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<h2>HL Paper 3</h2><div class="specification">
<p><span class="fontstyle0">Gasoline (petrol), biodiesel and ethanol are fuels.</span></p>
<p><span class="fontstyle0"><img src="data:image/png;base64,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" width="602" height="122"></span></p>
<p style="text-align: left;"><span class="fontstyle0">[U.S. Department of Energy. https://afdc.energy.gov/] <br> </span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Calculate the energy released, in <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>kJ</mi></math>, from the complete combustion of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>5</mn><mo>.</mo><mn>00</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup></math></span><span class="fontstyle0"> </span><span class="fontstyle0">of ethanol.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">State a class of organic compounds found in gasoline.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Outline the advantages and disadvantages of using biodiesel instead of gasoline as fuel for a car. Exclude any discussion of cost.</span></p>
<p><span class="fontstyle0"><img 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PGLzp91+JiNvgKuC9dF36noWGI2zIbZ6CvguqjM66LvJJTLkgoo+eVCbT8IECBAgAABAgQI5Ago+TnOUggQIECAAAECBAikCSj5adSCCBAgQIAAAQIECOQIKPk5zlIIECBAgAABAgQIpAko+WnUgggQIECAAAECBAjkCCj5Oc5SCBAgQIAAAQIECKQJKPlp1IIIECBAgAABAgQI5Ago+TnOUggQIECAAAECBAikCSj5adSCCBAgQIAAAQIECOQIKPk5zlIIECBAgAABAgQIpAko+WnUgggQIECAAAECBAjkCCj5Oc5SCBAgQIAAAQIECKQJKPlp1IIIECBAgAABAgQI5Ago+TnOUggQIECAAAECBAikCSj5adSCCBAgQIAAAQIECOQIKPk5zlIIECBAgAABAgQIpAko+WnUgggQIECAAAECBAjkCCj5Oc5SCBAgQIAAAQIECKQJKPlp1IIIECBAgAABAgQI5Ago+TnOUggQIECAAAECBAikCSj5adSCCBAgQIAAAQIECOQIKPk5zlIIECBAgAABAgQIpAko+WnUgggQIECAAAECBAjkCCj5Oc5SCBAgQIAAAQIECKQJKPlp1IIIECBAgAABAgQI5Ago+TnOUggQIECAAAECBAikCSj5adSCCBAgQIAAAQIECOQIKPk5zlIIECBAgAABAgQIpAko+WnUgggQIECAAAECBAjkCFRAyW+OhoUTolCYFUsbvwjVOnzMRl8B14Xrou9UdCwxG2bDbPQVcF1U5nXRdxLKZUkFlPxyobYfBAgQIECAAAECBHIElPwcZykECBAgQIAAAQIE0gSU/DRqQQQIECBAgAABAgRyBJT8HGcpBAgQIECAAAECBNIElPw0akEECBAgQIAAAQIEcgSU/BxnKQQIECBAgAABAgTSBJT8NGpBBAgQIECAAAECBHIElPwcZykECBAgQIAAAQIE0gSU/DRqQQQIECBAgAABAgRyBJT8HGcpBAgQIECAAAECBNIElPw0akEECBAgQIAAAQIEcgSU/BxnKQQIECBAgAABAgTSBJT8NGpBBAgQIECAAAECBHIElPwcZykECBAgQIAAAQIE0gSU/DRqQQQIECBAgAABAgRyBJT8HGcpBAgQIECAAAECBNIElPw0akEECBAgQIAAAQIEcgSU/BxnKQQIECBAgAABAgTSBJT8NGpBBAgQIECAAAECBHIElPwcZykECBAgQIAAAQIE0gSU/DRqQQQIECBAgAABAgRyBJT8HGcpBAgQIECAAAECBNIElPw0akEECBAgQIAAAQIEcgSU/BxnKQQIECBAgAABAgTSBJT8NGpBBAgQIECAAAECBHIElPwcZykECBAgQIAAAQIE0gSU/DRqQQQIECBAgAABAgRyBJT8HGcpBAgQIECAAAECBNIElPw0akEECBAgQIAAAQIEcgQqoOQ3R8PCCVEozIqljV+Eah0+ZqOvgOvCddF3KjqWmA2zYTb6CrguKvO66DsJ5bKkAkp+uVDbDwIECBAgQIAAAQI5Akp+jrMUAgQIECBAgAABAmkCSn4atSACBAgQIECAAAECOQJKfo6zFAIECBAgQIAAAQJpAkp+GrUgAgQIECBAgAABAjkCSn6OsxQCBAgQIECAAAECaQJKfhq1IAIECBAgQIAAAQI5Akp+jrMUAgQIECBAgAABAmkCSn4atSACBAgQIECAAAECOQJKfo6zFAIECBAgQIAAAQJpAkp+GrUgAgQIECBAgAABAjkCSn6OsxQCBAgQIECAAAECaQJKfhq1IAIECBAgQIAAAQI5Akp+jrMUAgQIECBAgAABAmkCSn4atSACBAgQIECAAAECOQJKfo6zFAIECBAgQIAAAQJpAkp+GrUgAgQIECBAgAABAjkCSn6OsxQCBAgQIECAAAECaQJKfhq1IAIECBAgQIAAAQI5Akp+jrMUAgQIECBAgAABAmkCSn4atSACBAgQIECAAAECOQJKfo6zFAIECBAgQIAAAQJpAkp+GrUgAgQIECBAgAABAjkCSn6OsxQCBAgQIECAAAECaQJKfhq1IAIECBAgQIAAAQI5Akp+jrMUAgQIECBAgAABAmkCSn4atSACBAgQIECAAAECOQJKfo6zFAIECBAgQIAAAQJpAkp+GrUgAgQIECBAgAABAjkCFVDym6Nh4YQoFGbF0sYvQrUOH7PRV8B14broOxUdS8yG2TAbfQVcF5V5XfSdhHJZUgElv1yo7QcBAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcASU/x1kKAQIECBAgQIAAgTQBJT+NWhABAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcASU/x1kKAQIECBAgQIAAgTQBJT+NWhABAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcASU/x1kKAQIECBAgQIAAgTQBJT+NWhABAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcASU/x1kKAQIECBAgQIAAgTQBJT+NWhABAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNIEKKPnN0bBwQhQKs2Jp4xe5WoeP2egr4LpwXfSdio4lZsNsmI2+Aq6Lyrwu+k5CuSypgJJfLtT2gwABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmsDALPktH8TtRxajsMuu3b93rYohQ0fHocdfELc/889o6kHc9NzFMWKX6XH7+y09ln71P2753RlRVzwmlnz0r83Zcc9bG5fFA/NviCcaW3f8T/5OgAABAgQIECAwAAUGdMmvOfqO2N6nW5u3xPqVr8avL/9GjKwaE2c9/EE0J5/Qf1fJ3/DQ7KgtnhD3rlXyk0+5OAIECBAgQIDAv0WgYkp+l27rmnj8+2OiNOKM+O0nuaVXye86C34gQIAAAQIECBD4FwpUXsmPiOaG6+LQQm3Mum9NtNX83rfrtEbjK0viR0eNjxHFqqitGx3TTpoXDy7f0OM0bIw3ll4Rp07bN0ZUV0V19Yg48Jvnxz3LPmvfXvuKrZ/F8vvnxQn77xl1pbrYd/r34pbLj4shnbfrbHnmwhg1aFLc+GbPW3daYuUd34jq3X8U/725bStfltMUL1yyVww5fUn88YbTY9reQ6KmODwOPP7yePTdrRHRGmvvOSFqu25bqoqZN7/dvnsb31gaP5lzWIwfVhPVhZoYOfHouPDuZfFZj/c9G/7+YMw//sDYu7YUdXtNjjlX3hIXTa6Oqdct77Jo+fi5WPz9b8TE4dVRW7NXTDp+Xvzq7z2sWhvjb0vOjWP2Gx61hVLsvs8hcfK8B6J7leZoWDghCoXZ8dvPujbrBwIECBAgQIAAgX4IVGTJjy1PxA+HD47R5/8l2qpwr5K/rj7O2n2P+PbtDbFua0s0bfgg/njxgVE77ifxt/Yb+Vtj3eM/iLHVk2Ju/T9i/dZtsWHlC7H4xL2i5oCr49X2dVrin0tPi32K4+LMO1+OfzZ+HA2/Oj+m1OwaharOe/K3PhfzRg6OKT9bEV01v+XDWHJEVYy64JnYEjuT01HyC7vWxCHnPRzL126OLWtejkVH1UXN1Fvinc4N73i7Tuu6x+OHo2piykX18Xbj1ti2YWW8eOtJMarqwFjQcZDR+vFv4uy9S7HfKbfHXz9aF2uWPxxzJw+Jwi5V3SV/w4tx9eTa2H3avPjt39fEhk9fj1+fPznq9pwV93d+v2Fd/Rmx1+4nxh3L1sXWlqbY8P4TcckBpZh45Su9vhfRjxn2UgIECBAgQIAAgR0EKrPkb3sprhw/OGpnPxxtnzn3LPnNr14VE4qHxKIVX3DHfuvaeODbtTF89kPxaY9PvTf/9vQYWjwm7lzVGtH8ZiyaWoqR362P9V3gW+KlyydGaXvJj23x0mWjozjpxljRWcZbPvxFHFnYO+Y9tzViZ3Kis+TXfS/+uKkrKDbXnxFDqr4VD3Teg9+75LfG2vtmRd1uc+Lh3gcQZ9aW4tglq9r+rSPevHFa1O75vfh9Y/d2ty27Ng4dvL3kt8Squ74VQ4uHx81v9bDa8lz8eFwxJlz6fPt2XvvJuKidclP0XKV7i34iQIAAAQIECBD4VwhUaMl/PuaPHRxDTv1NtN0V07Pkx8Zn45Kxg6N29DFx8aKH49kVn7R/2r8j/tbVDfHUQ0vi5gXz4oezj4yDdy9FoWpmLH6vJVo/vT9OLpbiW7/8uPv2nYjY8scfxF49nq7T9MqVMb4wJRa1t/yW+PD2I6Jmn8vipW3daf+/nOgs+dU9PrVve2XTs3Njr6pvxJ0rO9499C75ndveujqWP/lQ3LloQVx2zpw4ev89onaXYhx523sRravjnuNLUXvS/bGuxxuZ2PZcXDam1PlJ/uZ47KyhUX3Agnit56OKYnM8dubQqJl2U3vQxmfmxvhBpdj36Avj5oefjRWftP3biV8ECBAgQIAAAQL/SoHKLPmb6uPsukLsN++5aOvTvUp+RGz7+Pn4r8tOiRmjatofwTl032Pj0odWtL8hiGiJj+oviClDCjF8zPSY9d1L4volj8YLd3wnhrWV/HdbouW9xXFUVSlOXdrj4/W27b40PyaWejxCs2lZXDO+Kqbe9Fa0tHwQd8woxn5X/E/nbSxfnrO95NfMuD0+7Lrnp+145sbIqpmxpPLR6aAAABI7SURBVHPhjiW/5aP6uOjg3aK029g44sSz49LrlkT983fEaUOKceSt70Y0vxWLphVj2Jn1saXn9DUvj+u335Pfurb9jUCvx5R23fu/axT3vazzldvi4+d/GfPnTI+x1W2PNB0SE/7PJfHwivYvHfTcup8JECBAgAABAgS+IoGKLPnb/ucncVBhWJzxSMe9KDuW/G7bbbFuxdNx1w8mx5BBE2JB20fWW56OuaMLMXL2/bGyxyfY6x88OWo7S37rugdidqkUx925qtcn+Vv/fEHs0+OT/LbbYv5+7f5Rc8gtseLt22Nm1fiOjLYd2Imc/13J3xLPXDQmSnvMiQc+7HUAMafYWfJbV8fdx5Wi9sT7et2SFNuejx+P3f5J/qb47WlDombm4nivxxuMbrvP+Wnbunjr6f+KH02qjuL4q3f4F4DPWd8iAgQIECBAgACB/5VA5ZX81k/j8XNGR/Xo8+Kpzqe5fHHJ7zBtXX1vfKuqOs6s3xStq++KE4rFOGrx+91fmI3N7cW5WJgRt77dEtH8dtw2oxQjTn0kup/S2RTLr50c1V335Hdsu+XNG2JKcUZccvHhUTPxmljeeXv7TuV03q7zZZ/kb1r6ne7n5HcW+LZy3vP//bX56Ytj3KDtT99pjjd+NjVq9zwn/tDjiTfNb94Y0wvd9+S//3+/GUOGnBj3tH0PYfuv5hWx6LBSDJ/9q+1LdvizNdbce1zUlE6Px3r/Q8cO6/krAQIECBAgQIDA/1agckp+y5ZY/8HL8cgV34y9SxPivPqPu0p6z5K/6ekLY2z1tLjyyfdi/baWaNm8Kp5dOCOGDpsdj6xujWh6La49qBh1h10Zf1m5KbZ+9kH89a5zYlJp1ygUpsT17S29NdY9eUFMLO4Ts295NlY2fhIrHv1xzKgb1P10ne1nrOUfcfMhg6Owy6CY9NPXu/Zp53I6vnj7ZSV/65M/ipFVh8R1r66NNWsa47WFB0dNzfS46s8rY9PWz+KDF++Kcw+s7vXknNbVv4vvj6qOiWf8Ml5e1RhrVzwaV0wfFlW7VMW0619v3/vWdU/F3ImlGHnUgvj9G2tjQ+M78dSCI2NE9ZRY+FJbg98Uz1ywT+w29fJ46r31sa2lJTavejauPXxIjDh5aazp8d5gO4c/CRAgQIAAAQIE+i8woEt+r/vFBxVj6Ij9YsasS2LJ8x/3+r/d9iz57c+m/9VlMWvyPjG8ODiqa/aKycfPjXuXre+69WZjw91x3owxMbyqELVDx8T0k+fHvfXXxzGlujjlwbWdZ2VLvFO/IOZMHhlDizUxatIp8dOfnhX79rwnv33Nlnh38fSo2mVy5xdwu0/ql+fsXMmPDS/Hz48bE3WDizF+3nMRGxvinnOPiHF1xSgVh8W4qbPjinvq44ajqmP4yQ927cDGv98fc4+eEHuWSjF05NQ464YFccrupY779jvXalr5VCw664iYMKwU1cWhse9hZ8RNf17V7bvxjXjo0pNi6qihUTuoKur2PDhOuPieWLZ+e8P3nPwucD8QIECAAAECBL4igYFZ8r8iHJvZQaDxoTilZlh8v959NjvI+CsBAgQIECBAoKwElPyyOh3lsjMt8e5tM6N2yBFxzX9/EBuaW2LLmoZYev6kGD5+bjzd4z79ctlj+0GAAAECBAgQINAtoOR3W/ipp8CmN+OR+bPisDHDonbQoKipGxMzTrsu/vC+59z3ZPIzAQIECBAgQKAcBZT8cjwr9okAAQIECBAgQIBAPwSU/H7geSkBAgQIECBAgACBchRQ8svxrNgnAgQIECBAgAABAv0QUPL7geelBAgQIECAAAECBMpRQMkvx7NinwgQIECAAAECBAj0Q0DJ7weelxIgQIAAAQIECBAoRwElvxzPin0iQIAAAQIECBAg0A8BJb8feF5KgAABAgQIECBAoBwFlPxyPCv2iQABAgQIECBAgEA/BJT8fuB5KQECBAgQIECAAIFyFFDyy/Gs2CcCBAgQIECAAAEC/RBQ8vuB56UECBAgQIAAAQIEylFAyS/Hs2KfCBAgQIAAAQIECPRDQMnvB56XEiBAgAABAgQIEChHASW/HM+KfSJAgAABAgQIECDQDwElvx94XkqAAAECBAgQIECgHAWU/HI8K/aJAAECBAgQIECAQD8ElPx+4HkpAQIECBAgQIAAgXIUUPLL8azYJwIECBAgQIAAAQL9EFDy+4HnpQQIECBAgAABAgTKUUDJL8ezYp8IECBAgAABAgQI9ENAye8HnpcSIECAAAECBAgQKEcBJb8cz4p9IkCAAAECBAgQINAPASW/H3heSoAAAQIECBAgQKAcBZT8cjwr9okAAQIECBAgQIBAPwSU/H7geSkBAgQIECBAgACBchSogJLfHA0LJ0ShMCuWNn7RKbAOH7PRV8B14broOxUdS8yG2TAbfQVcF5V5XfSdhHJZUgElv1yo7QcBAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcASU/x1kKAQIECBAgQIAAgTQBJT+NWhABAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcASU/x1kKAQIECBAgQIAAgTQBJT+NWhABAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcASU/x1kKAQIECBAgQIAAgTQBJT+NWhABAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcASU/x1kKAQIECBAgQIAAgTQBJT+NWhABAgQIECBAgACBHAElP8dZCgECBAgQIECAAIE0ASU/jVoQAQIECBAgQIAAgRwBJT/HWQoBAgQIECBAgACBNAElP41aEAECBAgQIECAAIEcgQoo+c3RsHBCFAqzYmnjF6Fah4/Z6CvgunBd9J2KjiVmw2yYjb4CrovKvC76TkK5LKmAkl8u1PaDAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjoCSn+MshQABAgQIECBAgECagJKfRi2IAAECBAgQIECAQI6Akp/jLIUAAQIECBAgQIBAmoCSn0YtiAABAgQIECBAgECOgJKf4yyFAAECBAgQIECAQJqAkp9GLYgAAQIECBAgQIBAjkAFlPzmaFg4IQqFWbG08YtQrcPHbPQVcF24LvpORccSs2E2zEZfAddFZV4XfSehXJZUQMkvF2r7QYAAAQIECBAgQCBHQMnPcZZCgAABAgQIECBAIE1AyU+jFkSAAAECBAgQIEAgR0DJz3GWQoAAAQIECBAgQCBNQMlPoxZEgAABAgQIECBAIEdAyc9xlkKAAAECBAgQIEAgTUDJT6MWRIAAAQIECBAgQCBHQMnPcZZCgAABAgQIECBAIE1AyU+jFkSAAAECBAgQIEAgR0DJz3GWQoAAAQIECBAgQCBNQMlPoxZEgAABAgQIECBAIEdAyc9xlkKAAAECBAgQIEAgTUDJT6MWRIAAAQIECBAgQCBHQMnPcZZCgAABAgQIECBAIE1AyU+jFkSAAAECBAgQIEAgR0DJz3GWQoAAAQIECBAgQCBNQMlPoxZEgAABAgQIECBAIEdAyc9xlkKAAAECBAgQIEAgTUDJT6MWRIAAAQIECBAgQCBHQMnPcZZCgAABAgQIECBAIE1AyU+jFkSAAAECBAgQIEAgR0DJz3GWQoAAAQIECBAgQCBNQMlPoxZEgAABAgQIECBAIEdAyc9xlkKAAAECBAgQIEAgTUDJT6MWRIAAAQIECBAgQCBHQMnPcZZCgAABAgQIECBAIE1AyU+jFkSAAAECBAgQIEAgR0DJz3GWQoAAAQIECBAgQCBNQMlPoxZEgAABAgQIECBAIEegAkp+czQsnBCFwqxY2vhFqNbhYzb6CrguXBd9p6JjidkwG2ajr4DrojKvi76TUC5LKqDklwu1/SBAgAABAgQIECCQI6Dk5zhLIUCAAAECBAgQIJAmoOSnUQsiQIAAAQIECBAgkCOg5Oc4SyFAgAABAgQIECCQJqDkp1ELIkCAAAECBAgQIJAjoOTnOEshQIAAAQIECBAgkCag5KdRCyJAgAABAgQIECCQI6Dk5zhLIUCAAAECBAgQIJAmoOSnUQsiQIAAAQIECBAgkCOg5Oc4SyFAgAABAgQIECCQJqDkp1ELIkCAAAECBAgQIJAjoOTnOEshQIAAAQIECBAgkCag5KdRCyJAgAABAgQIECCQI6Dk5zhLIUCAAAECBAgQIJAmoOSnUQsiQIAAAQIECBAgkCOg5Oc4SyFAgAABAgQIECCQJqDkp1ELIkCAAAECBAgQIJAjoOTnOEshQIAAAQIECBAgkCag5KdRCyJAgAABAgQIECCQI6Dk5zhLIUCAAAECBAgQIJAmoOSnUQsiQIAAAQIECBAgkCOg5Oc4SyFAgAABAgQIECCQJqDkp1ELIkCAAAECBAgQIJAjoOTnOEshQIAAAQIECBAgkCag5KdRCyJAgAABAgQIECCQI6Dk5zhLIUCAAAECBAgQIJAmoOSnUQsiQIAAAQIECBAgkCOg5Oc4SyFAgAABAgQIECCQJlABJb85GhZOiEJhVixt/CJX6/AxG30FXBeui75T0bHEbJgNs9FXwHVRmddF30kolyUVUPLLhdp+ECBAgAABAgQIEMgRUPJznKUQIECAAAECBAgQSBNQ8tOoBREgQIAAAQIECBDIEVDyc5ylECBAgAABAgQIEEgTUPLTqAURIECAAAECBAgQyBFQ8nOcpRAgQIAAAQIECBBIE1Dy06gFESBAgAABAgQIEMgRUPJznKUQIECAAAECBAgQSBNQ8tOoBREgQIAAAQIECBDIEVDyc5ylECBAgAABAgQIEEgTUPLTqAURIECAAAECBAgQyBFQ8nOcpRAgQIAAAQIECBBIE1Dy06gFESBAgAABAgQIEMgRUPJznKUQIECAAAECBAgQSBNQ8tOoBREgQIAAAQIECBDIEVDyc5ylECBAgAABAgQIEEgTUPLTqAURIECAAAECBAgQyBFQ8nOcpRAgQIAAAQIECBBIE1Dy06gFESBAgAABAgQIEMgRUPJznKUQIECAAAECBAgQSBNQ8tOoBREgQIAAAQIECBDIEVDyc5ylECBAgAABAgQIEEgTUPLTqAURIECAAAECBAgQyBFQ8nOcpRAgQIAAAQIECBBIE1Dy06gFESBAgAABAgQIEMgRUPJznKUQIECAAAECBAgQSBNQ8tOoBREgQIAAAQIECBDIEVDyc5ylECBAgAABAgQIEEgTUPLTqAURIECAAAECBAgQyBFQ8nOcpRAgQIAAAQIECBBIE9jpkv/zmxbFnsN3j5F7jPCbgRkwA2bADJgBM2AGzIAZKOMZGDFseLz6t7997puK/+i5dPPmzbFm9Wq/GZgBM2AGzIAZMANmwAyYga/BDDQ3N/es810/9yr5XUv9QIAAAQIECBAgQIDA11ZAyf/anjo7ToAAAQIECBAgQODzBZT8z3exlAABAgQIECBAgMDXVkDJ/9qeOjtOgAABAgQIECBA4PMF/h/S5WXQLyIjlwAAAABJRU5ErkJggg==" width="694" height="392"></span></p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">A mixture of gasoline and ethanol is often used as a fuel. Suggest an advantage of such a mixture over the use of pure gasoline. Exclude any discussion of cost.</span></p>
<p> </p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">When combusted, all three fuels can release carbon dioxide, a greenhouse gas, as well as particulates. Contrast how carbon dioxide and particulates interact with sunlight.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Methane is another greenhouse gas. Contrast the reasons why methane and carbon dioxide are considered significant greenhouse gases.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Suggest a wavenumber absorbed by methane gas.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Determine the relative rate of effusion of methane (<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>M</mi><mi mathvariant="normal">r</mi></msub><mo>=</mo><mn>16</mn><mo>.</mo><mn>05</mn></math></span><span class="fontstyle0">) to carbon dioxide (</span><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>M</mi><mi mathvariant="normal">r</mi></msub><mo>=</mo><mn>44</mn><mo>.</mo><mn>01</mn></math><span class="fontstyle0">), under the same conditions of temperature and pressure. Use section 1 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iv).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mn>21</mn><mo> </mo><mn>200</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>−</mo><mn>3</mn></mrow></msup><mo>×</mo><mn>5</mn><mo>.</mo><mn>00</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup><mo>=</mo><mo>»</mo><mn>106000</mn><mo>/</mo><mn>1</mn><mo>.</mo><mn>06</mn><mo>×</mo><msup><mn>10</mn><mn>5</mn></msup><mo>«</mo><mi>kJ</mi><mo>»</mo></math> ✔</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>alkane<br><em><strong>OR</strong></em><br>cycloalkane<br><em><strong>OR</strong></em><br>arene ✔</p>
<p><br><em>Accept “alkene”.</em><br><em>Do <strong>not</strong> accept just “hydrocarbon”, since given in stem.</em><br><em>Do <strong>not</strong> accept “benzene/aromatic” for “arene”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Advantages: <strong>[2 max]</strong></em></p>
<p>renewable ✔</p>
<p>uses up waste «such as used cooking oil» ✔</p>
<p>lower carbon footprint/carbon neutral ✔</p>
<p>higher flashpoint ✔</p>
<p>produces less <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>SO</mi><mi mathvariant="normal">x</mi></msub></math>/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>SO</mi><mn>2</mn></msub></math><br><em><strong>OR</strong></em><br>less polluting emissions ✔</p>
<p>has lubricating properties<br><em><strong>OR</strong></em><br>preserves/increases lifespan of engine ✔</p>
<p>increases the life of the catalytic converter ✔</p>
<p>eliminates dependence on foreign suppliers ✔</p>
<p>does not require pipelines/infrastructure «to produce» ✔</p>
<p>relatively less destruction of habitat compared to obtaining petrochemicals ✔</p>
<p> </p>
<p><em>Accept “higher energy density” OR “biodegradable” for advantage.</em></p>
<p><br><em>Disadvantages: <strong>[2 max]</strong></em></p>
<p>needs conversion/transesterification ✔</p>
<p>takes time to produce/grow plants ✔</p>
<p>takes up land<br><em><strong>OR</strong></em><br>deforestation ✔</p>
<p>fertilizers/pesticides/phosphates/nitrates «used in production of crops» have negative environmental effects ✔</p>
<p>biodiversity affected<br><em><strong>OR</strong></em><br>loss of habitats «due to energy crop plantations» ✔</p>
<p>cannot be used at low temperatures ✔</p>
<p>variable quality «in production» ✔</p>
<p>high viscosity/can clog/damage engines ✔</p>
<p><br><em>Accept “lower specific energy” as disadvantage.</em></p>
<p><em>Do <strong>not</strong> accept “lower octane number” as disadvantage”.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any one:</em></p>
<p>uses up fossil fuels more slowly ✔</p>
<p>lower carbon footprint/CO2 emissions ✔</p>
<p>undergoes more complete combustion ✔</p>
<p>produces fewer particulates ✔</p>
<p>higher octane number/rating<br><em><strong>OR</strong></em><br>less knocking ✔</p>
<p>prevents fuel injection system build up<br><em><strong>OR</strong></em><br>helps keep engine clean ✔</p>
<p><br><em>Accept an example of a suitable advantage even if repeated from 11c.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>carbon dioxide allows sunlight/short wavelength radiation to pass through <em><strong>AND</strong> </em>particulates reflect/scatter/absorb sunlight ✔</p>
<p><em>Accept “particulates reflect/scatter/absorb sunlight <strong>AND</strong> carbon dioxide does not”. </em><br><em>Accept “<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><msub><mi>O</mi><mn mathvariant="italic">2</mn></msub></math> absorbs <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>I</mi><mi>R</mi></math> «radiation» <strong>AND</strong> particulates reflect/scatter/absorb sunlight”. </em></p>
<p><em>Do <strong>not</strong> accept “traps” for “absorbs”.</em></p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>carbon dioxide is highly/more abundant «in the atmosphere» ✔</p>
<p>methane is more effective/potent «as a greenhouse gas»<br><em><strong>OR</strong></em><br>methane/better/more effective at absorbing <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>IR</mi></math> «radiation»<br><em><strong>OR</strong></em><br>methane has greater greenhouse factor<br><em><strong>OR</strong></em><br>methane has greater global warming potential/GWP✔</p>
<p><br><em>Accept “carbon dioxide contributes more to global warming” for M1.</em></p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>any value or range within <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>2850</mn><mo>–</mo><mn>3090</mn><mo>«</mo><msup><mi>cm</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math> ✔</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«rate of effusion of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><msub><mi>CH</mi><mn>4</mn></msub><msub><mi>CO</mi><mn>2</mn></msub></mfrac><mo>=</mo><msqrt><mfrac><mrow><mn>44</mn><mo>.</mo><mn>01</mn></mrow><mrow><mn>16</mn><mo>.</mo><mn>05</mn></mrow></mfrac></msqrt><mo>=</mo><mo>»</mo><mn>1</mn><mo>.</mo><mn>656</mn></math> ✔</p>
<div class="question_part_label">e(iv).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Almost all were able to calculate the energy released from the complete combustion of ethanol.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The majority cited correctly that alkanes are a class of organic compounds found in gasoline.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most gained at least one mark for an advantage of using biodiesel instead of gasoline as fuel for a car and most scored one mark at least for a disadvantage of biodiesel. Many conveyed solid understanding, though the disadvantages were not as well articulated as the advantages. Some incorrectly based their responses on cost factors which were excluded as outlined in the stem of the question.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most scored the one mark for this question, with "less knocking or higher octane number/rating" the most common correct answer seen.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The wording of this question was critical which involved contrasting how carbon dioxide and particulates interact with sunlight. Some missed the "Contrast" command term as the action verb. Loose, non-scientific syntax was often seen such as stating "traps" instead of "absorbs".</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was another "Contrast-type" question, which was better answered compared to (e)(i). Many scored both marks by stating that carbon dioxide is more abundant in the atmosphere whereas methane is more effective at absorbing IR radiation.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The main issue with this question was that a high percentage of candidates did not realise that wavenumber is the reciprocal of wavelength and hence wavenumber has typical units of cm<sup>-1</sup>. Many incorrectly gave wavelength values, in nm, which did not answer the question posed.</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The determination of the relative rate of effusion of methane to carbon dioxide was almost universally correctly computed as 1.656.</p>
<div class="question_part_label">e(iv).</div>
</div>
<br><hr><br><div class="specification">
<p>A fuel cell is an energy conversion device that generates electricity from a spontaneous redox reaction.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The <em>Geobacter</em> species of bacteria can be used in microbial fuel cells to oxidise aqueous ethanoate ions, <br>CH<sub>3</sub>COO<sup>−</sup>(aq), to carbon dioxide gas.</p>
<p>State the half-equations for the reactions at both electrodes.</p>
<p><img 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QQQQACBQhagoCjk7BIbAggggAACCCCAAAJ5FqCgyDMwwyOAAAIIIIAAAgggUMgCFBSFnF1iQwABBBBAAAEEEEAgzwIUFHkGZngEEEAAAQQQQAABBApZgIKikLNLbAgggAACCCCAAAII5FmAgiLPwAyPAAIIIIAAAggggEAhC1BQFHJ2iQ0BBBBAAAEEEEAAgTwLUFDkGZjhEUAAAQQQQAABBBAoZAEKikLOLrEhgAACCCCAAAIIIJBnAQqKPAMzPAIIIIAAAggggAAChSxAQVHI2SU2BBBAAAEEEEAAAQTyLEBBkWdghkcAAQQQQAABBBBAoJAFKCgKObvEhgACCCCAAAIIIIBAngUoKPIMzPAIIIAAAggggAACCBSyAAVFIWeX2BBAAAEEEEAAAQQQyLMABUWegRkeAQQQQAABBBBAAIFCFqCgKOTsEhsCCCCAAAIIIIAAAnkWoKDIMzDDI4AAAggggAACCCBQyAIUFIWcXWJDAAEEEEAAAQQQQCDPAhQUeQZmeAQQQAABBBBAAAEEClmAgqKQs0tsCCCAAAIIIIAAAgjkWYCCIs/ADI8AAggggAACCCCAQCELUFAUcnaJDQEEEEAAAQQQQACBPAsUTEERDwdV7/Mp0BLSsBtafFDB+oB8gTaFhuMue51ROLhSPl+VWkLHXfaRCv14wkoS54L5A1Do5zrxmUmeir8bOfcS/wOakrnhdyO/G62XR5yfyR/TnL0GtVyn4YPPMAzDnLfP55O1OQ3DYMoIIIAAAggggAACCCCQL4FMtULBvEORLzzGRQABBBBAAAEEEEAAAXcBCgp3G1oQQAABBBBAAAEEEEDAQ4CCwgOIZgQQQAABBBBAAAEEEHAXoKBwt6EFAQQQQAABBBBAAAEEPAQoKDyAaEYAAQQQQAABBBBAAAF3AQoKdxtaEEAAAQQQQAABBBBAwEOAgsIDiGYEEEAAAQQQQAABBBBwF6CgcLehBQEEEEAAAQQQQAABBDwEKCg8gGhGAAEEEEAAAQQQQAABdwEKCncbWhBAAAEEEEAAAQQQQMBDgILCA4hmBBBAAAEEEEAAAQQQcBegoHC3oQUBBBBAAAEEEEAAAQQ8BCgoPIBoRgABBBBAAAEEEEAAAXcBCgp3G1oQQAABBBBAAAEEEEDAQ4CCwgOIZgQQQAABBBBAAAEEEHAXoKBwt6EFAQQQQAABBBBAAAEEPAQoKDyAaEYAAQQQQAABBBBAAAF3AQoKdxtaEEAAAQQQQAABBBBAwEOAgsIDiGYEEEAAAQQQQAABBBBwF6CgcLehBQEEEEAAAQQQQAABBDwEKCg8gGhGAAEEEEAAAQQQQAABdwEKCncbWhBAAAEEEEAAAQQQQMBDgILCA4hmBBBAAAEEEEAAAQQQcBegoHC3oQUBBBBAAAEEEEAAAQQ8BCgoPIBoRgABBBBAAAEEEEAAAXcBCgp3G1oQQAABBBBAAAEEEEDAQ4CCwgOIZgQQQAABBBBAAAEEEHAXoKBwt6EFAQQQQAABBBBAAAEEPAQoKDyAaEYAAQQQQAABBBBAAAF3AQoKdxtaEEAAAQQQQAABBBBAwEOAgsIDiGYEEEAAAQQQQAABBBBwF6CgcLehBQEEEEAAAQQQQAABBDwEKCg8gGhGAAEEEEAAAQQQQAABdwEKCncbWhBAAAEEEEAAAQQQQMBDgILCA4hmBBBAAAEEEEAAAQQQcBegoHC3oQUBBBBAAAEEEEAAAQQ8BCgoPIBoRgABBBBAAAEEEEAAAXcBCgp3G1oQQAABBBBAAAEEEEDAQ4CCwgOIZgQQQAABBBBAAAEEEHAXoKBwt6EFAQQQQAABBBBAAAEEPAQoKDyAaEYAAQQQQAABBBBAAAF3AQoKdxtaEEAAAQQQQAABBBBAwEOAgsIDiGYEEEAAAQQQQAABBBBwF6CgcLehBQEEEEAAAQQQQAABBDwEKCg8gGhGAAEEEEAAAQQQQAABdwEKCncbWhBAAAEEEEAAAQQQQMBDgILCA4hmBBBAAAEEEEAAAQQQcBegoHC3oQUBBBBAAAEEEEAAAQQ8BCgoPIBoRgABBBBAAAEEEEAAAXeBaVxQHFeopUo+n2+CfxVq6OjWQPSce+STaYkPKlgfUKAlpOFE/2GF33lKbS8NKp74/ozCwZXyBdoUGk4+M5nD5KxPYr5lqg/a88vRyCNhvdPxuF4Kn8nRgOnDxDUcalPAt1LBXB1jZL86Gp7SwEgu8/JV53+SLmbs9Q+p+2iOfx7S08b3CCCAAAIIIDAjBaZxQWHly9+qvpMxGYYx9u/UL3XLwR+r6p5ncvsCsuhqNfZEFGmvUal5+OF+dTb8RAMx+9y5RAsbX5UReUI1pdOf1o4q9TGu4f071bDpNxoNO3WHKfjdcYU2P6JP7rhD3ynJYV7G5X8Khm5OqaRK97dcpuYf/b2O5rKemqLhMi0EEEAAAQQQ+GoFcvjq6qudeMajlVynv/jhX6lu71a1vRq23j3I2IPGghWIa2SgS5s/ulsty69SYZ7wXskrUmn1vWo78rd6au9xr51pRwABBBBAAAEEzkugwF9fRXVwKKKRBElcI+GQgi311hKpgJa0BBUKJxcvJdWGFQ4F1bIkMPE+ziVPwyG1XF2rLdGoepuuUXFimdNpx5Ina7s+qHDKX4WtZSvOZVHxqAZeatESe/nWkhYFQ2Fr3hnyOZl+WfU5p+hA15hDoEEd75jzMef+sK6ufVJRvaam8kuTy79Mi4Dp+ZQ6GioSdqPLwkbCCgU9YjPn1N2hhkBy+VqgYZveOnB0XODx6H69lDF/47pI8d+p99lfaNbdN6ks5Wx3i9Eew2zvHo0nsbTOmZcJ828n+qgOvLVtNB7fqJ89tqSv2qVogerXfEdd7f9r9HyMh4Oq9wVyvyTOESabCCCAAAIIIFD4AikvsQov3Eqtrr9epYprZLBLa6vXa9+cHykSM2TEBtQ+Z59Wld+jjoETkrnPQKfWrHpf5c8NJpdPxf5JjxTvUu26X42+CBs1Kq1R+2Cfmv1+1XV+oti4ZU6XqGzxbarrfVvvHXJea/CF+nt6pdW3qspcFhX/TN331WlZ6Ntqj5yVYcR06rlrtW/VnVrf/Zn7uyuT6ZdVn3M62r1BlVU/l9aFdMqcT6hGBxvM+fxOJTWPabCvVX7dpc6hL8eWfymqvV2/0ZWt78uI/Yv23l+l0pGPFVx7p1bts2M7q0j7t7VvVbWWdey3CqYTGth2n6p+9oXu2HsyEX/4hwt04M13FB3FluJHu3VfZZNCdv6MQT1X/r5WVbdlvDYgfqhPLwQX6O7F8x3vTmSK0TQ3z4VndM+yPSpe26tYYjndWUUeuUxdtRv0vHm+ZMp/9B29eWCBfhg2l+KdVeTnC/RmndXPjOmiuMyS/7obVeE4H4sWNqrHiKin8WqHjQOdTQQQQAABBBBAIBsBw/qSzNfQ0+nrc6OvudKQv9XoOxlLmXgs8p6x7d7rDFVvM/pPmW3Jff2Nu40jKbtaY9R1GkOxL42hzrsMJbZThhv7JvaJ0VnnN/zNfcZJ89mTfUaz32/UdX5iJIe1xrDnlNj/j43qrR8ap+xREn0qjea+zw3DiBkn+1oNv+4yOoe+tPcYe94ex9GS3Myyn3X85PzOp48jxsQBnU4TjJOISWMuiT7Wfv61xu4jZx0RpPVP8bB3S9vHyt/43Fh5tfNhdx99tOeQdo6k5zGxvzNGl3FTPLPIvz2PlH72nC6Cy7jz1Z4gjwgggAACCCCAQGaBTLXC9H+HIvqkaq8oTrnTU3HgUR275Un1v7JWleZFuMO/VU9XRBU3Xyt/SsQlmle+QDp4SEdGvqbAv/sPqu59Vp2v/1qh7r0KX+gdgRLLTG7T0LbXtT9x16dzOvput7rKf6CVi66UlHy3Iuov0/w5sxz1X5FK5pWpItqrnv4vHM/bm5Ppl12f+KEPtKtXqigPqMQ+nGarpr1fRk+jFqb4je4wwYZ1vIobdZ1/gtj0qYaODGu4/111RReofN7Y0SQrfnvURP4G5L9hvuakHD+Zv2jXu+qf8K5a53Ts8CFFK8o0z3ExtneMyXgj7VU6Ftqj7u5udXfvUEttjZp6T9uzOs/H09byu4voUhJQeYUcywDPMwR2RwABBBBAAAEEJhBIeXk2QfvUf2qiuzwZPWpvvF2V1gvZ+LHD+si5fiY9qughHT72e5VUrtcbQx369yf+XpvvXKLyy4vlc66bT+/n+f0szb11hVbLKgzin6rnhbdVsXpp6t2GJiqKypvU6zX+ZPpNpo/XPCZqjx/X4Y8iE7VYz0X00eGjipgv+DPs5WyKbqnVFfZ1JonHS1Xe9Jpzl7TtER0Z+jTtuWy+NZfIvaSGwBUqr31WH54wr434puqf61Zn3QW+IJ8SLtkYsA8CCCCAAAIIIJCdwPQvKLKIs2jOfN3gz7Dj6DsERSpZWK0Vje3634ahWKRfu//0mB6uvUebQ5O8O07p9apfLXX1/FYnEn/9vzFtPb+kuk4Nmdd1OG99m9juV3vNbPeJT6bfZPq4z8C9pWi25t8QcG9XQDfMn6vA/DJlSs3YANa1KuOMjAy36bXegRobJLuteFivrm/VO0t360jMLE6/rxUr7lBN4LSGDmZb/rgcakq4uMyNpxFAAAEEEEAAgUkIzIiCQokX9QEdfP//KGrfiCeBZf0FO21JjO1Y5K/UivsbtNpv/jX9uPsF0naHCR+vVFV9ndTVrf/R/YZ6627T4rJLrD2Tbf6DB/RxyofwmRcF/1RLXD/YbTL9sutTVHaT7h73V3jrA/tc5zNR4BmOd+SQDspc5lSq0qpbtdpvLn9K3osrOVJcI4l9rHFd83dCAx23yzfuTlr2fGZpjlmwJJa0jSXeM8b+Qxo6qHFL5OKnTmiSZaU9IUkX0WUkkowrZTmbY2psIoAAAggggAACkxCYGQWFrtSiv1yn7731Y7Vtf98qKoY1GGzRqi1ztPWJFVpYZL1oXtKm7tFbyQ4r/O672q8VWlO/YPydcBJr0i9Lsp8e0cSXXBSpdNFybSjv1qbWD1WXcvtS8/MB1ujppfv0QNsO7U8UFebtbV/X5o3PSFs3auVCu/hwZncy/bLsU7RAS1vWqHxLu34SOpooouLRX2tn1wFVJ+ZzWfL6jsR04jo9ctql0DLjvkePfS8ttsEurVu1U+V2bKWL9eDTf6KuVS0KDpq38E3G//jmnY6lULNV/WCblqblL9y9RRs3ycqf08fetq9FMZe0OT4l2ivGRX+i+tUB9Xbt0l6r0ItH39f2th8r6HyDIqv823OxHy+eS3Lp3+Lx75DZU+MRAQQQQAABBBCYjIB9PXemK7ftfabWo3VXHtc7IaXPNmacGuozOpvrDDNWyW9UN3cafUOJ+zUld45FjP7dW417/WZ78p//3q3G7v5I8i5O4+4OdNaI9P03ozqxr3mnpn9L3ilq3Jzsuz+l39nHmuOpIaOvs9kaR4b89xpbd/cbkZQ7UqXHYxiGV7+Uuwudz7HOGpH+l43mar/lUGc07/xwbD6xI0Zfq+Vo3hXrC/NuV+l3eXI5XnWz0dk3NHbXq8RuJ42h3m1j7tWtxmu7nzTqUu5+lZ4/GSm5mYAn+ZR5ntzkuBOXvWPmGGORD42do+dK8liv9f2Dsbu50nE3qyzzP+68mSB3eXcZfxez2FCnUSfnXcpsGx4RQAABBBBAAIFUgUy1gs/c1SxEzA/usjYnU5fQB4EpKmAuH9uuZRuljjfWJ+/6NUVnmtdpmR/KuLRJQy17Ml+Xk9dJMDgCCCCAAAIITFeBTLXCDFnyNF1Tx7wvXKBIJZWr9ciit/Vs7+9clmdd+FGm9ghxDe99WU/M+2s9WJ3hIv+pHQSzQwABBBBAAIEpKkBBMUUTw7RyKTBb1Q9t1Lf27NE/T3yhSy4PNvXGGunXi+2nteXR2zWXn/iplx9mhAACCCCAwDQXYMnTNE8g00cAAQQQQAABBBBAIN8CLHnKtzDjI4AAAggggAACCCAwQwVYADFDE0/YCMyNB9MAAAU2SURBVCCAAAIIIIAAAgjkQoCCIheKjIEAAggggAACCCCAwAwVoKCYoYknbAQQQAABBBBAAAEEciFAQZELRcZAAAEEEEAAAQQQQGCGClBQzNDEEzYCCCCAAAIIIIAAArkQoKDIhSJjIIAAAggggAACCCAwQwUoKGZo4gkbAQQQQAABBBBAAIFcCFBQ5EKRMRBAAAEEEEAAAQQQmKECFBQzNPGEjQACCCCAAAIIIIBALgQoKHKhyBgIIIAAAggggAACCMxQAQqKGZp4wkYAAQQQQAABBBBAIBcCFBS5UGQMBBBAAAEEEEAAAQRmqAAFxQxNPGEjgAACCCCAAAIIIJALAQqKXCgyBgIIIIAAAggggAACM1SAgmKGJp6wEUAAAQQQQAABBBDIhQAFRS4UGQMBBBBAAAEEEEAAgRkqQEExQxNP2AgggAACCCCAAAII5EKAgiIXioyBAAIIIIAAAggggMAMFaCgmKGJJ2wEEEAAAQQQQAABBHIhQEGRC0XGQAABBBBAAAEEEEBghgpQUMzQxBM2AggggAACCCCAAAK5EKCgyIUiYyCAAAIIIIAAAgggMEMFKChmaOIJGwEEEEAAAQQQQACBXAhQUORCkTEQQAABBBBAAAEEEJihAhQUMzTxhI0AAggggAACCCCAQC4ECqagiIeDqvf5FGgJadhNJj6oYH1AvkCbQsNxl73OKBxcKZ+vSi2h4y77SIV+PGEliXPB/AEo9HOd+MwkT8XfjZx7if8BTcnc8LuR343WyyPOz+SPac5eg1qu0/DBZxiGYc7b5/PJ2pyGYTBlBBBAAAEEEEAAAQQQyJdAplqhYN6hyBce4yKAAAIIIIAAAggggIC7AAWFuw0tCCCAAAIIIIAAAggg4CFAQeEBRDMCCCCAAAIIIIAAAgi4C1BQuNvQggACCCCAAAIIIIAAAh4CFBQeQDQjgAACCCCAAAIIIICAuwAFhbsNLQgggAACCCCAAAIIIOAhQEHhAUQzAggggAACCCCAAAIIuAtQULjb0IIAAggggAACCCCAAAIeAhQUHkA0I4AAAggggAACCCCAgLsABYW7DS0IIIAAAggggAACCCDgIUBB4QFEMwIIIIAAAggggAACCLgLUFC429CCAAIIIIAAAggggAACHgIUFB5ANCOAAAIIIIAAAggggIC7AAWFuw0tCCCAAAIIIIAAAggg4CFAQeEBRDMCCCCAAAIIIIAAAgi4C1BQuNvQggACCCCAAAIIIIAAAh4CFBQeQDQjgAACCCCAAAIIIICAuwAFhbsNLQgggAACCCCAAAIIIOAhQEHhAUQzAggggAACCCCAAAIIuAtQULjb0IIAAggggAACCCCAAAIeAhQUHkA0I4AAAggggAACCCCAgLsABYW7DS0IIIAAAggggAACCCDgIUBB4QFEMwIIIIAAAggggAACCLgLUFC429CCAAIIIIAAAggggAACHgIUFB5ANCOAAAIIIIAAAggggIC7AAWFuw0tCCCAAAIIIIAAAggg4CFAQeEBRDMCCCCAAAIIIIAAAgi4C1BQuNvQggACCCCAAAIIIIAAAh4CFBQeQDQjgAACCCCAAAIIIICAu4DPMAzD5/O570ELAggggAACCCCAAAIIICDJMIxxDl8zn5moYdyePIEAAggggAACCCCAAAIIpAmw5CkNhG8RQAABBBBAAAEEEEAgewEKiuyt2BMBBBBAAAEEEEAAAQTSBCgo0kD4FgEEEEAAAQQQQAABBLIXoKDI3oo9EUAAAQQQQAABBBBAIE3g/wMxzyOjgB/gxwAAAABJRU5ErkJggg=="></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A concentration cell is an example of an electrochemical cell.</p>
<p>(i) State the difference between a concentration cell and a standard voltaic cell.</p>
<p>(ii) The overall redox equation and the standard cell potential for a voltaic cell are:</p>
<p>Zn (s) + Cu<sup>2+</sup> (aq) → Zn<sup>2+</sup> (aq) + Cu (s) <em>E</em><sup>θ</sup><sub>cell</sub> = +1.10 V</p>
<p>Determine the cell potential <em>E</em> at 298 K to three significant figures given the following concentrations in mol dm<sup>−3</sup>:</p>
<p>[Zn<sup>2+</sup>] = 1.00 × 10<sup>−4</sup> [Cu<sup>2+</sup>] = 1.00 × 10<sup>−1</sup></p>
<p>Use sections 1 and 2 of the data booklet.</p>
<p>(iii) Deduce, giving your reason, whether the reaction in (b) (ii) is more or less spontaneous than in the standard cell.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Dye-sensitized solar cells (DSSC) convert solar energy into electrical energy.</p>
<p>(i) Describe how a DSSC converts sunlight into electrical energy.</p>
<p>(ii) Explain the role of the electrolyte solution containing iodide ions, I<sup>−</sup>, and triiodide ions, I<sub>3</sub><sup>−</sup>, in the DSSC.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Negative electrode (anode):</em> CH<sub>3</sub>COO<sup>−</sup> (aq) + 2H<sub>2</sub>O (l) → 2CO<sub>2</sub> (g) + 7H<sup>+</sup> (aq) + 8e<sup>−</sup></p>
<p><em>Positive electrode (cathode):</em> O<sub>2 </sub>(g) + 4H<sup>+</sup> (aq) + 4e<sup>−</sup> → 2H<sub>2</sub>O (l)</p>
<p><em>Accept equilibrium signs in equations. <br>Award <strong>[1 max]</strong> if correct equations are given at wrong electrodes.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>i<br>concentration cell has different concentrations of electrolyte «solutions» «but same electrodes and electrolytes»<br><em><strong>OR</strong></em><br>standard voltaic cell has different electrodes/electrolytes «but same concentration of electrolytes»<br><em>Accept “both half-cells in concentration cell made from same materials”.</em></p>
<p><br>ii<br>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="E = 1.10 - \left( {\frac{{RT}}{{nF}}} \right)\ln \frac{{\left[ {{\text{Z}}{{\text{n}}^{2 + }}} \right]}}{{\left[ {{\text{C}}{{\text{u}}^{2 + }}} \right]}} = 1.10 - \left( {\frac{{8.31 \times 298}}{{2 \times 96500}}} \right)\ln \frac{{{{10}^{ - 4}}}}{{{{10}^{ - 1}}}} = 1.10 + 0.0886 = ">
<mi>E</mi>
<mo>=</mo>
<mn>1.10</mn>
<mo>−</mo>
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mi>R</mi>
<mi>T</mi>
</mrow>
<mrow>
<mi>n</mi>
<mi>F</mi>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
<mi>ln</mi>
<mo></mo>
<mfrac>
<mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<mtext>Z</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>n</mtext>
</mrow>
<mrow>
<mn>2</mn>
<mo>+</mo>
</mrow>
</msup>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
<mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<mtext>C</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>u</mtext>
</mrow>
<mrow>
<mn>2</mn>
<mo>+</mo>
</mrow>
</msup>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mn>1.10</mn>
<mo>−</mo>
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mn>8.31</mn>
<mo>×</mo>
<mn>298</mn>
</mrow>
<mrow>
<mn>2</mn>
<mo>×</mo>
<mn>96500</mn>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
<mi>ln</mi>
<mo></mo>
<mfrac>
<mrow>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>4</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mn>1.10</mn>
<mo>+</mo>
<mn>0.0886</mn>
<mo>=</mo>
</math></span>»</p>
<p>(+) 1.19 «V»<br><em>3 significant figures needed for mark.</em></p>
<p><br>iii<br>more spontaneous because <em>E</em> > <em>E</em><sup>θ</sup><sub>cell</sub></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>i</p>
<p>photon/«sun»light absorbed by the dye/photosensitizer/«transition» metal complex<br><em><strong>OR<br></strong></em>dye/photosensitizer/«transition» metal complex excited by photon/«sun»light </p>
<p>electron«s» move«s» to conduction band<br><em><strong>OR<br></strong></em>electron«s» transferred to semiconductor/TiO<sub>2</sub> </p>
<p> </p>
<p>ii</p>
<p>I<sub>3</sub><sup>−</sup> + 2e<sup>−</sup> → 3I<sup>−</sup> «at cathode»<br><em><strong>OR<br></strong></em>triiodide ions/I<sub>3</sub><sup>−</sup> reduced into/produce iodide ions/I<sup>−</sup> «at cathode»</p>
<p>iodide ions/I<sup>−</sup> reduce dye/act as reducing agent <em><strong>AND</strong></em> oxidized into/produce triiodide ions/I<sub>3</sub><sup>−</sup><sup> <br></sup><em><strong>OR<br></strong></em>dye<sup>+</sup> + e<sup>−</sup> → dye <strong><em>AND</em></strong> 3I<sup>-</sup> → I<sub>3</sub><sup>−</sup> + 2e<sup>−</sup></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p><span class="fontstyle0"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>1</mn><mo>.</mo><mn>57</mn><mo> </mo><mo>%</mo></math> of the mass of a rock weighing <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>46</mn><mo>.</mo><mn>5</mn><mo> </mo><mi>kg</mi></math> is uranium(IV) oxide, <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>UO</mi><mn>2</mn></msub></math></span><span class="fontstyle0">. <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>99</mn><mo>.</mo><mn>28</mn><mo> </mo><mo>%</mo></math> of the uranium atoms in the rock are uranium-238, <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mmultiscripts><mi mathvariant="normal">U</mi><mprescripts></mprescripts><none></none><mn>238</mn></mmultiscripts></math></span><span class="fontstyle0">.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Show that the mass of the <sup>238</sup>U</span><span class="fontstyle0"> isotope in the rock is <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi></math>.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">The half-life of <sup>238</sup>U</span><span class="fontstyle0"> is <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>4</mn><mo>.</mo><mn>46</mn><mo>×</mo><msup><mn>10</mn><mn>9</mn></msup></math></span><span class="fontstyle0"> </span><span class="fontstyle0">years. Calculate the mass of <sup>238</sup>U </span><span class="fontstyle0">that remains after <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi></math> has decayed for <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>2</mn><mo>.</mo><mn>23</mn><mo>×</mo><msup><mn>10</mn><mn>10</mn></msup></math></span><span class="fontstyle0"> </span><span class="fontstyle0">years.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Outline a health risk produced by exposure to radioactive decay.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Deduce the nuclear equation for the decay of uranium-238 to thorium-234.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Thorium-234 has a higher binding energy per nucleon than uranium-238. Outline what is meant by the binding energy of a nucleus.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Determine the nuclear binding energy, in <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">J</mi></math>, of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mmultiscripts><mi mathvariant="normal">U</mi><mprescripts></mprescripts><mn>238</mn></mmultiscripts></math> </span><span class="fontstyle0">using sections 2 and 4 of the data booklet.</span></p>
<p><span class="fontstyle0">The mass of the </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mmultiscripts><mi mathvariant="normal">U</mi><mprescripts></mprescripts><mn>238</mn></mmultiscripts></math><span class="fontstyle0"> nucleus is <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>238</mn><mo>.</mo><mn>050786</mn><mo> </mo><mi>amu</mi></math>.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mfrac><mrow><mi>mass</mi><mo> </mo><mo>%</mo></mrow><mrow><mi>fraction</mi><mo> </mo><mi>of</mi><mo> </mo><mi mathvariant="normal">U</mi><mo> </mo><mi>in</mi><mo> </mo><msub><mi>UO</mi><mn>2</mn></msub></mrow></mfrac><mo>=</mo><mo>»</mo><mfrac><mrow><mn>238</mn><mo>.</mo><mn>03</mn></mrow><mrow><mn>238</mn><mo>.</mo><mn>03</mn><mo>+</mo><mn>2</mn><mo>×</mo><mn>16</mn></mrow></mfrac></math> /<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>0</mn><mo>.</mo><mn>881</mn></math>/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>88</mn><mo>.</mo><mn>1</mn><mo> </mo><mo>%</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>46</mn><mo>.</mo><mn>5</mn><mo>«</mo><mi>kg</mi><mo>»</mo><mo>×</mo><mn>0</mn><mo>.</mo><mn>0157</mn><mo>×</mo><mn>0</mn><mo>.</mo><mn>881</mn><mo>×</mo><mn>0</mn><mo>.</mo><mn>9928</mn><mo>«</mo><mo>=</mo><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi><mo>»</mo></math> ✔</p>
<p><em>Award <strong>[1 max]</strong> for omitting mass composition (giving <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn mathvariant="italic">0</mn><mo mathvariant="italic">.</mo><mn mathvariant="italic">725</mn><mo mathvariant="italic"> </mo><mi>k</mi><mi>g</mi></math>).</em></p>
<p><em>M2 is for numerical setup, <strong>not</strong> for final value of <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn mathvariant="italic">0</mn><mo mathvariant="italic">.</mo><mn mathvariant="italic">639</mn><mo mathvariant="italic"> </mo><mi>k</mi><mi>g</mi></math>.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>Alternative 1</strong></em><br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mfrac><mrow><mn>2</mn><mo>.</mo><mn>23</mn><mo>×</mo><msup><mn>10</mn><mn>10</mn></msup><mo> </mo><mi>year</mi></mrow><mrow><mn>4</mn><mo>.</mo><mn>46</mn><mo>×</mo><msup><mn>10</mn><mn>9</mn></msup><mo> </mo><mi>year</mi></mrow></mfrac><mo>=</mo><mo>»</mo><mn>5</mn><mo>.</mo><mn>00</mn><mo>«</mo><mi>half</mi><mo>-</mo><mi>lives</mi><mo>»</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mi>m</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi><mo>×</mo><mo>(</mo><mn>0</mn><mo>.</mo><mn>5</mn><msup><mo>)</mo><mn>5</mn></msup><mo>=</mo><mo>»</mo><mn>0</mn><mo>.</mo><mn>0200</mn><mo>«</mo><mi>kg</mi><mo>»</mo></math> ✔</p>
<p><br><em><strong>Alternative 2</strong></em><br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mo>𝜆</mo><mo>=</mo><mfrac><mrow><mi>ln</mi><mo> </mo><mn>2</mn></mrow><mrow><mn>4</mn><mo>.</mo><mn>46</mn><mo>×</mo><msup><mn>10</mn><mn>9</mn></msup><mo> </mo><mi>year</mi></mrow></mfrac><mo>=</mo><mo>»</mo><mn>1</mn><mo>.</mo><mn>554</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>10</mn></mrow></msup><mo>«</mo><msup><mi>year</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mi>m</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi><mo>×</mo><msup><mo>𝑒</mo><mrow><mo>–</mo><mn>1</mn><mo>.</mo><mn>554</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>–</mo><mn>10</mn><mo> </mo><msup><mi>year</mi><mrow><mo>–</mo><mn>1</mn></mrow></msup></mrow></msup><mo>×</mo><mn>2</mn><mo>.</mo><mn>23</mn><mo>×</mo><msup><mn>10</mn><mrow><mn>10</mn><mo> </mo><mi>year</mi></mrow></msup></mrow></msup><mo>=</mo><mo>»</mo><mn>0</mn><mo>.</mo><mn>0200</mn><mo>«</mo><mi>kg</mi><mo>»</mo></math> ✔</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any one:</em></p>
<p>«genetic» mutations ✔</p>
<p>«could cause» cancer ✔<br><em>Accept specific named types of cancer.</em></p>
<p>cells «in body» altered ✔</p>
<p>cells «in body» cannot function ✔</p>
<p>damaged DNA/proteins/enzymes/organs/tissue ✔</p>
<p>«radiation» burns ✔</p>
<p>hair loss ✔</p>
<p>damage in foetuses ✔</p>
<p>damages/weakens immune system ✔</p>
<p> </p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mmultiscripts><mi mathvariant="normal">U</mi><mprescripts></mprescripts><mn>92</mn><mn>238</mn></mmultiscripts><mo>→</mo><mmultiscripts><mi>Th</mi><mprescripts></mprescripts><mn>90</mn><mn>234</mn></mmultiscripts><mo>+</mo><mmultiscripts><mi>He</mi><mprescripts></mprescripts><mn>2</mn><mn>4</mn></mmultiscripts></math> ✔</p>
<p><em>Do <strong>not</strong> penalize missing atomic numbers in the equation.</em></p>
<p><em>Accept “<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>α</mi></math>” for "<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>H</mi><mi>e</mi></math>”.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>energy required to separate a nucleus into protons and neutrons/nucleons<br><em><strong>OR</strong></em><br>energy released when nucleus was formed from «individual/free/isolated» protons and neutrons/nucleons ✔</p>
<p><br><em>Do <strong>not</strong> accept “energy released when atom was formed”.</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>238</mn><mo>.</mo><mn>050786</mn><mo>«</mo><mi>amu</mi><mo>»</mo><mo>×</mo><mn>1</mn><mo>.</mo><mn>66</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>27</mn></mrow></msup><mo>«</mo><mi>kg</mi><mo> </mo><msup><mi>amu</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math><br><em><strong>OR</strong></em></p>
<p><img src="data:image/png;base64,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" width="126" height="18"> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfenced><mrow><mn>92</mn><mo>×</mo><mn>1</mn><mo>.</mo><mn>672622</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>27</mn></mrow></msup></mrow></mfenced><mo>+</mo><mfenced><mrow><mn>146</mn><mo>×</mo><mn>1</mn><mo>.</mo><mn>674927</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>27</mn></mrow></msup></mrow></mfenced><mo>−</mo><mn>3</mn><mo>.</mo><mn>95</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>25</mn></mrow></msup></math><br><em><strong>OR</strong></em> <br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>3</mn><mo>.</mo><mn>42</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>27</mn></mrow></msup><mo>/</mo><mn>3</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>27</mn></mrow></msup><mo>«</mo><mi>kg</mi><mo>»</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mi>E</mi><mo>=</mo><mi>m</mi><msup><mi>c</mi><mn>2</mn></msup><mo>=</mo><mn>3</mn><mo>.</mo><mn>42</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>27</mn></mrow></msup><mo>×</mo><mo>(</mo><mn>3</mn><mo>.</mo><mn>00</mn><mo>×</mo><msup><mn>10</mn><mn>8</mn></msup><msup><mo>)</mo><mn>2</mn></msup><mo>=</mo><mo>»</mo><mn>3</mn><mo>.</mo><mn>08</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>10</mn></mrow></msup><mo>«</mo><mi mathvariant="normal">J</mi><mo>»</mo></math> ✔</p>
<p><br><em>Accept answers in the range “<math xmlns="http://www.w3.org/1998/Math/MathML"><mn mathvariant="italic">2</mn><mo mathvariant="italic">.</mo><mn mathvariant="italic">7</mn><mo mathvariant="italic">×</mo><msup><mn mathvariant="italic">10</mn><mrow><mo mathvariant="italic">−</mo><mn mathvariant="italic">10</mn></mrow></msup><mo mathvariant="italic">–</mo><mn mathvariant="italic">3</mn><mo mathvariant="italic">.</mo><mn mathvariant="italic">1</mn><mo mathvariant="italic">×</mo><msup><mn mathvariant="italic">10</mn><mrow><mo mathvariant="italic">−</mo><mn mathvariant="italic">10</mn></mrow></msup><mo mathvariant="italic">«</mo><mi>J</mi><mo mathvariant="italic">»</mo></math>”.</em></p>
<p><em>Award <strong>[3]</strong> for correct final answer.</em></p>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question was generally well answered. Many candidates approached this question using amount, in mol, and converting to mass at the end. Some candidates omitted the mass composition however, resulting in a mass of 0.725 kg, which yielded [1 max].</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The question involving half-life was very well answered and most scored both marks giving a final answer of 0.0200 kg, via different methods of calculation.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question on outlining a health risk produced by exposure to radioactive decay posed no difficulty and the most common, correct answers included "could cause cancer" and "can damage DNA".<br><br></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most scored the one mark for the nuclear equation for the decay of uranium-238 to thorium-234. The most common error was including a neutron on the product side</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Although many scored the one mark for outlining what is meant by the binding energy of a nucleus, the question was often answered as energy involved in the formation of an atom. Some candidates did not understand the difference between nucleus and nucleons.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This demanding question on the determination of the nuclear binding energy was well executed and many scored all three marks. Even the weaker candidates still managed to gain an ECF mark for M3 by using the E = mc<sup>2</sup> equation. The general performance on this type of calculation was much better than in previous sessions.</p>
<div class="question_part_label">f.</div>
</div>
<br><hr><br><div class="specification">
<p>Dye-Sensitized Solar Cells (DSSCs) use organic dyes. Their interaction with light has some similarities to photosynthesis.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify <strong>two</strong> ways in which the structure of the dye shown resembles the chlorophyll molecule. Use section 35 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Both photosynthesis and the Grätzel cell use energy from sunlight to bring about reduction. Deduce an equation for the reduction reaction in the electrolyte of a Grätzel cell.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>delocalized bonding/conjugated bonds</p>
<p>contain metal atom/ion coordinated to «organic» ligand(s)</p>
<p>involve bonds from nitrogen to the central metal ion</p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>I<sub>3</sub><sup>–</sup> + 2e<sup>–</sup> → 3I<sup>–</sup></p>
<p> </p>
<p><em>Accept I<sub>2</sub> + 2e<sup>–</sup> → 2I<sup>–</sup>.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Doping of silicon increases the conductivity in semiconductors.</span></p>
<p><span class="fontstyle0"> Describe the doping in p-type and n-type semiconductors.<br> </span></p>
<p><span class="fontstyle0"><img src="data:image/png;base64,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" width="697" height="229"></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Doping of silicon increases the conductivity in semiconductors.</span></p>
<p><span class="fontstyle0">Explain how doping improves the conductivity of silicon.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>p-type:</em><br>«small amount of» <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">B</mi><mo>/</mo><mi>Al</mi><mo>/</mo><mi>Ga</mi><mo>/</mo><mi>In</mi><mo>/</mo><mi>Tl</mi><mo>/</mo></math>Group 13 element produces holes ✔</p>
<p><em>n-type:</em><br>«small amount of» <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Sb</mi><mo>/</mo><mi mathvariant="normal">P</mi><mo>/</mo><mi>As</mi><mo>/</mo><mi>Bi</mi><mo>/</mo></math>Group 15 element adds extra electrons ✔</p>
<p><br><em>Award <strong>[1 max]</strong> for correct element type for p <strong>AND</strong> n <strong>OR</strong> p-type: “produces holes” <strong>AND</strong> n-type: adds extra electrons”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>electrons and holes flow in opposite directions<br><em><strong>OR</strong></em><br>electrons can flow into holes<br><em><strong>OR</strong></em><br>gap between valence and conduction bands becomes smaller ✔</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>The description of doping in p- and n-type semiconductors was well expressed and the majority scored both marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The better candidates were able to explain how doping improves the conductivity of silicon and typically stated that electrons can flow into holes. The weaker candidates had some idea of what was involved but often were not able to articulate precisely in a scientific manner the process and hence usually failed to score the mark.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The combustion of fossil fuels produces large amounts of CO<sub>2</sub>, a greenhouse gas.</p>
<p>The diagram below illustrates a range of wavelengths in the electromagnetic spectrum.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question">
<p>The structures of 11-<em>cis</em>-retinal and β-carotene are given in section 35 of the data booklet. Suggest a possible wavelength of light absorbed by each molecule using section 3 of the data booklet.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAxUAAADFCAYAAAAiy9+4AAAcGklEQVR4Ae3dDYyc9X0n8O+sI0JzxiBEeuxCrohatonqisY+665wwi+cHZqinKA1ag5rOVuEnoC69QEbnNDqSktj4lIZEhJqsYXaQcI0e6Co5WySlblCcnF3EanR1V75kHsHuz6dhaxllSNWPHOafevY3rUNmfDsPvOxZPnZ5+X/8vmNzXx5nv9MpVar1eIXAQIECBAgQIAAAQIEPqBA2we8zmUECBAgQIAAAQIECBAYFfhIo0OlUmn80TYBAgQIECBAgAABAgROEzj1YaeTQkX9YD1YnHrSaa3YQYAAAQIECBAgQIBAywlMlxU8/tRyLwUTJkCAAAECBAgQINBcAaGiuZ5aI0CAAAECBAgQINByAkJFy5XchAkQIECAAAECBAg0V0CoaK6n1ggQIECAAAECBAi0nIBQ0XIlN2ECBAgQIECAAAECzRUQKprrqTUCBAgQIECAAAECLScgVLRcyU2YAAECBAgQIECAQHMFhIrmemqNAAECBAgQIECAQMsJCBUtV3ITJkCAAAECBAgQINBcAaGiuZ5aI0CAAAECBAgQINByAkJFy5XchAkQIECAAAECBAg0V0CoaK6n1ggQIECAAAECBAi0nIBQ0XIlN2ECBAgQIECAAAECzRUQKprrqTUCBAgQIECAAAECLScgVLRcyU2YAAECBAgQIECAQHMFhIrmemqNAAECBAgQIECAQMsJCBUtV3ITJkCAAAECBAgQINBcAaGiuZ5aI0CAAAECBAgQINByAkJFy5XchAkQIECAAAECBAg0V6B8oWJkX7auuCZdvUenljrb8amvOsveo+ntWpqOrt4Mn+XM5h+uZmRgd7ZufiYD1bHWqwPdWVNZOr3BBx7EexnoXpvKmu7Jvj5wUy4kQIAAAQIECBAojUC5QsXIG3n6wT/Jf9n746kLdLbjU191DnsvycotfRncsjLzzuHs5p7yTvY9+cXc2//eZLNtC9Znd60vW1ZeMrnPBgECBAgQIECAAIGflUBJQsXxDPXvSNedvblq7a9l7mlaZzt+2gV2ECBAgAABAgQIECBwjgKlCBXVgZ257Z43s+bLv52lF8w5bepnO37aBaftGM5Ab3e6VnSkUqmk0tGZrS8NZGT0vGqGezeno2Nzeocnnj8aSv/TXVlRP/e0809rPMnY41OVFV3ZvrUzHaPXjLdXPaWtFV3p7p3ou37dp7Pq4f5kz4YsnDP2yNPJjz+Nj6+yNtt79+bprjVjY6osTufW3RkYGR9zfVj1vnq2prNjfNyVjqzo6k7vwHQPdY0/DlVZm+6Bf7pTMtUM7SNAgAABAgQIECivQClCRVvHr+epbz+Qle3nTVmpsx2f8qLJncfSv/VzWf70/8vNzxxOrfbjDD6/LPs7N+Ub/ceSHM+Rw4cytHh+Lp9b5zyet5//49z41MfywOCPU6udyLu9K7O/8+Zs7PnHNLyFn+xhcmPv3+SVi+/NQL2PvXdk2dz/nZ7bV+fG3n+RLRNtff2TefnWibbqj13913z3viXJ6idz8MSZHnl6Lp9/cE8u2PBcarVaTgw+ksv++s7c8Y2+8XB0LP2P3J4bX/i53NlfH3cttRN/lwfmPJtVdzyZ/sbwMTng87Ng/a7UaruyfsH5k3ttECBAgAABAgQItJZAKUJF5v582kff0E9TvLMdn+aypJqR/r/IPY9cka8+dHuWjYaW89K+dFWuW/xaHtn1Woarh/PKs6+k/eorcmlds/pmdj/Rkyz7N1k6en5b5i76TDrXfTTdT3w3h86UKtpvTOdvfDJzc17aF3wi1b1P5K7uq/JHX9ww3ne9rXV5bOeNefGuJ7J34s7ItONvPLAk9z2wKTctGFv10db+K7l+2UXZ+9IbGayPafi17HrkSNZ13jLeV5K2y7L8tluyeu/388PB442N2SZAgAABAgQIECAwKVCOUDE5nWZvvJN9u76Zg+tuyvWXNdwFaVuU9bsHxxZmjwzm4P6OrFvzy2OLtNuuyLW3XJuhhx/Jn4/eyaiPaWwhd233+iw4Z/F30rd7T4ba5+eKSxv6TlvmXj4/i4f2ZHffOz/FhOfm8oVXJvsP5a36XYh5K7NlsC9blr2T3p6e9NR/d3dl1cIN2fNT9OJSAgQIECBAgACB8guc81vcMlOMrUGYWEdQ/7Mja7oPpFo9msOvH8vihR1TLP4eE6keOZzXh67MwssnloefnwW3bUvf85/N/73n+nRufSY9PXvH1i5UD6R7zfi6jIn1Fmf7eNahP8mqC+eMr4MYG+Ocn8kb/eEc6N6QjgsWZtVjP0j9wa5cdEO+3vfnWZ03c/CtsRUkZX4dmBsBAgQIECBAgMAHE/jIB7usXFeNfQTr+tMnNdybg/t/lNxy+qGxPdWMvHUo+9vnp6vxbkJbe5Z89vbR39WhV7PtC7+dmx9bn75vbxy9w3F6T0fz1nRd1NdKvHimOxzTfB/HdO1Ns7868FfZuGFfbvjW4Wy/6Rcyljbri7z3ZH+Sq6e5zm4CBAgQIECAAAEC7lSc6TUwtyMLF3/slDMavwBu/BGliUXaw73p6hi/yzF+VVv7v86GzhvT/r7XJVycpWtWp33/a3ljqHE9Q32dx59lRVM/cWk8HOWqXPNL/3w8UNQn8JO8e2y6T346hcWPBAgQIECAAAECLSsgVJyp9KPrIz6VPTuezd7RN/bDGej5w9zxpQvy5LbfyIKMPR61+pZfzfy65LxPZe2m+vl/mecnPoa1OpS+7/RnaPWnc+389/MJSW2Zt/yOfPWGl3PX5u3ZN9p//duzn8+D93wt+co9WTv6iUvjayNG5/FeRkZ+cqYZTXOsLfOWXp917a9kx1N/m6HRxeTHM7Rvezbf9bUMTXOV3QQIECBAgAABAgTqAkLFGV8H4+sjbvtRHuz4aCqVC7P8hY9n894/y/pF85LRRdoX5eorLhmHvChLNm1P390X54XlF46tg5jz6Tx98R3pe+rW97FIe3xQbb+Qm7Z9Kzuv+1/pGu1/Ti5Y/kI+fvezeWbTsvF1Hudn/g235/7jX8rCOVfm5l2HzvyxtdPNd961+d1vb8my73emY0597caSfOG/XZLO55/Lfe3TXeR7KqaTsZ8AAQIECBAg0EoClVr9CwkaftW/rO2UXQ1HbRIgQIAAAQIECBAg0KoC02UFdypa9RVh3gQIECBAgAABAgSaJCBUNAlSMwQIECBAgAABAgRaVUCoaNXKmzcBAgQIECBAgACBJgkIFU2C1AwBAgQIECBAgACBVhUQKlq18uZNgAABAgQIECBAoEkCQkWTIDVDgAABAgQIECBAoFUFhIpWrbx5EyBAgAABAgQIEGiSgFDRJEjNECBAgAABAgQIEGhVAaGiVStv3gQIECBAgAABAgSaJCBUNAlSMwQIECBAgAABAgRaVUCoaNXKmzcBAgQIECBAgACBJgkIFU2C1AwBAgQIECBAgACBVhUQKlq18uZNgAABAgQIECBAoEkCQkWTIDVDgAABAgQIECBAoFUFhIpWrbx5EyBAgAABAgQIEGiSgFDRJEjNECBAgAABAgQIEGhVAaGiVStv3gQIECBAgAABAgSaJCBUNAlSMwQIECBAgAABAgRaVUCoaNXKmzcBAgQIECBAgACBJgkIFU2C1AwBAgQIECBAgACBVhUQKlq18uZNgAABAgQIECBAoEkCQkWTIDVDgAABAgQIECBAoFUFhIpWrbx5EyBAgAABAgQIEGiSgFDRJEjNECBAgAABAgQIEGhVAaGiVStv3gQIECBAgAABAgSaJCBUNAlSMwQIECBAgAABAgRaVUCoaNXKmzcBAgQIECBAgACBJgkIFU2C1AwBAgQIECBAgACBVhUQKlq18uZNgAABAgQIECBAoEkCpQsV1YHurKlU0tHVm+HpkKoH0r2mI5WOzekdrk5z1nsZ6F6bSmVpunqPTnNOUvb+wiqJ10L9L0DZX+vmVy/yTPy30Wtv9D9AM7I2/m30b+P42yOvz7G/pk17DzruOsv+qNRqtVrjmCuVSk7Z1XjYNgECBAgQIECAAAECLSowXVYo3Z2KFq2vaRMgQIAAAQIECBAoTECoKIxexwQIECBAgAABAgTKISBUlKOOZkGAAAECBAgQIECgMAGhojB6HRMgQIAAAQIECBAoh4BQUY46mgUBAgQIECBAgACBwgSEisLodUyAAAECBAgQIECgHAJCRTnqaBYECBAgQIAAAQIEChMQKgqj1zEBAgQIECBAgACBcggIFeWoo1kQIECAAAECBAgQKExAqCiMXscECBAgQIAAAQIEyiEgVJSjjmZBgAABAgQIECBAoDABoaIweh0TIECAAAECBAgQKIeAUFGOOpoFAQIECBAgQIAAgcIEhIrC6HVMgAABAgQIECBAoBwCQkU56mgWBAgQIECAAAECBAoTECoKo9cxAQIECBAgQIAAgXIICBXlqKNZECBAgAABAgQIEChMQKgojF7HBAgQIECAAAECBMohIFSUo45mQYAAAQIECBAgQKAwAaGiMHodEyBAgAABAgQIECiHgFBRjjqaBQECBAgQIECAAIHCBISKwuh1TIAAAQIECBAgQKAcAkJFOepoFgQIECBAgAABAgQKExAqCqPXMQECBAgQIECAAIFyCAgV5aijWRAgQIAAAQIECBAoTECoKIxexwQIECBAgAABAgTKISBUlKOOZkGAAAECBAgQIECgMAGhojB6HRMgQIAAAQIECBAoh4BQUY46mgUBAgQIECBAgACBwgSEisLodUyAAAECBAgQIECgHAJCRTnqaBYECBAgQIAAAQIEChMQKgqj1zEBAgQIECBAgACBcggIFeWoo1kQIECAAAECBAgQKExAqCiMXscECBAgQIAAAQIEyiEgVJSjjmZBgAABAgQIECBAoDABoaIweh0TIECAAAECBAgQKIeAUFGOOpoFAQIECBAgQIAAgcIEhIrC6HVMgAABAgQIECBAoBwCQkU56mgWBAgQIECAAAECBAoTECoKo9cxAQIECBAgQIAAgXIICBXlqKNZECBAgAABAgQIEChMQKgojF7HBAgQIECAAAECBMohIFSUo45mQYAAAQIECBAgQKAwAaGiMHodEyBAgAABAgQIECiHgFBRjjqaBQECBAgQIECAAIHCBISKwuh1TIAAAQIECBAgQKAcAkJFOepoFgQIECBAgAABAgQKExAqCqPXMQECBAgQIECAAIFyCAgV5aijWRAgQIAAAQIECBAoTECoKIxexwQIECBAgAABAgTKIVCSUHE8Q/070rWiI5VKJZWOzmx9aSAj5aiRWRAgQIAAAQIECBCY0QIlCBXVjPR/LZ9bujNzHvi7nKidyLu9K7O/8+Zs7PnHVGc0f31wwxl46dFsfvrALBjrjMc0QAIECBAgQIAAgQIEShAqjmfwh9/P3tW35Lbll6UtbZm76DPpXPfRvPiD/znz71YM9+XJzi+n/0QB1dclAQIECBAgQIAAgSYIlCBUjOStg2+m/eorcmkJZtOEmmqCAAECBAgQIECAwIcqMPvfhleP5vDrgyejje77RDat/VTmnXxkip/Oth6jfrwnWzsXj63XqK/ZWNGV7t6JNRvVDPduTkdlTbq2fzmdHZVUKkvT1Xs0STUjA73p7lozfm1HVnR1p3dgeGwcw73pWrQqDw8NZc+GqzKnY3N6h8ce2KoO7cvT012XiT7XZnvv3obzFqdz6+4MjDQ+9HXK/Orj7O496ZzqQHfWVDqyptsjWFO8QOwiQIAAAQIECBA4i8DsDxUNExx7c1xJZc5V+dLVd+fzSy5qODrV5vG83bMpS5buTO7uzbunrccYX69x4wuZc+eenKjVUqv9OIMPfCw7Vm3KN/qPNTS6Jzteac/9AydyYvDZfH7ZRRk5sCN3Lt+Yly/9/QyeqKV2oj9bLn05ty78XLbWr523MlsOfDf3tbdn9ZP/kBODD2XlvLZU3+7J7Us2pHfiutqBfH3hq7l1+eb0vH28oc/n8vkH9+SCDc+lVqvlxOAjueyv78wd3+gbf+xrfH43fieXbukfG/+7f5qFL2/M8o3P5+3x7NG2YH121waze/2ilOoF0SBlkwABAgQIECBA4GcnUKr3kGNvjutv3g/nq0fvy2e37jvzmorqm9n9RE9yX1e+eNOizG1Yj9H9xHdzqPpO9u36Zg6u68yGZe3jb7jPS/vyW7Ju9YG89MMjDYurl2Rd52eyaG5b2tp/Mb8491j2/cVjeemG/5yHNl6T9rp0W3uW/d6fZud9R3Lv5p4MNN5QmKzx0ex99KF0L/69fHHiuszLovVbsnPdf89dj76S8fscSZbkvgc25aYFY/dj2tp/Jdcvuyh7X3ojg/W2h1/Jo3f1ZPEf3Z+NE+Of+0tZ/9i2rHvxoTy6t343xS8CBAgQIECAAAECP51AqULFJEXbJ3L9v1+dg/duza6B9yZ3n7pRPfS9PLsnWbywI3MnD16SlVv6Utu9PgvaxrYHtyzNkd4X0tPTk56e7elatTIb9vxo8oopN4b/Prt3DGbxNZ8cCxSTJ83N5QuvTPYfylsnPaY0fsLodf1TrBEZu25ox3fSN/6I1GSTkxuNbf8kw33fyY6hjlx9xSUn34GY25GFiwezY/ffNwSUyUZsECBAgAABAgQIEHhfAuUMFfU7DpfPz+K8kmdfOZyfjK4ZqK91mPh9rusHqhk58HQ6Oy7MwlWP5wfH6v/7/+ez5us9eXJ1sv/g4LR3QqpHDuf1oTPUYuhQDh9pfJTp5HOHHl6VCyfHWx/3z2XhhudOPumcfurPw6s+3jD3scfDNuw50+DOqWEnESBAgAABAgQIEBgV+EhZHdouvSJXtyev1586Gl0zsP60qVYHvnfavpN2VAeya+P9eemGb+Wt7TflsokIVl9gvX8oufqks0/6obH/kw5M/NA+P1dcet7ET6f8WV9j0ZsXp13jUH0fdxh+M08e/MusX3D+KX34kQABAgQIECBAgEBzBCbeJjentRnUytidgmtzy7VXnPzoT8MY2+b/am457Y7DexnoXptKZW26+w7l4P6c9ghT9d1jOetqhHm/nDXrOrL/1f+RoZPWTox9BG4Wz8/lc6fgn/a6Y+nf+uuprOmeZi1Gw8RGN9syb+n1Wdf+D3n1jf/TsPYjyci+bF0x36c9nUrmZwIECBAgQIAAgQ8kMMW72g/UTuEXDe34Zv7qwPgS5pE38tQfP57jX7kna8/0f+jbrswNXXdk4cNb8uXet0ffeFeH/jZP7Xgty+vXLvtXo8Fgz45ns3do7FGl6tCr2bb5D9J91qeHLs6y/3B3/u2Lf5DN214dDxbDOdDdlVsfvjRfeeimLKjrj65v+NiY349GMlK9JMt/Z3NuOOW6gZ6Hc8+9+afrzkV83rX5na9elxfv+v1s2zc0FixGDqTnwQdyb+7MQ2sXTBu4zqV55xAgQIAAAQIECBCoC5QmVLT/1jW57MW701Ffh3DBf8rBlY/nmU3LGhZgT1Xw89K+8v4803drTjz4LzOnUsmcjq05cdsz49dekuW/+3ieWva9rOr46Oi6hMu/8P18ovPxfOu+JVM12LCv/s3e6/K1vdty3ZE/TMec+rqIRfmPB6/JzoPP5J6Jj7sdDTbrcrz+PRX/bH12HXovbZf9u2w76boLs/yFi3N33/ZsmriuoafpN8/LZTc9lL07r8uRriWj86tc8Jt54eN3pO+ZO7Nk/E6J76mYXtARAgQIECBAgACBswtUavUvOGj4VV/MfMquhqMzcLN6IN03rMyXrt6ZA1tWnsOX3c3AORgSAQIECBAgQIAAgVkgMF1WKM2dillQA0MkQIAAAQIECBAgUEoBoaKUZTUpAgQIECBAgAABAh+ewOwPFSODY5/QdNIX2H14gHoiQIAAAQIECBAg0OoCs39NRatX0PwJECBAgAABAgQIfEgC1lR8SNC6IUCAAAECBAgQINBqArP/8adWq5j5EiBAgAABAgQIEJhhAkLFDCuI4RAgQIAAAQIECBCYbQJCxWyrmPESIECAAAECBAgQmGECQsUMK4jhECBAgAABAgQIEJhtAkLFbKuY8RIgQIAAAQIECBCYYQJCxQwriOEQIECAAAECBAgQmG0CQsVsq5jxEiBAgAABAgQIEJhhAkLFDCuI4RAgQIAAAQIECBCYbQJCxWyrmPESIECAAAECBAgQmGECQsUMK4jhECBAgAABAgQIEJhtAkLFbKuY8RIgQIAAAQIECBCYYQJCxQwriOEQIECAAAECBAgQmG0CQsVsq5jxEiBAgAABAgQIEJhhAkLFDCuI4RAgQIAAAQIECBCYbQJCxWyrmPESIECAAAECBAgQmGECQsUMK4jhECBAgAABAgQIEJhtAkLFbKuY8RIgQIAAAQIECBCYYQJCxQwriOEQIECAAAECBAgQmG0CQsVsq5jxEiBAgAABAgQIEJhhAkLFDCuI4RAgQIAAAQIECBCYbQJCxWyrmPESIECAAAECBAgQmGECQsUMK4jhECBAgAABAgQIEJhtAkLFbKuY8RIgQIAAAQIECBCYYQJCxQwriOEQIECAAAECBAgQmG0CpQsV1YHurKlU0tHVm+HpqlE9kO41Hal0bE7vcHWas97LQPfaVCpL09V7dJpzkrL3F1ZJvBbqfwHK/lo3v3qRZ+K/jV57o/8BmpG18W+jfxvH3x55fY79NW3ae9Bx11n2R6VWq9Uax1ypVHLKrsbDtgkQIECAAAECBAgQaFGB6bJC6e5UtGh9TZsAAQIECBAgQIBAYQJCRWH0OiZAgAABAgQIECBQDgGhohx1NAsCBAgQIECAAAEChQkIFYXR65gAAQIECBAgQIBAOQSEinLU0SwIECBAgAABAgQIFCYgVBRGr2MCBAgQIECAAAEC5RAQKspRR7MgQIAAAQIECBAgUJiAUFEYvY4JECBAgAABAgQIlENAqChHHc2CAAECBAgQIECAQGECQkVh9DomQIAAAQIECBAgUA4BoaIcdTQLAgQIECBAgAABAoUJCBWF0euYAAECBAgQIECAQDkEhIpy1NEsCBAgQIAAAQIECBQmIFQURq9jAgQIECBAgAABAuUQECrKUUezIECAAAECBAgQIFCYgFBRGL2OCRAgQIAAAQIECJRDQKgoRx3NggABAgQIECBAgEBhAkJFYfQ6JkCAAAECBAgQIFAOAaGiHHU0CwIECBAgQIAAAQKFCQgVhdHrmAABAgQIECBAgEA5BISKctTRLAgQIECAAAECBAgUJiBUFEavYwIECBAgQIAAAQLlEBAqylFHsyBAgAABAgQIECBQmIBQURi9jgkQIECAAAECBAiUQ0CoKEcdzYIAAQIECBAgQIBAYQJCRWH0OiZAgAABAgQIECBQDgGhohx1NAsCBAgQIECAAAEChQkIFYXR65gAAQIECBAgQIBAOQSEinLU0SwIECBAgAABAgQIFCYgVBRGr2MCBAgQIECAAAEC5RCo1Gq12sRUKpXKxKY/CRAgQIAAAQIECBAgMKVAQ4QYPf6RxrNOPdh4zDYBAgQIECBAgAABAgSmEvD401Qq9hEgQIAAAQIECBAgcM4CQsU5UzmRAAECBAgQIECAAIGpBISKqVTsI0CAAAECBAgQIEDgnAX+P4M3SXpDG7ALAAAAAElFTkSuQmCC"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>both between 400–700 «nm»</p>
<p>β-carotene at higher wavelength than retinal</p>
<p> </p>
<p><em>Accept any wavelength within the 400-700 nm visible region range for M1 and any higher wavelength for β-carotene</em><br><em>within the same region for M2.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Vegetable oils can be used as a source of energy.</p>
</div>
<div class="question">
<p>The natural absorption of light by chlorophyll has been copied by those developing dye-sensitized solar cells (DSSCs). Outline how a DSSC works.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Any three of:</em></p>
<p>dye has conjugated system</p>
<p>dye absorbs a photon «and injects an electron into TiO<sub>2</sub>»</p>
<p>electrons transferred to semiconductor «and dye ionized»</p>
<p>dye oxidizes/takes electron from electrolyte</p>
<p>electron flows through external circuit «to reduce electrolyte»</p>
<p><em>M4 may also be scored from more detailed answers involving iodide species (eg “iodide/I<sup>–</sup> oxidized to I<sub>3</sub><sup>–</sup>/triiodide” <strong>OR</strong> “I<sup>–</sup>/iodide reduces dye” <strong>OR</strong> “I<sup>–</sup>/iodide releases electron to dye” <strong>OR</strong> “I<sub>3</sub><sup>–</sup>/triiodide reduced to I<sup>–</sup>/iodide”).</em></p>
<p><strong><em>[Max 3 Marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>There are many sources of energy available.</p>
</div>
<div class="specification">
<p>Methanol fuel cells provide a portable energy source. The process can be represented by the overall equation CH<sub>3</sub>OH(aq) + <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{3}{2}">
<mfrac>
<mn>3</mn>
<mn>2</mn>
</mfrac>
</math></span>O<sub>2</sub>(g) → CO<sub>2</sub>(g) + 2H<sub>2</sub>O(g).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the half-cell equations occurring at each electrode during discharge.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the function of the proton-exchange membrane (PEM) in the fuel cell.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the flow of ions allows for the operation of the fuel cell.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Anode (negative electrode):</em><br>CH<sub>3</sub>OH(aq) + H<sub>2</sub>O(l) → 6H<sup>+</sup>(aq) + 6e<sup>−</sup> + CO<sub>2</sub>(g)</p>
<p><em>Cathode (positive electrode):</em><br><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{3}{2}">
<mfrac>
<mn>3</mn>
<mn>2</mn>
</mfrac>
</math></span>O<sub>2</sub>(g) + 6H<sup>+</sup>(aq) + 6e<sup>−</sup> → 3H<sub>2</sub>O(l)</p>
<p> </p>
<p><em>Award <strong>[1 max]</strong> for correct equations at wrong electrode.</em></p>
<p><em>Accept “e” for “e<sup>–</sup>”.</em></p>
<p><em>Accept “O<sub>2</sub>(g) + 4H<sup>+</sup>(aq) + 4e<sup>−</sup> → 2H<sub>2</sub>O(l)”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>allows H<sup>+</sup>/ions pass through/diffuse/move «from anode to cathode but not electrons or small molecules»</p>
<p> </p>
<p><em>Accept “acts as a salt bridge”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>H<sup>+</sup>/ions pass through/diffuse/move from anode/negative electrode «through membrane» to cathode/positive electrode</p>
<p>H<sup>+</sup>/ions used to reduce oxygen at cathode/positive electrode</p>
<p> </p>
<p><em>Oxygen must be mentioned for M2.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>Carbon is produced by fusion reactions in stars.</p>
</div>
<div class="specification">
<p>The main fusion reaction responsible for the production of carbon is:</p>
<p style="text-align: center;"><strong>X</strong> + <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="_2^4{\text{He}} \to _{\;6}^{12}{\text{C}}">
<msubsup>
<mi></mi>
<mn>2</mn>
<mn>4</mn>
</msubsup>
<mrow>
<mtext>He</mtext>
</mrow>
<msubsup>
<mo stretchy="false">→<!-- → --></mo>
<mrow>
<mspace width="thickmathspace"></mspace>
<mn>6</mn>
</mrow>
<mrow>
<mn>12</mn>
</mrow>
</msubsup>
<mrow>
<mtext>C</mtext>
</mrow>
</math></span></p>
</div>
<div class="question">
<p>The mass of <strong>X</strong> is 8.005305 amu and that of <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="_2^4{\text{He}}">
<msubsup>
<mi></mi>
<mn>2</mn>
<mn>4</mn>
</msubsup>
<mrow>
<mtext>He</mtext>
</mrow>
</math></span> is 4.002603 amu. Determine the energy produced, in J, when one atom of <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="_{\;6}^{12}{\text{C}}">
<msubsup>
<mi></mi>
<mrow>
<mspace width="thickmathspace"></mspace>
<mn>6</mn>
</mrow>
<mrow>
<mn>12</mn>
</mrow>
</msubsup>
<mrow>
<mtext>C</mtext>
</mrow>
</math></span> is formed in this reaction. Use section 2 of the data booklet.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>loss in mass = «8.005305 amu + 4.002603 amu – 12.000000 amu =» 0.007908 «amu»</p>
<p>= «0.007908 amu x 1.66 x 10<sup>–27</sup> kg amu<sup>–1</sup> =» 1.313 x 10<sup>–29</sup> «kg»</p>
<p>E = «mc<sup>2</sup> = 1.313 x 10<sup>–29</sup> kg x (3.00 x 10<sup>8</sup> m<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>s<sup>–1</sup>)<sup>2</sup> =» 1.18 x 10<sup>–12</sup> «J»</p>
<p> </p>
<p><em>Award [3] for correct final answer.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>A Grätzel dye-sensitized solar cell (DSSC) and a silicon based photovoltaic cell both convert solar energy into electrical energy by producing a charge separation.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Contrast how absorption of photons and charge separation occur in each device.</p>
<p><img 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"></p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest one advantage a DSSC has over a silicon based photovoltaic cell.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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k7NaU/i6mqp3BYVRL90cQJN6tEAF/Ql8wO2ptCEsosLlK7y02VKuErbivjC0hue999nNV1K2gn3cirvW4UMzJ9KVh7zd/HKkT5d/rwQI/MX7PQog2uF3EuTfBredJ13UYAz+rs4oaHoOxuuDUJawqItO0wcZmpCveAiIIwakrgd0XfIefWA73fIEBMeMoDt7QCUULnz00SXLkN//iI/3SaMhpHpFWEYV3jo8LUjrrYC97YjrsbpB3H1VbMqUsE+1ITHI/Fz+bWghPPPcb2bXUliKuffZMSOwX4GCjdfPP5nX4SRvXYKL6D42A/QGqpRkHIMxb8Lx71i1H7oL+w1QO41XEQBu/RbCdeRZPXbLRTzzq5gRxWBqpzvuSlNlQ+mTh6LMeN+B8+rmZzDN4QpYPND0+G3V1Gm7nAhcdC3WxxhVMoZEKdQelvqgakaF0uusSmYdbgX3EaF4s9vBqOq6CcU/laIY8Rp35CPlKO/x+/Ch5lz7N8f/USlMqHh10IUsS4Z/HYSxt/4lZoyYwuSDpLtmMVEYPbT6cf5XYoPImHElGQvGUkWRqPJ4kT2rymdM+KaYMRbbDEjtGfhwSakZ+uz6fZkHvETXh5spUPvdR4CCrj0JyNTBtwq/g2XTN6WPoKiz+sg+LO+Vs7mqUTxIU9KI9ejqziZeYpfhfkHTL7fF+P8BuOqsBeloINiG5W1FauXG55Y/QV+BJhvJxKQLVnB73CfLq6oN7dZc9YG5Au+xhajypJpX/b5cg2nv2sFE1zFaUeY4qY4Km1+TnR032Gm1d2vbGlI25dZbDi94eHhal6dJslJyU8ToSYfqez2Av3g89gUePPO5OYhUiOqT5/A2arbxDpDaWYa59CPuzAuYCRclB4YMZK8uV9HUXYeShtM3HLqXZuwevVqrInPRqWtrYnEeLdQnp+L83z6uux9SOH9xoY/NBaeCslbgkWnIikMuSQrwVavxurVm7CHLMt388bESY9i+uS7Lcqv1IzASHZIvhz5PxSiisjGLv/+jvcbuxsPjfOEQuy0AG7ayTxCoxx0L8ZNGAsNdDh5JJ/33eCMRnNn1xW3YpAxbcFXky4b+9j6uwv+817H22+/Lfn3V0T4EF25xa+cJM8WYcXkLZQdO4J8Uc/+w+895oGHxg+DITuB1afVG5ORX0Wq1x+TAoMweXhfiZR9oBnhxdV3eT5+OF8FE3nLJBsBpwgrzvwxjvjYCPkqzdMCXEKSzhCVOH20gNeRC8j87gRX16qxCBg1wDy1IIyYsglIVtryI3mO65zEiJfupya2Z6nBJyk2uXS4PRF9F3wfmxhhlmVBv3YUgT7wHOMDV5J99Ql8l8rrJKvbp5CyPYl/QbwPvsO49mVeMckvMiJxRT3iDXBxhLcXBt3rhwl+noDuRxw5Td4chBdSSRuVtxVh2hCkDz9j7vu/zeCnIQX9MrdLY9FJHC+tZ58luuw92Ej67DVfILuSPF9kf83t043FyD5+EQ0sl2zs2rgGq1d/iPjsCpjElybCMB9Hz1ZyfUPpMXx3jPiDKqEa9yBGOd/kR71byMRRpuKMk/QZ3UF9hwx7T/h6Z0bEhIcMeB8VW2SFlZMGPcrI764BeOR+waHeiGu87wtUanjhZyRvzkeymI4SKv8wTGf9V0wYNWUivIoOo6zsMOJiD4uhyAq06U+NtzFkTYIMwKiAsVBpT8Jg5VtGds2fgT9NIFOH5jcHu9MyJLlB3pjk68qu3ilI3oIYs7DcisXgSZwB5jISAePugjbvKqz9CVzh+9QTmEBWTEpGBLnh9V5wHeIOJSpgvJiKLTGWk20QRmDEzo6MftiYkjXT6X5XxEE/lTNWlMMnYrLVtKwz3D0GAtrr4pv9UGHDXLt69hgma5zRp9+D8D1WigJDvkwXSR96L4Inj4ASCriMehDjVIXIM9jwRVH54ak/cfooTt0o+qFfX+n7kTAlr4TKywMo2IvNMXsldUX8/h5lX1iMpcJmv8RnbQ3S/ech+glnfqWt5EHmqM6hmp8CknbOkgehhcEnEYm9dLQ9SXzYHBhhludCv3cMAYVmEp7wP8uuMLfut8iWP2Rrk0D+RVo+8sXLLD4XeANJAQwhK2Wrr+Ni6mew7NLMI9R224rCE+MeuhvHyCp1ed9PshT1i7TLSZjsVYyssovIiluHLBFjXwyfHsb1ueI9/sLhPv0+TJk8HEXEzysrAbHmxEG2+niKPEeuZXP+WFDBy8sEq2cE8X2bfh+cFbWtZKJyKL7ZKAbKUj/B6nR/zFvxYAf1HXLw3f+7tMdvt9KKDaexjltYOclK0Q8+QQGS4W7B9wXo7T0Nz81+Ev5e/MiD0gv+M6P45cAksgLOwx7B/KgITPVh39m4twufaZj3Mr8NhM2SKuDsHYaXlkjjcXuITZ0xR3J0kfCW0MS0jMIdfk8vxLwwf3hx++JxuZJpxIiFmEu22WDv9Id3+GIsiZgKH3G3abL3zRTMmLeQ9SMj4cwjgsL0jQIufk8iKsyX3/md7F/1BCKmDufyqasDuym52NnxfmU2y94db8oc9G0a4IIxC6DmCiobbotTKEr1H/DcolmYYEfPFG7j8PSiOQjz50e8WISk3qYiIuppbrsRcs95FMJfikLEVB/JDv2u8Jn6BOaJx/dI/P/kPpSiAd4f3oGzMHvmBFGflF4TMHPJYnGZvXLkZIT7CjrPj4CK/mWC3hChHNM5c+ds+QIltmdhqtOm+jjanhwcYbaZB73ZcQRs6RDfX4bNwpKXnjYvChJfBqU6KPU/FPycVPCbORdhQr/N9u1PYapXb9IDsgtSTGRBijBdLm8rwuKlR4W2RvrEcMwN8+FGpaUzGM73IGj+Qst2Sfbkm/cCtwWSLbAO9+kuGBY0B1EWfTrZQ2wuXma3qpG4G/T2RuBzszFT7EeIzE9hibi/Y2uZOBKfPCJHYEq4n9hHsbMuNbzzPqT1ZqverZ9Xres7bMHv3vecGIYRF587OTlB8vUOltyEBmGJMdleYLh5byVWCHFDUgU9X/EO1oqjWXWc3jgqYdcNJ25cafNMzK5brq4qOdX1zlpz5o22LZ4fDcL2Rrcb32rojharO5xle0eBddvMhP7kzkxN2sVobjxiEFvTh+JbvTs9X1EERS+6PwHJlDy/UKT7l5mWkBJoCQEn9HP3gAoXYLDlqqG8l/e1bUnabR3H7G7ALcRq6/Rpel2NQAcbYpa4yFRL+OOBGEd8osQ/yTCuOMcv/kgvKIFuTMA8Jd+oP2I3JkCLRgk4RoBMhYdg0Tx3HM38r/loJPYczMl47JGH4GfxXHEs1XYJJbobWK/ibJf8aKKdnkAnmZrs9JyogI0QEIZXGwlCf6IEugUBquvdohppISiBTkFA6E/uiLN+pygxFYISoAQoAUqAEqAEKIFORoAaYp2sQqg4lAAlQAlQApQAJdBzCFBDrOfUNS0pJUAJUAKUACVACXQyAlKv+E4mWhcSh+y4vDkVZejNb6/hhqrsRGxOvQDQbQe6UEW2o6iijtyDsFcXYBJ7wHhb5Ed26j+L8xgNP410V/+2SJumQQlQApQAJdDeBOiIWBsQFje4BH9uIMxHw4BuO9AGhLt+EqKONLoJanPLWQ9d9tf4bGsu6vvRd6rm0qPhKQFKgBLoDASoIdbqWriJS7+VcoeCC9trmK7gt+I6NmW67UCrAXeDBCS7gVsc8Nu6opl0x/FVagEM1NhvHUgamxKgBCiBDiTQo1+jTVVFyPkxB99naWEglUCO1Ah/HNPHaeAsVEqDDvnHjuCQEAbkqIrHEfrIKLixZqxw5BEA4QgN8RDjJo5BEvKgn12TgLEIKbE7kHerH3zCnoRvxTGk5JXBaKUj5hFS5dB+qDubgV2HjkFrMPJn8j1pPg6GPSD4Z/yYexzpbFoEjVznriD7838htewWx606C1tjtJi6ZDGCNLehy/8RudlZ5r2UyNEt4aF4xNuNP1YLMBalIHZHHm65TsG8WR747WgGsrTVXF5hszBz0jC+DXBTn8eOCL/z7WR6IKZM8ObbQNesPio1JUAJUAKdgUAPNcQsj1QSK8JYhry9X+ByQxR73hiqTuPrhBQUkAem+FcN7eHd0NfM5s63NBn4g1EBYfTL+lxIMTK96E4ExHM8r0Ob+hW0YtmIjiShvh+nRwoIhx4DRm0adpoDAoYCpH41GMOXBkGjMKGhKBWf7TjJvRhYpLcTRcX80V8NevxazhthQpjew3D30FsoSolnD2IWbrOfBi0O7yhBcZggj2SErvoodsRJQ1dDm5qCY8OJUdcHpsqT2BmfiovSJkDaSeouFNctwtKgYaJxJ02FXlMClAAlQAk4RqBnGmINv+DgV0dRRs619HoIs2cFY5TbDfEhdvH4GZRPCEDlgQMoMPSC14RZmBXmCzfFbVTlf4uE5HwYTv+I88H3wQ9VqKghTylh9EtyiDEGwsNdHFtzrEZoqC5CQHLiA/rCa8JTnI7cFM62uwFOj4KgYapRUcEbTkovTJg9C2GjBqEh/2tsSC6Asa4O9eTE1/qz2LuLM8LMegmzzl08hmPF4xDu7Yc5q9yQ8XECsqr7w3/eSwj37oN6kl7eVUAqDyqR//V2JBdU42J6NooDwuGtNI/QWYRtyMeuDcnQGhtQV28C0IDiY8c4I8wrDK/+eRLcTEJ619G/oQbXTKCjYl1EY6mYlAAl0DkJ9EBDzIT68z/iNDvK5YHJj0/DKDeCoRe8w5fi7XCuoshhy19pr7Nfyk7uweaTsgo01qP+BgNjZQmK2dGC/hh592AocBO6EjI9BYAdpegji0i/dg8Ct1F9uZKrZ9eJeJw11AE4D8ODfp7IKrsACAaWOHJ2F/znPIfHvfsDMOJGfT0X38MD7koT6n8pQBGrOFK9BNzun4hxGT8jq/o6LlXWAt7OgHD+qtILIzREx2rxy9kSa3ngjvun+CGjIAvVtypRaTDC200YoVNC5T8L8x8fxU1D3qhHLZu/M/q7cO6jLv3Ji4QBKEvF5o2/Yurk0bh7+st4+9ke2HV0D8WlpaAEKIFORqAHOutLH6A+GONp21Bi6uvAudvbqTGlC1z6MjBUVnKO+nCDh3tv9oFYeYkz4MA+YO3Ep7e7OAHh4F6g98i7MVRsSUZcr+Prn3fMF1dMKodihKYfX27zqJRygAv6Sg14V5leMg2oq2MtJD6uZDRO8Es0VqCkmOSrhKvfaHiK8gBWumwURuj6QD1iqOgPaZbTHUNciaHVB5rAOZg7wQtKkrNBi6zUFOzY/CE27jmNKjJoRv8oAUqAEqAEWkWgB77WmlBf18BB698f/SQPLJsklb6IeO1p+PEjBJZhGlBUUcXdErYlEB9yQO+h7lBZRqDfugsB8eBeJfr3d4aTUC5TBc7lV7LfOJ9BiT+WYDSxv5pHpQZ6uInGEPuThV6a0PBrIYrYmU1hexTzy4RoBIp2moKVx6zWdfi1oIR7WRBWV16rxCU2PQ/cO4yMzpE/O3Iq3DDq8T/jzbAqFOWcw2/FJ1infkNBBo4W+yCcjM7RP0qAEqAEKIEWEzD31y1OoqtFVICbbgFQU4bSqtvEOQe67D3YuHo1Vq/5AtmVt6HUjMBIMgxgLEb28YtoYFezZWPXxjVYvfpDxGdXwCRxwlaOHAENCS9OQ/XDyBEe3EhCV0NE5W2SgHlBhhHVp0/gLK9HpZlpOFZNrKK7MC5gJFwke8oJiznYxEWDvQ+GDlFBQUafRvAjT+X5+OF8FUyszp3E3pQ81nlfOdwf49gRXGE0rjc8PFw5HVN6YMRIMtp2C+X5uTgv6vU+pPB+Y8MfGsuOlIkjX8LLAyuQeYSOM+7Iysz3sXr1Gm70C27wnvgHBE5/CMPZ4bEmEdEAlAAlQAlQAg4Q6IEjYn2geWgKfI4lQ2vIR/LmfCSLoPrCa/KjGOdOsNyHKZOHoyjrIsqyEhCbJQaCcvh0PDXBA4r6fH71mtlRv770AsrZoNRR30ysu10Zce3ibyCbPUClhhd+lukR8b0Kw3TWF+wKuKlqQd4U1NgAACAASURBVEd4FqLBLuiJAi6jHsQ4VSHyDGU4uXMzLNwSVX546k/j4U5enUQjjrhufYLV6f6YF/0ERgWMhUp7Eoay49i5+bgEuhIq3xn4E9FZGFElTKdbTJ0LI3SCceeK0ZPG4BhZmFKwF5tj9krSA5TDJ2PySDoaZgGFfqEEKAFKoAUEeuCIGACX+zEzKgJTfVxFZEovf4TNewFRQffw00QuGBY0B1ERU+GjEoYAyH5Oc/HyoknsA9E8KiKMapinjCBs7irmQC+6D4E6lP5awRant/c0PDf7Sfh78ccLkb3oZkZxW5uQEKLRJOgIR0EclZLqifMohL8UhYipPpIpbVf4TH0C8xb9EX7sohLiBjYCU8L9xDDcaKwCzt5heGmJpV5D5YOpM+Zg0dPj+NWNkpEv6dS5KGc/DHUfwC5ecfP7IxbNCzOXjRWdyBOBqLkTOKOQKw79nxKgBCgBSqCFBJwYhiEL59k/JycnSL4Kt+knJdAogR6nN6ZSfusIBX+26OBG+dAfuw+BHqfr3afqaEkogU5HQOhPeuaIWKerDipQlyIgbB0hni3apaSnwlIClAAlQAl0IgLUEOtElUFF6QoEJFtHSKcVu4LoVEZKgBKgBCiBTkeATk12uirpegIJw6tdT3IqMSXQPAJU15vHi4amBCgB+wSE/oSOiNlnRH+hBCgBSoASoAQoAUqgXQlQQ6xd8dLEKQFKgBKgBCgBSoASsE+AGmL22dBfKAFKgBKgBCgBSoASaFcC1BBrV7w0cUqAEqAEKAFKgBKgBOwToIaYfTb0F0qAEqAEKAFKgBKgBNqVADXE2hUvTZwSoAQoAUqAEqAEKAH7BKghZp8N/YUSoAQoAUqAEqAEKIF2JUANsXbFSxOnBCgBSoASoAQoAUrAPoFe8p/IBmP0jxJoLgGqN80lRsN3VQJU17tqzVG5KYHOScDKEKOHfnfOiurMUgm7A3dmGalslEBbEKC63hYUaRqUACVACAgvdXRqkuoDJUAJUAKUACVACVACHUSAGmIdBJ5mSwlQApQAJUAJUAKUADXEqA5QApQAJUAJUAKUACXQQQRaZYiZqopwImMXNq5ejdXsvzXYuCsdJ4qqYJIWqD4fu9asxa58AwAT6vP3YM2aPcivJ6Hk36URO+CalXUNNmWUWpahA0RpLEuTLgObVn+GDN3NxoJ1qd9MhfEIdXoW8YUNHSR3Awrjn4VTaDwKLRT4DoljOof4UA000RkgLaV1fwYUHtyMVdvOdRI95tlqViHD0Bq4JtQWHsD6VTvFOuL0JgDRGVdah6wrxmZ1xhuh8Z2lnh2A2ClkNsGQsQqaO9TftE/fZt0WHKBPg3RCAlbO+o7KaKrMRsJn/4XJ/yksemsO3IhJZ6pC0cmjyNz1T5yZHoVFkzzAWnoufpjzph+ftAG/nC2BcWAA3J05O9DF71mIPzsqQDuFM1VfxiVjHwwdouJkb6d8WpesCQ2VV1CjdMcQ1xZXYetEoLE7NwFDDuIiP8SpNSGdRE5njI7aAyaqteJcxYm4N7D81P/ij61NisanBLo0AdoWunT1SYRv4YjYTZSfzsPFgRPxeJgvZ4SRRBVu8J4UiscnD8LF42dQbuvF12TA5Uu34eo3Gp4tzF0ifxtfCgbOCNx/34A2Trstk7uN6suVMA4cLBqzbZk6TYsSoAQoAUqAEqAE7gyB1plCpgbU35RbW71w14PPIXpZEDRs6gbk71qLNbvyUU/K1FCFippe5hEni2lLEsCEBl0+MnZt4qc7P8TnKaegazDnQ6ZEs1M+xxphSnTjLmRaTIfehC7jM6zelI6iUklaG/cgW8dKYYduLTda19+Ey6f34fM1ZMqVTLdmW+TPyXgKKZ9/KJmSzUC+Rdq3UVV0BLs2rrFbDkfKCpB0svm8BFnqUVlRA+XQIXBtXQ3a4dAet29Cn5uM9ZF+7JJdsmzXaVo04jMKUWuR3S1cPfOdOZwmEusPSsOQ4fgMxEeHNpKOPIwG06LjkVEoTPgJ0xKhiN76ISI1TnByIlNbl3lJKnDm4Eb+vhM0kRtxUIxLghhQmBGP6GkaXgZ5+hYFYnVamAbZmnEQG0UGoYjedgJ6s2pzEcvzsH99JDSEkZOt/JsonyED0WOCsVavR9piXyjF6cAm4kHg8iy2ZmRim8jYD5HrD6CwVhBUno69upRykE1NEhk1GoRuPYgT26IxzW5ZpWlcQUZ0GILX5gJpi+GjlE5H3kB53rdmvXGSy0zSITqYKKm3UETHZ0jKJc2rDa5rT2D9NA00i5NRZqpG7von4cRPhdmdqmK5mMtl0uciWaILTk4OyGzSI1fC1KqdNYO9SX+iET1oJdOrZ3BQLJu9+mqsz3BUX0kT1CM3eb2kTW/A/rwySSXfRFnyK9A4PYn1udUwlSVjsUaDaetPyPonSRTJpSWnpvoDLqJDcWR1ae6LbLWFCn66Vd6vkSl7eZuVy9gMlkT8RnSbLV1tITLize3aSm9NF5C82A9O0zYit7bBgr0Ea8+5ZCR/ACTfGr80XjnOxMXEMBu+LWSuNxbUeJFJ/+g95qP0i4yRYRhjWTrz0TufMullN9hYlt+NzPXz+5gNMVuZfYVXufBXf2b2bY0V8zFePcXs3hDLbP32R6bsOkmxjik7vpvZ8M5m5tvztbwk15ifvoxlYv65jdm7TwhXy5z/djPzzkfpTBmJZuuPlTWGeeedj5gvj19ky8Xl956YP8PwMr7zEbP7pyusjIzxKlO4bysTE7Ob+amOS5zjIwlzvYRJ3/oBExN3nLnCBjGnI+TFWIW5xVz9KUnCw8hcL8tmvt37JbM1JkZkaqsod/Je03pjZGpyNjCB6oXMhmwdx4y5wejS32EC8QSzLqeKFdeojWNCAAZiOCNTo01iVgTexwSuy2ZqSKiabGZd4HhmYVw+911M5xkmTks00cjUFCQwC9VjmYUbjjI6wtqoY7I3LGTUYl5G5lr6SkYNMOqFCUxBjZEx6oqYopo6Rhv3DEPKo164hcnWER29xmiTVkrkFMoSxcQVXOMwG0uZ9JUhDELiGK1N3TLn12jZjAVMXIiaAUKYFUkFXPmEtAM3MDk1bGEcKB8RO51ZoVYzIXEFPO/mcUHgSiZJy5XPqEtjVjarDmxp33WOrXolk37NyMuHJspqK53LTPqK8RasRb1pTGbmBlOa9DKjFnWL6FI+E7dwLKOOSmJKbdabdf5N67oQp4rJWfcEA17njKVJTJQajHpFOsNSZev6Pkn9kHi8ngiMBF0X9JhVZVldyNMxljBJUWMl+muu96ikEk4XWN1omj0ns5oJXJHEaInuWfFqIVNRzyVttKaASVoRwkCq5032GZJ21Wjd83UhhhH6FdLWhH5DaDPgdcuy/oRatfXJcZKUhbnGFMRFMWr1y0xSKf+cY/s2c16OxGH4ujS3RXm68rZg5mHZr91yoM8wxzXnR7pOmb6xACzZWOk2w/0uyMBqNp+OtD/i+mC+j2J1XS2pf1uku989oT+xsLyEm44VlxgFPzLfbv3AwnCRx+UMrVjmy59I93ODKUv/lHlHNFhk368XMt9uiGXijl/iHx4kNUmYmnLmeJzUmBFy4w2vL39i6situp+YL2PeYWKE72wwSTq8sSTEFj/ZeHLjUhZPZlhycY1M3U+7mRjRwJTFYQPJwtjMS2aosmE+sM3jHYGpKH2HXTStN1yHIT6EBEllDxHugTqWER8YPDe2wfIPJy6MuUMTkjJ/8nlZPVylnZbQ6YxnVqRfNkdlBGPB3IFyP0rl58PYNbokyYmXQn6Nl43hH1ByTpZldqR8wkNFaog5Ek+QU85Fyo5hLOURC9nEhcDW0hCzLKuQf9P1KzV6OXnkMsvqycow5cVl78vj2i9K07rOxeVkAmfk3eKMI4uHvqBrouFB4kn1jGchGGWiSLJyWbQhe/xkafGGWOPsZfXF5i9Lv6VMBT2Xt1GLupCyEAvPcG1EMGAFeeT1Z6mv3EuJPIwQV6prfJnBtdNbvPFsNg4lcoiXsrxk9wXGlm2mOXFkclswl6cjlEkWR9ArOW/+PteWGo9r3d4a0W0LnRSBWF/wegDWYK3hXpSgNr90W8fodneE/qQVE1sKOGseQPifVyB6STDuhRZ7yTScxfSf3OeqgZtS8/bFfS4ka+l3oP78jzhdNwIT/AZLHOX7QBP0Et5+81ncbziL4xcHYXLYg3C3Ibnx0mVUmwDO4d4Dkx/xgYs4uCnNy0ZksnrzlwIUGd0xbvw9cBbj8RfGSlyuvg0ohiFo2SosCxrGydigQ372SZwuEaa9SPg+8BzjA1djIQ6l/wJuDaAC7KKEt19CkKZX43mhBhWV9VwYjJTxEAQbCA93KymFHzvZ52AExeZAFxuA8oxvkJycjOTkrYgODsLiNPlUsS8eHjtUUv8KDBjmDT99Gg7kXIVCMxbTA4/izbj/4ETGfyTTjXyRDT/hQKIOfg//DmqLah6AYT4jgfwilIpTbHYw+fljrLqP5Ecurj7xEHIMvaAZ9wcEpn2KuL1ZyEjObMbUVuNlk2Ro47IY2tJaoKXla2k8VhJLdk3WgQ3pHbvF1zX4sjoWqfFQbH3fhiHnEBL1GjwwQtq3ABiggY+fDokHfmqDlaq8KKYL2Bu7EWl4Aq/97xTg23V4Jf4M1CtexNOjhTbrDO/QOYjS7sCeE1fZiKayI9iR6InXnvUHWSqkCnofOt0aTCw/wreZrxEf/RR8Fn9lp8xXkXMgDXq1N0Z4SvXXsg3ZjixjbyrB0d1HAT9vDBsgNCReJmYPokb3aSVTF+s2alEXzekz5CWS6qtQ9yPhM0zq9yuUVxrXGaOffhEr1GcQ/8o6fIsp+N/XngAy4/Fp2kXbq4/ZdpUL9QMjZD7P0j5DmNLn83IoTj2KjqYiDTK5VUGI1elwIGqMpI+UlsHGdRu2fTii2wpPjJs+Bmlv/ht7T2Qg2cr9hJdRMRpPRy+CWv8JXvl7GvDYQrwWCGRu+AJpZd1nNwAbNWJ1S2hhVj84foMYZGMxaVIw5ix7HmGDipG6OxNFrE+XzKmcd9Qf6OHGGToW32VhrQQQjLqmVgreRPk5LapdfTBG2hnVX8DZopsQ87ZKn89fHk8IJ6xQbChFNu+/tubzFPxw+iLqcQtXLl2BURJXoXkEC+eFYVzdd1hPwmWfkPiQ8b5oqEDW1g94HzJuC5CYrVmoZvOsYf3VIBqtgiD8pyCP7Hbn/GpC7bltiNQMgk/wp8gm1jI8EPpZMuJCgHytziE/DLZsAybi9ZRMbJ9UhaSY5xHsMwhS/wNTeQlO6RuhoC9CSXlrGrkCA8YvQ4p2PSZV/wcxs6bBZ6DSjr9bI3JY/KTDqZIrtjt6i3BAS8vX0niy7LmvTdSBzTid4mYu1gYPMfsWEr80pS8WpzWmMK0RvByXr92ym4DC6xHMWwDeCGxA0YFdiPeLwB8fdOXi1J5BfOQ4DPSZi4+zK8lqKLiGrkVO3DONv1DoP0DwIKVFOZU+i5FmV5LW/NBeTNuqz7iJ8pIitK6GK1FcfInzcbaDSr82GIN4P0fW/9WpXyMGM5dIS+LYyb7R223a9sWcGtNtV4x/fSe02yehOikWs4J9MNBJ7pMmJmR9oS9Bcbn8Bd06WHe60/y9D4hz/Yb9wFMvYo6fypKFwgMTwibi+FYtfrt6G94afhSKdyo36QqRXy1x1Ldw3OfCWiYo/cYbSnCX3uSueSPLdTJZidmAszYc2blRMnf4jeG31LBKxV7+wkjaFNznUov8XTtxsHYiFkc/gmH89hswlSLjeKbMeb4X3LwDEET+mapwPjUJu1OzUTIvCuEjycrRm1D6ROC1OX6SUTuJUCTNjJvAUMk99lIqTxvY0fLk2+O7qRB7lq3EwRlJKN0aAS9BbOI0nK8HHmhmpgNGIyiC/FuCWOLMuncHNr8SjEBtOs69MQIPqIFT9pIURgtK7QVw5L4CA0YHIoL8i4oFcajeu2MzXgmeC216KmKDBjuSiCSMMFLT9D5YCk8HyydJnVw6HM9RLo3VQWwQZD2DTJqO+voM4rRfIEoclWonORT3YOa7qxG1fxbWxh7A4n3LsSXqMGat/Qe+XjxZkv9dCAgNAeYfQs5KT5TszkPI7HfhzbaPBhTueReLDz6KpNINiPASRriIk3YxAG/7wofEQbs/CqOFdiYPKR28l//W7O/txLTN+ow+8BzhDTWKHChZAwq//gfW6sciKmk5/oijeGHDPiBwA9a/GADpeJplYmqExGVgfyOjVKZyyxhAU3EaUCiP0sLvbdr2HdZtFUYHRbD/omLJIpn/YMfmtxEcWIT0c2sQpFIApkJ8HZsAvfplJL0bAhz6GzZkAoHr/o4Xx/MvIy0sc1eLZq+p2i+Hsxs8Bt7GpcsGG2/wslEri1Eo4TdhawhhKlCYYnOGu8dAq3zNG5cycB3iDqVViNuozP8RRbgbD43zhMIiTyGwnVEy4Wfyyca7Lr3DXpt0OcjQAt733wMXIcwAd9wlGGFkPUo5MTDBj7Zxq0RXb8qAThiRVrhhVOAkeCuvofi3KpgUHhjj5w5hKlXM1FSB7Pi13GayChWGDO1jFYaTp7GRPTG1znNRq4M2H1ZTEaaaalibHvJpKRNqS4uQrw5BaMBd1mVSqDE+YhEiF4yH/lQJygf8HqELNMj//mfZasRalGqLZVMt1smxd6ymL7m46gWPIYB0ILI/hXo8Ip6PxAJ1UyNbzSybLB/2q6qF5WtpPFsyyO/J60DQe3m4DvuugCrgMSxQF+D7M5cs+y129Vfbb4iq8AriprXSkvHt6UGcYab+Cm/GHZNMgfJyIQ37Pt+F3Wn+mD1lBD/lJOirbJrcVIfqKzfskOQMO3V+Hs7opaO+JtTmbsS05mxeqhiBKbOnWI28cas9NQiNL8SAVjGttx4JZ/sJDRaE/h6qZvUZdnCwt4W6t9P2pFFrf8K3iUeBwCj8b8hAnP4yHvH6J7Bu/f9gvDg9K40AwG674lfJ2toc2qE4zvCeEoYQ+TQ9v+lzszadtpufoGPS6WdZ+Wx8dUy3pRH7QD1+Jp6PDIdanJEwofbH/UhMAwJfW4iQQT/jy4+ToQ9c3oTRK023+1xbP1WaKpvCEw8GjYEpKwl7Ms+jSux066E7nYqd3xRDMz0Q97soeF8tYRRKPvUonwrk/aqq83H0bCVM7DYW2dizOwf9pz6OyZq+cBn1IMb1L8Khb0/y20nUQ5edjC9SqzD6qScwwb2XLE+hMPwoUiPbPXAjZip49S/h8yf70xYg9bscmHxDEXq/CnC5B/d794NRf5HPn2y1QWQ8hmoIm8AOwKiAsVBV5+PIyVLeP+w2qn45D71RYNEHnuP8MbxGKCtxlytF9p4vcdA0EbMma6CAOR1LHtK8hPJ18k++I0hL3I1M/gFh0n+PTaveRrzVnEEu1sZsQDK7XQSZnkjE0vkpmLHlBQSqFOAeBKGITj7HT2eSZdlHcOAEEPVCMLwVd2Hi/yzF9P1vY9Wm73ljzIBz8dGYv9YT696PsD9SIGDUJyDmvb287xcfN/EhbHl1ClTgt2GYtoqXkUQyoPDQIZxABF4IHdmI70bjZROyb/zTwfKx/ja8h2R9LWpNDsZrPHP216brwIFEWhyE9/9h4zegtva2YymppuDVLY9i/yt/x6YTes4Yqz2H5Ji3sBwv4/1nRzdSb45lYRnKFeNf/DvWBeZhw6cZ0KsfR/SaZ6Ano2LSkyNU/nj2NU9sWB6DtJAwTPEWfMh4oyptNxIyyzh5TXqc2PR31t/MMi/hmwKqwBewZcZhvLJqK06wbY20j72Ief0TYN3reNbh0UBneM9YgpU+exDzYTrXjkxlyEzYjbTA5RyvVjLVr43Fe0I7JtOwS5chccYqvBo4WDRwHOszhPLb+WTlfAiJ86MRf44MB3JM3otJkExZ3kRZ2hfYkOnPGV6mU9izIc+B0ZnBCHx1FWbI+pvC5LV4fTns9DeOxVF4hyJ6pTvWxnyCDLYub0KfuRuJaf58uo62hbZr+xzhJnSbPzlhWnSy2X+2thCHDuQCUXMQSnTcdBFpn8YjkzW8/GE6sdfM3p7Ra6d6u8Pt5k9Nohfc/P6IRf1O4cec77A5hvNoApRQ+fwBD895AQHeblAQ53eL3d9rZXtfWRtHnF9VLxxI+QwxyUZA6QX/8PmYOU7D+ZQ5j8ITi57FyaOZiI9NhVHIc950Ps+b0BH/MLn/FDuSBXg/dY/taUBi9LGyeiHoT5NhOvZ/eD+5DEY+/5eE/KGC38y5qN+bhB2xJ8GVeTIeezIY2J3OjxKq4OwdgkXz3HE0cztiU7m3V6WXP6bPm4MJGm6KQeE+AXOj+uLgd1sRk0zCuMJnahCiZt4PDT/a5uwdiNkzge++2YKYZML3ETz52ARcSi7uQo76pJkMRuBfPkXCR28hWNOXbTfqheuwOfJTJHn+Fa9YtKSZWLc0AMXvPQynL84A6oVYty0JL06/h3tQjp6PhBxX7Nj8DAbOOsPFJGG2/BN/mcmFGTBmAT7JHI49ce9CoySeMWoErliD7dqnETSaTJqJbw8WOYtfQl7F0qALeG+0El/oiQgbsC1zMabz00OjF21CjusObA4chFm8IUnKsyVlKWaKU0hiapKLEKxY4Gu/bJKQ9i8VaLp8ZC5yJGZEL0BisC+Ui/npo9Zy4YVSOFAH9uVv7S+8gZAYCR/lm+yU0L4pjqTZB14R7yPT9WvERY+HMpNU3FgsXLcaOTuftD/i4UjS9sIQX7r/6vC68LvNkwVc8eAfIxCy/AKGsS8SQmBiVC1FSsJHeD14GDcTQPR8cyT2JnlipmWjESIBinsQsSkJrnviEK3pi0zyC9s+dmPnzPGNTK+ZkxCuFOrpWLNzJxI/egsaJTmhgbSjWOTsnM3zag1TF4SsW4Kg4g8w2ukL6Nm6WI/MF6fzrgvN6TMEie198nIOjMN7QYOwmFR94Ep8tfRVhGTm8ZFImC3Qkc1r2D/OKV741tinwmsmNmW6SvobgnwdtuRsxUw7U2wOxVF4IWhNAnISP8Lrmr4IJkIErkBCzlYs4NNljWWxLRzCrhG2JHWkz2iiT5Qn26huj8GihN1w3bEZgQNn8cYu19ZS/vIkX7/3ICIun+yhwv2RhSniF+Fmz/l0IutBheISJ0PJV+E2/aQEGiVA9aZRPKzhZ8h4E2OCi7DmTvgoNSUO/b3FBKiutxgdjUgJUAIyAkJ/0oIRMVlK9CslQAlQApQAJdADCZAHaU/7o4M1bV/j1BBre6Y0RUqAEqAEKIEeQIAaJT2gku9AEenU5B2A3N2zEIZXu3s5afkoAarrVAcoAUqgrQgI/UnzV022lQQ0HUqAEqAEKAFKgBKgBHo4AWqI9XAFoMWnBCgBSoASoAQogY4jQA2xjmNPc6YEKAFKgBKgBCiBHk6AGmI9XAF6RPH53ag10RmSXc07suQmGDJWQdOcnc4dEpdsVHkA61ftRCG/LRC3+WoAojOszzBwKEkaiBKgBCgBSqBdCdBVk+2KlybeKQgoxiDqgA5RnUKY9hTiKk7EvYHlp/4Xf+SzUYyOwgGm+5e8PanStCkBSoASaE8CdESsPenStCkBSoASoAQoAUqAEmiEADXEGoFDf2pDArWFyIiPxjQnJ5Alu05OoYiOzzCfRUayMumRu00SZlo04jMK+TMlyZGOGYjWaBC6/mscWB8JDZuOBtOiE5Grv4LCgxsRqeHS10R+wp+1R9I9h/hQDSymJmV5aSI34iB7vqVQZgMKM+IRPU1jR94ryIgOgFPoJ8g4kWgOp4nE+oMSmYVyJa+XyLYB+/PKhIwA8GlpViHDIDlqhC2vk4NykzTCELw2F0hbDB8lNx1pOTXZDJlrC3FQZOyHyPWJiI8OhZNcRkkp6CUlQAlQApRA8wlQQ6z5zGiMZhOoRu4/XsP8w7/DZzVG9hgto+51KBOfx9I9hfyBxheQvCQE4Rl3I1Z3AwxjRM1nv8Ph+bOwLPmC5HRIPdKWb0XGyJUoZBgYddvwhxPRCNBMw3tnJuLDUgZMTT7W4B+Y+eZ/UCaxa0SxTVxeAQlKLNVeA8NcQ8ajZxAZuArJZTfZQ7zPxf8VgfMPwzM2F0Y2n7/D8/Ay+IRvQm6tJNG09xCT1B+LU0rBMDeg2z4S+0Jewz9yhTNYq5G7YQkCPr6KpzJJXkYUvjESefsOSg4cFiVr/KJRuVUIik1F+orxQEgctMYcxAYNtp1eUzKTfJbNQmR+EDLY+voeK+/KxJtrybmd9I8SoAQoAUqgLQlQQ6wtadK0bBMwleP0wXPwe3QSRg/gVI4cKPz+f4twIGoMe0C8IfOfeCXeF2veWIyJanIwOndQ7cfbw7H/lX8iUzJSpF4RjTcixrAHGCvUD+KxiRog5K94Y9nDUJPkB3hjyqO+0O/PgVZqNPHSmYrS8c/4vljx1muIYA8BV2HM0/OwAMn454FimAw5+PebJzBjy7tYNlHNHjauUD+Mv368CSu067BKMB5JeupFeOuNmXy5+kAdMBUT1Xk4eLqcMx4NedizoVySlwIDRs/EG28tgto2Lbt3m5TbbkzZD43KbAJbF/sfxZb3n8MYtr5UGBMVi+3EyKN/lAAlQAlQAm1KgBpibYqTJmaTgMIT46aPQdqb/8beExlIlk43shGuIudAGvRqb4zwJEaY8KfAgGHe8NOn4UDOVeFmKz8bUHQ0FWkYCZ9hA8xpqYIQq9PhQNRo1OYcQqLeFw+PHcoaYWKgARr4+AH5Wp15ulT8kb+wCGOCgU1LlhcxMkm55HEb/d6U3MSgbeGfhcx8Xfj5YyxrEAtpDsAwn5HCF/pJCVAClAAl0EYEWtx3t1H+NJkeQcAV41/fCe32SahOisWsYB8MdCK+XfHIkPpl6T9A8CAl75PF+XopfRbDckJMDT8fDTsa1j7obqK8pKjRaUP9qRKUS2Yn7cvRdFr249JfKAFKgBKg/vn23wAAIABJREFUBHoCAWqI9YRa7hRlVGF0UASiYg9wvlQ5W/BE+UYEB35odlBnfZsY1oeMHKZr/teIv1Obl60PPEd4NzptqH5gBDwdajlNp9Xm4tMEKYFWEzCg8OBmrNp2TuKb2dJEhQUi8eLedtYptWV+1qnf0TvCgqL4tmAnkZxdPPMethU28DcbUBj/7B1aPMPnFdpYHUpkba/L9mLbXvI2I12HHifNSI8GpQQcINAH6vEz8XxkONT6IpSUD0BAaAjU+Xk4oyfO8sKfCbW5GzGtTTc+dYb3lDCEoBja0lohI3FlpVNoAsoffAwL1AX4/swlywdRrQ7afDRjRE4BVQBJS5YXTKgtLUK+mLsj035Nyd1WneRdfF0UodTCv64WpdpiUWJ60Y0JGHIQF/khco13qIx3Or87VKy2y8YEw4kERC4/DXOVOGN01B4wuvcRpKKP8bZj3TEp0RrsGO49K1d2+whvTItONm9XUVuIQwdygag5CPV2gSrwBWyZcRivrNrKbztBdonfi5jXPwHWvY5nRzu3GTOFdyiiV7pjbcwnyGANv5vQZ+5GYpo/1r0fgdFuAfifNROx/5W/Y9MJPWeM1Z5B/NJlWOuzHO8/O9pxfyzVFLy65SEkzo9G/DkD2UuDLdd7MQmS6U/eyNKnYNvXP3P+Z7XnkPxeLNbqzcVuUm6F1KBrQG3tbXNkh68UfF2kIea9vXx9GVCYvAExZGsM+kcJUAKUACXQpgSoIdamOGliNgkoxmBRwm4sHfINAgfyPmADn8E3Q15Aypon4UW0UHEPIjYlYfujvyFa0xdOTkoMDPwGQ5buxs7XJratT5jCC0FrEpCzqB4xbF59oYmpx6KcrXhtvCsAskpwIzK3P4ry6PFQkv3KBv4/aB/dBG3KMoznV37aLKvVzT7wingfmdvG4nDQIK5cL+RgwtJXESIJqxj9ND5OiwLe9MNAkl/4v1Ez63X8K0SytrJJuZ3hPWMJVt58Ez7KkZi1p8hyRE+SX6OXbF3sxCqxvh7Ge8UBWLpuZqPR6I88AWEKZetBHN8o3+9OGPHlp+ymRWOrsF+buEebo3vYfYjkA+a985ymRWNbbhkM5JirSD/O11ITiY3CywQrHnkRyOD2hBP34ZP4ahLZxwRjrV6PtMW+UIoykW3+TmAb2UvOVjy+6CZ9LpKF8jiR/ee+RV75DfuqYTe/JuS0n6JMTiLDAfMLIIkn39PQ3n6FWw/ihGRfQ+u9Bm9Cn5tswXr9/jyUi7IJR5nJjxjj617CFiBp2dqPkKTxJsYEfwA9vsJin378voK2piYd1RsH9j4UyyC9qMAZi70a5XsvEh2R1r+N/SIlbaN1bKVydYNrRvIHELcc+kcJNI8A1Zvm8eqaoa8z2rhnGPWKdOZa1yxAm0jtkK5fS2dWqMEAY5mFG44yOiPDMDUFTNKKEAaBG5icGnLjMpO+YjwXJi6fqWFuMDptCVPDXGMK4qIYtXohsyFbx5CQRt1RZsPCsTbiqpnAFUmMlqRnLGXSV4YwRD71wi1Mtu4Gw4hpvcwklZLvRqamIIFZqJbIZdQx2RsWMmo8wazLqeIYsfKrmZC4AjZ/ctNYmsRESeNZpU3KmM2sC7zPLBNzjdEmrWQCAQYhcYyWFMbWn1V+DsppIy1OTgmXmnwmbuFYRh2VxJSy9cB/FxndYHTZW5iFajUTuC6bqSFpivUXwqxIKuDuCXzF+jMyNTkbmEBIwgh1DIGdkbmWvpJRYzyzIv2yRFq+7tUrmfRrRKgbTGnSy4xaTMtc/qikEsbICOk8w8Rpr/PpcO0RYhot1Buid+nvMIHS+pdIyl3yecl0i6tbid6w9T/erPOs7qYxK4lOtDlbKyG75A2hP7GwvISbXbJEVOgOI0D1psPQt0PGfKevjmLiCgSTS3hYSTrddsi5KyTpkK7zD3Lx4S8UjL0vPJTlD2M+EBtmLMM9gIWIgnEgPOBtxbX1sGYYozaOCRENAS6elVyCUSgYS6wMQl5EBj4/4XdRLD491jgX9EYwLoRA9uIKv8vLZs6vSTklSXCXcuOE3JVyqeMMI7VgmAoJSMNcFw0xy5cOWRieiWUYeVmEOEKdC/nxTAQjyljAxIWoZS85Um5COo0YYi3WG7nMgozST4GrnJsj9c/HFXSHlROyssrLJ01XIoeVXkp+66KXQn9Cpya7wahmZy8CN5XBbUdBrzs7ByUGkWkQfTwW+5KpVCJvX2gmvYIv9PuwPMBN3F6ks+tdx8qnht/Dv+M2GBYEYfdr0yHxwE8g3oLWf8K+cy3cw846Qcs7hp9wIFFnLRd438J8+QINPjobLxfWq4W5ePrEQ8gxXOH2AvTzxjCLqXup36KlOHa/tVROUwmO7j4KWMiggCrofeiYPYgaXc/LKN8jT9jXT76oRiqhLIwgo3wrHbaOXaQRm7w2FR3D7jT5IqDBCIrNAXMgCqObfEq3Um8s9hFsRFw7ewty9Q+Os24NJpYfQXJyMpKTv0Z89FPwWfxVI4mSn9qPbRMZd5qfm6ziTiMpFaTLEjBvQyHdkoJed3UuXVYhO1hw+/vQNb3vnEVcC4Oj6UKZyktwSrL4wyoGu4JZ8GGz+hX6tcEYxBrmwstEP/ND1ngFJad01pFacKe1ctrN0tSUjDqcKrnikF9lkzLaFaI9fmim3rSHCCRNsqApchwG+szFx9mVrIHlGroWOXHPAPaMfBuydC62NgRsh1vUEGsHqDRJSoASoATsEbAeWRJCNr3vnP24Qhr2PxWeI/CAZO2HVUirky2kIdQIiStgz121eoEgWyi4eWDEAxpphBZft07ORrJVDG5CRg0eGDHYoRXRTcrYiBht/1P76o1j8jagcM+7WHzwUSSVluC/sUsQERGBiCAvXGvmtjedi61jpW9tKGqItZYgjU8JUAKUgBUBvfVRWOw+dBosCP09VFbhyQ1h37m22MPORgaq3yN0gQb53/8MvcXJEPwecfZG2OzGq0bu+ifhxG702Yb7z9nNrwk5FSMwZfYUq9EXU2E8Qp00CI2vwIP29itk9/WTH0Vmg6FwS5BRftwZW8f1fChhyk2IZPtT4T0Zs0PkR6fxqyId2kOxnfVGENtqVIurD/WCxxCgquf2GZRPX5rqUH2lkVWzQtrST4fYSiN0/WtqiHX9OqQl6EYErl69iuvXr3ejEvXcoujXxuK95HP8vnDcPnSJM1bh1cDB9qGo2nAPO6tc7sLE/1mK6fvfxqpN3/PGmAHn4qMxf60nt4ceeSJI/Zzqa1FrGozAV1dhhixeYfJavL4cfDxh/7kUzF+aiHPsZsAO7j9nlZ+DclqVj9++xWcPYj5M58pnKkNmwm6kBZL9/8bAbeJcrJku26/wXCKWzk+AT7P2K+SZJC7D0vgzjez9R4wsHRK37bPPRDESM6JfgM/aWHyYUcZOjZr0WUhIzEMgK5OL5GxaE+pr662nT9tVb3jQ+gSLvQVZvUl8CFtenQIVeEM8bTcSMrkywKTHiU1/xyvxZ6xqqvEbjrFtPI2u9Ss1xLpWfVFpbRJoyyNSbO3PYzNTyc22OQIkddfHCBj7e3zwf/+VpE0vuyYBNQJXPI0JxR9gNPGrGvgcDvutR+ammdy+eXYL1ZZ72MkzUWDAmAX4JHMTHi1/Fxol8fUag5e0D2O7dideZ/fQIwNzxDBYgJtkH7H+UdhT1ACF10xssog3CIHf3IWl4t57JB63F+A2vwwEsfsFjsEL2b5N7z9nld9Nx+SUF4+IoJ6ONTt3YpFxPVc+5QTEGOcjZ+fL3P5/A8Yi6hPZfoUv/YxHt2ci5fXm7VfIMVkPv8PPcXv/DVyG7AlRWBcicdZXjMazH/8br2E9fFkmzyCuJgRv/esZifR9oA5aiZ0582GMmcDuW6jUrIdx0U5xD0VuM+drWOzTH/1n7UKRxYgmSao99YYXNeRVLA26gPdGk70gByHo8Fhsy3wfEV59uNHcwKVISXgAPwQP4/ZeHPY3HBkeib1JKxo9Mk4CQrx0iK0YuutfOJFVn0IxyAopyVfhNv2kBBol0OF6w24KOR+n1mRgf9QYh3w8Gi1Qs38khthC+OwOg3a/I6ucLDO4fv0aNv79eSR8qcXMvy3H2lfmWQag3zoNAYd0vcP1sdPgooJQApRAIwSE/qRXI2HoT5QAJdDOBK5fv4RX587E0cz+mPPJ+3h37uPtnCNNnhKgBCgBSqAzEaBTk52pNrqtLPyRHqEtOZJFdowImeaRHknCjj605EgW4fiRUERv/RCRGjJNQ44iuYjC+GfhJD1+xKRHbvJ6PgwJp8G0aMmxMC2sN2KELY2YjqS9tzDm+VBqhLWQI41GCVAClEBXJkANsa5ce11N9rTN+DjjHrxRaARjLEX6H05hUcAwjHmvCI98mAuGuYaCNb2wbuZ72FtG9jMyoTb3E8wN/wbKl9P4pfM3oHvLBYnBr+EfudVkF0HEnkvHCjW/vJ4spVcpYCpLxpLxi5Hh+XfojGTPsnP4zOd7zA9chWQ2bQFeGhKPqrGy0Aijbjeen+gu/MB/ViN3wxKEf9MPL+feYKfuGeNJvKXcjeAX4pDLOiXLotj5SpzwiTM+93cT7y6dh7zUOoycG4Sk2OV2YtHbXY4A0UmdDgc6ZJq8y9GiAlMCPZ4ANcR6vArcQQDqRXjrjZkYTXbeVqgR8Nh4qPEM1ryxGBPVxOFThdFTHoaf/jiytWTv8as4sWcHtAsisXiimvf96gN14GwsCDmHg6fLrVcPscW5gszN7yPe7694Y9nD/O7mxJk1FtsXHMcrm49KdjYfjwWRT2DMAAUU6vtwn8Wu4AAMedizoRwLImfzMhK/VC8ELpqNkMwfcFpnfwNMKdm8Q//AjPuH4t4no3H2yhX8691FOBR3GlcCJ2P/56s7wK9NKh29pgQoAUqAEugoAtRHrKPI03wdIMAd86GDAYUZ3+BQtRFAJbI/fhtrM4GQ2XaSEI5kWTACnhavGvyRLG8eQs4bjyDATnSL2+zoRg5QW4iM5COoJj9WZ+PjxWuRiWdgTwSLNGDCxd90cHPpBcMPJzH3ubn4XelJ5Nw/E8kbozGkXz/L4PQbJUAJUAKUQI8hYPGY6jGlpgXtGAL2Noy0K40Jtee2IVIzCD7BnyK7mqzZ9kDoZ8mIs9oA0TqRRo9ksQ5u5w7ZZ2kxNAN9EPxxNmeIuc7AZzn/QggaO5tOmpwCT0W9gxnPhuEPOI2fDh3ErnPD8VjQGPzpgTHSgPSaEqAEKAFKoIcRoCNiPazCu1RxTYXYs2wlDs5IQunWCPP+S8RBP18PPNBYaYjPWGPbWZgk05P20zEVfo1li09gRlIJtkbcw08hEkf/NOSjCREsklVgwf97GydTM/HDD3oMHO+Hf3zwqkUI+oUSoAQoAUqg5xGgI2I9r867TonZ40IAv4d/x/t5caKbaqpxpbFSCEdkWB3lIj2SpbEEhN9MqGWPPvHFw2OHSvy4bqOmmviwNe+vX/9R8AkYD7/AZ/D152/hvv50SrJ5BGloSoASoAS6HwFqiHW/Ou0+JeINqrTE3cjUc07xJv332LTqbcTrJcW0OiLFkSNZJPHtXgpnuB1FYkIWfyTMTehPbMWqVz6BVAS7SVj8oMDLsXuQ/d02hNApSQsy9AslQAlQAj2VADXEemrNd4lyD0bgXz5FwsRjCNb0BdmFeNjffsDwyE+RtGK8uQRWR6Q4eCSLOQX7V6op+EtKLCb+EMkfCTMefzsyGJF7v8IKtf1o9n7p168fyD/6RwlQApQAJUAJEAL0iCOqB60mIBzT0OqEaAKUQCcnQHW9k1cQFY8S6EIEhP6Ejoh1oUqjolIClAAlQAlQApRA9yJADbHuVZ+0NJQAJUAJUAKUACXQhQhQQ6wLVRYVlRKgBCgBSoASoAS6FwFqiHWv+qSloQQoAUqAEqAEKIEuRIAaYl2osqiolAAl0BUJkCO6dmN9pB+78pc46DppIrH+60wUyg+N1ycjkvxu558mciMOFjZ/D7uuSI3KTAn0FAJ01WRPqel2LKew8qMds6BJUwKdgkBzdZ3d9+5vL+K1L87Ylj/wHaTvXIkg9tB74HbueowJWI5fbIfm7qpXIv3cGgSp6Ht0Y5job5RAZycg9Ce0JXf2mqLyUQKUQNckUHsCG+Y+wxlhgSuQkKODkWHAMDegy96ChWQfusx3MP+jo/xxW7dx+UIRZ4SFxEFrJGHN/4y6NKwMVAP6NBzIudo1mVCpKQFKwIoANcSskNAblAAlQAm0lkADCvesx/JMPaB+GUnbYxA5Xs0fk9UH6okv4ePtK0FsMX3iIeQYyIH2DdAVa9mM1Q+MgKesd1YMHQ7vPuTnapRXX2+tgDQ+JUAJdBICsqbeSaSiYlAClAAl0JUJ1P6EbxOPAhiLqC3LMdOLtaAkJVJA5RuA6eSO/gfkna9nDbFrl2vYMC5DBsFFEhq1hTi44QO8mUYO1vLHo2OHSH+l15QAJdCFCfTqwrJT0SkBSoAS6JQETLozOMiOhi3CvMeGSw6MtyXuENw1sBdguoKSUzo2wC/LA9B7ua2wagSuXIIZ3s62fqT3KAFKoAsSoIZYF6w0KjIlQAl0ZgK3cenMCaQREf28MWyArYkHEwwFOThIwqi9McKzD1Crgza/kaPkA1cg7i/PYkb4eKhtJdmZkVDZ/j977wMeZXnm+38zuKzaGCzFlnfEI4tpgt3EUpPFs9Wtk4BJKdW6qNhSSDCcqlWoWw5klpRiKxbNnyscKqhdzkyDoe6CZn5U7dIEMsYW2iU7YalhCzMnyxW3YSatVCGM8kdnnt/1/pt5583MZBICmTDfXFfy/nue+7nvz/3MO3eevyRAAgkJ8OOcEA0fkAAJkMDFIvAePK1tkMMuaclcFOdYEO7vxSHlxhq0nwopA/UjA/TlLs4Vj2Hp1xiEXSyPUC4JjBUBBmJjRZ7lkgAJXKYErsB1N+biJtm67oM4HDhvsvM8Au4tWF/XBWA+Vi68FTkII9jXg2455dWTMelq9dVskeagpmE1bDgM5/KfoEMZ1G8Sx0sSIIFxTYCB2Lh2H5UnARJIRwJX5H8JjypLTWzB8pot0UVYwwF0bfs+Fs35ATogwVa/Do8WXQvgPPp7e5QWMtw+A9bIoBELsr8wD0vK5GUrmlD7qg/y/Er+kAAJXD4EGIhdPr6kJSRAAulCILsYj77wjLJWWOCllSjLn6Sulj/BiuKldWoQtmYbXl45G9mKzkH0eY8pZzcV3oiYOZGWPNxvXwoJAbStfYmtYuniY+pBAqNEgIHYKIGkGBIgARKIErAge+YSbOl4E6/UVyjrhanPClBR/zPs8nShfcNd0UH3kRmTN+H2GZ9GpEFMyWRBTvFcLFEWHeNirlHGPCOBy4MAtzi6PPw4plbo2zSMqRIsnAQuAQHW9UsAmUWQQIYQ0N8nbBHLEIfTTBIgARIgARIggfQjwEAs/XxCjUiABEiABEiABDKEAAOxDHE0zSQBEiABEiABEkg/AgzE0s8n1IgESIAESIAESCBDCDAQyxBH00wSIAESIAESIIH0I8BALP18Qo1IgARIgARIgAQyhAADsQxxNM0kARIgARIgARJIPwIMxNLPJ9SIBEiABEiABEggQwgwEMsQR9NMEiABEiABEiCB9CPAQCz9fEKNSIAESIAESIAEMoQAA7EMcTTNJAESIAESIAESSD8CDMTSzyfUiARIgARIgARIIEMIMBDLEEfTTBIgARIgARIggfQjwEAs/XxCjUiABEiABEiABDKEAAOxDHE0zSQBEiABEiABEkg/AgzE0s8n1IgESGC8EwgehctejqysLGRlLYTTd3a8WzQC/c/C51yILGsN3APhEeRPIUv4KJzl37zofMM+J8qH8qOiixVWuxsDAFLKk4KJKSVRys5FufMoRpV00Ic9DT/CtoysvymRH5VEV4yKFAohARIgARLQCJyFb+c63Nf8WbT0vY4F10/MUDJXIq9qJ0TVRTQ/6If3L+ZgWe6VF7GQFEVbZqKq1Q/d3FENiFJUYXSThTHQ2YTK1T14+p7RlUxpsQTYIhbLg1ckQAIkMEoEcnDtNfxfd5RgxhETxoCnA/+54IvI5TdZHD68NV4IsPqOF09RTxIggfQnoHQRzUD+sleAwDOYM2kCrPY9+IO7Btascti3PotKq9xdWQy7+4RiTzjQiW2RbkwrSuxOuH1y55bhJxxA1zY7SpSuzixkldjhdPsQNCQZfHoCbnsxssqfhat1o1aumndb13EM+FrRUFmodp9aK7GxM2Do1goj6HPDmUivhF1haplq95ypa3LADbvVivKte9BpsMVauRF7YuyVy47VreHVrbCXRLv9VFvfg6f1T1hwx3RYcBFtjYD9CO8d/tcYZg17DD4wdU1GshlPRuRHuZ9zBP5PKc95BLqaFbZKN7q1EqpNYQy412LmnGcQwCtYln+V2uWq+bDE/uMIB70rFkEf3M4kdTRl/8vATqKr4avIsi6H6/hZBLs2oiTLauh6HYDP7YzqnWX63ITfgWtZIbJKNqIreBbHXcthzfoqGrpOGr2RPufC8APAcMVTEkiNAOtNapyYavwTSK2unxFexwMC0hrRfiokhAiJU+1rhAQIqaJJHDkdEiF/j+iRj30tokoqEBWN+4RfTipOiSOOKiFJj4uWvnMqsFCvaKkqEFLFZnHAL98LidNHmkSFVCCqWnqFki0u2ndFe3WRACRhq24R3tMhIUJ9on1NmZDtiMozlxmVH9Er5BcHGiuEhPmi3vO+EEKzscwhvEYFTrWLaqlIVLe/G02jc1CeQQBlorrliDgt66zrY2sUHlk/5ZbGxNGtpjndLRwVBarO1e3ilG6rLG++Xv7FtFWIkNchygABqUI0HvCLkOwDb4uott0kbPUHNFuOCEeZJCRNRzXPA8LhPaNqPFI/ppIvJJd9kyhzHFHrQyp5xDnR1/K4kCL+iPpdrVd6vTXYoPtQqhKOI6eECP1ReHtOCaH5KFqnzgn/gc2iQpKifPS8kfLi+1+p355GYZPrrcxWs8X4eTotP9d1UCuNWq8j9VHXXVKZnD4g6m2SgKGe6dVoLI/6+yQm8tJvjqViLHv8EWC9GX8+o8YjI5BaXU8UiOkBil62FjxEvjxi76tf6PoXiuHLUEmm3deDHD1rzFGTH5Mmvjw1aND1U/NJVS2izxhkiVh91Tx6YCYXbNbJxEH7ItYDFVVVsz4Jyh6UV813UyQwuxS2mgNfk71KMJQoEDPbqTvKJEO/HTmmmC8mEBtOnqi+apFGH8eRM8gPci7dBsM/D4owU/5keWGo3xpHKP+MnNaCRS2gUuQm+CdANSD6N4GcSOAcTTlmZ/r7hF2T6dM4SU1IgAQyicDA22ht7oI0azqmxryJszEtfwYCzXvhGTgBT2sbAlIupk81Dvq3IHtaLgoDbWj1vDe61BS9/Ci8/XOQ4uiF7h70BcOw5M7BI1XvoHHnQWWWIMJ/wN6ftSF/5b2YnROTMYl+mh04Bm9fEEhUdrYV+YWSQc559Pe+h/vKb0GO4e6wTxOVB9UHuq2q3Jtxe8FnELVsOD6Qu1FH4seR5EstT7jnN9jRBhTmW5EdATcFpbUeiNYq5EUNjTyNf6KVV3grCqQ4dVT3bdzMJv/jPI7v2oy1bYBtZQXmog3rlm9BQFoK+/15GvuJsH7+b2Frex6OXb+G29UBXzDO1AhLHu63L4UU2ILl69qAuRVYaQM6Gl9C2/HzcbUZq5spox4rBVkuCZAACVzOBAJ1czBJH/ulHK9Sx5gZjdbGm6nLYchjzLIwIX8Z2pQ0Z9RlImJkyEtmnFElFOZiWnbqr/pwfy8OBYyFm84DPejtPw9YbsDcb94NKAFjGOGedvzEOQNL7rnF8MVuyjtal+Fe7HN9GuXFk2MlXixbY0sZ+VVSPyYRO5J8I8mTRIWEj8In0HvIn/Ax4Meh3hOG8YdJkkYeBeB9N5ggjwXZRU/gdW8Dbjv5BtbfV4L8ayakOG4SQKAXx/o/jJSUDiepfzrTQVvqQAIkQAKXFQEJZY4jCAkhDxOJ/fVvQKneslTmgDdkeq6k96C29AZ1mYiY/DtRlXfViEhZpk7HLGPjk1lKpHXOgpziuVgCuVXuOHr2/RJtZV/GHZdgKQm5Ncf11zYU63zMOqZ4nbqtKQocKllSP05JnHsk+UaSJ7EGiZ9YpmD6LGvi57Bi1vQphpbEJEkxEdffuxqbqwoQqHsRrg/m4qnNj0MKNKH2VZ8hMLMgO8+GBVW1eFMIhPwetMzvx9o5i7BemwSDsA+v1jYhID2OzU+VAXtfQmMHYKtfh0eLrk2mxCV/xkDskiNngSRAAiQAIOcWlC+xonv/7xGI6VnRZoyVO+ELT0ZxeRmk7oM4HDB2p4S1mWQXYbHYhHoF0ec9BhhbnZS0QPMvfgbXjoMoe/ACl5LQy/b6Y2eEyuuFdevNdGfRs68Tf32h3ZJyJdTLG+SDOLYO6mILI9jXg26pbHDL3KAKPlI/jiRfanksuV/Eg2VAdwxrbabrUIvXxtiXpDyZD2Ygf1q08zMma7wLyw0oe6wKNuxD82tHMUkJzD6FtrUvoSPBwsAWqQgLHq7EEklvfQsj+B+70ax1cZZN+j3++TkXArbVaHi0+OK32MazK8k9BmJJ4PARCZAACVw8AlNg+04N5u1+EjWb9mvB2AB8rjqsWg3Ub1iAPIsFObZHsHneW1hesxWdSjAmL++wC+tXbQHqV2Fh3mgvZjoZsx9agbtMeh112rG4bqqml05lMmYv/CbyG9dgTduteFBZSkJ/NpKjxqS5Fj9yHVWDMXmXgh/Vok6PwyAHSRjel3tCVYZjaxfq1jfCpSy1EUbwaDNWLH4d8zY/AtuQLXMj9eNI8qWYxzID8+yPIL+uFs+6jyutTeHAr9HUfBA2pV5drY5DVNiF8WHwQ0OLlBGoBTmzF+Hpu0x1VOHThPxh11G56/H2yEKFAAAgAElEQVQhNNTfqo7nCki41/5dlEVaxbRgsaRG84WsywB8e/eiEwvwSPkMWMJ/QNvzTnQogdetCHfuQmPHrahveAhFw+imN1p5Mc8ZiF1MupRNAiRAAkkIWK6/F5s6NuHO/qdgnSCP/ZoE288nY4VnK1bq3SeWG7FgUwu23/nfsFv/EllZE3CN7ee4bsUOvLxy9kX4796C7JlLsCVGr5n4tvd2bPe+jFW6XopdFmR/YR6WlEmQqr6O8lHollSZrMR1P38A18jj3vKewbHSb6G+TOsvlQfY/+fsUeoCHY6t96J+RTGO/eh21QelbhRua8GmBTem1u02Uj+OJF9KeSZCKl2Dlz2LEVr/N5ggjzu0NiC09OVIvbLklsO+5hSW5X8Cn7jvX9ATSlCZswtQtcVUR7/9e9y5vQOvrxpJHb0WRavegPBvVnamsORVoVX40Vo1ExZcibylm+BZMRk/t03SthHTPjevfw/3yjtZyPY7uiHe/C6Ksq9ATukG+MUbprqbwJYxuJ0lz9vUy5UHgBou9ds8kkBSAqw3SfHw4WVEgHV9jJwpL5Y6bxm89p+jtjTJWKoxUo/FksBICOjvE7aIjYQe85AACZAACVwEAtrK/JXbcFRfkiAcQOemZ7D2/P1YONs0S/IiaECRJHCpCTAQu9TEWR4JkAAJkEACAlNg+4efYHOhG6XykgRy1+SEMmwJfQ2vv/x4Wo7vSWDIqNxW7I9ZlkRduuRyvj8q4MaZEHZNjjOHpaO6evNqOupGnUhgNAmwro8mTcoigcwmoL9P2CKW2fWA1pMACZAACZAACYwhAQZiYwifRZMACZAACZAACWQ2AQZime1/Wk8CJEACJEACJDCGBBiIjSF8Fk0CJEACo0ZgwA271Ypy59EEC2+OWkkpClJnQGYpOwSkmIXJSCADCTAQy0Cn02QSIAESIAESIIH0IMBALD38QC1IgARIgARIgAQykAADsQx0Ok0mARK4iAT0LsKte/BvGythVdaBsqLE3oyuyMbdWrddiR1bG7Q01hq4lU2NB+BzO2EvsWrbt5TD7nTDpy9wqqh+HoEuFxoqC9U01ko07D6I/ohZYQy4a2DNKobdfSJyF9DKjZQlP5JlNUfLk2Xt8cVsuh0OdGKbvVzTR7bFCbey52JUdDjQBZduS1YhKhtew8H+c9EEPCMBEohLgIFYXCy8SQIkQAIXQiCAtodX4gU8jK6QgDjtxgpsR/GiLegyBlQd/4p9k1fDJ87B3/EIZucEcdT5XdgWv4WptV0ICYGQfx2mvvUE8u/epOUNI9i1BYuKf4J3v/YKTgsB4VuDGQf34KXIxtip6n4ex10rUVS8HVjhxmkRwml3Kbor78MTrnfUjaCPu/CtomVwT10Hv2yLOIoX8vdjsa0GruPn1YKCnWhc9CCee/dr6DgdghD78b0ZPfjFS4dTVYTpSCBjCTAQy1jX03ASIIGLSUCq+iE2PHE7JPktmz0TC75nR7X3Z9jZ+V60WOluVN7/OWRjIqS8G5E94MFP13Zi3uan8MRsSdlM2iLdju8+twnV3nrU7PQhjPfQufNn8Fbb8b0FM9VNv3X52r7Y0QKGOAsfQ+tPXEBElrwJ9nxULvlLOH/Sjp7wCXT8eAOchd/F93RbkIOZVbXYvuTfsPzH+zCAMAY6d6HRuxDf/969yMuWDc5B3oKV+H510RAK8DEJkAADMdYBEiABEhh1AhIKb/+cGoTpsrOtyC/0o7n1bQzo92KOYQx49qI5cDNuL/iMEoRFHit5gW6vH8GBt9Ha7EdhvlUNwvRESpqr9auUjuGe32BHG0yypqC01gPRWoW8oFxWF6RZ0zE15tsiG9PyZyDQvBeegRPwtLYhUJiLaUoQphetptGveCQBEohPIOajFT8J75IACZAACYwWgcChXvSH40k7j/7eHiTrXZTz+v29OJQsUTzRF3gvUDcHk2L2PLwK+cteUaWGTqD3kP8CS2B2EshcAgzEMtf3tJwESGAMCAxuXdKVmIip03ORrHdRzmu1TsesZIl0caN2lFDmOKKMVxPyeDTjr38DSj/5aUyfZR210iiIBDKNAAOxTPM47SUBErgEBAJqN6KxpKAf3m4rlpTfghzj/ci5BTnFc7FEOoL9h/8YuyirklfrQsy5BeVLrAnkf6hJsyB7Wi4KI7Ljn1hyv4gHy7Quz0iSs/A5FyIrayGc/Z9Vy9r/ewRiWvFOoqvhq1AXa52M4vIySN096DNOREAQfd5jEak8IQESiE+AgVh8LrxLAiRAAhdEIFBXix+5jqrLQAQPw7niCTTPq8F3bFMSy80pxkNPz8bu5euwqTOgBmNa3rr81diwMA8WTIHtOzWY1/wEVjgPa/KPwvWjWtQZuizVIMuP5m2/wFElQBqAz9WI9XVd0fItMzDP/gjy62rxrPu4Oksy8Gs0NR+ErX4VFubdoJa1+0nUbNqvBWOynDqsWg3Ub1iAPIsFObZHsHne61i8ojlxWdFSeUYCJGAgwEDMAIOnJEACJDA6BCTYqu/H3xx7Bnny2KprvoG3ChvQseleXJ/0rSvPSNyIju13ot9ehAlK3v8N752b4H39CRRpg+Et19+LTR0NKHzrG7hGSfMEDvxNFerLDIP1LXlY+NxPsRINuPmaCcjKegCO02X4/j89YDBxIqTSNXjZsxih9X+jlDfB2oDQ0pfx8srZymQAtaxNuLP/KVgnZCEraxJsP5+MFZ6tWFl0rSrLciMWbGrBtkI3SpWyZuKRAzdjRf29hrJ4SgIkEI9AlpA7/LWfrKwspf9fv+aRBFIhwHqTCiWmuRwIpFTX5QVdZy7Goafd2F01M3b24+UAgTaQAAmMCgH9fZL0f7NRKYlCSIAESIAESIAESIAE4hJgIBYXC2+SAAmQAAmQAAmQwMUnwK7Ji8/4si9Bb1697A2lgRlPgHU946sAAZDAqBHQ3ydsERs1pBREAiRAAiRAAiRAAsMjwEBseLyYmgRIgARIgARIgARGjQADsVFDSUEkQAIkQAIkQAIkMDwCDMSGx4upSYAESIAESIAESGDUCDAQGzWUFEQCJEACJEACJEACwyPAQGx4vJiaBEiABEiABEiABEaNAAOxUUNJQSRAAiRAAiRAAiQwPAIMxIbHi6lJgARIgARIgARIYNQIMBAbNZQURAIkQAIkQAIkQALDI8BAbHi8mJoESIAESIAESIAERo0AA7FRQ0lBJEACJEACJEACJDA8AgzEhseLqUmABEiABEiABEhg1AgwEBs1lBREAiRAAvEIDMDn3oGGykLIm/wqv9ZKNLzaAV8wHJsh4EKlnibO0Vq5EXt8A7F5eEUCJDCuCWQJIYRugb4TuH7NIwmkQoD1JhVKTHM5EBhuXQ8H9mPTPz6KlS8djm++7Qdof3kNSqWJyvOPuxows3g1/it+avWutAbtR59GaQ7/j06Gic9IIN0J6O8TfpLT3VPUjwRIYHwSCHaicdEDahBmq0aTx4+QEBDiHPwHNqNCAtDxAyz+P/ugtnF9jHff6VGDsDIHvCE5bfQ35G/DGpsEBNrQ6nlvfDKh1iRAAoMIMBAbhIQ3SIAESOBCCZyFb2cDVncEAOlxtGxfj8oiCeoLdyKk2d/Gc9vXQI7FAs174RmQuyjPwn/MqxQszZqOqaa3s+UzNyBXaTg7if6TZy5UQeYnARJIEwKmj3qaaEU1SIAESGA8Ewi+jdea9wEoQNXm1bj3erXrMWqSBTk3F+Mu+Ubgtzj4/z5UArFT755Wklx93SRcHU0MBH3Y0/gM1rYFANyKOwuuMz7lOQmQwDgmcMU41p2qkwAJkEBaEgj7D2OP0hq2FN+ce4PWEpZI1esw+ZorgPAJ9B7yK4n+a3Ux/mJ1vPQSbGu+hXm5V8Z7yHskQALjkAADsXHoNKpMAiSQzgQ+xh8Pd6JNVrEwF9Oy43U8hDFwxIM9chopF9OnTgSCfni75RavBD+2ajj+YSHm3V0EKZ7IBNl4mwRIIL0J8OOc3v6hdiRAApclgffgaW2DHHZJS+aiOMeCcH8vDik31qD9VEgZqB8ZoC93ca54DEu/xiDssqwONCqjCTAQy2j303gSIIHRJ3AFrrsxFzfJgrsP4nDgvKmI8wi4t2B9XReA+Vi58FbkIIxgXw+65ZRXT8akq9VXs0Wag5qG1bDhMJzLf4IOZVC/SRwvSYAExjUBBmLj2n1UngRIIB0JXJH/JTyqLDWxBctrtkQXYQ0H0LXt+1g05wfogARb/To8WnQtgPPo7+1RWshw+wxYI4NGLMj+wjwsKZOXrWhC7as+mJaATUfzqRMJkMAwCDAQGwYsJiUBEiCBlAhkF+PRF55R1goLvLQSZfmT1BX1J1hRvLRODcLWbMPLK2cjWxEYRJ/3mHJ2U+GNiJkTacnD/falkBBA29qX2CqWkgOYiATGDwEGYuPHV9SUBEhg3BCwIHvmEmzpeBOv1Fco64Wpqhegov5n2OXpQvuGu6KD7iMzJm/C7TM+jUiDmJLJgpziuViiLDrGxVzHTRWgoiSQIgFucZQiKCZLTEDfpiFxCj4hgcuDAOv65eFHWkEC6UBAf5+wRSwdvEEdSIAESIAESIAEMpIAA7GMdDuNJgESIAESIAESSAcCDMTSwQvUgQRIgARIgARIICMJMBDLSLfTaBIgARIgARIggXQgwEAsHbxAHUiABEiABEiABDKSAAOxjHQ7jSYBEiABEiABEkgHAgzE0sEL1IEESIAESIAESCAjCTAQy0i302gSIAESIAESIIF0IMBALB28QB1IgARIgARIgAQykgADsYx0O40mARIgARIgARJIBwIMxNLBC9SBBEiABEiABEggIwkwEMtIt9NoEiABEiABEiCBdCDAQCwdvEAdSIAESIAESIAEMpIAA7GMdDuNJgESIAESIAESSAcCDMTSwQvUgQRIgARIgARIICMJMBDLSLfTaBIgARK4hASCR+GylyMrKwtZWQvxT64fozxrIZy+s5dQiWEUZdJ3pHqGfc6LYGcYQV8rGmpehi88DJuYNG0JMBBLW9dQMRIgARK4HAichW/nOtzX/Fm09J2DEDvxvwqy09iwwfpW5V2ZRvq+h07H97C6K02D2DQiNV5UYSA2XjxFPUmABEhgXBPIwbXXXDGOLBhv+o4jtFQ1hgADsRgcvCABEiCB0SAwAJ/bCXuJVeuOK4fd6YYvqPclnYDbXoys8i1wdzZH01kr0bDHh6BRhXAAXdvsKFG69bKQVWKH021KY0wPQO0SK4bdfSL6ZMANuzULVrsbA5G7qh76vXCgC66GSlj1srIMeoffgWtZoSm/LCiMAXcNrNYauAd0+7QCwkfhLJ+B/GWvAIFnMGfSBCX/qUj5+onc3eaGM9J9aUWJ3Qm3T9V0pPbo0mOOQR/czgQ8E+gb5RUjCeFAJ7Yl0Dk2ZfQqpTwmn1srN2KPwkL215cxp64LaFuG/Amyj/+k8pd9tfVZVFrl7l/d98m5RnyXtRBb3R0GWwpR2dBqqK+a/sFONJRYYV3mwvHwSXQ1fFXpao503ZrZGuuPXFOOu7DMakVJQyeCWn3KKtmIrsjnIsopo86E4QeA4YqnJJAaAdab1Dgx1fgnkFpdPyWOOKqEJFWIxgN+ERJChPz7RGNFgYCtUXhOy3feFe3VRQKQhK26RXiVe+eEv/0Hwob5ot7zvgor1CtaqgqEVLFZHPCfkyWJ00eaRIVUIKpaehXZcamGjghHmSSk6nZxSkkQEqfa1wgJEChzCK+sgvxzql1US0Wiuv1dIU4fEPW2IlHRuE/4techf5tYY7tJ2OoPiNNCkyE9Llr6ZF30H9WWaFn6ff14RngdDwhIa0T7KVVwyOsQZXhAOLxnYmyKlB3yiwONFULSWYzEHr144/F0t3BUGHmeE/4Dm0WFJGk2yokH62sUoZ+H+lpElVRg4KX7Pcon1k4hUskjNJ/Dtka0eGXvmeVqdSfix6hvpYomceR0SIT8PaLn9EeRupKQq+5TuV5EypPrq9HvusXvC0/9fAHNJ6otMNQx9bmug5xLl1PmOKLVVb3ey77/QJz2NAqb/BlQ6pdeTuYc9fdJTOSl38wcDLR0NAiw3owGRcoYDwRSqutKcBMnUFLuS0L9UtK+kAzBiWJ/TBr9C1YPWHRCekAUDWz0J9GjFkxEvqzVa2lRhVgk6fKMcj5SAzWzPnpQostRgrWbNBu00ozBXFQBw9ngwCY2QNECuaoW0acHiEpuY8AxXHtiBGm66PZGAyX1gZnzYH0NxminRt2MTzVbtAA4np0xgbCSNV4eLTjWRcfUC3PZuv6mPFqwLyXlmjyvUVfVFghF3kfqPwiIBNNy1CUH/6a6oetvOMaXY/jnw5D2cj/V3yfsmsyo9k8aSwIkcHEJhDHg2YvmwM24veAziHnBZluRXwh0e/2xXY9GhWLSvAdPaxsCUi6mT51oSGVB9rRcFAba0Op5z3DfeHolcu/4Msrafol9PWeBcC/27TiOJUsfwpzC4/D2yZ2fqnwsmYvinCuQU7oBfv/TmN3/K7hcLrhcr8Jp/5raraiLzr4F9yy5FW07foMepRdSsxdlKC+erKca3nHgbbQ2+1F4++cgxQLDtPwZQHcP+oITh2lPjCBNH41n4a0okOLwxDGNSwrqKzp3QZo1HVNjispWdA4074XH3E2bUp4P0bPvl2jDDORPM0xoyClFrd+P1qqZsXUqmaopcTV1JUfkqXao7MNA+B3sqt2INszHysfuAF6rx3LnYUjVj+J+fSKDZSo+f9dMtK39KXZ1uuFK0H1uybsH9uoiBJxPYt1rYcx9rAo2/AKNz7txPJE6Eb0uz5OYKnR5mkirSIAESOBSETiP/t4eBJIUFzjUi/7hfOFoY6vUpR/k8T9ZmJC/DG1KGWfgcy7UxqGpz+TlIeQxO5bcL+LBsoPYsa8X4aAf3v+6E+W3zcYdD16P5ta3MRA+gd5Df4kl5bcgR5YVPAxn5edxTf4iPHfgzwAsuLa8Dh7HA1owJCt9JXLLv46q7ufh6JDHn8nBzVvIX3kvZueM7Osk3N+LQ0mB9aC3//zw7TH7QLHXb75ruPbjUO8JDMs1dXMwKTKeTuZ/VWzgapCunwZGkEfPO5xjqlyHIxPox7unPkqQ5VoUrXoZ3u234WRLLe6bk49rsmLH+iXIqNwOHHsH/R8Oh34yaePr2cg+OePLRmpLAiRAApeIwERMnZ4LKUlpg1tRkiSWH5U54A0JeRiJ6deD2tIbkFe103R/J5TlFizTcceDt6Lb+wccl1vpbsrFtOwrFf1wqBd+32+wo/tOrSVLXrLhKSzbcyda+nrxZu23sGDBAiwovR6nvMdiFLRc/yV8cwnUYE5pdbkeS+65BYb2m5j0Q11Ypk7HrKTAtBbBYdkTp1TLFEyfZY3zQL9lxazpU1JvcYKEMscRhAb5RUD4N6A0bmA6kjy6fsM7psw1FbGWG3HvUz9EldSFutpWfHDPamyuKkCg7kW8GrMWXA7yShegqrYVQpyD37MZ8/s3Yo7t2chEjrDvNdTWdUGq+iGeuseCvc870YH5qG94CEXZmRmSZKbVqVQ8piEBEiCBYROwIKd4LpZIR7D/8B9jW1fkVqluoDDfmmLQMhnF5WWQug/icOC8QZMwgl0bUTLkgqhqUIjm57HW0YbCB7+IXIumX3cznnmmGd1Kt6T8NRBEnxxwmbvtwh/g5IlzhrLl08mYvfCbyG/eiR07XkNz4ZdxR+4FrLOVcwvKl1jRvf/3CMQ0iOg6yQGkrONw7DGprFwm4dnXg25zd2A8Efq9hDprMwnLnYMXW00pj9albO4mVWZzWpEVT66uk/mYsDwzV3PG+NeW60vx2Mr5QJsLr/1ukhaYvYK1jt8YZuEa806EVHQvHq68G1JAbdUETuI/XnNpXZw2TPqdC885/wxb/To8WnStMXNGnTMQyyh301gSIIGLTiCnGA89PRu7l6/Dps6AGozJ3X4rnkBd/mpsWJiXYquLBTm2R7B53ltYXrMVnUowJi9HsAvrV20B6ldhoT4+J65RWtCFXXjpZURbe5RxaF689NLpaLcktCClbQeaOo6rOocD6Ny0ThkLFCveguwvzMOSwtfw8MM7tQAvNsXwriZj9kMrcNfuJ1Gzab8WjA3gqNOOxXVTUb9hAfKUb6rh2BNPAwtyZi/C03eZeB5txorFTcgfkqdR5hTYvlODeSadfa46rFoNg87Dz2PJLYd9zadQt34L3IrPzyPQsQPNbbdqcrXxW4roswgGPzYWYjhPlashS9LTa1H06DrU2w4q47kC0ldgf/qBaKuYEizmosTuii57EfRhb2sXUPV1lOdeifBxN55vPKgFXmF07vwZOmyr0fBocYr/nCRVcPw+NM5K0EfwG+/xnASGIsB6MxQhPr9cCKRe108Jb7tDVNskIecBykS1o11bpkKmoc18M89SHLRMgxDitFe0O6qFTZEDAalC1Ld4IktMJGcbrxxtVqBxxpssJOQXniZTOa+0iwMt1UIy6ynOib6Wx4VklhFXmcGzEGNnEyqFi9PeduGoLtN4yct6OES7snyDUegw7DFmM56bedqqhaPdK05H0gzWN/Io5iRk0hlCqqgXLR51yRI56dB2Ds6jFGH2ha1aNBnlKstLyHVLnoX7n+I9ZWkS86xJRQOTjmauiWZNpsogBogI+T2ipV5edkSu8/JvgaiobxEeZemV2LS8EgojmUOW/EcPI+VBoIZL/TaPJJCUAOtNUjx8eBkRYF3XnXkWPmcFbPu/jn/fugDXs29FB8MjCaRMQH+fjKf9JlI2jglJgARIgAQuHoFw4Ndoav4IKxtKMzIIk79AM+2HjTQXz+P8P+bisaVkEiABEri8CGiDxidYGxBa8UzGDrAePIPVPKP18ru+vCpyelnDrsn08se41EZvXh2XylNpEhgGAdb1YcBiUhIggaQE9PcJW8SSYuJDEiABEiABEiABErh4BBiIXTy2lEwCJEACJEACJEACSQkwEEuKhw9JgARIgARIgARI4OIRYCB28dhSMgmQAAmQAAmQAAkkJcBALCkePiQBEiABEiABEiCBi0eAgdjFY0vJJEACJEACJEACJJCUAAOxpHj4kARIgARIgARIgAQuHgEGYhePLSWTAAmQAAmQAAmQQFICDMSS4uFDEiABEiABEiABErh4BBiIXTy2lEwCJEACJEACJEACSQkwEEuKhw9JgARIgARIgARI4OIRYCB28dhSMgmQAAkAGIDPvQMNlYWQ95ZTfq2VaHi1A75gOJZQwIVKPU2co7VyI/b4BmLz8IoESGBcE+Cm3+PafemhvL5xaXpoQy1I4OIRGG5dDwf2Y9M/PoqVLx2Or5TtB2h/eQ1KpYnK84+7GjCzeDX+K35q9a60Bu1Hn0ZpDv+PToaJz0gg3Qno7xN+ktPdU9SPBEhgfBIIdqJx0QNqEGarRpPHj5AQEOIc/Ac2o0IC0PEDLP4/+6C2cX2Md9/pUYOwMge8ITlt9Dfkb8MamwQE2tDqeW98MqHWJEACgwgwEBuEhDdIgARI4EIJnIVvZwNWdwQA6XG0bF+PyiIJ6gt3IqTZ38Zz29dAjsUCzXvhGZC7KM/Cf8yrFCzNmo6pprez5TM3IFdpODuJ/pNnLlRB5icBEkgTAqaPeppoRTVIgARIYDwTCL6N15r3AShA1ebVuPd6tesxapIFOTcX4y75RuC3OPj/PlQCsVPvnlaSXH3dJFwdTQwEfdjT+AzWtgUA3Io7C64zPuU5CZDAOCZwxTjWnaqTAAmQQFoSCPsPY4/SGrYU35x7g9YSlkjV6zD5miuA8An0HvIrif5rdTH+YnW89BJsa76FeblXxnvIeyRAAuOQAAOxceg0qkwCJJDOBD7GHw93ok1WsTAX07LjdTyEMXDEgz1yGikX06dOBIJ+eLvlFq8EP7ZqOP5hIebdXQQpnsgE2XibBEggvQnw45ze/qF2JEAClyWB9+BpbYMcdklL5qI4x4Jwfy8OKTfWoP1USBmoHxmgL3dxrngMS7/GIOyyrA40KqMJMBDLaPfTeBIggdEncAWuuzEXN8mCuw/icOC8qYjzCLi3YH1dF4D5WLnwVuQgjGBfD7rllFdPxqSr1VezRZqDmobVsOEwnMt/gg5lUL9JHC9JgATGNQEGYuPafVSeBEggHQlckf8lPKosNbEFy2u2RBdhDQfQte37WDTnB+iABFv9OjxadC2A8+jv7VFayHD7DFgjg0YsyP7CPCwpk5etaELtqz6YloBNR/OpEwmQwDAIMBAbBiwmJQESIIGUCGQX49EXnlHWCgu8tBJl+ZPUFfUnWFG8tE4NwtZsw8srZyNbERhEn/eYcnZT4Y2ImRNpycP99qWQEEDb2pfYKpaSA5iIBMYPAQZi48dX1JQESGDcELAge+YSbOl4E6/UVyjrhamqF6Ci/mfY5elC+4a7ooPuIzMmb8LtMz6NSIOYksmCnOK5WKIsOsbFXMdNFaCiJJAiAW5xlCIoJktMQN+mIXEKPiGBy4MA6/rl4UdaQQLpQEB/n7BFLB28QR1IgARIgARIgAQykgADsYx0O40mARIgARIgARJIBwIMxNLBC9SBBEiABEiABEggIwkwEMtIt9NoEiABEiABEiCBdCDAQCwdvEAdSIAESIAESIAEMpIAA7GMdDuNJgESIAESIAESSAcCDMTSwQvUgQRIgARIgARIICMJMBDLSLfTaBIgARIgARIggXQgwEAsHbxAHUiABEiABEiABDKSAAOxjHQ7jSYBEiABEiABEkgHAgzE0sEL1IEESIAESIAESCAjCTAQy0i302gSIAESIAESIIF0IMBALB28QB1IgARIgARIgAQykgADsYx0O40mARIgARIgARJIBwIMxNLBC9SBBEiABEiABEggIwkwEMtIt9NoEiABEhhHBMJH4SzPRbnzKMKjqXbQhz0NP8I239nRlDrqsntiu/EAACAASURBVMI+J8qzimF3nxh12RQ4UgID8LlqUJKVhaws6wXVzStGqgLzkQAJkAAJkMD4JRDGQGcTKlf34Ol70tsKS14VWkVVeiuZYdqFfa9ixX2vY0ZLL9oX3IgLadW6kLwZhp3mkgAJkAAJkAAJkIBO4C8x5dpPXFAQJktiIKbz5JEESIAERpNAsBMNJVZYl7lwPHwSXQ1fRVbWQjgN3WDhQCe22cuRpXVvlNidcPsGNC20PNblcB0/r90LI9i1ESVZhVjmekfrpjuPQFcz7CVWVY61Eg17fAgabElejpxwAD63Myojy4pYXcII+txwRnTNQlaJHU53tJzwcReWWa0oaehEMPwOXMsKkVWyEV3BFDoTwwF0bbNr3TyDZRtMiZ6mlCcRmzAG3Gsxc84zCOAVLMu/Cla7GwMDbthlG+w/RkNlocJTuS+XGvTB7Uyio5a3fOsedBpssVZuxJ6IT+PIySqH3emGLwmn2K7JE3Dbi5FVvgXuzuR+j8LSz8x+HOznAXcNrFkLsdXdYaibhahsaDXpaGI7pB0yc1m23JUX57fcCZ9SVcZSR52T+fNg9NFZ+JwLMSF/GdrQhbo51yHLWgP3QAr1XBdvPgrDDwDDFU9JIDUCrDepcWKq8U8g9br+vvDUzxfAfFHveV+E+lpElQQhVbeLUxoG9V6BqGjcJ/wh+eYpccRRJSTpcdHSd05NdfqAqLdJQqpqEX1yGvO1OCf6Wh4XEspEdcsRcVqExOkjTaJCKhBVLb1CzjJ0OSFx2tMobFKVcBzRtAv1ifY1ZQJlDuGNlFskKhzd4rSi2Tnhb/+BsOEB4fCe0Sx6V7RXFwko9z5QZUIStvoDWh4tmfkQ6hUtVQVCqtgsDvhluwfbIEJHhKPsJlHmOKLYJFLJMySbkDjVvkZIRhtOtYtqCQI6i9AfhbfnlBCnu4WjwqjjOeE/sFlUSAb79LwRXyjwVY62RuE5LYNU64VU0SSOKNdChPxtYo3NYJuZjyzG6xBlKBLV7e8KIXTOkrBVtwivIkf3h1rf4oiI4RqpcyG/ONBYISStnsrsVSYQsK0RLV61Pug6Rn2p1TupQjQe8Ks+0RnpdTW+Eqa7Zr2jvh87HfXPYdS2kH+faKwoEIj40ewTk1kpXurvk5jIS7+ZogwmIwGFAOsNK0KmEEi1rqtfnFADqI/UQEMNUExBix7oRACqX7LRgE0LkiAHVgfFATm4MwZqSoAixQR4kS9qRbb2pZ20nDPC63ggGnRFdImeqPYYg67oM+NZfLuTBweDgiFFoBYQSGtE+6mQiA3E9GDBrE+8PMnYxJGjBVNR/rIyulxDgGzUUQ/kkuXV05gDSiO8JOdxAzGdjZ5PKV+KBqv6/chRq1uDAiVjHdGZ6EGfntmYRv6fQQ5Y45Sl3Dfn1WWYj4agKxLgp4GOig3Rf2QiWptsjvVJJNWwTvT3CbsmzU2EvCYBEiCBCyEQfge7ajeiDfOx8rE7gNfqsdx5GFL1o7g/70pV8sDbaG3ugjRrOqbGvIWzMS1/BgLNe+FRujosyC56CA31N8J53624bTVQ//rTWHD9REVOuOc32NEGFOZbkR3ReQpKaz0QrVXIC6ZSzhWwfv5vYWt7Ho5dv4bb1WHqggIs1gLcZduHtY430Ol+w9B9GilUObHk3QN7dRECziex7rUw5j5WBRt+gcbn3Tget+fmPXha2xCQcjF9qmqTKtGC7Gm5KAy0odXzXmwhSC3PkGxiuJuKiLnUyiu8FQVSHB1xDN4+Y0ewMbNmh57GMhWfv2sm2tb+FLs63XAZunaNuUZ0nm1FfiHQ7fXHdEtHZCl1zo/C2z8HKcZ2tc6huwd9CbtHjWk+xoBnL5oDVsyaPiV2fJOigx/NrW9D72CPlG8+CXrw4rfX47+XNuLZpQVq/R1zHcOabTfj9oLPxLEtCV+zfcO4jnHHMPIxKQmQAAmQQFIC/Xj31EdJUwTq5mBSzHiZq5C/7BVTnmvxhW9UoUoCYJuDkvwc0/OhL5OXIwd7T+B1bwNuO/kG1t9XgvxrJsSOAcuejVWvd2D7be+jZf3DmJM/CVlDjgmK6hU49g76P4wbiamJAs9gzqQJMWOH1DE4URmDzkaSZ5CQFG6ET6D3kD9JQj8O9Z5IcVmNa1G06mV4t9+Gky21uG9OPq4ZNB4vSVEX8Cjc34tDgSQCAj3o7dfHIiZJF3mkjY8y1t8JN2NZW7JCtMzyGMInlqHxf3wfL9TMiQSGY6/jefT39iCZBYFDvehPUpUjeIZxwkBsGLCYlARIgASGJGC5Efc+9UNUSV2oq23FB/esxuaqAgTqXsSrhoH6gIQyxxGEhJCHiMT++jegNEd7PcstbOuehPOvbLB567HqRU/8Fo+EiqVSjgXZeTYsqKrFm0Ig5PegZX4/1s5ZhPX62lXZeShd8C3UvumHCPnhabkL/WvnwLa+I9L6Efa9htq6LkhVP8RT91iw93knOjAf9Q0PoSg7yddNmQPekImBwsSD2tIp8S0bSZ74kpLftUzB9FnWJGnitAwlSQ3kIK90AapqWyHEOfg9mzG/fyPm2J69sAHfScsELFOnY5YczCf6GdQqmSihfv8BOLxnYuutVo/9taVI/O/CSXQ1Po77dt+JzRu+gZmGejH2Ok7E1Om5SIppUCu2zmPkxySfjJELZU4SIAESyGQClutL8djK+UCbC6/9bpIWmL2CtY7fqEFLzi0oX2JF9/7fIxDz37U2UzIyg+w8ju+SuzZvRP2Pd2D75gXwrn4KL3adVPBacr+IB8vM3SXqrC5lhmb/Z1MsJ9ZbFqkICx6uxBIpQWuPRULRgqWoXFKEaAvBSfzHay6tS9aGSb9z4Tnnn2GrX4dHi66NLSByNRnF5WWQug/icMDYGqPPDo2dZapmSy3PkGxiguKIQnFOkpTX14NuzED+tGjHcBwBSW5NhFR0Lx6uvBvSsFukkoiN9yhhnQuiz3sMKMzFNENQFE+Ees+CnOK5WCIdwf7Df4xtCVRmCidbePc8jrvW4m5TF3ukrDHXMZltfni7zcMAIppf2IlxZJk+cMx4j+ckMBQB1puhCPH55UJgWHU9ZoajNiBeH7StTKiTZ1LGzpr0tqwRtsgMNn3Go2FmnjZbMDp7S591VibWtPepsyS1WXj6DLd4syZjy9F0M8ySk2dwKmm0iQHqwGR9ZqbszZA47W0R1bYi0+xMXVdtcLdhllnCOhBvBqQi+6bojEvzIPdU8ogU2CizEeVB/x+ID05/IELKgOzY2a2K3vqMwEEzO3V79QHsg/PGDOrW7IjOdpRnwh4RLdVl0ZmxcUDFyNBnTZoH68eduGEUZhgcb56pG6lziQbra3UkUma8WZOqHdG6aSxbPo+Wr8/oNacwponMmtRnE18SHWWNBs+a1GfNGm2L9clgS1K5o79POGsyFVpMk5SAXpmSJuJDErgMCIxuXZeDmXbhqC4Tslz5V6qoFy0ebTmAQUGXClANrAwBgBxweF4S1TZJk1MmqpsOaEtiyHmGKEdJ4heelnpRIS/dEE8XpYwWUS9P4deeQ6oQ9S0eQzkX4ODTXtHuqBa2RLLNgZhc1FB5FHWGYKMv0yGXK88sfU9dviJ21qRml7k8W7VwtHujS3MkCOLMX9ghv0e01MtLRuisC0RFfYvwKEt3xGcYK0MLciNBkZZnyEBMTmeuC/ISGA7Rri1TIT9XZ7GaZz6aAzFZ1inhbXcY6t1Qdmh6R+zW7deOEXvGUkedv9m2MlHtaNeWClHTxPpEzze8o/xZkn+y5D96m5q8yJrhUr/NIwkkJcB6kxQPH15GBFjXLyNn0hQSGGMC+vuEY8TG2BEsngRIgARIgARIIHMJcNPvzPU9LScBEiCBMSUgtwjwJ5YAe6VieWTCFQOxTPAybSQBEiCBNCTAoCMNnUKVLjkBdk1ecuQskARIgARIgARIgARUAgzEWBNIgARIgARIgARIYIwIMBAbI/AslgRIgARIgARIgAQYiLEOkAAJkMBlRCDsc6I8qxh2fWuisbZtwA271Ypy59HYVdgvWK8B+Pb8GDXbRlvuBSs2igLCGHDXwJoVb4eBUSwm3UWFj8JZboXV7o5spzVSldXPR3rxZCA2Um8yHwmQAAmkIQFLXhVaRZI9GtNQ5xGpNOCBo/JZdIVGlJuZSCBtCDAQSxtXUBESIAESIAESIIFMI8BALNM8TntJgAQuMoEwgj43nPZyyOtkKb8ldjjdPgQNJYcDndgWSWNFid0Jt29AS6F3Sf09GlwuNFQWarLKYd/WicCAD3saKmFV5BeicuP+yObh8bomY8sqRGVDK3xBw27jQR/cTjtKEumrdy9u3YPObdF01sqN2BPRWVb9PAJdBn2tlWjYfRD9Ebt1u8xdpyfgthcjy1oD94CulyyrGfYSq2q7LGuPxlDWZ+Yc1AUCaFt2MyZE8pnZJ+JaDvvWZ1Fplf1j1iWirHqibGRthXWZC8fD2qbsMV2FJptlhjH+1m1eiK3uDoPP4/ghHECXq0HTKwvWykbsPnjcpFC8SxOrrHLYne6oj2Ns0PNrtliXw3Vc23BdLn9I/xp8Yi5HFm2uS4PSmH1k5qXrF+fYfxC7I/Ve5mOuf2bZZv/HkQkg9vMRL88AfG5ntC5mxUsTX3ZKd407I+n7Hhnv8ZwEhiLAejMUIT6/XAikVNeVzb6LRIWjW9uHUN98Wt5c+oyCIt5G3EccVULSNtmO7vkHgchm3LocCHmfx8YD8p6UgzdSNu+BF9mbsrpF3StP38C6qkX0heQ9G7uFo6JASJENrc8J/4HNokIy7Gep7aMIGDb+1vdpjGzsHRKnPY3CZkyjbWgNSKLMcUTRN/5ehub9E7VNpSOyBtspFJ10uTLWaJrIhtEhvzjQKO/rOF/Ue95X0qjly/t6Nokjp0Mi5O8RPadlEPF+3hee+vkCWn6VpXFjb83miD9kGbqfBpcZ9aUQIdPm7EJoZUX8Le+5KG+sLu8hGq07g7WMtwG35lPdxzIbxTcF2ibt5msZTa9oqSow1Dd98+vHRUvfOcWuvpbHhWS0Va87kXJUG3S2sq66nar/5fp2QNTbkn8+Btmo7aM5ZP070iQqpAKR2P9CqJ+PKM9UPosKO6lKOI6cUlXT6768P2miqjPIiME39PcJN/0ezIZ3hklAr0zDzMbkJDDuCKRS180v+sFGakHHoJe4el/dcDrB5suDgg/5m+6IcJRJQt+oOjYQi7dZsy5b/jL6QN3kORIA6toa05wRatBjDEDkdKY0wqi/LkfeG1reSFsPmPQ85k2lTYGYySZVmolbjFw5hVZ+JCjQdTDmS1S+njb2qLKEkGSZH2mBSkxQpJVZ3S60r2hVgKL/TakFn3o9UOwxc9H1jQYOsRqa+RqeDpKnBXqyr4/8StTbJNUuLZCIrTeaHCNj47mhGNW/mt4xdhsTRc+H/nxE00bO4tYHc1CViv/j51E2fI8JqIx+1T5Dup8iSl34if4+YddkSu2GTEQCJEACqRGwWAtwl20f1jreQKf7DUN3o5Z/4G20NndBmjUdU2PewNmYlj8Dgea98ES651IrM2GqcC/27dgHFOZiWrZemAU5pRvgFztRlfchPK1tCBTeigJpokGMBdnTclGIY/D2GTtUDUlgSqPY5UdhvhXZxmTZVuQXXm28M+R5uOc32NEGk6wpKK31QLRWIU83xShJL//2z0GKea5yRXcP+ozdsca88c7D72BX7Ua0YT5WPnYH8Fo9ljsPQ6p+FPfnXanlUHXy1xaj3/1zuFwuuFxbYZ9TimVtH8aTarhn1OtjDHj2ojkwA/nTjPR0xoZsMadhLZ8Vs6ZPQazZMnc/mlvf1mYaXouiR9ehPt+F+27+ElZjNV7fdC+uVzKdRc++X6INpvJzSlHr96O1Kg9BRb8hyrFMxefvmom2tT/Frk43XKbueFn1IT8fMfalcqHV0ZH4P6XP4hWwfv5vYWt7Ho5dv4bb1RHt8k1FvRTSxPgthfRMQgIkQAIkkIxA9myser0D2297Hy3rH8ac/EnIGjROBgjUzcEkfUyWcrwK+cteMUk2fTGanl7wZfgEeg/5k4jx41DviZSWnQj39+JQIImoi/xoyPIDPejt18ZCDUuXfrx76qMEOcIIHt2GSusk5M95HgdOyuPbPo3yF1xwlAHdXn/MuMAEQpSxdf29PRg5vi7UzbkuOiZRrk8TbsayNpPE7Fn4xooFkCDBNv925EeC88SaxT4ZqpxrUbTqZXi334aTLbW4b04+rjGPp0rx8xFb7tBXF+L/5J9FC7KLnsDr3gbcdvINrL+vBPnXTDCNAxxav2QpGIglo8NnJEACJDASAtl5KF3wLdS+6YcI+eFpuQv9a+fAtr5Da52QUOY4gpAQ8vCQ2F//BpTmXKJXs2UKps+yJrEwTgtIgtSWqdMxS0rw8BLcHrJ8KRfTpxpb/YZQynIj7n3qh6iSulBX24oP7lmNzVUFCNS9iFd9Z9XMYR92PrEGe+a1oC/Uitqq+7FgwddQav0Q3m5TEJS0uImYOj0XI8f3ABzeM7H1SKtX/tpS5Ghlh4+/gXXLXfgr21/Bu/opvNh1MqlWgx+mUk4O8koXoKq2FUKcg9+zGfP7N2KO7dnoRIwhPx+DSx7qzsj9n8pn0YLsPBsWVNXiTSEQ8nvQMr8fa+cswvpRWK/vEn3ah0LI5yRAAiRwmRKwSChasBSVS4oQONSL/uxbUL7Eiu79v4/MdFQt12axlTvh0ycOXigSy3Tc8eAdMHfLqTMr5UVW/4QvlJdB6j6IwwFja1EYwb4edJu7qpLpk6PZZW4FCvrh7da76YbqalMLsOR+EQ8OalE6C59zIbJiZiwaFNLLH8Q1iD7vMVP3rCFfklPL9aV4bOV8oM2F1343SQvMXsFax2/UgFqxDSg0dYeGT5/EiSRyBz+yIKd4LpZI5q5g3Q+Dc6h39HxHsP/wH2NbLpWZkrnRhXTlrtZ1T8KZvxo//vl2bK56B6tX/RRdSnftlci948soM3dFawupZpU3of8Lsn4plBOj6kRIRffi4cq7ISVqkTR/PkZa90fi/4R5kn8WLVIRFjxciSVS6i3GMVhMFwzETEB4SQIkQAIXQkANcsphdx3VuqXkKfW/QmsnUPXIHORapsD2nRrM2/0kajbpy04MwOeqw6rVQP2GBfHHQI1IqSuRO+9bWJO/E+ufbVcDv/BxdDTtQJttNTYsnIlPzl6Ep+96C8trtqJTCcbk7rZmrFjchPz6VVgYGQ81lAKaXc1PYIXzsGp78ChcP6pFnaFxSA2y/Gje9gscVYIA2fZGrK/rihZgmYF59keQX1eLZ93HlQAjHPg1mpoPwqbrZBx79mEQwfBkzH5oBe4ycT3qtGNx3dQRctXGVdkOovF5NwLSV2B/+oFoq5j2Rd7WvAMdWiAbDuzHppon4TTYHDUsyVnOHfjO5v+J5sV2OI/Ky5jI9WYXfrS+KXmXpZLvTuxevg6bOgNqMCZzX/99rMbj2LAwDxacx/Fd8hi3G1Hf8BCKcv5KDSq99Vj1okfxlSW3HPY1n0Ld+i1wK7acR6BjB5rbblXZfVLWb4hylMAtFyV2V3QcVdCHva1dQNXXUZ57JYb+fCRhlPTRSPyfymdR+wegpAauyFItA/Dt3YtOLMAj5TNix+Yl1THBQ+O4f30Ev/Eez0lgKAKsN0MR4vPLhUBqdf2c8HtaRH1FgZDTK79Shahv8Qh/ZGaWvDRBu3BUl0XSSBX1osUjL0kh/ySYLRdv5pppRlm82W8h/wHRFClLErbql4THLy9JoP2c9op2R7Ww6fraqoWj3astv6HPzDPPmtRnoBln+sl2/dJge5mofuVfRH2ZPoNQLi9OmqY3Rfs/PSAgrRHtp3RIMseXtOUbZI5lorrpgIGhvkyE/EyfVWjmKtvqEO1efU6jztWosw5hZMdYtvKyGPXilfZfiZbqIm0ma6Iy481oPSW8bY2iQtLqjW2NeKXlGVEWsS+RjqeEt91hYFUgKupbIj6OLGFSfyDqU6EvEaIvsyG7xi88TbH1oClSJ+Wyk5cjpwj5PaKlXl4yRLMBsbooy3sM+fkw2Wmq4/rTwXV9KP/rdVavL4rGQ3wWNS4t9VG/QPVz9POqazS8o/4+yZKz6TGavPCg4VK/zSMJJCXAepMUDx9eRgRY1y8jZ9IUEhhjAvr7hF2TY+wIFk8CJEACJEACJJC5BBiIZa7vaTkJkAAJkAAJkMAYE2AgNsYOYPEkQAIkQAIkQAKZS4CBWOb6npaTAAmQAAmQAAmMMQEGYmPsABZPAiRAAiRAAiSQuQQYiGWu72k5CZAACZAACZDAGBNgIDbGDmDxJEACJEACmUvgvffew5kzZzIXAC2/8AVhyZAESIAESMBAQNsWxmp3a/tKGp6l9ekAfHt+jJptR7WtcrQVxa010T0C01r/8afcL//lORQX3IJn/r83x5/y1HjUCFwxapIoiARIgARIALDMRFWrH1XjjcWAB47KZ3Ho6bLxpvm40/fMmVPYuO5hNP2zF/fX1OKpRV8ZdzZQ4dEjwEBs9FhSEgmQAAmQAAkkJXDmzB/xnUX3Yl/HJ/D1LRsYhCWllRkPOUYsM/xMK0mABC4VgZiuyTAG3DWwZi3EVncHttnLIW9rkpVViMqG1ujGyAl0Cwe64GqohFXJI+crh93pjuYbcMNutaJ86x50brOjREtnrdyIPZENimXh8gbSbjgj5VtRYnfCraeR5cycg7pAAG3LbsaEmO7I4zi4uxGVVrn8LGRZK9Gwx6dtaK4pHg6gy1B+VokdTrchjaZnif3HaKgsVOTE7bpV0mnlRGzWrxfC6TurFhj0we2M2puovKG5AOFAp8EvJi4yueMuLLNaUdLQiWD4HbiWFSKrZCO6lA3LEzguwW05CFux4C607PoIMx8uZxCWgFOm3WYglmkep70kQAJjQOAVPLy+Ddcse0XZzzfkb8T1v3gcj7zoiQ1ojJoFO9G46BH8fMLD6AoJLd8qTGh+2JQvgLaHG9ByzUN4XQiIUB+2X/9LlD3i0IKFMIJHm/G47Qm8NXUd/LKsUBdqp76FxfmL0NB1EsgpRe3RdlRLEsocRxDyb0Bpjvb1ENiDXxycge/5QhDiHPzbZ+AXZSvxopxP/pGDk2+V4W73/0Ct/xyECOH0C5/DW4vvwxOud7TxZnLCADqaf4fJa/ZDhP6IjoeLkaNKiP6V9fCrtsr7Hsu/IX8b1thugq1+FRbmXQkED8P5+H1Y/JZe3jn4a/8H3lpsw91ysBSRNhQXNcj6VtEyuHUu4iheyN+PxbYauI6fVyRZrv8SvrnEio7VDdjZcx3KHquCraMeq5L5TtNBHoQvD8ZXf87jqRXfxMFffoAZi0rRUrtau89DxhMw7hWu7wRuvMdzEhiKAOvNUIT4/HIhkFJdDx0RjjJJSNXt4pQIiVPta4SEIlHd/q4Bw7uivbpIoMwhvCHD7ciplk9aI9pPGROcEV7HA9F8p9pFtQStLD2zXuYDwuE9I4RQy5KqWkSfUZR2P6KDIksSZY4jQk2mlWXWQbHvJi2duSyTDnreuHrqaZMcT3cLR0WBkCqaxJHTslY6l8dFS985Q0aTHnHLM6Ux2x+RpvFS/KfeDHkdogwQCsOPekVLVYEA5ot6z/uRXOaTrj0viDv/6hqR87f/Sxx+913xkx9+QxRjirjBtlj86cMPzcl5nYEE9PcJW8QyPhQnABIggUtPIBvT8mcA3T3oi9vFZUFO6Qb4/U9jdv+v4HK54HK9Cqf9a8hf9soQ6lqQPS0XhTgGb18QGHgbrc1+FN7+OUgxb/yhdEhWzIfo9voRxHvwtLYhIOVi+tSJhgyaDoE2tHr0FiHD45ROT6LrxX/Esv++H9uf/QZmZsvKa+UV3ooCKU55us1x5cfj0gVp1nRMjcMl0LwXnoGwIsmSdw/s1UUIOJ/EutfCmCu3iuEXaHzejeNqElOJYfzhv/345NVXYOC3/45F31iEN/95Nzx//VVs2vg9XHfVVab0vMxkAjHVL5NB0HYSIAESSCsCchdc5edxTf4iPHfgzwAsuLa8Dh7HA0kCuMEWhPt7cSgw+H7kTqAHvf1qN1zk3nBPAs9gzqQJ2vg3dUzXhPxlaBuunEj68zjuWou7Gz8DxwvfRakedIVPoPeQP5Jq8Ikfh3pPGLpDB6cw3wnUzcGkmPFoV6UQ7KpSAsfeQf+H8SIxC75W9QPMW/hl/C1+h7f37sG/HL0Bc0tn4u9nzTSrwOsMJ8BZkxleAWg+CZBAOhI4C9/Op7Bsz51o6WvEguv11p8TcNuPAchNWWnL1OmYJQGHEuUY1JqVKGGS+2UOeHdXIS/Rv/YDSfIOehRGsGsLFt/3Fua1vIGlMw0jySxTMH2WNYkxVsyaPgUWJAvWjAXKY+Lc2F01M+mimmHfa6it64JU1YKn7rFg7yNOdGA+6hseQpHSUmeUqZ9bsOR/P4l//2UHfvvbAK4pKsSLz3xHf8gjCUQIJPrYRBLwhARIgARI4FITCKLPewwwd8GFP8DJE+eGp0zOLShfYkX3/t8jENN4o5eRi2kJg4mhipqM4vIySN0HcThgbFWTg6mNKMkyzHQcSpT2PHx8F564ux6od2DTghtNAVKS8vp60I0ZyJ+WnVpJCbmcRFfDV5FV7oRP4XUS//GaC22Yj5WP2TDpdy485/wzbPXr8GjRtUnLuuoTn0V+cREKbQ/g1f/7fdz0CXZJJgWWoQ8ZiGWo42k2CZBAOhPQAo62HWjqOK52tYUD6Ny0Dsudh4ep+GTMfmgF7tr9JGo27deCsQEcddqxuG4q6jcsUFuysq3IL7xalf1hEHGHrg0q2YIc2yPYPO8tLK/Zik4lGJOXytiF9au2APpMx0H5EtwIHkZTzZPYPW8ztq+cjcEhlQU5sxfh6btM5R1txorFTcgfVnlTYPtODeaZuPhcdVi1GhEu4KuyeAAAIABJREFU4eNuPN94UAu8wujc+TN02Faj4dHiOPqZ7bLg8dqdOPCv21DGLkkzHF5rBBiIsSqQAAmQQNoRkAOcFXi9aRZ+O2caJshjmKb9I351QyV2tVRDGpa+FmTPXIItHZtwZ/9TsE6Qx3DNxLe9t2O792Ws0lt1LDMwz74E5+V1xD5RhZ092ppdQ5VluRELNrVg+53/Dbv1L5GVNQHX2H6O61bswMtxg6lEAsMY6HwZa186jIDzPkxT9NTXEJOPxbC7TwDZBajaYirv27/Hnds78PqqeMFbovIAy/X3YlMMl0mw/XwyVni2YqXGxXL9Ajj8frypyJ6C0loPxJvfTdIlGVveVVddBfmXPySQiECWPGNUfygv1me41G/zSAJJCbDeJMXDh5cRAdb1y8iZNIUExpiA/j5hi9gYO4LFkwAJkAAJkAAJZC4BBmKZ63taTgIkQAIkQAIkMMYEGIiNsQNYPAmQAAmQAAmQQOYSYCCWub6n5SRAAiRAAiRAAmNMgIHYGDuAxZMACZAACZAACWQuAQZimet7Wk4CJEACJEACJDDGBBiIjbEDWDwJkAAJkAAJkEDmEmAglrm+p+UkQAIkQAIkQAJjTICB2Bg7gMWTAAmQAAmQAAlkLgEGYpnre1pOAiRAAiRAAiQwxgQYiI2xA1g8CZAACZAACZBA5hK4wmy6vPcRf0hguARYb4ZLjOnHKwHW9fHqOepNAulJYFAgxk2/09NR6ayVvnFpOutI3UhgNAiwro8GRcogARKQCej/1LFrkvWBBEiABEiABEiABMaIAAOxMQLPYkmABEiABEiABEhgUNdkykjCfXA/14RfnwzFZsnJx9/N/RK+WGjFlbFPgPD76PEchGf/b+Ed0PLJ6W8vxheKc/FJY1g4nLRKOR/j/Z5D+A/Pfvzae1ItOZkuZt14fekJDLhhn7kYh552Y3fVTBjdf+mVOQufswL5O74M7+4q5I2FMuGjcM77KnY8+EYa8BiGBxS9S7F21nYcrS1FzjCyDk46AN+eJjT5y/B05VjXicHa8Q4JkAAJjDaBEQdi4X4fuk8C1/7dMqwonaZ9iYZx1v829vzrdrzQ+/f49t2fjQZj4T/hQJMTe8JfwINL/xFf/6RctBw8dWFfx6vYcrgE3156Gz4lfwEOJ61MJPxndL+6Ha7jn8HfzX0A9q/LQaCsy79j144mvHBkPpbe//nYQG+0SVIeCZDAhRMY8MBR+SwOPV124bIogQRIgATGAYER/t8fxtk/n8BpfAqFMz9taMmw4ErrLMz/SjEsB/fiN/7zEQTh/sP4tz9Mwhe/UoLPKkGY/OgKfDL3Nsz/ymxc84eD+F2/mn44aYEP0POLl+E6/ll889sLURppiZN1uQ0LH/yfsBz5FfYd+yCiC09IgARIYPwQCGPAXQNr1kI4fWfHj9oj1TTow56GH2Gbbqvc4lpuhdXuxsBIZaaa71KWZdZJKTsX5c6jCJufxbu+ZLqegNterAwslweXq7/WlPUM+5woL3fC9/Fo+dH8eZB7MxYiy1oD90AicuY88YCO3b0RBmJB/Nd/9iI04VO47trBjWqWqXkovPZ9dB/9k6lCfYwPPvxokLWWybeiwv4ISq0TDc9SSRvG2Z638PpB4Na770TulYPNUXU5hd95juFDg3SeXmoC5xHocqGhslD9IFsr0bD7IPo1NcLHXVhmLYbdfcKkmPoSiL6EZTnNsJdYtRdCOexON3zBRB9AvYAAulwNqLRGXyQldifcPvOr/U84vGdjJJ21ciP2xKQZgM/tNJRvxWA55jRmHbUXW4kdWxsqYZVfbvJL5JRmw3uHsUe/n1WIyobWWPuCPriddpREXopm+SaEEQRdcEXkyhyGyhd9eW1178FG3Xdyvm2dCJiR9x/EboP8wezCCPrccNrLIy/zGHZKV/Uc1AUCaFt2MyZEXqxD5INRzw5si8iPwy4+Gt5NGwJhDHQ2oXL17xAZ9GKZiapWP/wX3O2dgpGXsqwU1Ema5JLpOgWltR6I0BE4yiSgzAFvyI/WlIaThBHs68VfPPhF5F5xsfx4JfKqdkL4N6A0Z3AM8P+zdzZwUV133v8xWGMsorWacgdNrLKOSSQxQu22unEEM8S1Jj5YzdaAGFg1iRK2PgKFGJtEY8pLSU20SZpnpirGjRrmMbHZyCgEutpUOuOaSCozpT6kxRlSXSMw9W2dOc/n3rl3uDPMK0IYnP98Pnzmvpz/2/ece/nPOeeeG5BhhJzsm9fOLpz/4jpik+7GlJH+VDjR/bcvIf1+UyRMxz9O/DtOHmpE61WvO/iIMfiGLIkKvawdfzI2o2vMvUiZ/HXfSBUTkFawERv/JRkjfZegowNOwAm7aQeWp76J848eQDdjYJYSTD55BLttLuOKxAfxeDZQ/fZvcU7ePLo+RW01kJ1xH+JxHef065Gy6CgSykxw8Hq6fw5VYwHUBQc95TxiugRT1Soseu92rDVdA79EC3P8Ac/F7kP6Gi1M8iTOUIJ1e4eL5TrR8Oh5bFUtR6WJn3fIx6HFmqzjUL3e4qkn/11YBL+70KL7MdRZjW4fHdZNSGgsgGrRNk9bDf+BY2MLYWHXYG1Yg1mj+WvpMgyFL2Bv7GqYHHx8B/Do+SqZ7CWY3liPrMZ78Hq3Q/DBYd2A2OrVyN9v8frhI4Ngb0LV8jV4T9LLGCS5NW8YYZcV7b15AKuz9gBrDXAwB7rNa4Cdy7G8qslDzrb7CE5OLoFF4NuOPYmHoXHzdcLeUo216gI0JmyClY/NYUJZQiOyJL7xaShrqUMRx0GjPQOHcGNFcDm3wwewerMBo/IOiFyqkPjBWgSPz62ANogAEehXAhdhrP0bMudMko2c9auBW0MZk30A/v4V/OM4V8d+8fxm9ou6vzKHr+KOv7K6X2xmm//9U/Z3+fkr59ip999im5/fzKr+/ffs3BWf0i6JUMoKdl7y74fcNm0PGIHg7eY8qytKYVxRHeuUe9FZx4o4jmm0Z5iDOVi3sYqpsZRpzVfEUg7WWVfCOK6E1XU6GPMoL1MkHE9hRXXnZQdlm37OO8xapnHbu8LM2qUM3FpW035NJiz3XSyj0TKzv6Yr2JrOcmvaPK8ND99dOiHFJVlznGFaDce43BrWLtcv918oM0VkJgkG+/bi6C4eLB5RDt7xeOmT/PaqX0++Ikfv2JjIQmLqwYl3NBQ5yU/vNuCl2x133zeCt3Xmbqfqom2sYsV0xstIbd9hPcF2FmmEYwDH1EVaVmf2uCoYc1iZsaaCreDgkl1Rwd6pWME4d1vl/XewbnMd0/rV9SUzViz0as/SNeZdnxIPiaOGFf3qZdF+D9NQfHdYjaxG8NXlO6BhRdo6Zu6WN+hrzGrczYrUnIsDt4JVGMysm0n2JVmRm6/21W1mddoipoZYVl3EtHW8DvEjtaNfGdiJnT3luBVVzODNW5Lhvz1sSf4sZb+q+0hWb9PZiorDYkz+riFRVn6NB/NZfm3Lt+X+SdcDf62F7aukqJOZDVUe7euAwLKnrqWSHt+iPUjXKvsLq1kxRWzLPXXGt/cpFUb2P7wwXw8Lxfulh7+i5mBM+GJBrwfp3i3+nwhJxmU/lDYtejogX9L9xF93VoAs09/8MJnI1S/xt25g1B3f6Jmsz58eocT9i/4VG4tzMf/bTrQcfA0vvLAN75xod/ecubWEUlawI+8+cUvTRiQREHq1rEhWKREn9ytOCVWy1E+pQNwDC5CtOYl9x9rEnh3+15QByJ6P1Higy3gU1TYlZkwa5/nrStBjRXXtp77nkPA9LVYjymZdRL1eDz3/pytGuioPBrk//HbyTEzn5EPkcZigmgxb9VEYu4ZBef/3oDb8EtqD/4l6fYPnkCE/RCb4eDdmT/+WDx+B02arRy+St3lgJJJn3wNOfmXK41Mk4P6HpsGw8dc42FQPfb0liD7eggLxaVthtW7BrI7fuuLXvwtd8aNQ5R3o7UKvI97xKBA3IQnJNgNqjRd7lfY8cBbmdjsgtQHv2ODii9OtaJf3TEpK+ionyAfRLdkYkG8bGqo/wdiS42COL9CwOhVx5/RYlZKHeqlHkLXgddVxZKlLoT8nzad19d6mvnYRjzZ0gjEHLM9OxskPjkDsPHb1zAbrXcQYpDy5CRUqPdZt+o2rt9huxBsbKmDOfQEvLr7Ls316MDCg+hiHEosDDus+rJ41FvzUgaC+h9TrKvZqp+4B8uvRzfew1qfhdM4SFOj/iri0LWipKwGHpdCar/gejrQ3Q7d2CbIa70SZle/hvgZr2Z1ozFJjUaW8l9YGw+pK1Ix6Aod89tJ6BB1gJ1BP6wgkzXkYGsNhHGuVxn94VfJ7lwII2WfRDcUkzHlsJgz7fodW+b84jxECXy4H8pUvz/MvhTqnGXPrxfZVMh6HNpajwZe6gMcmInNXq2tkgOcr+2vdkIJhwv2wAZ9lfh9J8vuZpDMkJqFcD5JC6Ts0mZDatKRygL994QliMvD8MF7Yeek8vnB4T+SXqR2hRPJ3v4e0f1mLdQ9/A62H/y+OtPqZTB+07HB8a3x8gJuKzC5tDgoBZ0cbTvX8F/Hvg2IyMtY8jNMbd6OBn3Qp3HQSsH7ZTNmSCCaUp48X5xiJ871i70aeIZABfrgwD8pRKqS/dgLC4iZjFuB146+ggZgo+PdKdkaBuJQCHDJX4ruXfoPNS+ZBNSoWMfOKoRMSouvoaGuV/cOUiYqbtlNt6JDfWHsXCXJkDFI27IV5z3dxqaYMS9JVGBXja56alxr+ppdzP0apluO1E/8tJGdjMsph1C6F3yTIS0XvXStOtV3wPxwqEwjaBmytaBMf1pGJoa9ych2Dtc1lP44fTosHFHdg6pTraHh1K3TJP8azBbPFRDse03LLsCf791j36jHXj4iuk9hf1YGi59Yjcyq/EIgCcVMX49nnVoJzB3IRTb9+DUcWvICtki4Fh1k//jn2FHWgsFTvGiaPS8WTlYVQ6X6KTQf/C01vvIhCcya2v/gDJAa886cgO2chpsUpoOCmYErcxRB85+d2HUSVWYOcvO+5f0gouH/CyuyZaDjSDCvf7p1nUfumHigqxrOZ0xDHxzdtIXKyb4PuzTrPpMMdr3yDt7MXG4/MxfatqzBL+NE0HNysp/DanpUwF1ZivzTJHwDntsOj5JA6PwVcw8f4RPYgmVy77+0UWX3wah7A/Flj3DEpkr6PxzQnUf3+pz0/ijwSpvB8dvkgJXh6vP9f4nJM0g89aJCROta3qwjsK7qO4dV1jViwfRNW8m1T4J+N1/bwyW9/f/hk9CTu9f7hLJgJkUlI14OX3yHJXAihTXvpHcDdgJejT7tB54f9HWdNn6F74kzcn8D3LHTh9Dvl2PLOaR+T5Yfhm99Jw/fHdOPsX77km1kYZfketm/gjlE38MX5Lj//DG7gv0/sxpZt9a6bgM+A6OBAE1AkTMKMkK7y4Uicn4ls8D0tF1y9S8mZeOSBMTIXXb+U5b++pG1/k3mdlndRkNeEBTVtcHxUhtzMTGRmPghl5//DaZnm0Db5f4xqZOaW4SNhnpURNQs7sDF9OTbXdyFhUlLAGxo3YxISwr/qvFyLx9S0TOSW1bp6A4zbsbDjFaSrf+bnqaGrsOx/EXlH5qKmvQ0fla1CJs8gLRGd5rNeusPZ9dE76Uc8aBvgkjBJuF94KuirnKeWCNgT/jGb0Lv+5T2uN8Qe1clQTZD3HYs9kFIYgi5r757TXr2L/A+HJ1BZcRd0S2biu4VAxaEtyEyU9/hKSgN8h+Q7Qup1dbb+DvsM8OodFyeD14ayfp+rp8nWq+daYhToh1UoZQJwcJ/y6mkVf0Caqw6iSXhq7zrOHdWjWvU4ls3iE6a++axISsea3M9Rtf+kK0l3/hVH3zZAtX4xZoU8KV3uq9S+/PRwu+Prpw3nBbR9NtNP0hgKk67QrgcPd6VRiVCuoWDX4039YvbwKthO2P8SpPXDeg07CpbEpxg/GY2HHk1xrQmGEfjmHaPg+OI8LvmKSxheHCb2aoVTlk/m78C05G/g0ief4qz3AwD8j68vP0Pd7+y4f+F3oQw70mDo6HzIBOLvQ0a2svewnN0K82mvZ1njZ2LZ+gRUv/0O9n3QiGT+aRuh7hSIT52PbO4Mjjd/4Zl425tQOc/fY9/8UzutOA3vm88NdF/yfmISPnqH7Gg3nwUnDI/2bkQKLgWZq3OQzfG9QxcR59dHPlbvf0C+CF72w0kpPrDgLTMcXMpirM5ZBM5PrxLgiqHXsKvz77h04Zq3Qh/73v/cRKZcoF/mXmqkNnD8j15PW0q+JWFCXG++6Kucl/lI2bWVp2O0+2lXvkf3dtnwcPAeVT6O8HoJx+CBH+Uil/8hpE7HPFXfl9sN7Dtcw2/93uvqVXP8P/dTVq+D8t3Qe2nlUje3Lf8BeVHs9TuM5OwFeIBv0331WTER8x9fBAjTIpxwttbhTd1kZD9yn+cUj5tzfsCk+aRbf68aqb6SxpCYnIM1yAhDb+dDu4YkuaBtWio4wN8+7nyBLAaaH3YZ1k8OY8/+Dty/8of47jelZS2GI+GB7+Nu5++xb/9v0frlDdEAv+DqKRza+wFalXPx0L38DSKcsrya4VB+/5/xT6M+xTt7DuMTq/RP/TKsp+uxf2ctuu5fiIeS/DxRGShUOtePBMZB/UwpFlQXIF/X7Oq+t7dA/1IZynuNKI7BA49kIllXgNVViXhM/rRN/Bw8s30uPly3CduabK5kjNez+TkUYi22LpvqY4haSuCOoXrnf4pJwHXYmt5C6bodvYcRbTux+aWD4twvfkizGFnV/4jtz8xBPMT1auaVQu9e0qILlqNH0YRMrMmYDEV8Kp7YMsvLx2bo8gtQrir046Mnalt5GV7St4icXLLVC0rxjHocIK41NK9Y3zM/zW7B0VoTkPsvyEjq9T4LAGORmqEBZ9iHnQ3nXNycNjRt24R1umZP4z73TCjfXCXG7Hr6MT/rEBZsXwO1r5usTx1jMeuJfDz04U9Ruu24WA8i3/IEVGzNdL3NQD5v8LIddmeIcj5tRtpB8WlQ2VwaqTfX9ej9iKA9qnxEYfUSOj/HwU0/he7baqjNFdgQ9AlZf8yC+X59gHpdvfxRjMOkGUqvg/Ld0Htp5VI3vS38YIAwT/WS0Os3s+fe1WefxXuXMEJwDq3HDsOgeRhzfF7jNx1BPyu4itZjTbhXeNrdh+qQmCRCGWSEobfm4SFdQy65YG06zPSotzMhHwnTkjg/DH/Df771Ml544YWevy17Ybp8J/55/UqkTZAmYLv8UHzjfvxw5TLMvsOKQ6++JMpsRtm+Fnz9vh9irbSiPn+TCaOsoH3EXUjLWoFH73XgD7oKUfer+I+223DvY+vwr2l3eT4wEDIaKtifBBSJi7GtoRLJjT/CKL5HYFQBTnwnFxUaz7bC23R1yU8Het10hiMxcysa9sxFR3EKYgU9S/He+DUw7l2LFF89KrzC+Dn4t0NlmPVxDpSxfC9ECn7y23HIOXgARd5DpppnkJ/2OV6aGouYmNFIa5yOXQ1bxeGcEZi6chuM+WPxnnq0OE9tNNTvjUX+oWexWBjy4ef9vOLl4/+Gee42mA8V+PfRDXskNBWrkHb2ZUwV4vsRGpMr0bBtsWtej2IaVu7ch/zx70HNz0+TMTi0xd/cHwXi1fk4tHMGPk6f4OI24Sf47cQcHKwpCjiU6nJLg6Lsu3H2pdmIiYnFqLR6JO+qwbbMQBO+3QGJG/xcoGzsaNiGuR0vivUwDU+ZZ2OPeS82pIjDz4rJWFCcjev8OmJfz8X+1uuhyXmbi7R9vz17l2Cq/AFi+AUvndKPBj89kFJMfnV59y5ex7mDFVinuwsVr+7Dnu2ZMBe+iDeEpVgkZSF8+7Un912y7fWwi1evq2s+lfdDK+IPnJAWrBV/VJw+iWab9IADH4PU8+09JBVCfP1SxOUXqvX4P/pDXgnTTfgsJXgfvA39vpPQuEcI+uJ0iO2rL6q9ZZxtOKa/w8+wJF84FCbx4ihIkOvBw3aIMYbUpj0UD+yO/JlM6VFK+THaJgLBCPR7uxEec07pvQREMEfofD8T6Hl8v2dJkX42McTUhdTWhaUTepaskEJ0tNewXG46W1F1jFmF1Rw6mbmmhKmxkFUYvxSLXWPtNWsZx+Uy7Rl+WQt+mYoacakHaWkXB+s+s5Ot8NJ1RpvLOJkulz2OqStOuJZ1cLSxmtzpDOoqZvRYTsLtoWu5GPRexiC471Jb0bCSunbX0i0OKztRxS+7AdazVMs1Zq17nqnRU85hNbAS9RS3nz3Lnvyd/b3778zhvexB92mmXTGdcSu2sxNWfqkZiYcsVn91ICxZ0zs+iYDv5Su8y/tYLoFX0H2CVQhLckhL8ri1MhaKz0Kc3kvTSEuO8MtDSPUv6vXgIvEP5qvYvtQlrEZYxkPevrxlZf7zm6K9nuUrvM7Ld+XLVkjHPfzleYVQjyyU68G7PkKRYSx4m5YcH7hv6X4SZo/YwCaFpJ0I8I9X2xr2ofr643haM9HHUCMxIgJDk4CrV1jeIyj2phrfwnqpRxBir++u6WhM43tdYzFqjRHfyX8GPW/fDKF3URqSVBWi8slU15wixV1Y/OILyO3DEGVw30PtdR0OLq0Ee41ZcGz+jtA7G6ushGPlXuxdP0vwU5GUgeKSTuSpvo6vL3mn95OUcdORu6MGe+b+BcXK21yMnvoj5u5pwKENLh2D0kLi7sMj2XMATpymIHeizz5Ly/pw4PxOPZAbCrYttq/S8WKvfiymvvQ50jzal7cO8U0g0tPphjyoYgO94oifMB9g2QpJfUhMQrkeJIXSd2gywdu0pG/gv2P4XE8yww9zyHalw/RNBAIS6K92w7+TbAG/tpe6BDVv/kR8fD+gaTo5oAT4VwdtxLT0Vmwx70buVF/zzwbUgYhT3l9tPeICI4eimoBw71W3orhly5B9TdBQrEDpfkKJ2FCsvQjzWWpMEeYWuUME+p0AtfV+R0oKv0oCwvtcC9Cx5d+xI3e60APptB3Htp8U4P3kXw5uj+JXySFCbEn3ExqajJAKITeIABEgAkSACAwoAeHBpRd6HpqKiUFsyq/gePRN99DwgNon5T4JUI+YTyx0MBwCUlYfjgyVJQJDkQC19aFYa+QzEYhMAtL9hHrEIrN+yCsiQASIABEgAkQgCghQIhYFlUwhigT4+RHKQE/7iOsZKUv9vCrIF0nxiaKwZHzp8T7mhN1Si8rSva73Bnqfpn0iQASIABG4JQhIy9/fEsFQEETg5giMwNTc/WC54WgR35NXFo5MKGUvokn7LApPPY1HQilOZYgAESACRGBIEqAesSFZbeQ0ESACRIAIEAEicCsQoETsVqjFIROD+EoU5Troz12F3fQK5sV4DhU6bSboK3Og5F/dI/xloFhX3/NeRWl48a0jaNpVjHliOWXOKzjifv8jD+Q6bCY9KnOSXXqUOaj88CQ6ArLyGpoMyZbvoUmnrQm7ijPEGJSYV6xDvYd//FtZbDD5jIHX+TDSy02AsHhiKorrLwDogqVeh+J5ysB6vWLsP6ZeimmXCBABIkAEbpoAJWI3jZAUhEbACbvp19hQeBLq9Sug4b6A4Zc6NHArUfxD8WXd9iZULV+D92JXw+RgwuLCDusGxFavxhqPlxXbYFhdiZpRT+AQ/wJlRzv2JB6GZo0WJrvT9d450w4sT30T5x89gG6+jKUEk08ewe5eLxkP5n0wW73lnef0WJWSh/qETbAKcbTgddVxZKlLoT8nvh/P+Tn0qzRI3RmLfHMnGOtE/dxm5Ahl4pFWdhh1RSmARguzw4iytLGwm7RYk3UcqtdbBDbM8Qc8F7sP6fnv+p9H1m9Me8dJR4gAESACRODmCVAidvMMSUMoBJwW7C+tQAOXifwf3YNO4WXE/w3NlhVQx/PN0ImupoOoMmuQk/c9cGLLVHD/hJXZM9FwpBlWPscSP1xRMZ7NnCa+uoVD6vwUcA0f4xMrn+hcRNP+t2GWl4mbhsxni3u/5FtSGOA7sC1vwQtoeHUrdMk/xrMFs8U4+BeBl2FP9u+x7tVj6OKjba3Dm7rbUPTcevENAvGY9sPHkQ093qw9C1moooHrsH7yMRqSZ2PO1HjXMUUi0rbWgtXmYqrPK7k/mXrHSftEgAgQASLQHwRosn5/UCQdQQhcx7mD27HRAKgrVmA+DPjxuh2wcSXYI/WGQYH4tK2wWvmnBX8L/dGLQnJ26cRbyCs3AJqHA9hQIG5CEpJhgLndDiR8itpqK5K3KF2JmiQZp4QqeSROSft9+vayNdVLSRdv2wQuexISPJKjOExQTYZt41EYn/1HTDh2GAZMxmMT4noUxKehzGoV9/mhSPlnOJT3fw/qvF9Ce/AfkAEHJmgexNQ4DyNyAaA/mdLrjbzY0i4RIAJEoH8IBLqL948F0kIE3ARsMJ+3++jtEQvYm6HLuR+jVMvx2on/FhKJMRnlMGqXAqdb0S4MO7qV+d1wdrThVNhDkH7V9emErTwdo93z3Pj5brdDlXegT7pcQgrEpRTgkLkS3730G2xeMg+qUbGImVcMXb0Fdn+a+4mpP/V0nAgQASJABG6OACViN8ePpEMiMByJiwuxPXc6bOVvQP/3+Xhx+1pwtp0oe9ciJmZXYdn/IvKOzEVNexs+KluFzMxMZKYlotN8NiQrUiFFwiTM4KS9wfjmoNGegYOfm+b9Z916Ey/VVSBuqhqZuWX4iDE4rEbULOzAxvTl2CxM5veOtf+YemumfSJABIgAEegfApSI9Q9H0hKMgGIiNE/nQo1jqH6/BaOFxOybMGzcjYYufkaUHe18wpU8E9O54T3anH/HpQvXevZD2Yq/DxnZSpw2Wz17iuxWmE9fDkVD38tIto//ETaPiV7iE6MZOlicI5A052FocNY1lCpZc7ZAl6FEjFBGOuj/W8GlIHN1DrI5K061XfD17ar9AAAgAElEQVTR09iPTP27QWeIABEgAkTgJghQInYT8Eg0HAL80NoTqKyYiYaq3TDYOCwu/jE07l6xsUjN0IAz7MPOhnOupMJpQ9O2TVinaw7HEIBxUD9TigXVBcjXNbuSMXsL9C+VoXzAhyxF2x/+FKXbjovJWBcs+nJsKAQqtmYKE+sVSRkoLvkmyjfvQL2Nf8DgOmwN+1BtmCmWcc0pcwV+FXa7HRbdMsTMK4XevQxGFyxHj6IJmViTMRm9L+b+ZBpmFVBxIkAEiAARCIlA73t3SGJUiAj0hcAYpGz4DZh1OzITh0MxNRe1zIra3GlQ8BPL1fk4tHMGPk6fgFh+ftWEn+C3E3NwsKYI4Y40KhIXY1tDJZIbf4RRvK5RBTjxnVxUaEb2xfGwZFy2t2Fux4tQxvLzw0ZD/d5Y5BvfwvqUMS5d/BOPW3bCuPIyNitvQ0zMbVBuvoyV7jIjkLRgFUqub4QqdjKW7G9H0sptMOaPxXvq0eI6YqLeQ89icaKsF9Htbf8ydauljTAJ8Ou/7etZ045vj/y6du829KyPJ2m06ZHjMbdQWk/P9d17vTxJkL6JABEYqgRiGD+JRfxIbwKX9umbCIRCILrbjbj46qmnYf7Q3zISoVCkMkOBQLht3Wk7jm0/eRLrd/vp1VU/j7q9JUgTh+NvmCoxLbUQfw4EgytBXcuWm5hrGEg5nSMCROCrIiDdT6hH7KsiTnZuaQLcDO/lKm7pcCm4UAgIi+kudSVh6iLsNFrFBziuwXpiO1bw3bwNzyPrF6615YAbOP95qysJExby9XzYw2E1oETNATYDao388i70IQJE4FYgQInYrVCLFMMgEHCiq74UypjxSK++H1ueSIW4zOog+EImI48A/8RqJQobbAC3FjV7NiMnhRPn8Q0HN+spvLanRBhyt1UfhVF4YOUqrGfNQii+EnvFtyYiSRiBvoSOS1ciL2TyiAgQgT4RoESsT9hIiAiIC9Dyy1NYtcidRmkYtQkZAfuneL/6GIDpyN1e6GMOnwLxd6fiIV7E9jFO/ol/mvcqOs93C0pGjh8Nj9mMdguOVL2MjQb+aZOZmDt9vMwYbRIBIjCUCdDK+kO59sh3IkAEIpKA09qMI0Jv2Eo8Pn+ijyda5W6Px9hRwwDnBbSdcr1Z4c+FqfhaobyMtM1BXbIKC5JGSAfomwgQgSFOgBKxIV6B5D4RIAKRRuAGvmhugoF3KzkJE3y+hsqJrjNGHOHLcEmYlDAcENa5C7C+iroI2n9bhgWLUtzvYo20yMkfIkAEwidAQ5PhMyMJIkAEiMBNErgIY60BfNrFZc9HarwC7ldz8U9FdjqEtzK4J+jzQ5z5T2Plo5SE3SR4EicCEUeAErGIqxJyiAgQgb4QaG9v74vYAMgMw/i7kjCF13z6JJqFBXvlZq7DVr8Dm8tNABZi/bKZiIcT9vZWnOaLjRyL0SNdt2YFl47SykKo0QzdujfFt1DIddE2ESACQ50AJWJDvQZvIf+dFh0yYpZBZ7naj1E5YbfUorJ0LywerxzqRxMhqHLFlopin++E9KegP3yXnu70XBiUX7/G88/lm38/+UVJ9dAVZ8jkMlCs+w1MvRINf/EMzPErVzpRsnYpJk6cCONfIiMZG6Z6EE8KS03swLrSHTgivQ3BaYNp13NYnv48GsBBXbEJTwqL/F5HR1ur0EOG2ZOhdE8aUSDugQXI1vDLVsjfzTowLEkrESACg0CAX9BV+gB8bzh9iEB4BPqr3TjMWqbBUqY1XwnPgYClz7O6ohQGjZaZHQELRuDJgfDdwTrrShiHFFZUdz60mB3trK5Ew8CtYBUGM+sWpRxWI6upWME4aFhJXTsbDLx//dzEHv3HqWx0QhJrbPk8tHhuolTobd3Bus/sZCs48Atm+/jjmLrEwKxuaGJdA2xKhZH9j4ePUp2BgSthdZ1uIY9StEMEiMDQIiDdT6hHbBCSXzJJBIYOgUswVa1B+s5/QM0f3sKGh6YiTnReeOn4hm04VPE1vJz1Mg6e49+Z+dV92s0NyF+6BEcu3omjJz7Cg6o7vzrjQS0pEDctGzsaPsKBihWyV3RNx4qKt3HQaELd1od6Jt27n5icgtmT74C7Q0ywo0B86nxk8wvA0mKuQclTASIw5AjI80cpO5Mfo20iEIxAqO3GYT3BdhZpxN4BjqmLtKzO3OlW76tHLJiMIOywMuPOIqYWex64FVXMIOjt6WVw9UrwvUBfiD1CGlb0q5fFHgupd8jBus11TOvXR6lnYin7Vd1HslimsxUVh5m5239PhSu2HjuuXqlAenz5LvZgdZtZnbYnXqiLmLaup6fKDdTnhhSD5ItnIU8/GWOddayI45hGe8Z/j5dQBowrqmM9templ99ztNewXI5j6ooTrNvRxmpypzOoq5gxALfeWlxH/tpylD187ziGb/8z0//XGX/F+v14qG293w2TQiJABG45AtL9hHrEhlzqPDQddp7TY1VKHuoTNsHq4F/d0oLXVceRpS6F3k9PSkgyzs+hX6VB6s5Y5Js7wVgn6uc2I0fQG4+0ssOoK0oBhFfGGFGWNk4EaED1MQ4lFgcc1n1YPWsM7C3VWKsuQKPko8OEsoRGZKmWo9J0SQb+AFZvNmBU3gHxybYqJH6wFmveMMIuKxV8M5Cecb59tzdDt3YJshrvRJn1Ghi7BmvZnWjMUmNRZVOY9oN56ESX8SiqbUrMmDTO/1pY8fchIzsFPSvE+9arSHwQj2cr0VBYif2t46F5OhfqhgpsCIEbPxH/yhXXavLtfzFiw8p/xWHrd/BSVRH+14xpvg3SUSJABIjAECBAidgQqKSh7+IFNLy6FbrkH+PZgtnicEw8puWWYU/277HuVelde/JIQ5NxttbhTd1tKHpuPTKn8qvbx2PaDx9HNvR4s/Ys/M/PT0F2zkJMi1NAwU3BlLhLaPr1aziy4AVslXxUcJj1459jT1EHCkv1ssn+KTJ7gIJ7APNnjUHDkWZY/RuUByduh6vHia6mvdh4ZC62b12FWcKLoqXX5ayEmU9w+vVBB2kC+WSoJkgDkj7CkA7ZWtHWcRV2ix7F85TipP4MFOtbxARxHNR5T0ODA9hYdhid92ciP/ebaCh8EW94JLqSQv77Ol79SSYemvg9/NO//hR/v9KBl9dkYd/vJ2HxqnkoXTxXXpi2iQARIAJDjgAlYkOuyoagw12forbahN7vz4vDBNVk3z0pIclcRuuxwzDAK1GIT0OZ1Yra3Gn+e3G8MQr2rEiefU/PvB2hjMtHnG5Fu91flhVKGW+DvvaD6RHXnkqeielCEibpUCBuQhKScRbm9vD65CQN/fbtbMX+/K24kP8xHMyBbuPDaFqyyZ0gKqY+guKiFNh0P8Wm952Yz/eK4QNU/bIe53zivYq2v17EN9AO04d/QtbKH8F0+CK+/fDd+NXz6/rNbVJEBIgAERgsApSIDRb5KLRrK0/HaI9lE26HKu9AQBJ9kQmo0M9J92Kafs5D6O35aiej93LFPaG71xnxgBWn2i4E6AX0J+fv+HAkTEoCF2qCx68Qr5yO3FojtJl3QQEF4u5/EAunnMfF7hv+jAjHbWc/R8dlX5lYPF76P+/gH9STgS8P4uD+Bpz4xj/h+Zeewfjbbw+ok04SASJABIYCAUrEhkIt3RI+ctBoz8DBvyTb+8+6FWnxvppiX2T6BkuRMAkz+KfS/H2k19D4O/9VHFeMw6QZygCWgszlCiDp+5T0tF6QBE/qvRRXiJfrcp79BEcmPoJ5KtcrrJ2W91FWbgKX+wJefESBo7/UoQELUVH5BFJ8vgoIuP32BKwqyMPCb/Ka70bKginImknzwuScaZsIEIGhS8DXf7+hGw15HpkEhMncSpw+/kfYPDo9LsFU+QPEZOhk86/EEEKSGYGkOQ9D491j42yBLkPpW68/Qn7t2dFuPhvgnYH+FA7E8bFIzdCA67Vau7Qqu9cQbX+4ED8Ty9bPhGHjdj/LU1yC6VdVKMdabH9mDvhZeu6PvQlV+Z9izZ61YpJ1Cf/1vh4GfjX5p9UY/Yker+n+W7aoqVuy18acxasR9w8pePiJh/F/X/tJ6EPOvTTRASJABIhAZBGgRCyy6uMW9WYc1M+UYsGHP0XptuNiMtYFi74cGwqBiq2ZmNqrJYYmo0jKQHHJN1G+eQfqhRXer8PWsA/VhpmiXnHelUD2Kux2f0NkYzHriXw85OVji64YWeUJfnwc6Ory9t2J+FnLseWhRqwrfQtNQrxO4WnP/KydUFVswLKpI/rZqTFIWf8m6lb+CUu+swqVRyzuJzOdNhP0lQVYVPg/KNlTgsWJw922nbbjeKVgL8ZuexGZ4nHnuXr8suqkmHg50bT/bTSoC1H5ZKp7bTK3gl4b41B54CA+1FVh4tixvc7SASJABIjAUCXQ69/fUA2E/I5sAorExdjWsA1zO16EMpZ/vc5oqN8bi3zjW1gvvOKlt/8hySgSkbZlJ4wrL2Oz8jbExNwG5ebLWOnWOwJJC1ah5PpGqGInY8n+Vjh6mwL4+UzCApxyH6fhKfNs7DHvxQY/PvpU1W8He/vujJuO3B012DP3LygW4o3FqKf+iLl7GnBow6wQEpo+OMcz3noI1kNLMfZoPkaJ8/xilaU4MXYpDlkPYWtaothLxb9H8QWkLz+K+7eUI3daTx+ZIjETWqsVHwl+8stzGME++rHfIUlvTydMmOB9iPaJABEgAkOeQAy/QpoUBf/uOdmudJi+iUBAAtRuAuKJrpNd9Sielo5ymzxsNSqMh7AhJYQlMORiEbhNbT0CK4VcIgJDlIB0P6FEbIhWYCS5LTWmSPKJfCECA0GA2vpAUCWdRCA6CUj3ExqajM76p6iJABEgAkSACBCBCCBAiVgEVAK5QASIABEgAkSACEQnAUrEorPeKWoiQASIABEgAkQgAghQIhYBlUAuEAEiQASIABEgAtFJgBKx6Kx3ipoIEAEiQASIABGIAAKUiEVAJZALRIAIEAEiQASIQHQSoEQsOuudoiYCRGBACFxAfXEq+MfSe/6UyNC1hPky9quw6B4X5G5YdMiISUVx/YWb9Fj0TXqlmPgqMGVxPbr8avaS8VvuKzrRF59Dkukn//l19JRB6ttuwZHKl7DLcvUmjDrRVV8KpUc7iwnvtW69rPe0OSecsFtqUVm6t/fr5+RyXmyd/dZWpfiWQSdw4n1bhhhlKeq7PN6TJ/PGW0Z2KsI3h0W4f+QeESACRGAIERDfGPByC3QL0pCHLTB/mOvjFV7BQuLfcToKj+VNwrCp01DLcoMJhH9eMQ25tVYMgObwfQlVoi8+90UmVH/CLudEV9NO5BS2YssjYQvLBBSIT9sKK9sEi24FVHmA1rwbuTf1irOeNqfARTRpn0XhqacR0E1vtlNzB6atYgSm5u7HQFwGMqiDtkk9YoOGngwTASJABPwQ6PoUtZ/Nwpyk/n53qB97dJgIUJsbtDZAidigoSfDRIAIRCUBmx453kNKwv48VJrsAJzoMjbgs8zvI0kB9B7u4YeN6qErzhCHP5WYV6xDvcVzgNH1UvYccfgqGTmV7+Nkx7Ue5F7DSvyJoDKC9HXYTNUonqcU7WegWFcPi93fkJFksguWep1/OXsTKucpoczT45xb1SWYKn+AGOU66M9dB/ris4eMr6FjaRhZPqQYSox8GT0qc5JdHJQ5qPzwJDqkcHt980NnGzEt/WXYcAB5qtvRMywchE0vXeEe+Cv0OUmy4XIp5hgkVZpww6PN8YweRnq5CTDkQRXLD4v/0TXkPq8Yb1WKbYofJvzyj9BlKN1x9G6rAOwW1OuKMU9q8/OKoau3gG/p7o/TBpO+EjlKl1/KnCp8ePKc+zTgY2gyqIxL3Glrwq4g14rM0KBsUiI2KNjJKBEgAlFLgMvELsaE9/ry7/bt+ftIfB/nRRhr/4bMOZPEF6nLSTlhb6nGWnUBGhM2wepgYA4TyhIakaVajkrTJVdhexOqlj+G184/ioZuBxg7jmcnt+KD3c1yZZ7bIclcxzn9eqQsOoqEMhMcvP/dP4eqsQDqgoOyBMpTNdCFFt2Poc5qdMs5rJuQ0FgA1aJtMPFJXFwqnqwshEr3U2w6+DmEeUqmX2ND4efI3V6IxYnDvZUCIfksFxOHjuXcHe2oK9EA6kJsXTYVCoQSoxN20w4sT30T5x89gG5en6UEk08ewW6P96zKbfPDiVvQUlcCDkuhNV+BtSwN8aGwkavp0/ZEZO5qlbW1nnbXuiEFwyBvczyjw6grSgE0WpgdRpSl3eGy2vAfODa2EBZ2DdaGNZg1OkgKYW+Gbu0SZDXeiTLrNTBeruxONGapsaiySUzGLsFUtQqpr13Eow2dYMwBy7OTcfKDI/CLEqHJOM/psSolD/XStcJa8LrqOLLUpa7Evk8sB0CIf+m39AH4eqIPEQiPALWb8HhR6aFLIOS27jjDtBqOQaNlZkeY8XbWsaIpJayu0yXoMGuZBimsqO48Y+w8qytKYVxuDWv30Os67rLnYJ11JYzjenS4PJCXYYyJPnJFdayThSjD+8ZxTKM9wzzMC8clH33EK5yfznJr2nzIyfV9yYwVCxm4tazmzG9ZhZrzjLUvPnvIePvWyc5ocxnH5TLtmU7XyZBiFOtBYCfT6U/WXUTkjKVMa74isxcKG7cS2cYVZtYuZZDrY9eYte55pgYYwDF1UQ0zd3vUlkxe3OT9lrU5qZ31tF+x7Xi3KS+2nm1ValNrWU37NZlNLwYCM++241WGiXFK9kOS8Wrvbg/81J37/Fe3Id1PgqSzA5D5kUoiQASIABHwS8DZ0YbPlsxHaryP2zM/j6faiuTZ94DzOB2HCarJwOlWtNsvwFhrgC05CRPi5IXEMj4t8z0iwWT4IdOjqLYpMWPSOM/eujglVMlWVNd+6uMJTEnubsye/i0fcsBps1XsHRmDlCc3oUKlx5K7H0QhCnFo22IkysNw+x+Kz+7CPjb4Xi0tnsprx8o9L2LltHhxWDiEGKV6UCkRJ9cscBgpPxJkOxw2QVRJp7uO4RdZf8BC45dgjo+Rf2Er8vdbAj61G7DNSXrD/pbqZyamc/LeTAXiJiQhGWdhbu8S29RkqCbISUplfBmVmAWREerIBG7GJCR4tB/XdWCrPgqj3ycwfdkduGP01OTAsSXNRIAIEIEwCVxF67Em3JvxCPi0wPvD/8M85X+8BrC1os16Djhl9RYNvO+8gLaQZUwoTx+Pch8auRk+DuI6OtpaAwwzAbZTbehwAkLuGTcDP8rPRFWDHqqFs6HySCZl+sPyWSYnbjrPHUTBIh3u1P47StMSPRNEBI7REaweepvzcyRMNn60eByOT0OZNc11yN6OSzdGYcKY2z2KeO4EbnOeZcPYC1o/VpxqOwcrAreN3haDM5PL2MrTMdpnYy2RFxvUbY88cVA9IeNEgAgQgWgn4GzDMf0dyEgd65OEImESZnA+T7kOckmYpEzEpBnKAIV8nFKMC0PGNb+pZ25bz3wj15wnb/3DkTApCQHdlvVaOM/9BpvW6fFt9bdhLnwRb0jz3rzVhuWzlzA/tyxrHT5c8AK2rpzu2aslFA0c4zeC1YOXOf+74bHxr6f3mRumSiSNSkbeX9R4/HucV6IpKx+kzclKhrcZtH74ntVEKIO0jd5GgzPrkeGg0Z5xzWWUzwvkt61bkear17lH+CvbokTsK0NNhogAESACgQk4W38H/b1q38OSvGj8fcjIVuL08T/C5n6ykD/BrwF1FhCGI8chNUMDThimlBcSy/h0YWwIMgrEp85HNncGx5u/8BzqEp54TPKzcG0gOSvMp4FkaYjP+TkObvopdKpCvPreHmzP/RyFG37tmszfy+9QfO4lBDg/h74gz8+wZyBf+ac6xRilenAPqYp27Hw8l30Y9XcokD0vNv5U+Dk+LGUDWtk1tOefR9bKPX4XZg3a5vzoD35Yqp+TaLZdlxV3wt7eitPghxbjxTbFD1PKn6OUysjE3JsSsyAyUh31ulbEJ3GlhY3degdvgxKxwWNPlokAESACMgL8P582QEpKZGd6Nsdi1hP5eOjDn6J023ExGeOfSCxGVnkCKrZmYqpCgXj1GmxfcAhZ+dVoEZaV6IJFX4XN/JIEPj8hysTPwTPb5+LDdZuwrcnmSsbsLdBvfg6FWCs+dejDQHwqntgyy0uuGbr8ApSrZE8rHqzAOt1dqKh8Ainx38biF19ArrkCG94wei53IJgI0WcPd7rQsvNFrPtwLmr2rEWKr2HPkGIcB/UzpVhQXYB8XbPLN57DS2UoDzR0DPncJycu2y/DGRIbjyDC2BmOxO+l4SFDE5q/uOFDzl+bk88nvAq73ZesD3UehxSIn7UcWx5qxLrSt9AkJGOup37zs3ZCVbEBy/gFaAXe/4jqrGLoWvglWPjlWQ7ipc07/Q9nhyQj1pHXtWLRl2NDIcRrxcPhQduhRGzQ0JNhIkAEbj0C4jpVsXcjz2AT12GSr08VKGL5EgL+yikQNy0bOxq2YW7Hi1DG8usuTcNT5tnYY96LDSljXIKKu5C5rQa7kuuRNipWKLPmxN3Ir1jsTzEQksxwJGZuRcOeuegoTkEsvzbUqKV4b/waGPf6SWwEi/GYlvuKl9z/hnnuNpgPFQgJkTQkqarYhCfFOBSJP8CL2zP9D1GG5LMs5C4jfr1RB5ttB5ZMuK3Xulqudb1Ci1GRuBjbGiqR3PgjjBI4FODEd3JRoQk8WV+RlIHikk7kqb6Ory95B63O4GxkEYib0ut8bocq7wAgrksWk6FDS4sOGdK6a/xSHB/X44hmFqZ/y9eUcH9tbgSSFqxCyfWNUMVOxpL9Zjh6OxH8SNx05O6owZ65f0Gxkucdi1FP/RFz9zTg0IZZ4pCwyHvXdDSmjXaVWWPEd/KfgcavhdBkXHUkv1ZGQ/3eWOQb38J66Vrxa+OrOxHDP6gpmePfjSbblQ7TNxEISIDaTUA8dPIWIkBt/RaqzFs2FL7382dYs+RlNADgVmzHwZ+twiyPJxdv2eCHVGDS/YQSsSFVbZHprNSYItM78ooI9B8Bauv9x5I0EYFoJyDdT2hoMtpbAsVPBIgAESACRIAIDBoBSsQGDT0ZJgJEgAgQASJABKKdACVi0d4CKH4iQASIABEgAkRg0AhQIjZo6MkwESACRIAIEAEiEO0EKBGL9hZA8RMBIkAEiAARIAKDRoASsUFDT4aJABEgAkSACBCBaCdAiVi0twCKnwgQASJABIgAERg0ApSIDRp6MkwEiAARIAJEgAhEOwFKxKK9BVD8RIAIEAEiQASIwKARoERs0NCTYSJABIgAESACRCDaCVAiFu0tgOInAkSACBABIkAEBo0AJWKDhp4MEwEiQASIABEgAtFOgBKxaG8BFD8RIAJEgAgQASIwaAQoERs09GSYCBABIkAEiAARiHYClIhFewug+IkAERhgAl2w1O9DZU4yYmJiXH/KHFS+2wCL3elp26ZHjlTGx7cy5xUcsXR5ytAeESACQ5pADGOMSRHwNwnZrnSYvolAQALUbgLioZO3EIFw27rTdhzbfvIk1u9u9k1B/Tzq9pYgjRsunL9hqsS01EL82Xdp11GuBHUtW5AWT7+jA2Gic0Qg0glI9xO6kiO9psg/IkAEhiYBexOqli91JWHqIuw0WuFgDIxdg/XEdqzgADQ8j6xfHIOrj+sGzn/e6krCNFqYHXzZnj+H1YASNQfYDKg1XhyaTMhrIkAEehGgRKwXEjpABIgAEbhZAldh2V+JwgYbwK1FzZ7NyEnh4LrhDgc36ym8tqcEfC5mqz4KYxc/RHkV1rNmwTA3YxISvO7Oim9NRJLQcXYJHZeu3KyDJE8EiECEEPC61CPEK3KDCBABIjCUCdg/xfvVxwBMR+72QixOdA099oSkQPzdqXiIP2D7GCf/dFlIxDrPdwtFRo4fjZE9hQG7BUeqXsZGgw3ATMydPl5+lraJABEYwgSGDWHfyXUiQASIQEQScFqbcUToDVuJx+dPFHvC/Lk6HmNHDQOcF9B2yioU+nNhKr5W6Ks8B3XJKixIGuHrJB0jAkRgCBKgRGwIVhq5TASIQCQTuIEvmptg4F1MTsKEOF8DD050nTHiCF+GS8KkhOGA3Qrzab7Hy89HXQTtvy3DgkUp4Hyp9CNGh4kAEYhsAnQ5R3b9kHdEgAjckgQuwlhrAJ92cdnzkRqvgLOjDaeEAyWo63QIE/XdE/T5Ic78p7HyUUrCbsnmQEFFNQFKxKK6+il4IkAE+p/AMIy/KwlTeMWnT6LZdt3LxHXY6ndgc7kJwEKsXzYT8XDC3t6K03zJkWMxeqTr1qzg0lFaWQg1mqFb9yYahEn9XupolwgQgSFNgBKxIV195DwRIAKRSGCY6kE8KSw1sQPrSnf0LMLqtMG06zksT38eDeCgrtiEJ1PGALiOjrZWoYcMsydD6Z40okDcAwuQreGXrdiJsnct8FoCNhLDJ5+IABEIgwAlYmHAoqJEgAgQgZAIxKXiyddfFtYKs+1eD41qtGtF/VglUleWu5Kwkl3Yu34W4gSFdrSbzwpbU5LvgsczkYqp+GHxSnCwwbBxN/WKhVQBVIgIDB0ClIgNnboiT4kAERgyBBSIm5aNHQ0f4UDFCmG9MJfr07Gi4m0cNJpQt/Whnkn37icmp2D25Dvg7hAThBSIT52PbGHRMVrMdcg0AXKUCIRIgF5xFCIoKuafgPSaBv8l6AwRuDUIUFu/NeqRoiACkUBAup9Qj1gk1Ab5QASIABEgAkSACEQlAUrEorLaKWgiQASIABEgAkQgEghQIhYJtUA+EAEiQASIABEgAlFJgBKxqKx2CpoIEAEiQASIABGIBAKUiEVCLZAPRIAIEAEiQASIQFQSoEQsKqudgiYCRIAIEAEiQAQigQAlYpFQC+QDESACRIAIEAEiEJUEKBGLymqnoIkAESACRFZQBb4AACAASURBVIAIEIFIIECJWCTUAvlABIgAESACRIAIRCUBSsSistopaCJABIgAESACRCASCFAiFgm1QD4QASJABIgAESACUUmAErGorHYKmggQASJABIgAEYgEApSIRUItkA9EgAgQASJABIhAVBKgRCwqq52CJgJEgAgQASJABCKBACVikVAL5AMRIAJEgAgQASIQlQQoEYvKaqegiQARIAJEgAgQgUggQIlYJNQC+UAEiAARIAJEgAhEJQFKxKKy2iloIkAEBobABdQXpyImJkb2p0SGrgXOcA06W6DLeBw6yyVYdMsQoyxFfVfYWrysiv5l6GDhVQk2lFAW16PLq2TPrpdMz4lB3opUv8LE0lWPYmUf20iYpqh4ZBIYFplukVdEgAgQgaFIYBzSyoxgL7dAtyANedgC84e5mNqXn7x2K8xfS0de0hhMnbofLHcAeCimIbfWioFQPQDekkoicEsS6Mvt4ZYEQUERASJABL4SAjdMqEyS95hJ20nI0f9VdMGJLmMDPsv8PpLoLv2VVAsZIQKDRYAu8cEiT3aJABGITgLDUrChlYEx779W7MqcKDK5CGPt35A5ZxIUuOpjaNIJu6UeuuIMcQhUiXnFOtRbPAcYnTYT9JU5UApDpcnIqXwfJzuu9XD3MTQZVEaQvg6bqRrF85Si/QwU6+phsQcYOhWH4OYVv4rKnGRBzj0k6rTBtKsY86Qh3XnF0NVbYO/xFMH9EocqvYdwBbsxnsOvXvaUOa/giAe7EOKzW1Cvk/kcEwID8Hr17vhjlDmo/PAkOsQ4nef0yFOmorj+gixyftMVm5uXoCdM/l4aaTdyCFAiFjl1QZ4QASJABFwEuj5F7WezMCdphA8iTthbqrFWXYDGhE2wOhiYw4SyhEZkqZaj0nTJJWNvQtXyx/Da+UfR0O0AY8fx7ORWfLC72YdO8VBIMtdxTr8eKYuOIqHMBAefUHb/HKrGAqgLDuJcgFwMsKGh+hOMLTkO5vgCDatTEe/8HPpVGiyqvxNl1mtgzIHu1+9BY9YSFOg/d82tC8kv/2F5nBHtpe6MRb65E4x1on5uM3LUpdCfuw4glPguwfTGemQ13oPXBbYMDusGxFavRv5+i5/5gE7YTTuwPPVNnH/0ALp5bpYSTD55BLttLg8ViQ/i8Wyg+u3fenLk20M1kJ1xH+JD8s8jYtqJdAJM9gH4H2n0IQLhEaB2Ex4vKj10CYTc1h1nmFbDMWi0zOwIN14H66wrYVOK6linIHqFmbVLGbgSVtfJKzvP6opSGJdbw9o9dLuOu2y6dHBuGckHeRnGmOgnJ9gKUaazjhVxHNNozzAP88LxFFZUd14y5vktnAdz2ZJOiTaxlGnNV6SDvGMCA5f//yPbllv0ikXk0sNJVOdl12HWMg28/JTHJN+WecSE46KcwG1Kbwby8r22xXpz16vcP4mng3Ubq5jag4echYO5/JDKy4zI/ZMdps3IJSDdT6hHLNIzZfKPCBCBKCNwHR1tF7FE6P3wEbrQO2JF8ux7wHncweMwQTUZON2KdvsFGGsNsCUnYUKcvJBYxodagB8ODSbDz107imqbEjMmjYNcM+KUUCVbUV37aYAnML0Niza5JExKGC47qUDchCQk2wyoNVpC8EsmGnDzKlqPHYYBk6GaENdTMj4NZVYranOnwh5KfIoE3P/QNBg2/hoHm+qh9xpG7VEs25LqTaWEzDJc3EaKBRWIe2ABsjUnse9Ym9iz5mKE7PlIjUc/85f5R5uDRsDjOho0L8gwESACRIAIuAg423BMfwcyUsf6JOLsaMMpcSjLZwFbK9qs59B2yurztN+DzgthyJhQnj5etkRHDGJi70aeIZBjfi0DtpeRPjrWQ1+sKg8GXsRxPgy/AtgI61Sw+MYgZcNemPd8F5dqyrAkXYVRMb7n6Ulmg9abVFAxGRlrHsbpjbvRwC9XIiRwCVi/bCbipTII5p+7IG0MAQKUiA2BSiIXiQARiB4CztbfQX+vGqnxvm/PioRJmMEF4MH3LikTMWmGMkAhH6cU48KQWQqt+YqPBw4YrGVpsoTBhx1fhzRamPm5br0eYDCi7KF7w/DLl/K+HAslvnhMTctEblktGLsGq3E7Fna8gnT1z3yu9xa03txuDkfi/Exkg+8NvODqAUvOxCMPjHGXAELxT1acNiOagO8rPaJdJueIABEgArcqAX7orAn3+huW5MOOvw8Z2UqcPv5H2DwmxtvRbj4LCMOR45CaoQEnDFPKC4llfOIbG4KMAvGp85HNncHx5i88J6Xbm1A5LynMxWslmyfRbOMnyksffmL7K5gXsww6y8gQ/OLlAg27SnpHIGnOw9DgLMztsmcyxadHYzJ2ouOBvsQ3HFzKYqzOWQSO75HskMci2pbqzWz1eBoU/Hpxpy9LDrq+42di2foEVL/9DvZ90Ijkx6RlTPqbv6dZ2hskAvJpbNLEMfkx2iYCwQhQuwlGiM7fKgRCbut9nqzPT+he4zVx3XuyvoN1n9nJVnDT2YqqY8wqzF/vZGe0uYzDQlZh/NKF29HGanKnM27FTnammy/Uycw1JUwN9DxE4DFZn58jH4IMu8baa9YyjlvBqk5YXRP2u8+wmiINg7qKGQVbPmpcmEzuPVlfbnM7O2G9JkzU7zbXsCL1FKauOMG6eVUh+cWYayL+dLZCe9olJ/kFmV1HO6sr4X19ntUJ9q4xa93zTO1mF0J84mR9dVENM0vxirZ6P0TRw8LRXsNy+Xrr5V/vyfeuWMDgMXGf1xWCfz0maSuCCUj3E4/HJKWDEew3uRaBBKjdRGClkEsDQiB4Wxef5OOTHfdf73+yfp3jk5WF3k9aeidivLSDdZvrmJZPfgQ7HFMXaVmd2fWcpVt/t5kZKlYwzl1mN6upWOw/EeMFg8kIyjuZuU7LitScaH86W1FRw4xCYuO27rnhLxETbdZpi1xJIu8rt4JV1BjFJFNUE6pfhiq2ghP5q4vYzhMG9isN5/m0psPKjDtl9vhyRjGpFMwFj89hNbIaN1veXggMhHo7zCpWTBe5aVjRgXdYhcbHE5hi8un7ydvg/nnCp71IJCDdT2J456TOOP79aLJd6TB9E4GABKjdBMRDJ28hAtTWb6HKjPRQ+OHSBVk4vqYGb2Xe5fmEaqT7Tv6FREC6n9AcsZBwUSEiQASIABEgAl8VgeuwNexD9fXH8bRmIiVhXxX2QbJDidgggSezRIAIEAEiQAS8CTgtOmTE3Abl5mvIfzMPKR7rwHmXpv1bgQANTd4KtTjIMUjdq4PsBpknAgNOgNr6gCMmA0QgaghI9xPqEYuaKqdAiQARIAJEgAgQgUgjQIlYpNUI+UMEiAARIAJEgAhEDQFKxKKmqilQIkAEiAARIAJEINIIUCIWaTVC/hABIkAEiAARIAJRQ4ASsaipagqUCBABIkAEiAARiDQClIhFWo2QP0SACBABIkAEiEDUEKBELGqqmgIlAkSACBABIkAEIo0AJWKRViPkDxEgAkSACBABIhA1BCgRi5qqpkCJABEgAkSACBCBSCNAiVik1Qj5QwSIABEgAkSACEQNAUrEoqaqKVAiQASIABEgAkQg0ghQIhZpNUL+EAEiQASIABEgAlFDgBKxqKlqCpQIEAEiQASIABGINAKUiEVajZA/RIAI3GIEumCp34fKnGTExMS4/pQ5qHy3ARa70zNWmx45Uhkf38qcV3DE0uUpQ3tEgAgMaQIxjDEmRcDfJGS70mH6JgIBCVC7CYiHTt5CBMJt607bcWz7yZNYv7vZNwX186jbW4I0brhw/oapEtNSC/Fn36VdR7kS1LVsQVo8/Y4OhInOEYFIJyDdT+hKjvSaIv+IABEYmgTsTahavtSVhKmLsNNohYMxMHYN1hPbsYID0PA8sn5xDK4+rhs4/3mrKwnTaGF28GV7/hxWA0rUHGAzoNZ4cWgyIa+JABHoRYASsV5I6AARIAJE4GYJXIVlfyUKG2wAtxY1ezYjJ4WD64Y7HNysp/DanhLwuZit+iiMXfwQ5VVYz5oFw9yMSUjwujsrvjURSULH2SV0XLpysw6SPBEgAhFCwOtSjxCvyA0iQASIwFAmYP8U71cfAzAdudsLsTjRNfTYE5IC8Xen4iH+gO1jnPzTZSER6zzfLRQZOX40RvYUBuwWHKl6GRsNNgAzMXf6ePlZ2iYCRGAIExg2hH0n14kAESACEUnAaW3GEaE3bCUenz9R7Anz5+p4jB01DHBeQNspq1Doz4Wp+Fqhr/Ic1CWrsCBphK+TdIwIEIEhSIASsSFYaeQyESACkUzgBr5oboKBdzE5CRPifA08ONF1xogjfBkuCZMShgN2K8yn+R4vPx91EbT/tgwLFqWA86XSjxgdJgJEILIJ0OUc2fVD3hEBInBLErgIY60BfNrFZc9HarwCzo42nBIOlKCu0yFM1HdP0OeHOPOfxspHKQm7JZsDBRXVBCgRi+rqp+CJABHofwLDMP6uJEzhFZ8+iWbbdS8T12Gr34HN5SYAC7F+2UzEwwl7eytO8yVHjsXoka5bs4JLR2llIdRohm7dm2gQJvV7qaNdIkAEhjQBSsSGdPWR80SACEQigWGqB/GksNTEDqwr3dGzCKvTBtOu57A8/Xk0gIO6YhOeTBkD4Do62lqFHjLMngyle9KIAnEPLEC2hl+2YifK3rXAawnYSAyffCICRCAMApSIhQGLihIBIkAEQiIQl4onX39ZWCvMtns9NKrRrhX1Y5VIXVnuSsJKdmHv+lmIExTa0W4+K2xNSb4LHs9EKqbih8UrwcEGw8bd1CsWUgVQISIwdAhQIjZ06oo8JQJEYMgQUCBuWjZ2NHyEAxUrhPXCXK5Px4qKt3HQaELd1od6Jt27n5icgtmT74C7Q0wQUiA+dT6yhUXHaDHXIdMEyFEiECIBesVRiKComH8C0msa/JegM0Tg1iBAbf3WqEeKgghEAgHpfkI9YpFQG+QDESACRIAIEAEiEJUEKBGLymqnoIkAESACRIAIEIFIIECJWCTUAvlABIgAESACRIAIRCUBSsSistopaCJABIgAESACRCASCFAiFgm1QD4QASJABIgAESACUUmAErGorHYKmggQASJABIgAEYgEApSIRUItkA9EgAgQASJABIhAVBKgRCwqq52CJgJEgAgQASJABCKBACVikVAL5AMRIAJEgAgQASIQlQQoEYvKaqegiQARIAJEgAgQgUggQIlYJNQC+UAEiAARIAJEgAhEJQFKxKKy2iloIkAEiAARIAJEIBIIUCIWCbVAPhABIkAEiAARIAJRSYASsaisdgqaCBABIkAEiAARiAQClIhFQi2QD0SACBABIkAEiEBUEqBELCqrnYImAkSACBABIkAEIoEAJWKRUAvkAxEgArcIgQuoL05FTEyM7E+JDF0LnGFFeBUW3eOC3A2LDhkxqSiuvxCWht6FRd8ydLDwzjhboMtQQllcj67ehcUjXjJ+yw3gCcHPpD4wHECfviLVTqHul0FnudqPFp2wW2pRWbrX1Q76UXN4qrpgOfIqSneFe22EaKWrHsXKvlx7Iervx2KUiPUjTFJFBIhAtBMYh7QyI5jjDLQaDtBoYXZYUZs7DeHdbO1oN4/CY3MmYdjUXNQyI8rSxvUvXMU05NZaYS1LQ3z/aiZtEU3gIpq0z6LQ1J/JXR8C7jJCm/MzmBx9kL3FRMK7N9xiwVM4RIAIEIGIJND1KWo/m4U5SSMi0j1yiggQgf4jQIlY/7EkTUSACBCB4ARseuR4DF1Kw5jzUGmy82OG6DI24LPM7yNJAbiGp+RDk/zQUj10xRni8KcS84p1qLd4DjA6bSboK3OgFGwlI6fyfZzsuNbjn4+hyaAygvR12EzVKJ6nFO1noFhXD4s9wOCrOEw0r/hVVOYkC3LuIVGnDaZdxZgnMZlXDF29BTwJ/59QfODL6N32hOHiXrq7YKnXyWLxxTIEW3YL6nWyGGJCYMLXtK0Ju4LUozeDkGS8mCpzXsERoX3wQ80PI73cBBjyoIrl29Xf0FVfCiXv81s/Q46Sb49SewvW1pyi7DK8Vd8gi4Vvb7X+2wTfHqalo9xmgyHvbsQqS1HfJYyXh9S2vZkAXnWtzEHlhyfRIRZ0ntMjTynFJJd2Db2726KgJ8y2LVfXx21KxPoIjsSIABEgAn0iwGViF2Ngvf4+woaUOAAXYaz9GzLnTPIxnOmEvaUaa9UFaEzYBKuDgTlMKEtoRJZqOSpNl1wu2ZtQtfwxvHb+UTR0O8DYcTw7uRUf7G7273JIMtdxTr8eKYuOIqHMBAcfQ/fPoWosgLrgIM4FyMUAGxqqP8HYkuNgji/QsDoV8c7PoV+lwaL6O1FmvQbGHOh+/R40Zi1Bgf5zP/PqQvHBCbtpB5Yveg+xaw0uP9k1WJ8bier09XhD4MSX0WJN1nGoXm9x1YfjD3gudh/S898V50+FYusSTG+sR1bjPXhdYM3gsG5AbPVq5O+3+IkB4JODVSl5qJfqkbXgddVxZKlLoT933Wc9hSQjMk3dGYt8cycY60T93GbkCHrjkVZ2GHVFKeKwuXzI24DqYxxKLA44rPuwetaY0Nqa4OkBrN5swKi8AwJHh7UKiR+sxZo3jL4T6vg0lLXUoYjjoNGegcO6FWnxCMOeHI9Y16lv4vyjB9DNt0lLCSafPILdNlc5ReKDeDwbqH77t55tlO95rgayM+5DPEKpa7ndftxmsg/AM6QPEQiPALWb8HhR6aFLIOS27jjDtBqOQaNlZkeY8XbWsaIpJayu0yXoMGuZBimsqO48Y+w8qytKYVxuDWv30Os67rLnYJ11JYzjenS4PJCXYYyJPnJFdayThSjD+8ZxTKM9wzzMC8clH33EK5wHc9mSzos2sZRpzVekg7xjnv4Lfk7psRmSDyInITa5ar5eJF1XmFm7NHAdhWLL2z+ZOf+bXnXhLujpt6vuJT7hyHjVhUcc3nqkevCSCaetudunFIi3Dem47NvDJ/64GHvAti2Td2+Kct517aHfwbqNVUzt0da82plHebdyxoTj3mxk529iU7qfUI9YPya1pIoIEAEicLMEnB1t+GzJfKTG+7g9C7/grUiefQ84j9NxmKCaDJxuRbv9Aoy1BtiSkzAhTl5ILOPTQb4XLpgMP2R6FNU2JWZMGufZWxenhCrZiuraTwM8geltWLTJJWFSwnDZSQXiJiQh2WZArfGi7Di/GaoProcmrGWp6Kh/D3q9Hnr9WyhOT0Oe4bKocziU938PasMvoT34n6jXN3gNpYVoS5GA+x+aBsPGX+NgUz30QYdVAQj1aAI3YxIS5FUEVx3Zqo/CKAzVycIPSeYyWo8dhgGToZrA966KH74HyhrmQyMhtTV/XaDy9uivjOSc+N1Xe5KcSglZxIDQJkeKyhWIe2ABsjUnse9Ym9hL6Wp/yOavNfRz2/aKLciuRxMIUpZOEwEiQASIwIASuIrWY024Vxgq6W2IT9JOicMtvc8CsLWizXoObaesPk/7Pei8EIaMCeXp42XLc8QgJvZu5BkCOebXMmB7GemjYz30xaryYAggAgTzgR/C3YUc5Wio0n+JE5f4ZOAOZLyuh1YDnDZbYYcCcSkFOGSuxHcv/Qabl8yDalQsYnrNIwtmawxSNuyFec93cammDEvSVRgV42uuWe+AbOXpGC3NjRO+b4cq70DvgrIjfZGRiYe8GVJb6/A9hBqyEVnBvtoLKifZUExGxpqHcXrjbjTwSa6QwCVg/bKZsqeGg9W1pKx/vykR61+epI0IEAEi0HcCzjYc09+BjNSxPnUoEiZhBufzlOsg37ukTMSkGcoAhXycUowLQ2YptOYrPua4sb4thSEs8eFrzpx8/pK3z0F8cFqwv6AERxbUoN1Ri7LcHyIz81GkKS/DfFqeMCoQN1WNzNwyfMT4uV1G1CzswMb05djsXrctiC3BtXhMTctEblktGD8XzbgdCzteQbr6Z+IkdG//+X1xflSvuYIMTJgz5evfc19kfNkOfiyktubRkxlcZ6ASfbUXVM5tdDgS52ciG3xP6wVXD1hyJh55YIy7BBBKXcuK99Omr5ruJ9WkhggQASJABMIh4Gz9Hf5/e/cDHEWV5wH8m4TFfyEqh2tmYM8cRoJKXDRZ9lapYgLuREpRL5zoaUg0lKIicutCUsE/+wcVITlcVGpFK9lAlBJxUirnaoKJwYLdgpuhVNBkclkK3TCDi/9I5lCQmXf1eron3TOT+ZNMnJD5pgpmuvv9/bzH5Ef3656myy3hL0vKgrKuQPFCM/bv/gRuwxUf+dyxg4ByOXICCoutMCmXKfWJ1DRhGzQ+hjzpyCq8FgtNHdh94HPjInTPXtQWxfvQVa3OfTjg1p9ZkYuvn0ZRWrgHmcbYBo8Lzv0IuYTr6/sGkR6Lm24qQMk95VhocuGDQ18hc1D9HQtTwc24p3weTPIMZbizRgOO4zdw1N6ANO2hu/qxiinPmcideR2sOAhnj+6+U/UO2bDl6uvQvx+wPv1cS2AIMdj6tHzKWU5dB5Q5oF2GVvdnXYUFD2Wj8eVXsPWtnci/1X9nMhDjvNIVn9C3+nVm2sIx/T6+p0A0Ac6baEI8PloEYp7rg1qsLxcPPyquD1oIb1ys7xV9HQ2izDRNlK3bJVzKivljoqOuQphwvaixf+2n9h4StoppwlTWIDr6ZKJjwmmrFhagf3G6YbG+XCMfQx5xQvTYlgiTqUys2+PyL9jv6xC2SquAZZ2wK3WFGW1lwXPwYn19nc+JPa4TykL9PqdNVFouFpaaPaJPFhWyGD6WNqiLxS2/Fa1KuUJ4XbvEurJpQo6h/6YBdbG+pVrYnMfURqtOpiXC1iPbE0NdavsslTbh1PqvmoTeVNFv4+2xiYqgcfSPUf84GhfrCxFLHuHtEa3Vcjy0vp8QrtbfCktgfuhvUvhW9PWd8N8cEbLgPpa5NtBCf7WOkBtG+vtvGNf/6xN93ljq0+XXvQ241O33zxltTiL0xhK/KQQMC/dlYTGMta7ORLzVPk8Mt0lqOxNRActIHQHOm9QZ61TvafS5rgYAMuAJ/An9ZRDeUeZdHHQHoRDGQEzm9Io+Z6uok8GPUodJWCrrRGsgmFBL73OKlpoyYQqk2SxsNTcPHIjJbNHyKEUfE87WOlFpMan1TxNlNTZhVwMetXbjy0CBmFpna12lP0iUbTWViRqbXQ0ywwViMlP0Nnhde0RDwAjCVFYjtrW+L2zyrlPtDjuvS9htNaLM1D9eMp3NrgaZSi9iqcsubAFrWVYMJiHj6G+jvu7gQCx07EPzKE2W/WrQmVoqRYOuT15Xi6hWxk/OzY/FV/Iu25BATJYUba4NIRATWoCoD4qi1af0LsxfMt87okYNtAGrqNz2iqgJ3CGry6L+hyP8Hc3Rx1pX0pDfap8nabIk7RSbfOCdblPbzVcKRBTgvInIw4OjSIBzfRQNJruSmgLyMu3cUuxebMOLJRcZ7/79gUW0z5MEXuD9gXvA6ihAAQpQgAIUoEDMAifhbt+KxpN34H7rT5IahOmbzEBMr8H3FKAABShAAQqMOgH/V4WdAfOqE1i6cREKDM/YS253eWkyuf6jonbt9Oqo6Aw7QYEIApzrEXB4iAIUiEtA+zzhGbG42JiYAhSgAAUoQAEKJE6AgVjiLFkSBShAAQpQgAIUiEuAgVhcXExMAQpQgAIUoAAFEifAQCxxliyJAhSgAAUoQAEKxCXAQCwuLiamAAUoQAEKUIACiRNgIJY4S5ZEAQpQgAIUoAAF4hJgIBYXFxNTgAIUoAAFKECBxAkwEEucJUuiAAUoQAEKUIACcQkwEIuLi4kpQAEKUIACFKBA4gQYiCXOkiVRgAIUoAAFKECBuAQYiMXFxcQUoAAFKEABClAgcQIMxBJnyZIoQAEKUIACFKBAXAIMxOLiYmIKUIACFKAABSiQOAEGYomzZEkUoAAFwgt4utD2Wi3KzWlIS5N/8lFe2wSH+6Qu/Sm4m+5Vj2vp+l/N5bVocrjh0+XgWwpQ4PQXYCB2+o8he0ABCoxYgV50Na1E0bg8lG4/C0scJyDECfTYZmHHivkovH012gLB2BiYSp7H9/YaXKz05xbUOb+FEMfQUVcBbF6B+YV3Y53jmxHbWzaMAhSIX4CBWPxmzEEBClAguoDvMNpW3oK8+avRblmH7RvuwwzTWABjMfHaEiw0AWjfiFUvfwBPoLTvcPDDvfib3LZeh5m5ZwLIwtS51+OXSppO7P+0L5CabyhAgdNfgIHY6T+G7AEFKDDiBE7i8OurUbq6BcD1qKm9CwWZuo/bs8/FBWfLRrvR/vz7cJ7SOuBBj/OgsmGanoNsJYsPvR127FD2TkX+ReO0xHylAAVGgYDuk2EU9IZdoAAFKDACBHyH/xuPPbABbtkWawluvPI8Y6uOfor9ymkv4270foTmRgeAAiwsvgJZ6EXXjvVYWroabkxDWd1TuLcgqKygIrhJAQqcXgJjTq/msrUUoAAFRrrAd+hufgX1ShRmgvXWq5Fr+C+v/gwXYJp/FS5RP4l9Rw7hAyWfA2vnXIC1SlenoazGBvsdN6BAubQ50vvP9lGAAvEIGD4e4snItBSgAAUoEEbAdwi7tu5SD8zErTNzYPyg/Qr25hb/2bLAmS+Z/Dt073oH8mImrHVwft+BOqtcSPYljoy/DFcyCAuDzV0UOP0FjJ8Pp39/2AMKUIACyRXwuODcr5zWAky5yMmWC/R1P4HLjwAsd2DBjPHqwaD1YWMmIGe6WVlH1rLzE3yuK4JvKUCB0SPAQGz0jCV7QgEKjDSB/FxM0i/Sx0kcfrcJjUqcFrSIPxCgaevDxqOw2Ap5Tgw77Ojo5RPERtrwsj0USIQAA7FEKLIMClCAAppA5sX4+dxp2pbhtX8R/zRU2DbgId3C+/71YZORNykTQDqyCq/1P+bC3YJm+1eGsrhBAQqMDgEGsP5IOAAADzNJREFUYqNjHNkLClBgpAik/wTW+ytgke1p2YqG9sPK0/B97h14pPQB1LutqLRtw/qSi/rXjvk+xetrnvavD7t4Bn46WT4/DECmGXn58pyYA42b3kKnh2fF/DD8mwKjR4CB2OgZS/aEAhQYEQLpyCxYgi12G2rKXFg9ZxIy0tKQYa6Fd+ELsLu2Y03JVMhzXvLnlKMWuRk5mF9/wL/jbytQ+KMi1Do8QHoOZt46U9nv3nwnLh13P5rcgYeO+dPzbwpQ4LQWSBNCCK0H8jvQdJvabr5SIKIA501EHh4cRQKc66NoMNkVCiRZQPs84RmxJA8Eq6cABShAAQpQIHUFGIil7tiz5xSgAAUoQAEKJFmAgViSB4DVU4ACFKAABSiQugIMxFJ37NlzClCAAhSgAAWSLMBALMkDwOopQAEKUIACFEhdAQZiqTv27DkFKEABClCAAkkWYCCW5AFg9RSgAAUoQAEKpK4AA7HUHXv2nAIUoAAFKECBJAswEEvyALB6ClCAAhSgAAVSV4CBWOqOPXtOAQpQgAIUoECSBRiIJXkAWD0FKEABClCAAqkrwEAsdceePacABShAAQpQIMkCDMSSPACsngIUoAAFKECB1BVgIJa6Y8+eU4ACFKAABSiQZAEGYkkeAFZPAQpQgAIUoEDqCjAQS92xZ88pQAEKUIACFBiEQE9PzyByhc/CQCy8C/dSgAIUGITAF2irKkRaWprujxnF9Z3wDaI0f5bv0FV/h1pGL7p2PIOVm6KU5+tEfbEZ5qo29ALwddWjOK0QVW1fDLoV/oxq/4rr0SU7FFRP+MKD8oRPlIS9PvS2rYQ5bQHqu75LQv1hquxtQ5U5ynzxdGFH7RPYNKQ2J2qe9s/NU0mdYz/cWPZ8tg//ZinADXetGMK/aePYMxAzenCLAhSgwBAEJmD2GjuEtwN1VhNgrYPT60JzxVQM/sPWgx7nONw6MwfpvXbUlT8FhzdKE9OnoqLZBdea2cgCkD6lAs3CjjWzJ0TJGOfhoHrizM3kcQv40Lu3AeUrPkS0KRC56ETN0/65OSYF5tiuN5/H3JnzcPBHk7Hjzfoh/Js2js7gPxuM5XCLAhSgAAXiFTjlQG2u/uyZ+j63Fo5TamG9H6H54xmYmXtmvKUzPQWGIOCBo7ZId2ZXm6dFqHV4/OWmzNz0YctzlXj4Px9HWsE8/OXNzbjgrLOGYGvMykDM6MEtClCAAj+cwJgCLO8WECLoT/dyFIyRzfCh196Oj0uuRq6nDVVT52Ct242WRZciw7wSbb3/8F8KLarCi7XlMMtLonL/159EuTTpg6erDfVVxeovWjOKqurR1iUvZPb/+NwONGnlpuWjvPZN7DtyQpfAeAlUHoiaR8l9Em5HI6qKzGr9xaiqb0OXJ8IFXPWyXVHVM6gtz1fyaZde4XPDsakKRdol4aIq1Ld1QQ0X/O2VaZpqUW72BxTm8nV4e9/h/r5AvVynuOraodSbFrjMq2QIqs9c/jR2GOxi6Z9M0xToS5q5HLVv78MRXYuMb+Xlt0cwdc5quLENi/LO0rWpF11t9fF5GgsPs5WJguXvhc5N8R6WF2Qa52Z6uMvfwzfHlPGOOJb+7vjce7EpyhwP0/GgXT688NS9+NNv6vD3vBvRuuVpnJPAIExWxkAsiJybFKAABUaOwFewN/8DJfKyZNZsrOlsRaXJBGtdB7yuJzE7S/0Ib/8zdo1fgS5xAq72xZhxbqSPdh88nY1YYlmGndmPweUVEF4H1mTvRGne7ah1fOPvvmcv1t1+K549ehPa+7wQYjcentyNtzYfGJgnpjwncbjpIRTMexfZaxzwyiC077+Qt3MZLMtex2FdDBRakRvtjR9ifPVuCO/naL+nEFm+T9F0txXz2v4Za1wnIIQXfX+8DDtL52NZ06fqOp5v4Fh3Nwqf/Qo3tR9T0nQ9PBn73toBd2glkfeo9RU2ZGCpU5Z1DG2zDqDcshJNh08CiKV/PngcG3B74UYcvWkb+qRBVzUm79uBzQM2KB1Zsx9HZ2s1TLgFdc5v1UvPveis/xUspTsDnl7XY8jeuQx589bDESm4jdzTKEd1czMk5TDOMcQ2lr7DTbi7YBHatDkuOvHHvN0oDYxTSKMDO7q6ugLvd735DJpfeg17/uU6vLpxZULPhAUqEbofQAa//KFAfAKcN/F5MfXpKxDzXPd2iDqrScBaJ5zeIfT3WKuovLhatB5TC5HbJpOw1nUI/56jorWyQMCkSyOrU+s3VbaKY3LTWSesKBCVrUeFEP48pgqb6DG0TS1LabNXHGutFqbgctW8gX4Z6okxT0gfVB9lv9bGMGbKcQitT/4Uap24RdQ5v9VlCmpL2LKD8w5gGVSv0VLfdnVclPT6MdKn0fqnjoE6PoGGD5Q3kCC4zUIIJc80UWE7pM4JfX1h2hEoq3+eBMZTfyzae1mvbm4aXYZrjmn91Ry1Rga76Oeylka+DuCuJvny6AGxaNYlAufPFY++/Jb4e+d2cfMlWQKX3yle3u3QF5SQ99rnSaT/NgWCNb6hAAUoQIEhCvgOo22ldimwGFVNncZLZ2GK9x05hI/nX4tC7cxXmDRx75LrehpdyL/mMpgMvwEyMSlvMrC/Gz2eL2BvboE7PxeTMvWJ1DRhK5VnSKLlkZda30Wj24zpOROMl2QyzcjLd6Gx+SPlTs+wVYTsVOs05SIne6zuaDoyJ+Ui392CZvsXap2TkTdJXlLTftQ02mZMr9+he9c7aEFQWfJspUvelDEFnlj6p41Bnhn6FkExODumlvgTaZ6X4pppF4bxBPY7XVHnWRwVBpJGnJta/xI+x7T+BvkjaCyV+h0wTc9Btn76wj9/3Y3vwt4beur1+JdH8eW33wNfv40/bGzEr+9dhtf/9yrctuDnuP3qqwJ9T/QbQxMTXTjLowAFKEABKeBDb/sGlP71Otj7vPD2LMYXDzyGVyM+gkD+0t+Ly4uvUO58TJSj/AX6wYCXvwC4u3HIdRiHPnDFV6XvizjyOLB2zgXGheAZl2JRS6SGRWiOezXmnJthKC8jbxFalCwncORQd/yXICNUF/1Q5P55o41B9ArUFCej9s39wSEcCY05Yq4hfMLIc3PY5hii91ffXvfaOThXWzeovJ6FvEXb9EkM7yflWbBmYw3KLj8ffe+/glfbDyJzxoX4w4pyQ7pEbzAQS7Qoy6MABSgQIiDX9zwJ13u/glznfLyvD6fO/jHOOyfCR7DvEHY1/RjFheNDShvKjvTsHEw3RShBnl0yT0TOdHOERGEOpU+II49/jVPITQpCBB65EaaGgXcpjwkJuuFBuQFCPrJjIrJzchGpywMXPNgjkft3frQxiLnasVH7FnpWKObCB04YZW4O2xxD9P72N1pdSxl8I4zc1q+v7M+gvJsy/UaYfpqHbLk1/kZUV9+HCxO8OD+oSuOZzOCD3KYABShAgUQKyEcCzMG4S6vx2YKb8AuT/nKasR5f91/QdLklsZclZRVZV6B4oRn7d38Ct+FMiXwm1EFAuRw5AYXFVpiUy5T6RGoaY1PVrfEx5ElHVuG1WGjqwO4DnxsfiOnZi9qi3DgffqvVuQ8H3HKhvPYjF8M/jSLlYa0n1ToPwtmjv4/SB09PN/ZrWdTLVoHNsG/ORO7M62BFUFnqg23Tihtw5MoY+qeNQfBlQ48Lzv3Hw9YcfmckT1kWkB98+TN8QXHtjTo3tf4lfI5p/Q3yR9BYDlj/N3DU3oA07YHEYXs9Frfdfxdy8ovw2O8WYOXNs8KmSuTOCP8dS2Q1LIsCFKAABQD1kQDev2Lp59W4s2GgJ+TLXyyHgOBfovo1RMc9GNwNceMx466l+OXbv8HK9bvVYEzeeVeF0rXZqHmyBFPS05FlWYzn5m5H6dJGdCoV9aKraR1WrXUMMJAx5smaiQefm4W3H3gM6/e6/cGYpxNNqx7FCizBkwumxHGGQKtzJx5Y+SL2KsGYfGzC61i1fANQsxwLppwJKHX+KxpLq1DfqXzXgJLmiVUNukuWapDl3o5Nr33iX1cl2/XEGqzVXTFNzy1GVfU/Ye2qDWhT6jsJd/tWNLZc5bc7P5b+TYDlwZWY27gMS+sPDFhXKLR+LZQPxz3H4csqxF2PzwjyPID6pcuwNm9FnJ6hNYbuGWBuGhIO1xyT/5GQvtHGUvUNmuNdTWuxfAXUOW5osGFj+jX3YNufN+N3D9xh2D9cGwzEhkuW5VKAAikooD6LSlvv1LIIeRlhvrImfSJ+cX0hWnZ+gs/DKg3waID0yZhbtRAn5XPEzqnAq93fhs0deWc6MqcuxIb29Zh15PcwZ8jnak3Ffc5r8JJzC5YXnOfPnn4RStbbsCm/DbPHyfVXU7F4z6VYWnPzwMXHlGcsJpY8ifaXZuFIVQEy5NqdcbfgjQsWw75lCQoMNwcMXFXgiFrnS7M+Q5X5DKSlZWCc5Q1csHQrtjw0Q10Mr9a5aRp2zj7Xn2axHT9b+iCsgYLkNxD8O55tqQAeycc42a55f0Lf/OV4QX5LgvaTPhGzH2+A/c7jWKXUdwbMq47jTvuLeEixi61/6RNvxvr2WuTv/A9/XeOWYc/PKlBjjbxY3x8IHsOivHNwzvxX0O3LwtSKp4M8fw3nrPVwbl82gGeM81Trs+F1gLlpSDOMcwwxjqXiq5/j58LyxngsDYyTocEhG5MmTQrZN1w70uQ9mFrh8vvRdJvabr5SIKIA501EHh4cRQKDn+vyO/nKYNl9G/7nxRJMhHz21XxsvOYlvD2krz8aRbjsCgVSTED7POEZsRQbeHaXAhRIhsCZmLLg93huwkZMkmegMm7AG9PWo+HOoXwHZTL6wTopQIFEC/CMWKJFU7A8LapPwa6zyykmwLmeYgPO7lJgGAW0zxOeERtGZBZNAQpQgAIUoAAFIgkwEIukw2MUoAAFKEABClBgGAUYiA0jLoumAAUoQAEKUIACkQQYiEXS4TEKUIACFKAABSgwjAIMxIYRl0VTgAIUoAAFKECBSAIMxCLp8BgFKEABClCAAhQYRgEGYsOIy6IpQAEKUIACFKBAJAEGYpF0eIwCFKAABShAAQoMowADsWHEZdEUoAAFKEABClAgkgADsUg6PEYBClCAAhSgAAWGUWBMcNnykfv8oUC8Apw38Yox/ekqwLl+uo4c202BkSlgCMSEECOzlWwVBShAAQpQgAIUGIUC/w/pxB8mompUawAAAABJRU5ErkJggg=="></p>
<p> </p>
<p><em>Accept “existence of holes <strong>AND </strong>electrons at p-n junction” for M2.</em></p>
<p><strong><em>[4 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any of:</em></p>
<p>cheaper<br><em><strong>OR</strong></em><br>ease of fabrication<br><em><strong>OR</strong></em><br>use light of lower energy/lower frequency/longer wavelength<br><em><strong>OR</strong></em><br>plentiful and renewable resources «to construct DSSC cells»<br><em><strong>OR</strong></em><br>operate at lower «internal» temperatures/better at radiating heat away «since constructed with thin front layer of conductive plastic compared to glass box in photovoltaic cell»<br><em><strong>OR</strong></em><br>use of nanoparticles provides large surface area exposure to sunlight/sun/light<br><em><strong>OR</strong></em><br>can absorb better under cloudy conditions<br><em><strong>OR</strong></em><br>better conductivity<br><em><strong>OR</strong></em><br>more flexible</p>
<p> </p>
<p><em>Accept “lower mass/lighter «so greater flexibility to integrate into windows etc.»” <strong>OR</strong> “greater power-conversion efficiency «with latest DSSC models»”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Modern electric cars store their energy in lithium ion batteries.</p>
</div>
<div class="specification">
<p>The diagram represents a cell in such a battery delivering a current.</p>
</div>
<div class="specification">
<p>The carbon footprint of electric cars depends on how the electricity is produced. Nuclear fission of <sup>235</sup>U is one source of electrical energy that has a minimal carbon footprint.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Complete the half-equations on the diagram and identify the species moving between the electrodes.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_09.45.58.png" alt="M18/4/CHEMI/HP3/ENG/TZ1/14.a.i"></p>
<div class="marks">[3]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the factor that limits the maximum current that can be drawn from this cell and how electrodes are designed to maximize the current.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the proportion of <sup>235</sup>U in natural uranium is increased.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p> </p>
<p><em>Accept any balanced equation which </em><em>shows Li oxidized to Li<sup>+</sup></em><em> </em><em>for M3, such as</em></p>
<p><em>LiC</em><sub><em>6 </em></sub><em>→ Li<sup>+</sup></em><em> +</em><em> </em><em>C</em><sub><em>6 </em></sub><em>+ e</em><sup><em>– </em></sup><em>or</em></p>
<p><em>Li</em><sub><em>x</em></sub><em>C</em><sub><em>6 </em></sub><em>→ xLi<sup>+</sup></em><em> +</em><em> </em><em>6C +</em><em> </em><em>x</em><em>e</em><sup><em>–</em></sup></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Limiting factor:</em></p>
<p>internal resistance <strong>«</strong>of the cell<strong>»</strong></p>
<p><em>Electrodes design:</em></p>
<p>large surface area</p>
<p> </p>
<p><em>Accept “time it takes ions to diffuse </em><em>between electrodes”.</em></p>
<p><em>Accept specific ways of increasing surface </em><em>area, such as “porous electrodes”.</em></p>
<p><em>Accept “close together/small separation”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>uranium converted to uranium hexafluoride/UF<sub>6</sub> gas</p>
<p> </p>
<p><strong>ALTERNATIVE 1:</strong></p>
<p>gas <strong>«</strong>allowed to<strong>» </strong>diffuse</p>
<p>lower mass isotope/<sup>235</sup>U passes through more rapidly</p>
<p> </p>
<p><strong>ALTERNATIVE 2:</strong></p>
<p>use of centrifuge</p>
<p> </p>
<p>higher mass isotope/<sup>238</sup>U moves/closer to outside of centrifuge</p>
<p><strong><em>OR</em></strong></p>
<p>lower mass isotope/<sup>235</sup>U stays in/removed from middle of centrifuge</p>
<p> </p>
<p><em><strong>[3 marks]</strong></em></p>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>As well as being burnt, methanol can also be used to provide electricity through a fuel cell. A schematic diagram of such a fuel cell, that depends on the transfer of hydrogen ions between the electrodes, is shown below.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="specification">
<p>Even though fuel cells, primary cells and rechargeable cells have similar fundamental characteristics, there are important differences between them.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce half-equations for the reactions at the two electrodes and hence the equation for the overall reaction.</p>
<p><img 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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest a way in which they are similar.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the difference between primary and rechargeable cells.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify <strong>one</strong> factor that affects the voltage of a cell and <strong>a different factor</strong> that affects the current it can deliver.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Anode:</em> CH<sub>3</sub>OH(aq) + H<sub>2</sub>O(l) → CO<sub>2</sub>(aq) + 6H<sup>+</sup>(aq) + 6e<sup>–</sup></p>
<p><em>Cathode:</em> O<sub>2</sub>(aq) + 4H<sup>+</sup>(aq) + 4e<sup>–</sup> → 2H<sub>2</sub>O(l)</p>
<p><em>Overall:</em> 2CH<sub>3</sub>OH(aq) + 3O<sub>2</sub>(g) → 2CO<sub>2</sub>(aq) + 4H<sub>2</sub>O(l)</p>
<p> </p>
<p><em>Accept correctly balanced equations with multiples of the coefficients given here.</em></p>
<p><em>Accept reversible or non-reversible arrows for all.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«portable» sources of electrical energy/electricity<br><em><strong>OR</strong></em><br>convert chemical «potential» energy to electrical energy/electricity</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>primary cells involve irreversible reactions <em><strong>AND</strong> </em>rechargeable cells involve reversible reactions</p>
<p> </p>
<p>Accept “primary cells have a limited life before going ‘flat’ <em><strong>AND</strong> </em>rechargeable cells can be recharged when ‘flat’”.</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Voltage:</em><br>chemical nature of electrodes<br><em><strong>OR</strong></em><br>electrode reactions</p>
<p><em>Current:</em><br>diffusion rate<br><em><strong>OR</strong></em><br>internal resistance/resistance of the cell</p>
<p> </p>
<p><em>Accept temperature for either but not both.</em></p>
<p><em>Accept concentration for either but not both.</em></p>
<p><em>Accept pH for either but not both.</em></p>
<p><em>Accept the current depends on the area/separation of the electrodes.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>In the 20th Century, both fission and fusion were considered as sources of energy but fusion was economically and technically unattainable.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the loss in mass, in kg, and the energy released, in J, when 0.00100 mol of <sup>228</sup>Ac decays, each atom losing an electron. Use section 2 of the data booklet and <em>E = mc<sup>2</sup></em>.</p>
<p><sup>228</sup>Ac → <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_{ - 1}^0{\text{e}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
<mn>0</mn>
</msubsup>
<mrow>
<mtext>e</mtext>
</mrow>
</math></span> + <sup>228</sup>Th</p>
<p><img src="data:image/png;base64,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"></p>
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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the energy released, in J, by 0.00100 mol of <sup>228</sup>Ac over the course of 18 hours.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how nuclear ionising radiation can damage DNA and enzymes in living cells.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Loss in mass:</em></p>
<p>«(3.78532 x 10<sup>–25</sup> kg – 9.109383 x 10<sup>–31</sup> kg – 3.78528 x 10<sup>–25</sup> kg) x 0.00100 x 6.02 x 10<sup>23</sup> =»1.86 x 10<sup>–9</sup> «kg»</p>
<p><em>Energy released:</em></p>
<p>«<em>E = mc<sup>2</sup></em> = 1.86 x 10<sup>–9</sup> kg x (3.00 x 108 m s<sup>–1</sup>)<sup>2</sup> =» 1.67 x 10<sup>8</sup> «J»</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«1.67 x 10<sup>8</sup> J x <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{7}{8}">
<mfrac>
<mn>7</mn>
<mn>8</mn>
</mfrac>
</math></span> =» 1.46 x 10<sup>8</sup> «J»</p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>production of radicals/•O<sub>2</sub><sup>–</sup>/•OH</p>
<p><strong><em>OR</em></strong></p>
<p>direct effect such as breaking bonds/atom migration</p>
<p><em>Ignore missing dots on radical species.</em></p>
<p><em>Accept named radical eg “superoxide radical” <strong>OR</strong> “hydroxyl radical”.</em></p>
<p><em>An example must be given for second alternative.</em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>The conductivity of a germanium semiconductor can be increased by doping.</p>
</div>
<div class="specification">
<p>A dye-sensitized solar cell uses a ruthenium(II)–polypyridine complex as the dye. Two ruthenium(II) complexes, A and B, absorb light of wavelengths 665 nm and 675 nm respectively.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the Lewis (electron dot) structure for an appropriate doping element in the box in the centre identifying the type of semiconductor formed.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_19.31.34.png" alt="M18/4/CHEMI/HP3/ENG/TZ2/18.a"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the feature of the molecules responsible for the absorption of light.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why complex B absorbs light of longer wavelength than complex A.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><strong><em>ALTERNATIVE 1</em></strong></p>
<p>B/Ga in circle <strong><em>AND </em></strong><em>Type of semiconductor: </em>p-type</p>
<p>showing 3 electron pairs <strong><em>AND </em></strong>one lone electron <strong>«</strong>and hole<strong>»</strong></p>
<p> </p>
<p><strong><em>ALTERNATIVE 2</em></strong></p>
<p>P/As in circle <strong><em>AND </em></strong><em>Type of semiconductor: </em>n-type</p>
<p>showing 4 electron pairs <strong><em>AND </em></strong>one non-bonded electron</p>
<p> </p>
<p><em>Accept any group 13 element labelled </em><em>as p-type.</em></p>
<p><em>Accept showing 7 electrons.</em></p>
<p><em>Accept any group 15 element labelled </em><em>as n-type.</em></p>
<p><em>Accept showing 9 electrons.</em></p>
<p><em>Accept dots or crosses for electrons.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>conjugated C=C/carbon–carbon double bonds</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>multiple<strong>» </strong>alternating C=C/carbon–carbon double bonds</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>extensive electron<strong>» </strong>conjugation/delocalization</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>many<strong>» </strong>fused/conjugated aromatic/benzene rings</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>complex B has greater conjugation/delocalization</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Crude oil is a useful energy resource.</p>
</div>
<div class="question">
<p>Fuel cells have a higher thermodynamic efficiency than octane. The following table gives some information on a direct methanol fuel cell.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_19.08.02.png" alt="M18/4/CHEMI/HP3/ENG/TZ2/13.c"></p>
<p>Determine the thermodynamic efficiency of a methanol fuel cell operating at 0.576 V.</p>
<p>Use sections 1 and 2 of the data booklet.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>n</em> = 6</p>
<p><strong>«</strong>Δ<em>G</em><sup>Θ</sup> = –<em>nFE</em><sup>Θ</sup> = 6 mol × 96 500 C mol<sup>–1</sup> × 0.576 V =<strong>» </strong>–333 504 J/–334 kJ</p>
<p><strong>«</strong>Efficiency = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\Delta G}}{{\Delta H}} = \frac{{ - 334}}{{ - 726}}">
<mfrac>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mi>G</mi>
</mrow>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mi>H</mi>
</mrow>
</mfrac>
<mo>=</mo>
<mfrac>
<mrow>
<mo>−</mo>
<mn>334</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>726</mn>
</mrow>
</mfrac>
</math></span> =<strong>» </strong>0.459/45.9%</p>
<p> </p>
<p><em>Award </em><strong><em>[3] </em></strong><em>for correct final answer.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about global warming.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Describe the effect of infrared (IR) radiation on carbon dioxide molecules.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline <strong>one</strong> approach to controlling industrial emissions of carbon dioxide.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">bond length/C=O distance changes<br><em><strong>OR</strong></em><br>«asymmetric» stretching «of bonds»<br><em><strong>OR</strong></em><br>bond angle/OCO changes <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">polarity/dipole «moment» changes<br><em><strong>OR</strong></em><br>dipole «moment» created «when molecule absorbs IR» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept appropriate diagrams.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>capture where produced «and store» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">use scrubbers to remove <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">use as feedstock for synthesising other chemicals <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">carbon credit/tax/economic incentive/fines/country specific action <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">use alternative energy<br><em><strong>OR</strong></em><br>stop/reduce use of fossil fuels for producing energy <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">use carbon reduced fuels «such as methane» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">increase efficiency and reduce energy use <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Do <strong>not</strong> accept “planting more trees”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept specific correct examples.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This part was fairly well answered with most candidates receiving one of the two marks. There were many candidates who stated asymmetric stretching and bonds vibrate but missed writing polarity and dipole changes, which deprived them of the second mark.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part was reasonably answered although there were many candidates who gave vague answers that did not receive marks.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>One suggestion for the reduction of carbon footprints is the use of biofuels, such as vegetable oils, as a substitute for petroleum based fuels.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the major technical problem affecting the direct use of vegetable oils as fuels in internal combustion engines and the chemical conversion that has overcome this.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the formula of a fuel that might be produced from the vegetable oil whose formula is shown.</p>
<p> <img src="images/Schermafbeelding_2018-08-08_om_09.42.54.png" alt="M18/4/CHEMI/HP3/ENG/TZ1/13,b"></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>viscosity <strong>«</strong>of vegetable oils is too high<strong>»</strong></p>
<p> </p>
<p>transesterification</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>conversion into<strong>» </strong>alkyl/methyl/ethyl esters</p>
<p> </p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>R–CO–O–CH<sub>3</sub> / RCOOMe</p>
<p><strong><em>OR</em></strong></p>
<p>R–CO–O–C<sub>2</sub>H<sub>5</sub> / RCOOEt</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Photovoltaic cells are much less hazardous than nuclear fission.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Early photovoltaic cells were based on silicon containing traces of other elements. State the type of semiconductor produced by doping silicon with indium, In, giving a reason that refers to its electronic structure.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Dye-sensitized solar cells, DSSCs, use a dye to absorb the sunlight. State <strong>two</strong> advantages that DSSCs have over traditional silicon based photovoltaic cells.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The structure of two dyes used in DSSCs are shown.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_10.05.44.png" alt="M18/4/CHEMI/HP3/ENG/TZ1/15.c"></p>
<p>Predict, giving a reason, which dye will absorb light of longer wavelength.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>p-type <strong><em>AND </em></strong>has 3 <strong>«</strong>valence<strong>» </strong>electrons</p>
<p><strong><em>OR</em></strong></p>
<p>p-type <strong><em>AND </em></strong>fewer electrons <strong>«</strong>than silicon<strong>»</strong></p>
<p> </p>
<p> </p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “it is in group 3/13” as </em><em>reason.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>cheaper</p>
<p><strong><em>OR</em></strong></p>
<p>ease of fabrication</p>
<p> </p>
<p>use light of lower energy/lower frequency/longer wavelength</p>
<p>absorb wider range of wavelengths</p>
<p>dye converts most/all absorbed photons into electrons</p>
<p>plentiful /renewable resources <strong>«</strong>to construct DSSC cells<strong>»</strong></p>
<p>operate at lower <strong>«</strong>internal<strong>» </strong>temperatures/better at radiating heat away <strong>«</strong>since constructed with thin front layer of conductive plastic compared to glass box in photovoltaic cell<strong>»</strong></p>
<p>use of nanoparticles provides large surface area exposure to sunlight/sun/light</p>
<p>can absorb better under cloudy/low light conditions</p>
<p>better conductivity</p>
<p>more flexible</p>
<p> </p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>B <strong><em>AND </em></strong>has greater/more <strong>«</strong>extensive<strong>» </strong>conjugation</p>
<p> </p>
<p><em>Accept “more alternating single and </em><em>double bonds”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Solar energy, which is freely available, is indispensable to life on earth.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest another advantage and one disadvantage of solar energy.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State a physical property of vegetable oils that makes them very difficult to use as fuel in internal combustion engines.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how vegetable oils can be converted to a more suitable fuel.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Contrast the importance of carbon dioxide and methane as greenhouse gases.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain, using an equation, the effect of increased carbon dioxide in the atmosphere on the pH of lake water.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Advantage:</em></p>
<p>renewable «energy source»</p>
<p><em><strong>OR</strong></em></p>
<p>does not produce greenhouse gases</p>
<p><em><strong>OR</strong></em></p>
<p>can be installed «almost» anywhere</p>
<p><em><strong>OR</strong></em></p>
<p>low maintenance costs ✔</p>
<p> </p>
<p><em>Disadvantage:</em></p>
<p>widely dispersed/not concentrated «form of energy»</p>
<p><em><strong>OR</strong></em></p>
<p>geography/weather/seasonal dependent</p>
<p><em><strong>OR</strong></em></p>
<p>not available at night</p>
<p><em><strong>OR</strong></em></p>
<p>energy storage is difficult/expensive</p>
<p><em><strong>OR</strong></em></p>
<p>toxic/hazardous materials used in production</p>
<p><em><strong>OR</strong></em></p>
<p>concerns about space/aesthetics/local environment where installed</p>
<p><em><strong>OR</strong></em></p>
<p>need to be «constantly» cleaned ✔</p>
<p> </p>
<p><em>Accept “can be used for passive/active heating”, “can be converted to electric energy”.</em></p>
<p><em>Accept any specific greenhouse gas name or formula for “greenhouse gases”.</em></p>
<p><em>Accept “solar cells require large areas”, “solar cell manufacture produces pollution/greenhouse gases”, “higher cost of solar cells «compared with traditional sources such as fossil fuels or hydroelectric»”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>high viscosity ✔</p>
<p> </p>
<p><em>Accept “low volatility”, just “viscous/viscosity” <strong>OR</strong> “does not flow easily”.</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>convert to esters of monoatomic alcohols</p>
<p><em><strong>OR</strong></em></p>
<p>react with short-chain alcohols «in the presence of acid or base» ✔</p>
<p> </p>
<p><em>Accept “convert to shorter «carbon chain» esters” <strong>OR</strong> “transesterification”.</em></p>
<p><em>Accept specific alcohols, such as methanol or ethanol.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>carbon dioxide/CO<sub>2</sub> more/most abundant «GHG than methane/CH<sub>4</sub>»</p>
<p><em><strong>OR</strong></em></p>
<p>carbon dioxide/CO<sub>2</sub> has «much» longer atmospheric life «than methane/CH<sub>4</sub>» ✔</p>
<p> </p>
<p>methane/CH<sub>4</sub> «much» better/more effective at absorbing IR radiation «than carbon dioxide/CO<sub>2</sub>»</p>
<p><em><strong>OR</strong></em></p>
<p>methane/CH<sub>4</sub> has a greater greenhouse factor «than carbon dioxide/CO<sub>2</sub>»</p>
<p><em><strong>OR</strong></em></p>
<p>methane/CH<sub>4</sub> has a greater global warming potential/GWP «than carbon dioxide/CO<sub>2</sub>» ✔</p>
<p> </p>
<p><em>Accept “carbon dioxide/CO<sub>2</sub> contributes more to global warming «than methane/CH<sub>4</sub>»”.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CO<sub>2</sub> (g) + H<sub>2</sub>O (l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup> (aq) + HCO<sub>3</sub><sup>–</sup> (aq)</p>
<p><em><strong>OR</strong></em></p>
<p>CO<sub>2</sub> (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> CO<sub>2</sub> (aq) <em><strong>AND </strong></em>CO<sub>2</sub> (aq) + H<sub>2</sub>O (l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup> (aq) + HCO<sub>3</sub><sup>–</sup> (aq) ✔</p>
<p>«increasing [CO<sub>2</sub> (g)]» shifts equilibrium/reaction to right <em><strong>AND</strong> </em>pH decreases ✔</p>
<p> </p>
<p><em>Accept “H<sub>2</sub>CO<sub>3</sub> (aq)” for “CO<sub>2</sub> (aq) + H<sub>2</sub>O (l)”.</em></p>
<p><em>Equilibrium arrows required for M1.</em></p>
<p><em>State symbols required for CO<sub>2</sub> (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> CO<sub>2</sub> (aq) equation only for M1.</em></p>
<p><em>Accept “concentration of H<sup>+</sup>/[H<sup>+</sup>] increases <strong>AND</strong> pH decreases” for M2.</em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Coal can be converted to clean-burning synthetic natural gas.</p>
</div>
<div class="specification">
<p>Automobile companies use hydrogen as an alternative to fossil fuels. Some properties of fuels are shown.</p>
<p><img 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N21r2J/jSOIMeFlE/I7ovLzoPtEFfKM18CYugjZ2fehYIv4uSP6mDBtsi/bkOe0qQlE/0X8VEw09PTe8ixewNkL2lXpEzB9yrVeI3LaTCSLH4IyDsNMLNlgQWURH8U4jup1DyA7OxtLUo0Yo8zZ7hO5qZh3/wPiKITU+3IejXteRQOSkL8ivYdetU6cqCiAcYwRqUuykZ39Y2xpULZZCLHO6JOcket5X83zonCPbvg5YjEe9//0p3zSOU40dWDLcy9oBL+Kc6dbQ1gMGKpBeV76uKT5nxrGvIM/yCIkdWGJ4r2Xsqb2Viv+/X5d53HhU81MRP86zvMpzp/kZcJfn942T41x0q24v5DPHZc/BDuPYE/5fkDIworM2d76QA0QxRd8rvw9P8Lmd5xij3JznRUWsT7ju/k8j1cafUcN4pNnYpqaXf92O7T61fvhp0YU1ovBjr8/wvpbcv2JQxNmAm649Ztij93J/e/hA/+vBHyM+tJ/R9kbDWgRn43FxKmS2qShWE1UFztwTuyeuh7JM7+oeTCAy5ON+OCUptdDTUOK0zBxqmQU+vvDJXSc6xI9+b5oA5DFJ6iXg+toG86q9YUHFzvO+/XS+QSM4hsDJt2YioV8GkJJCcpdwb6ivWz6/I6oUyr49IeXYN1rh9PdBbtZnLgRyE734ybQW/S7eHcckBaZfAFTpk8Rs6XfMAYZ0ukBhEGYh7zN/Mu9A811e2G1vgozH9Zq2ITs1W/0cRWpAbFfvws5GYLUY27/Mw7wDxZhMR648/qgDZ936kYGiiyvY6/dCffndpi1xnIPeRgpjz777Cy2/GInJl5/E36cOV/M1rXxd2L1ndcDf9mHsV9JBN8bVPq7BOepZulSWVGrWaXtbraAf1YAIa6A93yMtqNOQGc1vZQI/T8gAtdOwXRxKbQJZnuXNN1Fo6+AHSb86zjDtZgazyNw4mibdkqSt83zyjcFX787Cxm8zt79B9gPv40aFyDkZOHOuFAWo3ljitgrdYsx7ZZhkzBnQRbyn9ko1x2B0/t82yb/dju0+nWscTakcdHzuNClLBoKH6nBjr8/kobZADVg0rwlKOTd1g2FWLzyV96VseJGqf+BBzdtw7r7lmG1OA9sPBJu/65Uodm24plKeV9CzxnUP7sZW/iHmelupCWGazD0EGos/y0Zv1weS5VYgCB8E7feMAGGhNuwlDdyfHXwM7vlbvYrcNVvx9PisNMiPJwWj7Ew4NopU6Wh8YP1+NMZvvqX+6vA89X92UhIy2E3KhvOiNMXPK4/wVK1T7MXWX9UHMFhvnIT7hB5cxn9v8AVubVs+viOdDvRfIy/RF/C7PkZWHJPCr7yzz/Bul9uYJUkRtUvXxX+Kzyz/nVAnT+pzO8CTpb/EtUn+O6s/H2WdwTocZV5IDzPmVoUiAcKZKK0vgsJC+5BVta9+OE9d/R/OolhFm5fylehHoKleJPc8N2J1KDzdJWhXz5afAPmZ96Ne1K+hH++9yb296eIBmYzalz2v1qOv3/0CXKKnsR1X/iCLPdUrHz0IUxEG84YbsSre38ru3t7a8KxAl6Z1hQwehE19CJcUHV6SgPKn7NKbRZvP0ulFfG9rkxXy5ULtprdaBB3stC2eb75V9tI2w4Ub9wDF1KQk/m1gQ0N+yYxvHcqTxds6zdhW6Oykr0TJ6p/iXKx7khB9q0zfeeJ23bDsveEuK+ytt0Wsm/FDWNDrF/V9vAQair/IO/SIo/i8PnCmRV9/HD3QznY8fslF9Kt/xqnYKuV/P31dO922liJSZBXgmlWcsmru4TcStakrITtacUsvKvI1FW72tXg6mpNEzPbpXXsjHlXhakr8dXVYIGyAJrV0KyHVWI+q+WDrTxMYSYTXyWstwpeWYkmkVPzo6yiD7oKWZZZm++e4Ad5Fg69Bok6dGdVDwoLzYpDddW5jv5CfEcCVsHrMhXYbabbxJXR6uppRa4BMg4dRGg+B6QzJU96KypFN+3qdsZY1zFmCdhJgr97Wn/KylzN+82zopZDRa89rILXljdVRiUcY8puCDzv/J9ahvlCfZ8dDe5jlubPegTp618p+0oZ9e6S0VOaPSag83BAOtOJb+BOn7H0rxtFlmcvXvSNzt3Evj1jAgO+zf5fcgr76KOPNLoMxwp4N+sQdzDwsvYVIDLuhk5n3rpNeb8Df5WyFWpZ62HnFr1V8Dp1nG45CVgFr+jKb2eJUHdCUIKH4Xew9aXLQ1OPeu0XzYp0zXNVp+rK9VDr157sjwxWUtfO3AGr4DlQjRyKPcGdA+rXUOIPg4J0ogimszD3gEo2r0FYiI37GlD3uhm54vCAbAubimDZa4fjlTx5gQ93n4KUtbvQXPeaNEQneuVDphbUNe/C2hRpaFCOYYA/K/C6/ZA8N433jOTCbLNiW9ZMeRjPgNiUNdjX/A5eFzfNl5Pjctc1YN/aeeqke0Pc97FhX7V3krLoZweeWKSz+iwUqQ0zkbXNKm/WzwMkIdf8Fv5Wt0kzVzSUiKLJj7d3U8jpqTern++Iz1xEziUDRZV78cbO/xAXzQRO0I8mdv2XVcg1w2q34ZV8edEfj4pPvN9uRZ2Fb1Iv/8nlY7vWn/Ksx19FXxZv+eD+xTKiLW+BkRgS7sLT4u4U/JmA6+GGMmnGEPcdPCAuRuKq7GHxkRytXhmttP8GO1ffKS6QqjnwV3FVaU9pBkoYXS7v215C3V+c+H/JKfjFf/4nioqKvP8es2DSzBmYgD/gk6/eidf27gXUOYV6IxLncPzdIyKAwN5RPS7y/E+kYv6N4azH9dIarW4GxM7NwfaGOnWOIich5JbD1rAV+XN194fwgWWIW4JtDW+p7a8U9gU88nXtXt1KkHGIuzNLWrw70hYfyVk0xGXhZYcde7V1oQQV5tffQcP2HI39IgfKfRV2u9cekBhuRJYyNSGk+pXbHyuxy25VdSEly+vrSmyQFyfLKfbjZ7Dj74dI/sZqMEvV319U3Qd8CUSV9GERdkTqNSxkIjcS0pmfbtReWr3eOT+/w3QbWTrz9n5yuXr7l3jrN1jnoY3yfsveXmkVpdrTreHf1cSsRRly3BmsyNrk3TNR2SNyGHrJVJlDuIgsnYUgcFi9aHplfXrsDjOzOIqp9MgqiWp7XHsfhVBChfM3cvQVpOcxnJkdIXEF05myLLsfpisFIQJEgAgMAQF+oocxG9VKUkIJiu+dE3TxkeKNfsfj7SNn+oyhlZXohxmbgrWtDGvVp5fQsudJZNfcAGu7FfMPP4ZvZD+JxOZq5M8ZD8jbYOWr/uki8ghMQGLa3TChAQ2u7ciesd1XRGEl7pn/FfnUn1XeE3d4L2vRw7iX65n+iEA/CQzKEHw/ZaFgRIAIEIFAAtptnvim3A2PYUHQxUeBwcllsAjIW6RNmIWZX4lFXNYLcLI9kvE5WElSvGEmoD8sy6e/iNPgGpRhZO3WgdKhKg1PmEbO4qMwU6XoQiMQw3t4tV5jYmLErRy0bnQd/QRIr9GnQ9IZ6SyyCfBzwHORWABYmitxb/sGzE23IafuLWxeoDd/MDJzQ+UsMvUSTCrSVzAykeseTGfUAxq5OiPJiAARIAIRTIAfW/gUrEUdKEi8FpPT92Fh+Tb8+4g4kjGCsZNoRGCEEKAe0BGiyN6yEewLpLdw9Hz4CJDOho99f1MmnfWX3PCFI50NH/v+pEz66g+14Q0TTGfUAzq8eqHUiQARIAJEwIcAH9q/HzExD6PWFf4TYXySohsiQASGjQAZoMOGnhImAkSACBABXwKdaKl9CisK+Eld9EcEiMBIJkAG6EjWLuVt4AQ8J1CRaRz4MWgDl2TYY/C4HKgty4ORHwsn/jMirbgC9S386E7+1w1HWZr8TPGj85tQBsdV4KqjDAlqXL7+jHllqHUox+DJ0ev8eFoqkBmjPbdZxxM5RQ2Bq46XkP3ba5CZmxQ1MusL6i0LCWUODE8/7lW4ah+WymNerfdI5+4W1L9Rhoe3DqFcw5GmvmLINYCAMuJwPypalGM/AjwNigMZoIOClSIdMQT++Xe8a3MhtJNfRkyuAzLicR3E+mWLkb2u2tuQwYWGLQVIT1yGMseFgDADcXBVr0N26o9Q3mO8V/HP442wQe/UnoGkHsFh+Z6ootHet+Fp1diXjf8hz2GIco9NWYtjVf+BhcnRs4p+yFkOKMFuOF5cgfT71uFt94Ai6kPg4UizD+KNeq/yCWdCAmZNHzekNMgAHVLclFh0EfCgs8mOg0hBTubXRvGed5fQ+vuXsanBBQj5sDR1iFu1uZ02lJj4Wbv7sa60Fi2eWKSsfUd8xnd3Y5/bYY7nGjfBbO/yureuRYr2CIxcK5zcv/zP7TyEcrEHbD/K9xwRj8vUf28uoOmwHRAykJk6Vd8LuUYggY9Qm5cQ2FM+XMZxBBIKj0hjIWS9KJWrqixoT8UOT/wUy4gg0PkhDh88iZ6Pwx6cnJIBOjhcKVZ+doYyxJrwLOr/fgBleclSo5NWilo+bNvdgoPqkG4miqsa4fJo0Pk850O0ycgrq4XDdUX25EF3Sz0qijM1jVkmiivq0dKtiYgP/1QUI00d7vUfOtak6XN5BWfbWuHCbCTOiPV5Mrpu5A3HeaYn3IibE6TzpQ3Ct7E853YJxbFWtGuZDwCQQZiPH9zzLTEG19kL+DRYXJ6P0XbUCSQnYEYsVWXBMEWe+/XIqmpVPziUDw/m/2ESeYIHkYjXQ5r6zZiHsoPN6Ajw7V9f6dRDmp7iNxx/1kx5SUbe1vc19aN/XLx+9K/7/IfgueF/C1LXNYiSnVyXin+JScOzFWXIFOtG/yFYZWg2Bsbi+uAfgj3W0/ppljm6A+hEjkMnWuorUJxmlNuVnrjugsNR623bjHnY2ug3dci//UkrRkV9C7wElA+yNDxb+wZKxXQ104p8+Ert5EeN8vSlhDI0/p1PQ+L675/+PGfbcNQlIDnRiCFv5fyPGg12Zqe/P7qPLgLDodfP7Wb5XGmdc6hNK1lRbpLf+dQprKjunATW3cas+f7PpXiEfCtrdzPGupTziv3jF5jJfFg+k/oTZjcv8ktH9m8qZ/YuHlGQv2E+y3o4dKZP4jPWbLlPZigwU9FLzFrX7D3zWz8QY+rZ4SZmtncF+FLfj1wrc2qeup2HWLn8bsSb7exzzTPtpbvZwjKgOZdc+3CYrgddZ04ryxXPdVfOar/MnHU/YybuJuQzS1OHbs5V1vFmZvcD6n22idX97S1mVsqlqYRZmzsY62pmNnMuE8R0M1hR5WHm9Ck2Hay57jVvOPB3xMLqeFjlL0Bu5YHer3I+uZJHPT/hcxuoztztVpYv+NdB3nvlHQ7qT6s3lZM3PJdP+qd510Oq+/zPKv8Hs+bG+9WFvGyeYnVFKQz+ZUmp/6Cpl/2x91pPB0szsD7wjzrY/UD1FSxeyf0ya7eulN91hbv0K+RWsiaxvdBwVXWj9XsfszR/JkUXlE8Sy7Uck+tQPUYyc93wSWxZ7hJJRrE8n+u//phSt2tk7hlQv54G0xn/CvX5C+bRxxPdRB2B4dCr2rBBKWxu1mUvlxpLgKkFWlOZqpW1aFyAQTUSNRWD3Iiq8QslrK6Dt4ja+OUCpRpBmkpUTU9ToetptKOOFQlgQlEd0zSlej4HxW04dBY0I13HmEUxTDSVrpBrZq/vtfsZJHIsKvteDFBNfDzP6j9hJbO2Xw4ikpt11JUwoafGMUjIwXQedJ2pBgo3zj71Gp9YxMz2T4JmTS0rPRmgWvbKdW8fiqyDNVnydRtsaGXykdvPAg4q9dA8GJjOlMaf11U/Y3VO/r5eZs7DL7Bc2SiV6jTFn1IX8rx52al1jMqJG/FW1swNHq0RIn+sqfrsqe5jGkNJ/chTjHswpa7l9aZUlsCQYWHN8seF9IHn6+avEdVPD/U0Y3pp+scU+v3A9NVLOnKd7/Mxp9Z9Shui4YoMVmRtEg1J7wdGPMu1/kNsjxSualvH26imSundUHWnMUAVju5PWdenbqbyRQYrqWtnYivntKJCRYYAACAASURBVLESkyDVk2J57r/+GJPfS1WWXvj083EwndG4VeT0+49cSYTFyLv3JsTCgNibv4NF4rzAFOTkLcJcPnQaexPSFiX65N8wJx8HGIN713fQbtuL2oon8GD2dmkBzMXz6LjogWH6bNzBJza5NiF97kMoe2MvbKcTUea8DKacSW24DrPv4CtqHdiSnoa8sl2otbXjhjIH3MyJA/lzoV8IPOi0v40a12if/ymrJTYJ+a/YYN/7EorEeZ+SO18sdN+SVKQ8VIUTYRqCDzyH2ufVkG/Ow37ABteonf/5OS4cfxWPPfgzNCADJXU7UJgyRQ9UH9ySkGs5hi7mRpe9HCYesmE7arAWTV1usK7DMIu6d8B65LS4stvT8gbWFFTABSUsA3O3o64kQ5obvPYVOML2XvQhK0PlVZkGgnjkrs7HAoEv4hgHYd5S5OWkeKW4ehpHrA4Ax1FdkIyJ4pDpZNwosgNcNW/D3qmZNoTbkVPwPczh9aMhDt9cJE1JUSIMqe5TPPf6a8Ck1DuRw+tS21s41MpXQl/AX35XCxsEZCy9DQn6lSRCqad7TT6CPFz98AisLt6mVKDgxsnSEPzEZBRUHxfbkJoDf/WdipCxFAVL5opD14a4b2DRQrFxk3N0ER8e+ZPYZrmql+PGiWMQEzMGE29cjmoxDRsO2M9rci8gI+cufF3U+QTETriC1kNvwcZ9ZCzFclOc2FYZhHQ89sRyzZze/usPnX/FgRrHsMz/5NkK8lppmNAlERgogQlTMXmC/6s2EdMmjw8ec/dxVOQlY4wxFUuys5FdsAXSzCU+D1GKzxD3fWzYVy0ZRK5qrLsvG9nZi5BqnIW04lppHqhhJpZssKCyiDeIx1G97gFkZ2djSaoRY5S5qLpS0PzPACwGASn3/Aib33GCsQ4011lhEbkCrurn8UqjtjINCB3cwW8REmNOvLM5HwvmSHNNdQMqDf+onf9ZgYKMH4sNmZC/AivlxkmXVaiOff5QvKRpIB/F48uTpDlkhjgseKwYRdygafgd3mm+GKoE0efP8ynOn+TWxBRMn/IFjfzjMXnaRO/9udM4dtJ7G3DlOo8Ln2oN0KmYMlFZqTcW02YmQGvahFT3BSTSg8OkW3F/4SIAh7D7UBs8nUewp3w/IGRhRebs4IZCCPV0D6lG2KOrOHe6FT2qyX9O+vQpmKg2bV/EzOTrNXn6BKePfaS597+8gLMXPtM4+u/m4Z1777sLiwETJk/FBE1I9FN/wzr/kwxQrQbpOnIIXELLnqekr05TESzW/bA7L+Nzu9mnEhZ7GlJyJIOoqxl1Viusr5uRK/DtgVZh9Z4W8CrdIMxD3uYDstG0F1brqzDzVdYNm5C9+g20aOt9BYKnDYd2HwLi5+Hm2T0Yyor/kfzbWY9iI5/krpkYj0mYsyAL+c9slFe6e3vFhgKFp/WP2G1zIX7hzZitNgBDkXLkpeGqqMCv/xKGbbD6/KHobSAD9DBhMqaJLeRHOHb6k8iDFi6JDNdiajy3tJ042vaxWN9IUV9Cx7kubyrXTsF07s1/Rwh194cXkSUoBqc3WPCrcRBCqPuCh/d/MgVfvzsLGXDBtvsPsB/moz+AkJOFO+OCbc0Taj3tn1ak3htw7ZSpUs9ivBn2z707c6gL5fq0m8AXMGW6NCoRb7bjc1XXSrytqMrSGqz+nTJjMXHqNBGW62gbzqrtlAcXO87D97Ouf/qTelgTsfDmGcE/MgZRXaO86h5EshT1AAh0o735lBhemD0fmUu+h5SvnMN71oOar9MrOFO7StoUPe3nqO+ahQVZWcjKug/33OXdxNpzphYFovGUidL6LiQsuAdZWffih/fcoRnC0BG124nmYy4I2bfihr60CzpRRb3TpK8hUxxOdMG2fhO2qas8O3Gi+pcoF7sMUpB960wMDSoPuttbcQxDmWakaVGAyfwntNeVQFC3weIyDuUG6N4G8uTBD3BKbSABXOzAObGFvB7JM78YafDCJ49hFm5fyneCcMFWsxsN4g4dV+Bq3I2qGj7kLv+pZagB5c9ZpekqnjOoL5V28OhxlbkSh/obWt2neg/xwpBwG5ZmCIBtB4o37oGr1+3nQqmnQ0w8IrxphrJPVuG56uPiSnW+B7K0Mj0VxfUf90HSqUjNzBDbmZPlv0T1CX5gxxW46n8u7chiLEW9z7QL/6jHI+H274KP3cG2G5UNZ8QPHI+rDs8+XanZj1kK12/9Cd/ErTf49Kf6CzJo92SADhpairj/BCYhcf6/iQXXVZGNGWNiEDNmBtLfvQJxCpo4B3Qs4jJyUcgdGn6GdOM10nydMbOQXXFcHToaG7cAPxWHlmzYlD4DY8S5V9dghjifNAn5K9J15jcp8z/jsXD+DaN4/09Fg9fB9Egp8nkPjqsahfONMkfvHDYhdzUemjdUe3HK8z+Rivk3DnTeo5LHaPu9G6sfSEWcaQVeyE8CbFuxee9peKAxCve/ifdEg+gCPninQfp4+9ZsGMP2laBtILfimUqpwQY3rJ7djC18ZNp0N9ISh6dxGxqNjkdC5g+ksqHWQ9fAOH+VNM9PFWIq5j20GrkCL0LyfEBep22yiXvrbngotQ/1zLiQ6j79xl3zfsjbMKlbIhlmI3MF3y/UgYaGk0DGT1Fg6ulAgFDqaf5V0kOaKp8IuZiUioc25EPQzNUdY8wQ90Duex1nwKR5y7CBj7apc0qvgTGdz9tOQu6GZZg3SV9LCg1DQjpW8PINb/s1xliI01+dH9iB0lf9yfM/sTAVN/YihyJPuH97zn24U6P4iEBIBMYhbsnj2FdZJC2EgABTUTXsb/x/WM0nebvkydux87B2XwPqLIo/Hjn3a0Fdw0ZkiUNHU5Cydhea6yw+i2fAh/brrNiWNVNn6EGZ/3kr7kiShkBCEnsEezLEZeFlhx17fVhz3Lkwv/4OGrbnSAvKhoKBMv8zYx6SvhI2a2ooJA9/GobrkfHTfJhwHBXP1+Iv3eN0DKIvInXdfgCLYH5kQWDDNQCpDHOysNHM5w5qFtcohhVPr+whpIzwPVoNcUuwreEtaVoPZ8nLhM2OOrO4jEuma0Ds3Bxsb6hT501LXstha9iK/Lk9zHfW009IdZ9ewPFIuGuNfNADf34t37FZ9jgOcXdmSYuRell8JAUIsZ5GT2nqyTicbpMwN38rGnzaiyTkmt/qXx3HF29ut/q2UeL7YcX2fHnOdE/ZNcxE1jYrbOZcqdwqYR/5lu8cUDGOvulPmf+ZccdN+EpPMgzmM/9V9cGWy/v7o/voIkB6jS59cWlJZ6SzAALqNj3aPTKVvW6VbcXcrKtZs5+nuOWZmVntTnEbF/841S19tFs06W6hFWw7nXDvA+ov4eDeUzlT+Gq2CMLg7guppNif39GkL7VsIonlW9vk8quUdzCo22txkpGrv2A6i+Fiaw3cmJgY8YQKrRtdRz8B0mv06ZB0RjqLPgLRJzGVM35i0ioYs3eoyhOK6nBi84I+TAtQgw76xajSV3cjyhYvwTp+DHLAXxLyrW/i5aw4/DPC9RdMZzQEH6BUciACRIAIEAEiMFoIaLd54lOYrGh4whSRxudo0Yiaz9h5KNy1D1ZlCF554DOFLHr1Rz2gikJH+G+wL5ARnu2ozh7pLPrURzojnUUfgeiSmMpYdOmLSxtMZ9QDGn26JImJABEgAkSACBABIhDVBMgAjWr1kfBEgAgQASJABIgAEYg+AmSARp/OSOIhI3AJLRX3IybmYdS6lK1KhixxSigkAnzT7+3Ik09qUo9gDSkseSICRIAIjDACnhOoyDQiJq82YLP6SMspGaCRphGSJ0IIdKKl9imsKHg9QuQhMXQJXD2GV5etwsG7rPhH0waM0xzBquufHIkAESACI5VA9wnUlqxBgU1v1XzkZZoM0MjTCUk0qAQ+Qm1eAmJiEpBX+1HQlK46XkL2b69BJj/Fgv76T+CqA2UJ/Bz5NKgnrvQ/tsCQY1OwtpXBaVmCL37agSv4EmZM+UKgP3IhAlFB4ApcjlqU5SVLJ7uJJ7dloriiHi3d8lmnapni5Sr4v4QyB65qjmYN9JuMvLJaOMTTsnqCo4wE3Y+Klks9eRxlz/j2VQ9LOuhTb+NgHZfbDceLJfjtF28TT9yKBmWQARoNWiIZh5zA2JS1OFb1H1iY3NNRdEMuFiUYjIBrL1amFqJBuAOL5gs6p1sFC0juRCBSCPBzwjdhWWo21lUf1whlw5aCdCQu3gaHYoRqnvb/8jiq12Ujddn2XuI9h+PvHgGEBMyaPq7/yVHIQSYQi5S1v0HV2u8jOUpOvyUDdJBfCYo+kgm4vV+wPj0Jg9RbF8koIl02Vy3yfHQk9fxIvTz8+MMsVLmbYEmuRXb+TrTInUWRni2SjwioBDyn8PvNO9AgnuZZiaYuNxi7DGfdz6QjiRvMKN3TAo/c68/PkOH/PrebEc8jiTfD/rnkxt1b16bAe1BtPHKt/xD9S+Euw3n4BamnrOFV7Gk8r4oRcNH5IQ4fPAkh506kDtOZ4QEyjWoHZRTPr/c7oQyOKFuqQAboqH6RBzvzHnS3HPAOJ6UVo8rRgsayNHHYQjUeZDGuOsqQwI2MhGdR/3dtuFLUtnQC3S04WJYHo2iIZKK4qhEuH0OjEy31u73pxRiRVlyBeh5W928MhKwXNZWyUnm/g7UpsbohRpWjDu+PGhUd6VV2nWg5uFVeEBQDY95WHGzxa9jU4cM0lNU7fPVZewLd0MbB9VcjDRFyA1NucJWGV2xkf9yBx40xMBbXo/NiJ85fGVUaosyOJAKeT3H+pDR3b0JyEhJiefM8DoJpKXIyBAAuHGt2ojsseR4HYd7duGchN10v4OyFz4LGqpwZnpxoBNWKQTFJDzxnUF+aKbZvxrwqnOhXj7VOHfjR+5qpTF9EVlVrYLvVuhYp3i+OXgSNkMf+Z7EGO7PT3x/dRxeB4dCru93K8gWIZ5rz9MV/whKWuyxJvI4329nnGozec2/9wvCwppWsKFcKp8aFFFZUd06OoYM1WfKZoKTj87uIme2fyP7+way58QyIZ7nWf2hS17tUzr7Wnrut529w3IZDZ2pO3G3Mmu/PO4kty10iMdaeGy4GuszarSuD8Of6NDGzvYsx9YxxHR0jgxUWLQuIQyiqYx2qYP4Xl5nz8AssV37PhNxyZmsO7ts/dLjvh1Vn4c7MKIkvYnTmbmKWDEGuLzNYkcXK6kJ4l9V6M6BMcgUqdZh/factN3LZ1NX3Z6zZch9DBJ0NHzH6Yp8zp3WFpC9+Jru7ndWVZEj3pnJm73LrEvXqBMy/DWRMvx4VluWyZWId15Ou5OSUOtbnnPggogyRczCdUQ9ohHwIjDwxLqH1wGuo4B/0pp+hznlZGk7aeQv+sUs7v0kv50nItRxDF3Ojy14uDz9tRw3WSsNSXYdhNvEeAQesR06Djzp4Wt7AmoIKuKCEZWDudtSVZADYj3VrX+llnpOeHHxOzTtg7EVkCdH2aamXn9DdPK112FHB9ZSBkrp2uBmD21mOmf84rL+1R+chPLdqO1wQYCqxwenm/J04XJ4Lrim9PyFXHmZU9WlDec14bGjqAGOfwG5eJAZzWY/gw6BDS7wnZyWqnFLvtbPqUSycM0kvOXIjApFNwDAH92/bJC8g4fM+s5GeOBkxMXyx0C781uGCz4BPn3JzEtXZX9UsWroGxvmrUO0ChPzV+OHXg/VtdqO9+RTN/+yV9f/heOWTeHCTTWrvdq1EitiD3WtAXw+eUziwg2+fpK1H27Fz5lnsCnVhuzJFoyoraN3rm+jw3ZEBOnzsR3bKnjYc2n2Iz2ZCRs5SmAQ+eX0chAUr8URRSs95FxYj796bEAsDYm/+DhaJE5xSkJO3CHN5oY69CWmLEjVxXELrobdg4y4Zj+Lx5UnSUJEhDgseK0YRt4Aafod3mi9qwtBlcAJankux3BQnLuoxCOl47InlupWaNEzHY7wbq1enQeA1i0HAvII85OhaoPr6FHIewL1zuQE5BTenmaS5bcEFpSdEYAQRMCB2bh5ecdix11IkfXiLueOLhR7AktQMPFRxPExD8DziDBRZ6tCwbQniglkCnX/FgRoHzf/s7S2r/jEy5A6Q/NXL5faut0CBzz2tf8RucQul25Gz/NtyPappxwKDRLVLsNcuqjNFwkcAAXU+kxG3zLpOsyp5PCZPm9izgBOmYvIE/1dzIqZNHh8k3FV0nT8nPotfeDNma4NOmIxp4orAj3Ds9CdBwpOzLwEvT+GWWZiu8jRgwuSp0Ftg6ek6j5M8EmEqplyrBgBU/r4pAPr6nDBtsm78/qHpngiMVAIGIQX35G/GO3zOc1cz6qwvoUgc8TmO6vW70NjZn35Q/0VIfMTgADbnL8CcHnrqaP5nX9+y46h4vhZ/6dfcT8Bbj/rtOBC0Hu2rfJHlX9NSRJZgJE2UEzBci6nxvOvLiaNtH2uGji6h41xXmDM3FhOnThPjPHnwA5zS1s8XO3BO7Pi8HskzvxjmdEdqdF6erqNtOKvy9OBix3no9SMbJk6VeitdrWg7q1kJpPIfqawoX0QgHAQ86KwvlRdYavbbjJ2DBVk/wjNlhXL5+hOOfKhXAsMhg38cykhIIhbePEPTieDvj+6BRTDbm1HHR/eU3Qo4Fu2iS0fvy8dGWz1KBiiVncEhYJiF25feLq7ctNXsRoO42THf5247nt7iCHOa45Fw+3fBZ3vCthXPVMrDVHxF4rObsUWch3o30hL1+u7CLMqIiE7LczcqG86IHxAeVx2efbpSdw6oIeE2LBVX6h5CTeUfpN0JPC40WqpQE+rcpRHBjjJBBPpDwIBJqXfK01Vex/pnLGhUNojvPo7q56rkEYZv4tYbhqoeU+Z/DmWa/WEXAWFy8/FAyhyYHilFvuCCbf0L2HvmCqB2xDRjv/VPUr3Y/Xe8s7+Z75uFb83+smarLEC/HtW0YxGQ1XCKQAZoOGlSXBoC45GQ+QPki/Mvf4Z04zWIibkGxgeP4qvLwn+6kGFOFjaKi1aOo7ogGRP5Vk1jZiCdTwrnX6dlD/VvUrgmR6Pp0pCQjhX5XE82bEqfgTExMRhjLMTpr87XnQMKw2xkruCT3l1o2JQB4xjO34j5hdW6ButoYkl5JQIhEZh0Ox55YaVYvlzVqzBfrDNjEDMxGQXixvRJyN2wDPOGai9Oef4nFqbixqFKMyRQkevJELcAPy1cBLhq8fyvj6Jbr16cOB/rGlyAaSUeyYjzzYye/zEz8ODp6VimO5feN3i03ZEBGm0aiyJ5DXFLsK3hLZjl4yyF3HLYGl7AI18fjNOFpiBl7S40172mpscXQJmKLKhr3oW1KVOiiFwEiGqYiaxtVtjM8ip2IRdmmxXbH/lWkDma4xCXtRENtnJ5FS8g6vtvNpjFRWQRkCcSgQhENAFehsrhsO+DpUgcz1GlFXLNeL3Oiu358gJL9cngXSjzPzPuuAlfGbxkRljMU5Dy8JMwm4CGdWXY0+IJqBfBd2oxW2HXXSnvX49yv2+hYftKfH2oOr6HUiP+20AF26/J3x/dRxeBodersv8cGISVzNp+WQLWdZiZTXyvO/996aKL51BIO/Q68+ZK3VsQSSzf2sakHe0+YXbzIu++d17vdCUTGE6dkRL6R4B01j9uwxVqROtL2cMTYEK+lbWLFa+bddnLmUnc23p49qQeqK6D6SyGR6w1eGNiYsQd9rVudB39BIZerx50O7ZhMT+fWw+fsBLW/ylHVhydLayHh7sNvc40knQ3omzxEmmoSOMsXSYh3/omXs6aSQsT/NgMq878ZKHb0AiQzkLjFCm+Rra+LsBR9iBS1+3XxS3kW/E/L2cF3zZLN9TwOwbTGQ3BD79uRqgEBsSmrMQuu1UzJM6zKg+LN2wk4zOSNR87D4W79sGqDMErspqKYKmzYhsZnwoR+iUCRIAIhInAFKQUvgy71axOZZIiDmHP1jBJMJTRUA/oUNIexrSCfYEMo0iUdC8ESGe9AIrAx6SzCFRKLyKRznoBFGGPSV8RppAQxAmmM+oBDQEeeSECRIAIEAEiQASIABEIHwEyQMPHkmIiAkSACBABIkAEiAARCIEAGaAhQCIvRIAIEAEiQASIgEyAHzKxNU8+uSkTxbUnwnhGPVEeLQTIAB0tmqZ8EgEiQASIABEIA4Grf3kVywqP4C5rE5osk7El+0nsabkUhpgpitFEgAzQ0aRtyisRIAJEgAgQgQESGJuyFq3sGCxZ0/Hp+YuA8GVMuZbMiQFiHXXB6Y0ZdSqnDBMBIkAEiMDQE/gItXkJiIlJQF7tR6Enf9WBsoQYxMSkoczRHVK4q44yJPDjiBPK4LgaUpB+eLoKV+1j4p6Vwl0LMF+gPZ37AXFUByEDdFSrnzJPBIgAESACRCAIAVct8rgh6/cvocyBqxgLIetFuJstSK5YhfzKE/AEiYaciYAeATJA9aiQGxEgAkSACBCB0U5AyEIVY+LpiPzQROmfG0duteKrMakorv9fXOzqwJXRzony3y8CZID2CxsFIgJEgAgQASIwMAIe10GUphkRE5OMvIrj/VtJ3t2Cg2XKivRk5JUdQEuH37i7dhi/3qHxr6xg70TLwa3IM/LeTiPSimvgcAUzKw2YZFqNveX/ipr0r2BiagW+an4Fz98/h47mHdjrMOpCjx11OaYMEwEiQASIABEYZgLc+Fy/LA+bGgCT2YLt+UmI7atMntOoXZON7IrjcsjjqF73XVQHjacB69JTNU9t2JK9BleLrsOvt+yCS3ziQsOWXCxGHE5sXoBJGt/qpUHAvEer4Hy0SnWiCyLQVwLUA9pXYuSfCBABIkAEiMBACFw4gsrHCiXjs6QKuwrn9d34hAedDTuwSjQ+M1BS1w43Y3A7D6E8NymodEJuJZq63GBdh2E2CQBsKK8Zjw1NHWDsE9jNi8SwLusRfOjXkRo0UnpABPpBgAzQfkCjIESACBABIkAE+kfgJKoLlqCg+jggZGH1yjsg9KslvoKzba1Sr2XuCqxeECcOgRuEb6IgbzG4aRn4l4KcvEWYG2sAYm9C2qJE0YuQ8wDuncv7Oqfg5jQT4gMDkgsRCDuBfr32YZeCIiQCRIAIEAEiMNoIuGrx/K+P9m/uJ66i6/w5kZgwfQquVdkZMGHyVExQ77UXEzFt8nitg3g9YdrkIP4DvJIDEQgbATJAw4aSIiICRIAIEAEiEAIBUzns7TYUCS40rCtTTxHq2/6dYzFx6jQxMdfRNpxV90Dy4GLHeVwMQQzyQgSGkwAZoMNJn9ImAkSACBCBUUYgHrmr70VK3B145IWVEPA61m/+b5zxAIaJU6Xh75MHYX3vDDzwoPuD97D/JEeUiNlGbe/leCTc/l1k8Ee23ahs4P4Bj+tPsFTtkxcUjTK0lN2oIkAGaFSpi4QlAkSACBCBkUFgHOIyclFoEuCqqMCv/3IBhoR0rMjnC4hs2JQ+A2NixmBiaiEaIMBkzkeG4LtxTaD/GIwx3o5CPr+U/ohAhBMgAzTCFUTiEQEiQASIwAglEJuKh8vWwYT9WFdaixbMRNY2K2zmXO8iIiEXZus+/ZXyBn//Scg1v4W/1W2ihUQj9JUZSdmKYfxoA80fP3LLz0nzlC6jlQDpNfo0RzojnUUfgeiTmMpZdOmM9BVd+uLSBtMZ9YBGny5JYiJABIgAESACRIAIRDUBMkCjWn0kPBEgAkSACBABIkAEoo8AGaDRpzOSmAgQASJABIgAESACUU2ADNCoVh8JTwSIABEgAkSACBCB6CNABmj06YwkJgJEgAgQASJABIhAVBMgAzSq1UfCEwEiQASIABEgAkQg+giQARp9OiOJiQARIAJEgAgQASIQ1QTIAI1q9ZHwRIAIEAEiQASIABGIPgJkgEafzkhiIkAEiAARIAJEgAhENQHdk5CiOkckPBEgAkSACBABIkAEiEBEEfA/ZXOsnnT+nvT8kFt0EQh2FFZ05WJ0SUs6iz59k85IZ9FHILokpjIWXfri0gbTGQ3BR58uSWIiQASIABEgAkSACEQ1ATJAo1p9JDwRIAJEgAgQASJABKKPABmg0aczkpgIEAEiQASIABEgAlFNgAzQqFYfCU8EiAARIAJEgAgQgegjQAZo9OmMJCYCRIAIEAEiQASIQFQTIAM0qtVHwhMBIkAEiAARIAJEIPoIkAEafTojiYkAESACRIAIEAEiENUEyACNavWR8ESACBABIkAEiAARiD4CZIBGn85IYiJABIgAESACRIAIRDUBMkCjWn0kPBEgAkSACBABIkAEoo/AwA3QznoUG2NgLK5Hp17+xedGZFacgEfveahu4Yon1PTI3zAQ6ERLfQWK04zi0V38+C5j3lYcbNF9szTyXYHLUaMJZ0Ra8cv4rcOleec86G6pR0Vxphp3jDEPZQdb0K2JiS41BDwuOKqKkRYTIzPLRHHFm3C4rmg86VyGGM7jakSVqg+us5rAuLtbUF/hlUH3fQgxPR1JyUklEGr58C9rmSiuaoTLv3L310laMap8yqOaMF30RKC7EWVp30Jx/cd+vvpbVwIg3fixDPX2Ahxl3w9u6yjReE6jtiC5Z39B9apE4vsbUl3pGyQq7gZugEZFNknIyCdwBWdqS2F68F1M3+yAmzEwtxN7bzmKPFMpas8EN3o8Z97E+sU7geV74XTzcA5snn4IP1n8PBo6pZbRc2Yv1pjW4N3pT0p+2GU4987DsbxsrKk9rTFUI5/U0Eh4BWf2PoPFlcByu1PUh9v5JKa/W4LF/3VI/2NTFCzEcN2NKF/2U7w3/yVJ16wNO+cfxuJl2+Holq0ZXpGvWYanm+djR5cbjDG0P5uEd1bkocxxQcYQYnpDAy1qUwmtfHjQ7diOZYsPY/7ONlEfzP0S5r/3Uywrb/R+yHG9/WgZnnPnYB8vx6wDzavHoDJ1DSpbLkUtoyEXvPs4qp7ehN80XPZLuv91mQrxrwAAH9xJREFUJUg3fixDve3EiapNKP3NkV4C8PrIjFUVx4P7C6pX/SCeM7X40bd3wP3Q61KZ66rHauxE6vKdaPH/8NOPInJdmd8fwPPYh7+OOlYkgAlFdaxDL5j4XGAZlibm1nseqlu44gk1vRHmr896Her8u5uYJUMIfI+CuavyfcaaLfcxZFhYs/YFE8PdxorqzjHGZD9CCavr0HoK5q5GPqwXw6ozkV98QLl1N1tYRgBHDaaQwrlZR10JE/zjEct4iqwz2Q/uY5bmzzQJ+Ok7pPQ0wQf5clh11u+8BSsH/u7nWF1Ril8Z9del/70ilF5Y5dnw/kaezi4zp72aFeVuY4ftL7EMKGVC5iS+8/2pK6NPN3pvxlDry+08zCqLVjLz4UP6bZQqpJt1NVWy3PjbmOk2Hf2wXvSqxqO9CFJufOpKrf/IvA6ms6HtAQ3aNe1BZ30pjMZS1Is9VnyYpxZlecnS0B8fKv39EZxV7XjZf0wmil9+FnlGPkSYKg9T+A8l8aG9CtT7D+N2t+BgWR6M4vBiMvLKaqThWVUGnpjOcFNFPVqUHhp8jPriVMRkbkd9o2YImIZ2VU2FfGGYi/wDTjg3L8AknUCuo204q/u114325lMQbpmF6dq32XAdZt1yGTUH/opOjMec/D1gzo1YMEnrSU7I1Yq2s8F7WHXEGflO3U40H5uCW2ZdBy0xw/RZuAU2HLCf12fQ33BqbE4cbfsYHlzB2bZWuIQEzJo+Tn0KjMP0WQkQbG/hUOslYMDpaaIetZdhKB9qGToP+wEbkHMnUn3K2nVYsNketHyPWvQ6Gfe07MTytaeQ+ezDSJ04JtBHv+tK0k0gzF5cPCdQufwpNGeWoDD1Sz177rbjxZ88j7HPlmBZbKDXXvUaGATo/CsO1AA5mV/zbRcnLcBmpx2bF1ynFypq3LRty+ALbbgedz6wGKipxds+Q6raggFpmCd1B87d8zq6+BBOSwlmHzmIape/iDbUHBJQ0uKG27kbP543Bd0narBSO9QqDse+iwcTl3mH7cShvWzkHVuAenFo732UTG3A+i02TQJ8mKMQKYvf9g4Jd/0Cie+ugWnNXpzRGkO2Z/C09VoU7GsH40O7O2djf0YhXlSHCTXR0mU/CExAxtLbkKD3tno+RttRZ9A4gxuumiAZ38XtCeM1DnTpOduGowHlTeGiGInKvfc3tHAGTJq3BIWJNrz69kfy9IcrcNn/gMbEddh4/xwfo9cbu/bqFJrbuxFaetpwdN1nAmr5mIp59z+ARG397XHB/vZfkWhei/vnjAfE8ngByYkT4NTM59adu9tnQUZHAIPx+6jc9wQWCNoPr1Dz3ltdSboJlaTozzADd1W+ho0L4nqpky7A8eJTKJ9diqeWJEDnswH90atUv81G4uQzmrnwvMPsgKYjrE85iijPek16vwR0bUnHZHWxgrJoIQYxk9OxRW3IlIbnLew4cMo7787Hyj+Pxj2vormoGI9nzYX4IRE7F1mPF6NI8BctBTl5izA31gCDEI/42AtofOV5HLzr59i45lsQeO4MAuY9+gvsLDqLdaW1aPF40NmwA6t+fwde2PhDMSwwCXPzN2NnUYo3gc5DeG5VLZI3lGDNPEF6+WKTkP/8NuT8fiOea9BMCheW44nHl2BOLE9wHITUb2OecAQHPzjrzaM3ZroKmQCfT/MC1h/7LlZkztavAMQeMPUFCzlm7tFz5r+xeX0T8lek6xu3fYptJHn2oLu9Fcf6nKU+hIudh8IdP0V79iyMEeuNa2BM/xtydvwEKXI5Ens6A2SQe0ZF9z6kFxAPOfRGILB8GBCb8hPs2PC/yJ5xjTQ6NWYG0h1Z2FE4T6qrxfJ4Ed01JVjz9vX49zonGHOjpWQqdn6v57ncvckzap7HfhmCWAb6kuNQ60rSTV+oArEQBJ3uTJ9I+NzoV7B2fzr2bVuCuGBWVZ/1qtRvp1Cz9md4e9YjqBPnVPMOsz34nn9HmI9M0XETDFWfpReK6tAhwuGTzjX/Oup8DcfYr+HunFth2/1HtIq9iB502t9GDTKQmTpV7nJ2IjnRKFVoiiSxRiQmT1Du9H9FQ9aJ5G/dJBmfqq9YzEicDRxrRXv3x+IQkSv5ViT5fGHKfsQwskwuY8AQJEQ5nPLQrpqA74XoBzjW7PROzPf1QXe9EvCg+8SvUbrqQyzfWYIlcf3pDeghke7jqCzdiFPLy7FhyUx947aH4PRoIAR4hb0V6ab3sbSpQ64v3OhqWoR3v7cSFSf4rgcGTDKtwAt32fD0s3XyKusrcDVasHn3Odw2kOQpbO8EdMsHXwV8L0zvLkKTvCiMLzBqWvo+vvdQFU6oU5Nc+OO4HDy/YaFcDxsQO3cR8rL/jFXP9bSArXexyIcegb7UlaQbPYIDcRMX8C2uw6Kyh+SP54HEphfWiXE5m7BB7YWdhLn3PoBs/44wvaAR7hY2AzT0fI5HQuYPkH/sl7CIvYh8+P1dJBYuwbxJhl6G1HpOpefhOADiPCX/FYU9xenAlvRp3m17eE/NmBtRYOtfj1tPKdEzLQFeodZg5YIyYMMvUKoWPK0f+Vo09gO6xnU8apy6j6Ni5Q+xHqvxq9J0v48Vjb9Re2lA7IwEJPc5/6GGk0c5ch7AvXOVGb+KkfIB1r9il1bZG2Yia9sulE7diZQxfFRlMf6r6Rt4alsOYjEbiTMm9VPOPmcsOgO4apGnNyrl45aGMoffRmTBykfnEewpP6uOOklQ5Mbw4PN4pdE7LzhgTjakD/yQpsREJ+1hkroPdaUsIekmjKrynMbeJzfiVOGTeDhlShgj1kYVrCPsgjxfXus3uq6HwQAFDHHfwQM5kHoRxV7LOOTc/TWxx1Nc5NBHe0JB3mtYcUHDNYr3EH7vg6X5M98eXbl3N9himRAiJS89EuC9XL+Sjc9fY3t+km9PuH9YcbGR0d9VvfevbD2u97FVND7Xon57jjwFQ/VOFzKBnsuSToXYl3BimXfosJaNlJq3YZe3z0LsHCxcWwWnWO4OYHNeKiY6W3FMXpzUXzl1Eh95TkIWqrSjUbrX72BtineIMXj5UEaFdDBpR4UmfQ2ZOZqpTDreySlcBPpYV5JuwgVejcfTWocdFQ40rJuPicqHndxJJU1LvB8V/d56zIBJqXcip5/2kCpkBF8MiwEKKJPZ92D37t+hJlmzCEQsJMbA4Wt5blGPLJWw7//db2NkaaU0khMwI/Y6pGZmQBCH47UriWQ/YgKK4pvw/vF/+s7jFDeQTRj4xvo9ZmSUPvScQX3pYhjn/w7TX3i9d+NTxBSkZ0VdDKFM5bgCV/3PkW68D7+b/nM0kPHZ80smGhWBX9jqpPgZXqPFJ6JQwgVtCOUdDeQV1J6WCmT67ErBU5LmgKqrrENJz0dAutEn0Fv5UOpEndBi3WyUV+pOQuL8fwO0HxFiEK7bMzAtTIJxmFodHcmj16lfdSXpJtwKN8zJxwH/Dzt3EywZAqRpiXuQzxfn9fcvNh7z71J2c9FEIpa5uVh48/Tonj7mv2tUsP2a/P2p9+J+VP3YB1TeywwI3CPU3W5l+UISy7UcY108oa4mZi3KYF6/yh6BfvujMXkfLh62/BBzils+drAmSz4TsIiZ7Z9IYrvbmDU/hZmKrKy5i3vqYM3WEmYCGNS9CS+zdutKJgi5rPywU9rDVJHDVM7sYjhpjy5vGJlKsH3aVGhDf9FnvQ65iJ8wu3kRA5JYvrWtT3vGBrwvbic7XJ6r2WfSzbrs5aJ+hXwra9duBTrk+Qw9weHVmfL+5zNLk7TDr9t5iJXnJvntA+mfn1DCyeU0o4hZ6pqlMq6WXW055XvDxjNTiU0uy/I+ehlrmLX9spxwKOn5yzh498Ors/7mK9TywevSFSyjyMLqmpVdn+X6Va0TeX19mJlN8cxkPizr9jJzHn6B5cav1Oitv7KGP1wk60zcd9d/H1DW/7oy2nSjp+1h01eo7XoI/vT1qpdbpWxq60WpfYsfAW1ZwK7zfVZufw1QJjccARtNcyW4WVfzW8ycm8S4PEAGK3r9NWbOUDbGDmaAKmHrmEU0WHlYgZl8KkxZyV3NzGbOZYIYfxLLNVuZ1bxEY4Byfx2suc7CikyCLIfkz+5UGj8yQGWaA/6RCiTXV5B/yoeB8uGi3Isp++sJTMg1M6td/nBQwgSLO6CCH3B2whJBn8tiWFLVRNLVzOosRdKHmaaceN9/xhS9+RxEEUI4qYxryynXWTmzqYaNJIe0CTT/+FTKcjXTpi/6Cik9Tb4G8XLYddafvPWpfPiXNV4nviV/yGsS96lf9XWr8T2sl5GsMz1DRSlzUpnQqS+VulHRq3KvUI4i3Sgia3+HTV8yT5+6TiuYch2CPz298uCKbn3T8LeHgpQ5Jf0I/A2msxguq6ZjV1xw4+ekfRzG60toqciF6f0f4H9ezgq+dUEYU+w5Klme5odxIshm6D2Hj+yn/Fz1odFrZHOIJulIZ9GkLUlW0hnpLPoIRJfEVMaiS19c2mA6G7bZOB7XH1BZ8zkKf7pgiI1P5dSlAnm7F45H2t7lmfUXUXj/rb4nDkSfrkliIkAEiAARIAJEgAhENIGhN0A9J1CRacQYYxncqzcN4tYFwbjz/QVXY98LN+LdBZPlLZauQcr2z3DPvpdROGhbKQSTh9yJABEgAkSACBABIjC6CAzjEPzoAj3cuQ3WBT7cclH6wQmQzoKzidQnpLNI1UxwuUhnwdlE4hPSVyRqpWeZguls6HtAe5aTnhIBIkAEiAARIAJEgAiMcAJkgI5wBVP2iAARIAJEgAgQASIQaQTIAI00jZA8RIAIEAEiQASIABEY4QTIAB3hCqbsEQEiQASIABEgAkQg0giQARppGiF5iAARIAJEgAgQASIwwgmQATrCFUzZIwJEgAgQASJABIhApBEgAzTSNELyEAEiQASIABEgAkRghBPQ3Qd0hOeZskcEiAARIAJEgAgQASIwhAT8jwMfq5e2vyc9P+QWXQSCbQQbXbkYXdKSzqJP36Qz0ln0EYguiamMRZe+uLTBdEZD8NGnS5KYCBABIkAEiAARIAJRTYAM0KhWHwlPBIgAESACRIAIEIHoI0AGaPTpjCQmAkSACBABIkAEiEBUEyADNKrVR8ITASJABIgAESACRCD6CJABGn06I4mJABEgAkSACBABIhDVBMgAjWr1kfBEgAgQASJABIgAEYg+AmSARp/OSGIiQASIABEgAkSACEQ1ATJAo1p9JDwRIAJEgAgQASJABKKPABmg0aczkpgIEAEiQASIABEgAlFNgAzQqFYfCU8EiAARIAJEgAgQgegjMGAD1NNSgcyYGPGoJWNxPTr1GHhOoCLT2LMfvXDwoLvlAMpKd6HFI3mQ0ktFcf3HuiHIMdIJeNDt2Io0YynqO2WlakX2uOCoKkaa/E7FpBWjyuGCjk9NqCtwOWpQnCa9YzExRqQVv4zf+oXTvqv8aDD1X2aF+n5pIqVLf13EZKK44k04XFeCsPGgs74URi1bv2tvHdGbzj5GfXGqV0d+8cTEUB0QRAn9d/bXt27Z60RLfYW3rBnzUHawBd1BU70AR9n34dV7UI/0QCXQiZaDW5FnlOsoXca8baxHRXGmXEaSkVd2AC3dPdeUUNrUvOQ+hlOFowsiEDYCAzZAJUkE3Ga6Dah5G3Ydo8LT+kfs7k6ESeir3OfRaHkc6xyX+hqQ/EckAQ+6T7yGp0tfRYOefJ7TqP3RMjznzsE+xsBYB5pXj0Fl6hpUtgR/Bzxn3sT6xTuB5XvhdDMwtwObpx/CTxY/jwb1ffSgu70VxzIsaOZ+xPjl3wP5mBOmkqCXreh0u4Ize5/B4kpgud0JN2NwO5/E9HdLsPi/Dul/aMKASQs2wqllK15/Art5EWAqx74nTJgEoHedXYcFm+2+euJxdR2G2RQPk/mXeGLBddGJNiKlvgBH+Y+w+L352CmXD/fO+Xhv8Y9Q7rggS3wFZ2pLYXq6FfN3nJB0074Rt75TiMVljTpGaCdOVG1C6W+ORGSOI1MomfHGc7inoQOMudHVcA/ObfyeD2PPmb1YY9qM5vnb0CWWMQeevfXPWLF4Gxw9GKFSuHKcu+d1KVzX67jnXDkSewkXmaxIqmgnELZmNzZzMX4IGw7Yz/sxuYTWQ4245dF8zPN7QrejiIDYu7IeK9804v6ls3Uy7kFnww6s+v03kXfvTYgVfUzCnKxCPFF0Custfwxi9FxC64HXUJG8FAU58yDwN9ogYN6aEmxIflfzPp6H/YANuGUWpoftrdfJxkhx8pzCgR1vITnnIeSkCJCwfgtrHn8UyUE+NPWzznu8X8HadYC57CGkxPKYQtWZf4wX4HjxKazDSpQ9nCq/I/5+6L5fBDqPYE/5WeQ88B3EyeXDEPcdPJBzFuV7jkhlr/MQnltVi+ScXCyZwz8jeFmLg2l5FsatK8MezUeix9WIquJSvHnj3VgqFeZ+iTXqAomM/4ycJwqRJTI2IHbO91CQcysayveiUfyg/hgNz22U6rwlc+VyMA6CaSlyxm1H6Z6WICNGUrjf5xTj8Sw5XOxcLClYioyGV7Gn0b/tHnX0KcNDTCB8TfGX/w3fzQFqDvzV11DwtOFQ7ZeROX96YNZ0hnwq6pXhHD4E912kb3EAtgIkjtEOuV3G2SO/Q1lPwwg87toy7zCGOCxbgfoWZZKAPMSXuR31jZrhW73hjh7lDMwWufgTuISWyrVY25yGZwv/DRP9H4v3soGYcydSJ2lfS6knzLl5gdhzFhi0G+3NpyD4G5aG6zDrlsve99HzMdqOXkByopEMl0CIgS7dTjQfm4JbZl0nGp+KB8P0WbhF90NT8eH3223Hi2vNaC4qxI9TpsgPQ9SZT1SKIXsWRU/kyIasjwe6GSQCrqNtOOsBPGfbcNRl1H8nhEPYfahNMnw8J1C5/Ck0Z5agMPVLgyTVCI120gJsdtqxuafefbEucwap86bAtvuPaNUdie+tLh2hTClbEUtA29IPUMgv4xuZGYBcWSmR8eH32n81IXXyGMVJ+hWHWzOwuP6r2Oy8LA01/OomvPtgNtbUnoYHvLC8hbqiFEAcNtUWyuOo3t+K2Y+/Lw4DuZ3liNu/EitetMvDQPJw0m+/gJUOHjcflv0fPDFmN9JXWHyHKGzP4GnrtSjY1w7GLsO5czb2ZxTiRWXYqVc5fbNFd3oExsF411bs27hQ6qHU86IaiBPg1MwxM+ZtxUH1o0EnoFwZ6zwRnZTGE6JB9QVM/9/deEg7t6rWAZduZR0sxtHhLhkbwfLqxNG2j4P0smjDXMEZWzXKm7PwwiO3ez8gQtWZNirPR7D9sgLN+aV4xERD71o0YbmedCvuL5yOmlffwxm5PHhcf8HbjdfDvDErhCkqLhxrdkr1r2EG7qp8DRsXxPl8vIRFzlEXyRW4Gi14Zn0T8l9YAZPPx3kQGMda0d7DMLw2lMf1PrY9sxXHqFxpsdD1EBEIowFqwKTUO5Fz7C0calXm60nD7/+a+TVv4yNmTB5urbgRGx4vwDxhHB/LQezcHDy/czF+v2qHZu6eHokUFKlDFHzE9dtYzocoDh6Hk1eeynBS3lI5bmWoiA81/AkfODWLKITleOLxJZjz/7d3PjBRnncc/3K3AFkObIzbvIOmhl3u7CJ2eu6okykrArJurTnN2TpuKK7BpWjtjUolNssGlVJMK6tkoWSUyzESHBJX0qbgRNjcOomaLjSdGuqWRWTJMuMcaRrS0uX9J++9f+COOy5BvpcQ7n3e9/n3ed73vd/z/P48omowFfYN34HXfgVn//ovTCPedhq1fSmmWWCzf3X2lUdRQPwEk+EjeO73D+LQuVvipOT6keXo/F4tesdVY6ZGKOabUKcYfldWb7K8P8Zbt2Tbz+tHkHPxZ9j9mpH9mmExSyRRtpeNt7eiGr8XCPiwNUt4xuVPlGOmXC78nx47h9b2tAgVsfo8v8dL4AF4gsdRf7MK2VbJ+cXqKMflQAOC8sq1uPptYMevn6zYYLdT7x7viEhOk2lw5FXhbNF+VG6UTGEgancc+uLnmNhFZJAdg62OfATPrscLlRvNFwciMvKABBJHIIECKIDMtSgJjKtUMbL6fcNyTYsldeuE3YlVK1U/TIIQmu1E7oSRLammCKNDZeanqDG8tzHY24te4a+9BoXufRgwyqdOszngzoU8m1+gdqrr43cVgQn8OTWAN+qVlVJhUvI4ynf8BVW/NHN8UWWf5avFVYH+L/ojV2VsLmwtWYtrGvu1WYrhqRgIiM6HA+sR9K/XTEBjKES8VJjIvoeBgh/C79W+S2Iti9cbEpgcwfHCMgzvGpCdWgSHrwHsGv4J9rZ/KK1sZubj4MlHEa5rwaAcCUFcQWvsxdS3DSRTw4qYGC0B6Z0laO9uojPrbeR5gvJEfAUKDtaiNNyIVwbHZbOHCYw0n0D3lIFgalShZTUq+oVJvqT1ezuvGM+Imkeji5lGAgtDILECKJZjQ8kWjMo2KNNjF/Gngu/Da6Y2mGhA4TJrRKgVazRC4pws7uJq+z44MtwofOMiRB/OB0rxq0tvohg3cO2medAQw6IXrJ2GtS3pRJ0tJ2zIdufgnipdS0ecMMz3x0+e8MznntC24746VrjE0ylZaCz24Yl1iu2nXF6sYybYkXdfQXGgFOtETUU87VpCeSd6Ua4LX6UKPyae+y6OX76LuyNn8Nq1YpUDIADbN7CzfCPOHu2SnV9SkeU7hqHaTIQ8aRDCnRWeuIHNv3gZAduXaV+9ULeWJQuPvViDw+hFa/8NUeC0ZG1H81AQy0PbYBXGsfAE/ra5Bs2BHCDXieyon5NU2B97Fi8dTkN76zkT29GF6hjLXeoEEiyAqtXwdzB24WNsemKtuerVKCSOGFJCbe8Z+xBNX+/Bc/tGUHr6H/j8fCMqfD74fJvh+O/fMRp7cbINqiZ0TwLaOZ+m3Ld5xNVzT+zdM1NHySXpBdrYq1iKOczUrRILvSOKjpEoNF7QO0oIF8Y4ZtJKqt4hSlcnEyIJ2H0Iie8po3eXknYe1Z4pMUKE3pDFSCOVCVfR8wiJZiy3cL4xAE/Gfwwd1iIbw6P4CajsbAVtoasE1aFRycfhfCPKPRm4ZeSQGW3FigYx2ut5HQnESSDBAqhKDT/cj+GRryPfmW7QRGGltBj20Sv4MCKotRykPMWPdlVID4MCZklS7NcexqY1X1MZwX+G/91RPOBnyR5xaiHbGVERD5AJd96jBrFkBY/pcRQUrYHD8G41WSG959QkeL1/iuvtfqTogt/L94q9GCU6M5ElPiTiKuUdnbORZO+XA3f27DZ+ktDoQEBn/y1wjWbMFP7ySirHSAGyAP/l95yuZM3zIdoNbtJtAiLeE+AzpMM3j4TZN1rxyM+T9D7TBfcX33lpJs+cYEgtbQijyye3066LQDKPDjALCcRAwPAnPYb8BpdKaviPu9pxwZsHp2ENFmQWVOJk6TCqatswIgqhws4OZ1BX3QI0VcPvEgRX6YdKquRTTE5+ZlCfNklehbVfQLjjj7KHs+BJ2IbaqhboZ/na/OrjaNupzsPv8yOQiqziHyHoPoW6N5VoBsK4dSN0eh0OPP1Nk5X0dDhLnkLF6Ot4uUO2VZsW7KEacHTUj5qdLliQDpe/Gk3uAYR6PpoJmD35EXpC76M0Wu/S+XVsceay5KCkchtGjzah46o0cbvnMXt4P3aKz6dZ15RJoJmgGs2YKWVLIZtiUysqefk/OgIWZHp3o75oDP09QzO76YjPxwDcwe2SGZVlFfJ3ZeHVCBvQEYR//R6y+QxFh3qOqywuH441rUQ49A6uKp7s0+MYfKUR4aID2CvaQKfDmb8Nua9G2oBeDr+F7uyfmkeJsLjgP/YC3OHfoEd+poEpTAy2oC78COr3bojTVnuOzvE0CWgIGIqHmmtiPJQEwB3XlmFL/irVCqSmGMtD8DWfRueWf6LGIdgTWZFR8Dt85UA3uoJeWdhIh7P0GRyZOgq3NQc7To1FEfpFWIXNx6G+RnjfL4dD9Oj04MU/rED5md/icKzmglG1U9M3Hs6PgM2L6r53UYsWuET7tDR4WqZQ9u4x+BQvamVbV9VqpiVrK2o6n8fKcDEyhHxWB7Z/kIuTfQdmwpbYvAh2teLJ201y2SlI+UEYKG9Fs+8h8/t0fj25D3IJE4KD6KxfgfDDy0Q7batjPz7I/Tn6Ds2EVFK2NzVbVTEDEdWYmWVmeuIJ2NagoqUeJehHZYZsl+9qwu2yLvRVz7yPXXuacWnPJ6gT39kpsO4+Dfib0cZnKEFjIkQjaEPfk/9Gg0seB2sF+p01GGoJYLVs22lxlaHjUhk+r/uWZANq3YNT2IGONt+9jQSUFc8ZzY8FNs+z6Op7HLcbNsm+F6uwu/9BvDT0OipWy5sLJKgnLIYE5iKQ8oUQJFP1EfbH1iSpzvLrYiXAcV18I8cx45gtPgKLr8V8zhbXmHG8Ftd4Ca01G7MFWAFdfHDYYhIgARIgARIgARIggeQRoACaPNasiQRIgARIgARIgARIQNx+iBhIgARIgARIgARIgARIIIkEuAKaRNisigRIgARIgARIgARIQNiAnR8SIAESIAESIAESIAESSCIBCqBJhM2qSIAESIAESIAESIAEuALKe4AESIAESIAESIAESCDJBLgCmmTgrI4ESIAESIAESIAEljoBCqBL/Q5g/0mABEiABEiABEggyQQMd0JKchtYHQmQAAmQAAmQAAmQwH1MQLvL5pe0fdVeoD3PYxIgARIgARIgARIgARKIhwBV8PHQY14SIAESIAESIAESIIGYCVAAjRkZM5AACZAACZAACZAACcRDgAJoPPSYlwRIgARIgARIgARIIGYCFEBjRsYMJEACJEACJEACJEAC8RD4P+x2iGfh7sm7AAAAAElFTkSuQmCC"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Formulate equation(s) for the conversion of coal and steam to methane.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Comment on the specific energies of hydrogen and methane.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the mass, in kg, of carbon dioxide produced by the complete combustion of 72.0 dm<sup>3</sup> octane, C<sub>8</sub>H<sub>18</sub>.</p>
<p>Density of C<sub>8</sub>H<sub>18 </sub>= 703 g dm<sup>−3</sup></p>
<p>C<sub>8</sub>H<sub>18</sub> (l) + 12.5O<sub>2</sub> (g) → 8CO<sub>2</sub> (g) + 9H<sub>2</sub>O (g)</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em></p>
<p>2C (s) + 2H<sub>2</sub>O (g) → CH<sub>4</sub> (g) + CO<sub>2</sub> (g) ✔</p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em></p>
<p>C (s) + 2H<sub>2</sub>O (g) → CO (g) + H2 (g) <em><strong>AND</strong> </em>3H<sub>2</sub> (g) + CO (g) → CH<sub>4</sub> (g) + H<sub>2</sub>O (g) ✔</p>
<p> </p>
<p><em>Accept “3C (s) + 2H<sub>2</sub>O (g) → CH<sub>4</sub> (g) + 2CO (g)”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{141.6}}{{55.5}}">
<mfrac>
<mrow>
<mn>141.6</mn>
</mrow>
<mrow>
<mn>55.5</mn>
</mrow>
</mfrac>
</math></span>» hydrogen/H<sub>2</sub> produces 2.6 times/more than twice the energy of methane/CH<sub>4</sub> «per mass/g»</p>
<p><em><strong>OR</strong></em></p>
<p>less mass of hydrogen/H<sub>2</sub> required «to produce same amount of energy»</p>
<p><em><strong>OR</strong></em></p>
<p>hydrogen/H<sub>2</sub> more energy efficient ✔</p>
<p> </p>
<p><em>Accept “hydrogen/H<sub>2</sub> produces «nearly» three times more energy than methane/CH<sub>4</sub> «per mass/g»”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>m</em><sub>octane</sub> «= 72.0 dm<sup>3</sup> × 703 g dm<sup>–3</sup>» = 5.06 × 10<sup><span style="font-size: small;">4</span></sup> «g»/50.6 «kg» ✔</p>
<p><em>m</em><sub>carbon dioxide</sub> «= <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{8 \times 44.01}}{{114.26}} \times 50.6">
<mfrac>
<mrow>
<mn>8</mn>
<mo>×</mo>
<mn>44.01</mn>
</mrow>
<mrow>
<mn>114.26</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mn>50.6</mn>
</math></span>» = 156 «kg» ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The Sun’s energy is produced by the fusion of hydrogen nuclei.</p>
</div>
<div class="specification">
<p>Uranium-238 produces plutonium-239, which is used as fuel in breeder reactors.</p>
</div>
<div class="specification">
<p>Nuclear energy produces ionizing radiation which leads to the formation of free radicals.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain fusion reactions with reference to binding energy.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why the term breeder is used for the reactors.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the fission reaction when <sup>239</sup>Pu is bombarded with a neutron to produce <sup>133</sup>Xe and <sup>103</sup>Zr.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Nuclear disasters release radioactive caesium into the atmosphere, which presents serious health risks.</p>
<p>Cs-137 has a half-life of 30 years.</p>
<p>Calculate the percentage of Cs-137 remaining in the atmosphere after 240 years.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce a Lewis (electron dot) structure of the superoxide, O<sub>2</sub><sup>–</sup>, free radical.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why free radicals are harmful to living cells.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>small/lighter <span style="text-decoration: underline;">nuclei </span>combine to form larger/heavier <span style="text-decoration: underline;">nuclei </span>✔</p>
<p>product has higher binding energy «per nucleon» ✔</p>
<p> </p>
<p><em>Accept binding energy curve with explanation.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>converts non-fissile «<sup>238</sup>U» material into fissile «<sup>239</sup>Pu» material</p>
<p><em><strong>OR</strong></em></p>
<p>produces more fissile material than it consumes ✔</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><sup>239</sup>Pu + <sup>1</sup>n → <sup>133</sup>Xe + <sup>103</sup>Zr + 4<sup>1</sup>n ✔</p>
<p> </p>
<p><em>Accept equation with correct atomic numbers included.</em></p>
<p><em>Accept notation for neutrons of “n”.</em></p>
<p><em>Accept a correctly described equation in words.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em></p>
<p>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{240}}{{30}} = ">
<mfrac>
<mrow>
<mn>240</mn>
</mrow>
<mrow>
<mn>30</mn>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 8 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{t_{\frac{1}{2}}}">
<mrow>
<msub>
<mi>t</mi>
<mrow>
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</mrow>
</msub>
</mrow>
</math></span>/8 half-lives «required» ✔</p>
<p>% remaining = «0.50<sup>8</sup> × 100 =» 0.39 «%» ✔</p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em></p>
<p>λ = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.693}}{{30}} = ">
<mfrac>
<mrow>
<mn>0.693</mn>
</mrow>
<mrow>
<mn>30</mn>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 0.023 ✔</p>
<p>% remaining = «100 × e<sup>–0.023 × 240</sup> =» 0.39 «%» ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><sup><img src="data:image/png;base64,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"></sup></p>
<p><em><strong>OR</strong></em></p>
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<p><em>Accept any combination of dots, crosses and lines to represent electrons.</em></p>
<p><em>Do not penalize missing brackets.</em></p>
<p><em>Penalize missing negative charge.</em></p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>highly reactive</p>
<p><em><strong>OR</strong></em></p>
<p>start redox reactions ✔</p>
<p> </p>
<p>damage/mutate DNA</p>
<p><em><strong>OR</strong></em></p>
<p>cause cancer</p>
<p><em><strong>OR</strong></em></p>
<p>damage enzymes ✔</p>
<div class="question_part_label">d.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Chemical energy from redox reactions can be used as a source of electrical energy.</p>
</div>
<div class="specification">
<p>The chemical structure of a photosensitive dye found in blueberries and a schematic diagram of a solar cell are shown.</p>
<p><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how a rechargeable battery differs from a primary cell.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Formulate half-equations for the reactions at the anode (negative electrode) and cathode (positive electrode) during discharge of a lithium-ion battery.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A voltaic cell consists of a nickel electrode in 1.0 mol dm<sup>−3</sup> Ni<sup>2+</sup> (aq) solution and a cadmium electrode in a Cd<sup>2+</sup> (aq) solution of unknown concentration.</p>
<p style="text-align: center;">Cd (s) + Ni<sup>2+</sup> (aq) → Cd<sup>2+</sup> (aq) + Ni (s) <em>E</em><sup>Θ</sup><sub>cell</sub> = 0.14 V</p>
<p>Determine the concentration of the Cd<sup>2+</sup> (aq) solution if the cell voltage, <em>E</em>, is 0.19 V at 298 K. Use section 1 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the structural feature of the dye that allows the conversion of solar energy into electrical energy.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the effect of sunlight on the dye in the solar cell.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the purpose of TiO<sub>2</sub>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the reduction half-equation at the cathode.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.iv.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«redox» reaction in rechargeable battery is reversible «but not in a primary cell»</p>
<p><em><strong>OR</strong></em></p>
<p>secondary cells need to be charged before use</p>
<p><em><strong>OR</strong></em></p>
<p>secondary cells have greater rate of self-discharge ✔</p>
<p> </p>
<p><em>Accept “primary cells cannot be recharged/reused”, “primary cells can be used only once” <strong>OR</strong> “lithium batteries may explode”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Anode (negative electrode):</em></p>
<p>Li (graphite) → Li<sup>+</sup> (electrolyte) + e<sup>–</sup></p>
<p><em><strong>OR</strong></em></p>
<p>LiC6 (s) → 6C (s) + Li<sup>+</sup> (electrolyte) + e<sup>–</sup> ✔</p>
<p> </p>
<p><em>Cathode (positive electrode):</em></p>
<p>Li<sup>+</sup> (electrolyte) + e<sup>–</sup> + MnO<sub>2</sub> (s) → LiMnO<sub>2</sub> (s)</p>
<p><em><strong>OR</strong></em></p>
<p>Li<sup>+</sup> (electrolyte) + e<sup>–</sup> + NiO<sub>2</sub> (s) → LiNiO<sub>2</sub> (s)</p>
<p><em><strong>OR</strong></em></p>
<p>Li<sup>+</sup> (electrolyte) + e<sup>–</sup> + CoO<sub>2</sub> (s) → LiCoO<sub>2</sub> (s)</p>
<p><em><strong>OR</strong></em></p>
<p>2Li<sup>+</sup> (electrolyte) + 2e<sup>–</sup> + 2CoO<sub>2</sub> (s) → Co2O<sub>3</sub> (s) + Li<sub>2</sub>O (s) ✔</p>
<p> </p>
<p><em>Accept “polymer” for “electrolyte”.</em></p>
<p><em>Award <strong>[1 max]</strong> if electrodes are reversed.</em></p>
<p><em>Do <strong>not</strong> accept “CO” for “Co”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>E</em> = <em>E</em><sup>Θ </sup>− <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\left( {\frac{{RT}}{{nF}}} \right)">
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mi>R</mi>
<mi>T</mi>
</mrow>
<mrow>
<mi>n</mi>
<mi>F</mi>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</math></span><em>ln</em>Q»</p>
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="0.19 = 0.14 - \left( {\frac{{8.31 \times 298}}{{2 \times 96500}}} \right)\,{\text{ln}}\,\left( {\frac{{\left[ {{\text{C}}{{\text{d}}^{2 + }}} \right]}}{{\left[ 1 \right]}}} \right)">
<mn>0.19</mn>
<mo>=</mo>
<mn>0.14</mn>
<mo>−</mo>
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mn>8.31</mn>
<mo>×</mo>
<mn>298</mn>
</mrow>
<mrow>
<mn>2</mn>
<mo>×</mo>
<mn>96500</mn>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>ln</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<mtext>C</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>d</mtext>
</mrow>
<mrow>
<mn>2</mn>
<mo>+</mo>
</mrow>
</msup>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
<mrow>
<mrow>
<mo>[</mo>
<mn>1</mn>
<mo>]</mo>
</mrow>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</math></span></p>
<p><em><strong>OR</strong></em></p>
<p>0.05 = –0.01283 ln [Cd<sup>2+</sup>]</p>
<p><em><strong>OR</strong></em></p>
<p>ln[Cd<sup>2+</sup>] = – 3.897 ✔</p>
<p>[Cd<sup>2+</sup>] = 0.020 «mol dm<sup>–3</sup>» ✔</p>
<p> </p>
<p><em>Award<strong> [2]</strong> for correct final answer.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«extensive» conjugation</p>
<p><em><strong>OR</strong></em></p>
<p>«extensive» alternate single and double bonds ✔</p>
<p> </p>
<p><em>Accept “delocalization”.</em></p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>electrons excited/released «from dye» ✔</p>
<p> </p>
<p><em>Accept “photooxidation/oxidizes dye”.</em></p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>transfers e<sup>–</sup> to external circuit ✔</p>
<p> </p>
<p>Accept “provides large surface area”.</p>
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>I<sub>3</sub><sup>–</sup> (aq) + 2e<sup>–</sup> → 3I<sup>–</sup> (aq) ✔</p>
<p> </p>
<p><em>Accept “3I<sub>2</sub> (aq) + 2e<sup>–</sup> → 2I<sub>3</sub><sup>–</sup> (aq)”.</em></p>
<div class="question_part_label">d.iv.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.iv.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Uranium-235, <sup>235</sup>U, is bombarded with a neutron causing a fission reaction.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Two products of the fission of <sup>235</sup>U are <sup>144</sup>Ba and <sup>89</sup>Kr.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Write the nuclear equation for this fission reaction.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why the reaction releases energy.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The masses of the particles involved in this fission reaction are shown below.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">Mass of neutron = 1.00867 amu<br>Mass of U-235 nucleus = 234.99346 amu<br>Mass of Ba-144 nucleus = 143.89223 amu<br>Mass of Kr-89 nucleus = 88.89788 amu</span></p>
<p><span style="background-color: #ffffff;">Determine the energy released, in J, when one uranium-235 nucleus undergoes fission. Use this data and information from sections 1 and 2 of the data booklet.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The critical mass for weapons-grade uranium can be as small as 15 kg. Outline what is meant by critical mass by referring to the equation in (a)(i).</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The daughter product, <sup>89</sup>Kr, has a half-life of 3.15 min.</span></p>
<p><span style="background-color: #ffffff;">Calculate the time required, in minutes, for its radioactivity to fall to 10% of its initial value, using section 1 of the data booklet.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><sup>235</sup>U + <sup>1</sup>n → <sup>144</sup>Ba + <sup>89</sup>Kr + 3<sup>1</sup>n <strong>[✔]</strong></span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">greater binding energy per nucleon in products than reactants <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “mass of products less than mass of reactants” <strong>OR</strong> “mass converted to energy/E = mc<sup>2</sup>”.</span></em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«Δm mass of reactants-mass of products»</span></p>
<p><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Δ</span><span style="background-color: #ffffff;"><em>m</em> = «234.99346 – 143.89223 – 88.89788 – (2 × 1.00867) =» 0.18601 «amu» <strong>[✔]</strong></span></p>
<p><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Δ</span><span style="background-color: #ffffff;"><em>m</em> = «0.18601 amu <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> 1.66 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">× </span>10<sup>−27</sup> kg amu<sup>–1</sup> =» 3.09 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> 10<sup>–28</sup> «kg» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>E</em> = «<em>mc</em><sup>2</sup> = 3.09 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> 10<sup>–28</sup> kg <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> (3.00 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> 10<sup>8</sup> m s<sup>–1</sup>)<sup>2</sup> =» 2.78 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> 10<sup>–11</sup> «J» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Award <strong>[3]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">mass/amount/quantity required so that «on average» each fission/reaction results in a further fission/reaction <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">at least one of the «3» neutrons produced must cause another reaction <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept “minimum mass of nuclear fuel needed for the reaction to be selfsustaining”.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\lambda \left( { = \frac{{\ln 2}}{{{t_{\frac{1}{2}}}}} = \frac{{\ln 2}}{{3.15}}} \right) = 0.220">
<mi>λ</mi>
<mrow>
<mo>(</mo>
<mrow>
<mo>=</mo>
<mfrac>
<mrow>
<mi>ln</mi>
<mo></mo>
<mn>2</mn>
</mrow>
<mrow>
<mrow>
<msub>
<mi>t</mi>
<mrow>
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</mrow>
</msub>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mfrac>
<mrow>
<mi>ln</mi>
<mo></mo>
<mn>2</mn>
</mrow>
<mrow>
<mn>3.15</mn>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
<mo>=</mo>
<mn>0.220</mn>
</math></span></span> <span style="background-color: #ffffff;">«min<sup>–1</sup>» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><span style="font-size: 14px;"><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="t\left( { = - \frac{1}{\lambda }\ln \frac{N}{{{N_0}}} = - \frac{{\ln 0.1}}{{0.220}}} \right) = 10.5">
<mi>t</mi>
<mrow>
<mo>(</mo>
<mrow>
<mo>=</mo>
<mo>−</mo>
<mfrac>
<mn>1</mn>
<mi>λ</mi>
</mfrac>
<mi>ln</mi>
<mo></mo>
<mfrac>
<mi>N</mi>
<mrow>
<mrow>
<msub>
<mi>N</mi>
<mn>0</mn>
</msub>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mo>−</mo>
<mfrac>
<mrow>
<mi>ln</mi>
<mo></mo>
<mn>0.1</mn>
</mrow>
<mrow>
<mn>0.220</mn>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
<mo>=</mo>
<mn>10.5</mn>
</math></span> </span></span>«min» <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><strong><em>Note: </em></strong><em>Award <strong>[2]</strong> for correct final answer.</em></span></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Required candidates to write a nuclear equation for a fission reaction with the question indicating that <sup>235</sup>U was bombarded with a neutron to produce <sup>144</sup>Ba and <sup>89</sup>Kr. Despite this, some candidates did not include the initial neutron or omitted neutrons completely.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Outlining why the fission reaction releases energy was challenging. Some candidates simply said the reaction was exothermic. Some said that the products were smaller than the reactant. Very few candidates referred to binding energy per nucleon.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The calculation of the energy released in was done reasonably well. Some candidates answered this very well and scored full marks. However, many scored 1 or 2 marks out of 3 through ECF marks. Common errors were incorrect calculation of mass in amu, or omission of converting amu to kg. Here, it was apparent that good setting out of calculations was effective in scoring for partially correct responses.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The meaning of critical mass was answered reasonably well with most candidates scoring at least 1 out of 2.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The calculation of time taken for radioactivity to fall to 10% of its initial value was answered very well.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The sun is the main source of energy used on earth.</p>
</div>
<div class="question">
<p>Calculate the energy released, in MeV, in this reaction, using section 36 of the data booklet.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>Δ<em>BE</em> = <em>BE</em>(<sup>4</sup>He) − (<em>BE</em>(<sup>2</sup>H) + <em>BE</em>(<sup>3</sup>H))<br><em><strong>OR</strong></em><br>Δ<em>BE</em> = 4 x 7.1 − (2 x 1.1 + 3 x 2.8)<br>= 17.8 «MeV»</p>
<p> </p>
<p><em>Accept answers in range 17.3 to 18.1 «MeV».</em></p>
<p><em>Award <strong>[1 max]</strong> for final answers in range of 3.0 to 3.4 «MeV».</em></p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">E10 is composed of 10% ethanol and 90% normal unleaded fuel.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Ethanol has a Research Octane Number (RON) of 108.6.</span></p>
<p><span style="background-color: #ffffff;">Outline how higher octane fuels affect engine performance.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Ethanol can be used in a direct-ethanol fuel cell (DEFC) as illustrated by the flow chart.</span></p>
<p><span style="background-color: #ffffff;"><img 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" width="597" height="368"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Deduce the half-equations occurring at electrodes A and B.</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Electrode A: </span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Electrode B:</span></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the name and function of <strong>X</strong> in the diagram in (b)(i).</span></p>
<p> </p>
<p><span style="background-color: #ffffff;">Name:</span></p>
<p><span style="background-color: #ffffff;">Function:</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why aqueous ethanol, rather than pure ethanol, is used in a DEFC.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Biodiesel containing ethanol can be made from renewable resources.</span></p>
<p><span style="background-color: #ffffff;">Suggest <strong>one</strong> environmental disadvantage of producing biodiesel from renewable resources.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">increased <em><strong>AND</strong> </em>fuels can be compressed more «before ignition» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “engines can be designed with higher compression ratio” <strong>OR</strong> “less chance of pre-ignition/auto-ignition/knocking occurring”.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">Electrode A: C<sub>2</sub>H<sub>6</sub>O (aq) + 3H<sub>2</sub>O (l) → 12H<sup>+</sup> (aq) + 12e<sup>–</sup> + 2CO<sub>2</sub> (g) <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">Electrode B: 3O<sub>2</sub> (g) + 12H<sup>+</sup> (aq) + 12e<sup>–</sup> → 6H<sub>2</sub>O (l) <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Accept balanced equations with integer or fractional coefficients.</span></em></p>
<p><em><span style="background-color: #ffffff;">Penalize equilibrium arrows once only.</span></em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Name:</em><br>PEM/proton-exchange membrane/polymer exchange membrane/polymer electrolyte membrane <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>Function:</em><br>allows the passage of protons/H<sup>+</sup> ions «from anode to cathode but not electrons or molecules» <strong>[✔]</strong></span></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>water is a reactant/allows the cell to operate at a higher concentration of protons/H<sup>+</sup> ions<br><em><strong>OR</strong></em><br>water is a stronger electrolyte and thus produces higher electric current <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">less dangerous/flammable <strong>[✔]</strong></span></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">use of «farm» land «for production»<br><em><strong>OR</strong></em><br>deforestation «for crop production for fuel»<br><em><strong>OR</strong></em><br>can release more NO<sub>x</sub> «than normal fuel on combustion» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Ignore any reference to cost.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>One G2 respondent was concerned that “Research Octane Number” was used instead of “Octane Rating”, but most candidates correctly outlined how higher octane fuels affect engine performance.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some candidates did very well and deduced the half-equations occurring in a DEFC as illustrated in a flow chart. A few used equilibrium arrows and lost a mark. Some candidates failed to balance the half-equations.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Was answered well.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Few candidates could outline why aqueous ethanol is used in a DEFC.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most could suggest one environmental disadvantage of producing biodiesel from renewable resources.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Electricity can be generated in a variety of ways.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline how a microbial fuel cell produces an electric current from glucose.</span></p>
<p><span style="background-color: #ffffff;">C<sub>6</sub>H<sub>12</sub>O<sub>6</sub> (aq) + 6O<sub>2</sub> (g) → 6CO<sub>2</sub> (g) + 6H<sub>2</sub>O (l)</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The cell potential for the spontaneous reaction when standard magnesium and silver half-cells are connected is +3.17 V.</span></p>
<p><span style="background-color: #ffffff;">Determine the cell potential at 298 K when:</span></p>
<p><span style="background-color: #ffffff;"> [Mg<sup>2+</sup>] = 0.0500 mol dm<sup>−3</sup><br> [Ag<sup>+</sup>] = 0.100 mol dm<sup>−3</sup></span></p>
<p><span style="background-color: #ffffff;">Use sections 1 and 2 of the data booklet.</span></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline <strong>one</strong> difference between a primary and a secondary cell.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any three of:</em><br><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">C</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">6</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">H</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">12</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">O</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">6</sub> (aq) + 6H<sub>2</sub>O (l) → 6CO<sub>2</sub> (g) + 24H<sup>+</sup> (aq) + 24e<sup>–</sup><br><em><strong>OR</strong></em><br>electrons released by oxidation of glucose <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">enzymes «in bacteria» oxidize glucose<br><em><strong>OR</strong></em><br>«bacteria» transfer «released» electrons directly to anode <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">24H<sup>+</sup> (aq) + 6O<sub>2</sub> (g) + 24e<sup>–</sup> <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">→</span> 12H<sub>2</sub>O (l)<br>OR<br>electrons consumed by reduction of oxygen <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;"><br>PEM/membrane separates two half reactions<br><em><strong>OR</strong></em><br>PEM/membrane allows proton/H<sup>+</sup> transfer from anode to cathode <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">electrons flow though external circuit <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;font-weight: bold;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">Note: </span>Accept 4H<sup>+</sup> (aq) + O<sub>2</sub> (g) + 4e<sup>–</sup> <span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">→</span> 2H<sub>2</sub>O (l).</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«<em>E = E</em>ᶱ <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{RT}}{{nF}}">
<mfrac>
<mrow>
<mi>R</mi>
<mi>T</mi>
</mrow>
<mrow>
<mi>n</mi>
<mi>F</mi>
</mrow>
</mfrac>
</math></span> × ln<em>Q</em>»</span></p>
<p><span style="background-color: #ffffff;">ln<em>Q</em> = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{[{\text{M}}{{\text{g}}^{2 + }}]}}{{{{[{\text{A}}{{\text{g}}^ + }]}^2}}} = \frac{{0.0500}}{{{{0.100}^2}}} = \ln 5.00 = ">
<mfrac>
<mrow>
<mo stretchy="false">[</mo>
<mrow>
<mtext>M</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>g</mtext>
</mrow>
<mrow>
<mn>2</mn>
<mo>+</mo>
</mrow>
</msup>
</mrow>
<mo stretchy="false">]</mo>
</mrow>
<mrow>
<mrow>
<msup>
<mrow>
<mo stretchy="false">[</mo>
<mrow>
<mtext>A</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>g</mtext>
</mrow>
<mo>+</mo>
</msup>
</mrow>
<mo stretchy="false">]</mo>
</mrow>
<mn>2</mn>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mfrac>
<mrow>
<mn>0.0500</mn>
</mrow>
<mrow>
<mrow>
<msup>
<mrow>
<mn>0.100</mn>
</mrow>
<mn>2</mn>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mi>ln</mi>
<mo></mo>
<mn>5.00</mn>
<mo>=</mo>
</math></span>» 1.61 <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">E = «3.17 V <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" - \frac{{8.31{\text{ J }}{{\text{K}}^{ - 1}}{\text{ mo}}{{\text{l}}^{ - 1}} \times 298{\text{ K}}}}{{2 \times 96500{\text{ J }}{{\text{V}}^{ - 1}}{\text{ mo}}{{\text{l}}^{ - 1}}}} \times \ln \frac{{0.0500}}{{{{0.100}^2}}} = 3.17 - 0.021 = + ">
<mo>−</mo>
<mfrac>
<mrow>
<mn>8.31</mn>
<mrow>
<mtext> J </mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>K</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
<mrow>
<mtext> mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
<mo>×</mo>
<mn>298</mn>
<mrow>
<mtext> K</mtext>
</mrow>
</mrow>
<mrow>
<mn>2</mn>
<mo>×</mo>
<mn>96500</mn>
<mrow>
<mtext> J </mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>V</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
<mrow>
<mtext> mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>×</mo>
<mi>ln</mi>
<mo></mo>
<mfrac>
<mrow>
<mn>0.0500</mn>
</mrow>
<mrow>
<mrow>
<msup>
<mrow>
<mn>0.100</mn>
</mrow>
<mn>2</mn>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mn>3.17</mn>
<mo>−</mo>
<mn>0.021</mn>
<mo>=</mo>
<mo>+</mo>
</math></span>»3.15 «V» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Award <strong>[2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any one of:</em></p>
<p><em><img 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" width="598" height="181"></em></p>
<p><em><strong>Note:</strong> <span style="background-color: #ffffff;">Accept “primary cannot be recharged <strong>AND</strong> “secondary can be recharged”.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>The question on microbial cell invited varied responses. Half equations for the oxidation of glucose or reduction of oxygen were rarely written. PEM/membrane separates two half- reactions and allows proton transfer from anode to cathode was missed by most of the candidates.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The cell potential was correctly calculated by several candidates with some candidates managed an ECF mark for an error in the calculation. Unfortunately, the ln <em>Q</em> part was frequently wrong due to candidates forgetting to square the denominator.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates were able to state one difference between a primary and a secondary cell.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Nuclear power is another source of energy.</p>
</div>
<div class="specification">
<p><sup>235</sup>U atoms can be used in nuclear reactors whereas <sup>238</sup>U cannot. A centrifuge is used to separate isotopes.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the relative rate of effusion of <sup>235</sup>UF<sub>6</sub>(g) to <sup>238</sup>UF<sub>6</sub>(g) using sections 1 and 6 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain, based on molecular structure and bonding, why diffusion or centrifuging can be used for enrichment of UF<sub>6</sub> but not UO<sub>2</sub>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>M</em><sub>r</sub>(<sup>235</sup>UF<sub>6</sub>) = 235 + (19.00 × 6)/349</p>
<p><strong><em>OR</em></strong></p>
<p><em>M</em><sub>r</sub>(<sup>238</sup>UF<sub>6</sub>) = 238 + (19.00 × 6)/352</p>
<p> </p>
<p><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{\text{rate of effusion of}}{{\text{ }}^{235}}{\text{U}}}}{{{\text{rate of effusion of}}{{\text{ }}^{238}}{\text{U}}}} = \sqrt {\frac{{352}}{{349}}} = ">
<mfrac>
<mrow>
<mrow>
<mtext>rate of effusion of</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext> </mtext>
</mrow>
<mrow>
<mn>235</mn>
</mrow>
</msup>
</mrow>
<mrow>
<mtext>U</mtext>
</mrow>
</mrow>
<mrow>
<mrow>
<mtext>rate of effusion of</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext> </mtext>
</mrow>
<mrow>
<mn>238</mn>
</mrow>
</msup>
</mrow>
<mrow>
<mtext>U</mtext>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<msqrt>
<mfrac>
<mrow>
<mn>352</mn>
</mrow>
<mrow>
<mn>349</mn>
</mrow>
</mfrac>
</msqrt>
<mo>=</mo>
</math></span><strong>»</strong> 1.004</p>
<p> </p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for correct final answer.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “1.00” </em><strong><em>OR </em></strong><em>“0.996”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>UF</em><sub><em>6</em></sub><em>: Structure:</em> octahedral <strong>«</strong>solid<strong>»</strong>/square bipyramidal <strong>«</strong>solid<strong>»</strong>/<strong>«</strong>simple<strong>» </strong>molecular solid/simple molecule <strong><em>AND </em></strong><em>Bonding: </em>covalent</p>
<p><em>UO</em><sub><em>2</em></sub><em>: Structure:</em> crystal/lattice/network <strong>«</strong>solid<strong>»</strong>/<strong>«</strong>resembles<strong>» </strong>fluorite <strong><em>AND </em></strong><em>Bonding: </em>«partly» covalent</p>
<p>UF<sub>6</sub> sublimes/evaporates/boils at low temperature</p>
<p> </p>
<p><em>Accept “UF</em><sub><em>6</em></sub><em>: Structure: octahedral </em><strong><em>«</em></strong><em>solid</em><strong><em>»/</em></strong><em>square bipyramidal </em><strong><em>«</em></strong><em>solid</em><strong><em>»</em></strong><em>/</em><strong><em>«</em></strong><em>simple</em><strong><em>» </em></strong><em>molecular solid/simple </em><em>molecule </em><strong><em>AND </em></strong><em>weak </em><em>intermolecular/London/dispersion/van </em><em>der Waals’/vdW forces”.</em></p>
<p><em>Accept “non-polar molecule” for </em><em>“</em><strong><em>«</em></strong><em>simple</em><strong><em>» </em></strong><em>molecular solid”.</em></p>
<p><em>Accept “giant molecular” </em><strong><em>OR</em></strong><em> “macromolecular” for “network”.</em></p>
<p><em>Accept “ionic/electrostatic attractions </em><strong><em>«</em></strong><em>between ions</em><strong><em>»</em></strong><em>” for bonding in UO</em><sub><em>2</em></sub><em>.</em></p>
<p><em>Award M2 for “UO</em><sub><em>2</em></sub><em>: network </em><em>covalent/covalent network/giant </em><em>covalent” </em><strong><em>OR </em></strong><em>“UO<sub>2</sub></em><em>: network ionic/giant </em><em>ionic”.</em></p>
<p><em>For M1 and M2 award </em><strong><em>[1 max] </em></strong><em>for two </em><em>correct structures </em><strong><em>OR </em></strong><em>two bonding </em><em>types.</em></p>
<p><em>Accept any specified low temperature in </em><em>the range 56–65 °</em><em>C.</em></p>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">A proton-exchange membrane (PEM) fuel cell uses pure hydrogen gas as the fuel and a proton exchange membrane as the electrolyte.</span></p>
<p><span style="background-color: #ffffff;"><img style="display: block; margin-left: auto; margin-right: auto;" 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" width="512" height="421"></span></p>
<p> </p>
</div>
<div class="specification">
<p>A dye-sensitized solar cell (DSSC) uses light energy to produce electricity.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce the half-equations for the reactions occurring at the electrodes.</span></p>
<p><span style="background-color: #ffffff;"><br>Anode (negative electrode):<br></span></p>
<p><span style="background-color: #ffffff;">Cathode (positive electrode):</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the cell potential, <em>E</em><sup>θ</sup>, in V, using section 24 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest how PEM fuel cells can be used to produce a larger voltage than that calculated in (b)(i).</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest an advantage of the PEM fuel cell over the lead-acid battery for use in cars.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Outline the functions of the dye, TiO<sub>2</sub> and the electrolyte in the operation of the DSSC.</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Dye: </span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">TiO</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub>:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Electrolyte:</span></span></span></p>
<div class="marks">[3]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Suggest an advantage of the DSSC over silicon-based photovoltaic cells.</span></span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Anode (negative electrode):</em><br>H<sub>2</sub> (g) → 2H<sup>+</sup> (aq) + 2e<sup>−</sup> ✔</span></p>
<p><span style="background-color: #ffffff;"><em>Cathode (positive electrode):</em><br>O<sub>2</sub> (g) + 4H<sup>+</sup> (aq) + 4e<sup>−</sup> → 2H<sub>2</sub>O (l) ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept any correct integer or fractional coefficients. Award <strong>[1 max]</strong> for M1 and M2 if correct half-equations are given at the wrong electrodes <strong>OR</strong> if incorrect reversed half-equations are given at the correct electrodes.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">(+)1.23 «V» ✔</span></p>
<p><span style="background-color: #ffffff;"><em>NOTE: Do <strong>not</strong> accept “-1.23 «V»”.</em></span></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">connect several fuel cells in series<br><em><strong>OR</strong></em><br>increase pressure/concentration of reactant/hydrogen/oxygen ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Do <strong>not</strong> accept changes in [H<sup>+</sup>]/pH as they do not affect cell potential in this case.<br>Do <strong>not</strong> accept reference to quantity for “concentration”.</span></em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">liquid in cell is less/not corrosive<br><em><strong>OR</strong></em><br>does not contain lead/toxic chemicals<br><em><strong>OR</strong></em><br>larger energy density/charge capacity/current per unit mass<br><em><strong>OR</strong></em><br>does not have to be charged prior to use / is always ready for use «as long as fuel is available» ✔</span></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Dye</em>:<br>absorbs photons/light<br><em><strong>OR</strong></em><br>releases electrons ✔</span></p>
<p><span style="background-color: #ffffff;"><em>TiO2</em>:<br>conducts current/electricity<br><em><strong>OR</strong></em><br>semiconductor ✔</span></p>
<p><span style="background-color: #ffffff;"><em>Electrolyte</em>:<br>reduces/regenerates «the oxidized» dye ✔</span></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>cheaper/ease of manufacture<br><em><strong>OR</strong></em><br>plentiful and renewable resources «to construct DSSC cells» ✔</span></p>
<p><span style="background-color: #ffffff;">use light of lower energy/lower frequency/longer wavelength<br><em><strong>OR</strong></em><br>use of nanoparticles provides large surface area for exposure to sunlight/sun/light<br><em><strong>OR</strong></em><br>can absorb better under cloudy conditions ✔</span></p>
<p><span style="background-color: #ffffff;">operate at lower «internal» temperatures<br><em><strong>OR</strong></em><br>better at radiating heat away «since constructed with thin front layer of conductive plastic compared to glass box in photovoltaic cells» ✔</span></p>
<p><span style="background-color: #ffffff;">better conductivity ✔</span></p>
<p><span style="background-color: #ffffff;">more flexible/durable ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept “lower mass/lighter «so greater flexibility to integrate into windows etc.»” <strong>OR</strong> “greater power-conversion efficiency «with latest DSSC models»”.</span></em></p>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(ii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Natural gas is an energy source composed mainly of methane.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Natural gas is burned to produce steam which turns turbines in an electricity generating power plant.</span></p>
<p><span style="background-color: #ffffff;">The efficiency of several sources for power plants is given below.</span></p>
<p><img style="margin-right: auto; margin-left: auto; display: block;" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAhcAAAFiCAYAAABF3vqnAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAGk2SURBVHhe7f0NXFRl/j/+v5aP/9bvLPLRaouPbd6sEKF5x+qupl8jU4vaArFsLVJKNM070FV3N1GM3DIXuVE3U0xQ0tUShrQwRCX/aX5WHe9TBMMoicyCkOZbrg2/6zpzZubMMAMDHJT09ewxeZg5dzNzruu8z3W9zzW/qBVAREREpBMf9V8iIiIiXTC4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl25vVskoEtXdYqIiIjIvZJzpeqUM4+3osoAw9NCRHTjYZ1ARDYN1QfsFiEiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJdNTO4+AK5MSEI6NK1kY8QTDR+oa6DgMuoMBmREjPQ6XPqNdmIcos6C7VOFUZMtH9n05FbcUV94VqzHlP/NJ7EVd+jKyak9HUcx9bHfYgvvKjO4MJShMzwHi7zX+s6Qlu3sb5qMTXFKMyYh0e0333YPGSZKmAR/9UU70FO8gT00rzeK2YlDlZ8C1Pyw45lYoyoUFfZdFdEcZ6u8zpvXGy5uOZEATK9gfGRcVhe4HIo39IevvyGqJEsFQeQNe8JDBbH1JulP6rPXmtlyC04gWr1Ly3L2Y9hPGpW/6IbhkUcE7PHIibhLRSpTylO5WDLse+A6j1YHD4Os1MLoD06zAUf4eQlXnW1djx1XXPf4mD2O47CFTwTm0+cRcm5Uhx7ORR+6tNE3qnBkY0LkJB1TP279TAfP4ev6pwTruDCSROOq3+1Hr9BeLpJKYcl50xYFfEb9XnSTc2nOPihu7aBW3FPl1tgKTmMPHcxp6EbOt9+k/qHntrAPyJN/c7FIz0C/uor1HjNDC60BdDxOJ09He3VOYBHkbS/2GUeFlaHH/BdxSV1Gmg/YhB6sbmCrkdHC7Dv7A/qHzZVOH3wqDpNNxRzFb6yBw+dMCbjgHp++BCJoe1xsaxUHB0qw1ikH7NedJV8shChfn4IiXtfnV88GAi0OtfgLHYRhfPus/dr9ZpX6LapFNWFiO+u9n1p+muvmJLRT9snZqmAaeubiA+z9dn2wCPzMlBY7HatqmoUF77tnOPQfQJSsveguKY5zW1u1ttlICYmv93A/jSRU9+27O83o8L0PjLnhTu2HzYPmYXF4nq2Po3Zb+331wMjM4rg9Ik5fW8NvR6FzGLtycZdH2t9n1+Npt9V9ot/iooDKzHRtv6wBcht8HN3XccXsFSYsM2pHzgc8RmFTTw23PcbW4/TN7FN6Vt25nSM902G6YrMn3DzvW41ieNfXUiwLtcTo1NPqc+IU3fqKNytLHMN80HufxJjehvExGEY937mcjycwM7sMjHhjyHDBkDOVS/ZR5+d7PiO6/k8lGb3ydpj2vV4qxLf/SjH693jkFt+WX2tnpwLbZ6N/fvR5ky51kGur8tj2ghThW1bNtpjUTzc9Pk7HRtO36lzvkC/ZBOuyLrRqP2sXI5j19dlHWh0+Qy91oiya6u3BsRhl/qU7DbbGN1fXU4+AjE4dqv6mmBeh5he3cTztu+i4c9K4fZ4kZ/D+24+f29yLppTR2m+lzrnLPd1gYO7Otrdcs07v+rpGgQXNyNkWKi9EjFn74ap2vUjtaDatBu5tqjWEIoHQm5W/9D46ST+NWUkRk9LxMZTtpnNKMpaiJjhzyChsLzul2UpR+GCZxAWPcc5x8FcgOUzxyHs91OQWdTQCakuS8XHWBbzYN31isNzV+ocsT8PYmLax5qCazvo/i9mFVSqzzXnZHAJxRtnYUTkFCRqm8RPvYXE6Ag8uWCn20qj8fut/f7MOFvypXgnDpavzuGE/Wqk7utXtE2dvYfh3m5t1T9EBVz4Cp4c7trHqtmPjJNO63L2I85vS8T4JxZjl23hU2fF6aNxzadXit/C1KGjEOvUD3wMGxOeRdgTr6CwToVUH0/vSZLHaSJiI0diUr3v6yscXTvD/fc67RmMTz1Qz7KtxH/diYCet4oJM45/dAoXrM8K2nLeHw//sU+935alYicSnohAzMw0x3dso3weozBiYhaKbCdPn054NH4uRtgjlr1IWrpdTZKWuU7rEZ9qUl6Rwc2Iv8fh0Y6NbG7/8RPsSp4ivh9tzpRaB4WL4Lb8Iooy5PenfV0e03EY/eySRh5P3rt8Mg8pE0XdGKv9rKzH8ajZ76K8+iQyXV+XdWCsOKYWuq8rPGtu2W0J4vstysLE349wc7zIz2EKRg94wv05wiMd3uc3/8Za+bnXOWfJumAK0kz2thqHGvFdua2jbcs9gEft9buO59dmugbBhQ/8Qu5HuP3dF2Kn6Vv1D5tvYSootH95hsj7EeLnZld3p2N5nvbD1jqGLPFlrHe9UkmdhpjMevqjzduRODIJhXW+kHrUHEDaszFIdfriXYkDcOlMzF/XUoWsECtTt2sOeC1xEGZOx+R1Lq0ITdpv5+/P+eD9AWf3Fjj1n7u+XnrskNrUaUDPkQPRTflaZUX/BsZHpzsndjkR+5HwAhZ7jLDFexTHjHZ5Q9jjGG4PXrxRiT0rViLf/YcoTmDpiHl+A4q9PDQs5e/jpRfU92R4CPEfHLU24Z7YhvhhtkZc8b5e24yDno63yk1YtKie7zU1FVucjvHW6H8wwFbh7TuM0/b3ehlfnTtrfW+9Q9DjjnpO7JYybF04D1lKheyPoQnbcERpEj+K9xIeclSmBauRddBRn/h0DEXMhBD1L/F63npsPiKOwJpDSH9xpf14MYTNxbzHOjW+QhQn5JUrXANHldmI+PFjMT3Bw/d3agNSt5c24uTmPXNBOlZ6KNfmvJcw4ckXkOj2dVlXrMUHdbqvPNGj7OrPUv4u5oyMrxuEOhHniBeWYKu9tao++rzPqqzFWOyxvjVh+UKjc/2iJL3GePiubOR3Ng8vvVsm9lLH82szXYPgQvC7Bw9EdlL/cJNFbm8qlTohfNg99SQ29sKYlO32iiYvZSyC1FeUK5XM/fZ1W4qNSLRfqRgQFJWMPCV5sggfvT0XQ+1fyDtIzS72stD/gOJ3UrHcHoWKim/GKnW9Z3FkxypM1Z5IEl5RTwa+ap/h/x9JwzpYXxbaz9iC08p7SUO4fxv1WW9p35PcdjLGBNvfFI6/tgF7NCf6pu234Ps/CAhU12s+gCMltnXU4HzJ5+q0ynwWn32lFl7LZ9iXc9g6jc64r9cd1gPQUowtCx0VPYLHImmH9UR8Zv8GzLDvRxk2Jm+r5+Suff+lOPZ6BDo25QjXbL/kxHYkRfVSXxCOrsW6Pd5UkiLQyn/HHqgYIp/EyCD1KPbtgadfGO3IS3L6DN3RHOOf7kX6OM3+4BPsPWndnzYhcTh47jg2zwhW/paadzzpxQft7uiKbnJSW9lpjgdDzy64/b+USbcsZ3chw3YhYRiBpyKDRQmS/MR3PgHP2YtQGfIOl2luv22PkAl/wVR7OZAV+BvIfP1Vx7FviEBi/MNNO1YUmu/HKXAUb/fUKZw1DMOMtz/GGfH6mf3piNKWSaeWHJ3Zj2NRnj9IdNRvIoguOlUGw7C5+Nf+IvG6qP8yYjT1puOYalBTym6bEMQeFp/V/mQMtb4oBGNq9nFrmVMexfgo5VH1NaHDdGwukc97k6/nXPZczxHaYBTmfGTkexHg6VZHCU7Lao8H4agJn1xwHL1Ox71r/e70nVYgf+0unJXb1fX82nTXJriot+nGpckm+HGM7OepyUZc/Sa8hoURQfaKJjAiDokzNFcq9nW7XFUHT0LiXx5DoJI8eRP8+0dj9pxB1tdkoc/52PpFNcTphCn2KOoV/CNuuLpeH/gGDkdsSpqmcnPT76yX3rOR8lKEZtuPYe6iSY5Kw0PFLjVqv306496RfZVngc/w4bHz1uedDlobTUVV8yVKim0Ven/0CbCu2/lWxBBMXRSH8EDr4e7jPxBT5j6PnspfgtukQJu+GD3uIfU9NNUgxKf91b59+AYh/C/zNJ+Dm8LqVlsERmcpFYh81H/nz/f4ptrTexIVyox5mGs7xn06InTys5pKuRKm0guak2nrY/BvD9+uvXCfEgA4Tv6O773hCs4nMBo56mdpTejz/B1f/qbaflWm8P0dYrTl4OhKJK7QXGRMeAoPNLY7RMMQFYfZtu9HHC8P/rG/8ryVqKPm/BlT+vsrla2P/x/w2IjO1pekQ6Uob5EvrxPGzJ2mHseiPAeF4pF7HRcx8jifNTca/fzl+xb13+AwDLe/7P0xpV/Z1dGVT/Be6l71j7rniKCxsZjVOwRjEpKQlGHE+ugg5bupj37v03XZ+zDp+QeUaasSlJbblq3BkW2bHecs1/o96HHMnhMqAo54JKVkIu+tsQhU3ohe59fmaegzbSH1Nd1om2zEgfHkCPTxeLLoi4hBnV3eRHv0um+w5qrQduXsfFVt+F1PBDitty269vqdYzmXCNIT54MuGM9F9qtbSfoGY4i9QmlE4NIo2m4GG3EA9hqkqTQu4sS5b5RAoHn73RbdBg1TC5PjeUe+hdiXKVPwhPL9VmL/wRJxMnY+qB1NcRbUnC/FWevT4oV7RNDhvCc+9hOTVM9VVYffoWfXxnSDuOGUB6Jy+hzEO3Z7S6UXlEQuI3Kzk/FCVJojEx6X8FWVp8roVoT07apWjKpbO6G79jzRyt10ix8MbTqhzyPWq6mqwmMotWi/9zsRcIcv2nTsKqpeb8kkye3INW5CyqQpWO5IW4K5oso5uJDlIOQZp4sOO3mRMeF3zp9vo7gGRm3E19PVUY/UqaPaomPXAHW6BdXpR2+PO3s4WlTqHOdtbkPX3zX2oNKx7OrpYhk+sR8PmhZSG58gjMvdgsToSISHBnrx3ev4Puss63q8aFXh85OO7pD2ob3Q1emNyAuYtXjv5ecQHjFEc1Gl1/m1eVpmrd7wG4Cx9pYCzdWg09Wvu+BB62a0b1e3qde5kvoWlZdkkOB8y6c561mEqBm1tsfdkdoKXxtBema5VAlHyBKArh3dndxcKpSySug/Bswv8ev2v6r7WTlVGmZ8Xvm9Nbho5n77dBuICOUOAKG4FOdrLmvGK7gV94T8HnerXSfm9w6j5IoZJYcPqAe1tkK2wFxV6TgZ2LPCNd9NwCjNyaOeq6rfdUXH5rb8/7o92tX5EJv+/Sl3ntiy1X87EKOnxWFWnQSzdri9vaeg6Fe4xc/Taz8n7XF3v97WSeXKrtxRyXkbFCrBmQgmlIz5IAyOnIxZsX9xSXITVaZ/e/tVm0N79HnyGU1ypySv7scgpFmVa0Pfj/s6qsX9sj38DPW8L7fHeWPpWHZ1dKW8FLZ2Kfn5d2j256/j+2zoe9G6cgGlh2wrNeDODm7qd090Ob82T0ut1wvaq1/xfSlNN1ecm2zcXUVS6+BzCzordwAISmR81jFegbxq6t/P0XVSeQjHz5bgeOFn1r/RG/3udh+rXz/E1U5RFibJO0/swYTsM7U2YW7NmKK5WrleAoj6tMFtPULU8n4YRuO/8IFayRke6YuAhup/mTGvZNlrgongpxGfkob0vHRM1Vx0Ky0l6rSDOEFUfI7P7GcIydsuLvr5sl1c/tw5Lgy9c+3Pr9cwuHC5+lVOUMXOTTZ1mvldfYsqNweON5GrIWotTLY+XLeP9xEb0nCDmXMriafWjh9QXlqiTgudOuhw1eDqR3xd5ebg8xD9Nn+/tf16Zcj73+3493tqRBzYFXf4tsXtXbqpr3+Cve9/gL22bpjeIeh+m4eziXawHA+Pg3Eh4lTVQr6uctMq0YTvTyaAzXnF0UIRHIP0/YcdTZh+9WQvXqd8bu+Ce5QDwozjK1bgbeWz6YAB/QLqdsk5kcnHr2gy5nshKmMvzuS9jHERjyI00IvmfJe7Q2zMWcvwprvb/1qDOseiCJCqq9AyN6/q4FqXXZVz3VZfPlMTXa336dJVVSeXqAHNP782Twuu2gtOiYHiKiJzKdbZmmwMj2NGZGADO3gYm7cdd7m1U3u7o2AfKvZWdB/c3fqcYD50HCXNGjBLdVswBtm+QJzCm9kH614J1ZzCnnzbVXtLfamiwt6UjyMu78lSegwf2pvrrMPqKptu9n479+tVvZ6GVcp2bPNpX6/ErtSV6oA5ruvRXtEK5hM4UnINryWPbsV78lZFLct5TauLeAfyzoaGvr8LpxzBlDiBDn1+HEKV5LkbTQeEdL3NWtE6ZbHbdMegHmoLmEcX8clHn6jTwrBnMSm0YyMqryqYVmvvDglAkO1uJ3n3yIvrYdKjLtCb0t2o3a9qlBw+0agTTMtqZWXXxikn6SJMh0tdzhFy8LRnMTF5E3KN3gyceK3ep3OeTN1zlgU1pmUYGZOMHOPWuoN4Nfv82jwtuW4vuDTd7C7AHlv59+reW3mf/8tYvP6AOoBINYqNryA2wZYprF2P87ZwaiXiX33XfmBZB5N6uBEHnMrpCxR7lPVX/Dl5h7q8+PKLdyAldrqmYhuB6BFdW+aDV97Tv9SR5+S2jVgwfYkj21ib5KXHfvsFoJ9TBrqkCWC0t6za1e3nc4qwlco+2TGypqUCB9MmoJ+nAqQ7uf1/qL/KKNQUIXf+HCTaA4Wm3Lrl2qrkEgC3oMtnynBBbrjmAiq8PaZbjC/uCLhTnVZpfyfC20RVlyt65wDalayAtYNlieB2Tho2LtbcPSLLzepDLiega8Elt8ecjw3Zp9T9knVbsuZ9tA6tq+yq2vwWQ8ba2i7Uc4SxSP0cL6PiwL+wcnWhuOD5C2bFjkPY0+saHLvm2rxPA+66L8z5OHU6Z/0v1v5zA44XpGG2qKtjhr/gMgJtc8+vzdOya/eC85dm05gK/Bg2xo/G4N/KxJreCItd52j6lPevv3CvfT0+gRGIt2eMi4MuKw5h91gTc+4a8BRSC07ZDzhlFDuv6uK2CHx8huZWxQqxjonqeruhz/CJmoQzfwydE9Os297qJ9/Tixg9IEjddpxmFDg5AuF4DLEfUHrst3NrkKKeAEbhLnnPJxCjFmgr+3WYNby38r3IJMg/LS1Ala0AKaMetnDD8Km3kBA5EHfJ7d/zEGZpRsY0hMVh8pCGrrQFp5Yh2ar0DvYoQV/dAFh+9p+U6RVqtEG7Do67BMx5cRgiy8Y9L+N/r3lw4XJHluBdJedynB3NwVt75MiKbgJooepkmbheVbl2hwRPQvzjQfBzuntEnoBeRfo17x5xuUJWxpf5I/ooSYMudVtr0drKrsI1eVecI2IfUj/HIAzWjuKLEExdEKHewlmPa/I+feDbJxwTw2ytF+7OWbY6Wt6yPgOjAp3r1uafX5vumgcX8ksbGfe4+Gg0vB6ONBRTE7SDZmn1QtQ/Z7sM5ysH1HnJaZAbdwzDEvH2kse8H1THtz+mr03XDKTijhxVMB1Lo3s047a3+nTAkBlznQdksRMH3riXMd91BMJm77dLa5Ck5FvYtnKTJu/Cyn3ynrxVcByWage3cUeOcpmzEOEtFpwJ909BvNMgVRrBMUhb4OVgS3Uqo3TEKEGfu5OEnln0br4Thfv8pKutTUBfhNm/ZAO6BfyPF+XBNRCWo+8OEsGfawCtso8d4dIdIk8ki55R7w5xM7hWK+gecb4AciXK8eQpGONN685V04rKroZPx8fwWo52kCl3ZN32EmJCvEkuv0bv00cEAkvSvThn/RVL3d1S3azza/N4e/psQS735AreN9m0Q9eHXsQmp9EkZUb+AqTvWI8Ed/2yvj0wLv0D5GW8plnGyjBsOpYs24L8VVEIauTtaXIglWnKepMRrx3RUR7AM14T+/MBVrVYYGHVpusfkfC2EatmDHMcTDKjPsOITQsfgL+bt9Tc/XaOjOvPy6g/YvZDUPQK7NuRiSXa/ZcMwzB16evYvCsV42yjXLaU/wrAgwvXI2/NTE3F1AtjEtYi7+2/NiJvQlZGU8Sxudb5c7W9l/1HkZdgu1VMnAZX5+Ij+0A3zeMT+BRez16kGZ1VlomH0VP/LOLGc+pKczMGgSciEI4Vx3Z6wtOaiwl5jL6KlOyPcXrHAkdAVWlEzkcX6nSHBM34i/OJxLc3Rj8/wnGstYruERH0xIljLWOBy/cXrwz4tGnWUNyiPtt6tJKy60SUv6AorPp3PtKXTncJMmR5Tm5CnXyN3qfHc5btuMjHvnRP56zmnF+b5xe1gjrtRDa7yKzXq8FSbhQfWpw6XKv86d0tSAx13/QsfxVwgH08Cvlz7kuv4bDG15j8dcH+tvurO2Boyrv8KftGkz8gN9rxS6LDkvERf77ZratZJxCRPhpzfm2MhuqDa38pU3MS6+cvdowD3/tZjPWmT5uIiIg8u4bn12sUXHyB3JgQJfIJuOePmvvXXZvViYiIyHut4/x6jU7jLuPcq2RSyquPt+y9t0RERNev1nF+bSXncWvC3JaUpxqdSElERESeXJvza6tI6CSi1o91AhHZtP6ETiIiIrquMLggIiIiXTG4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJduR3+Ww7rSURERFQfT0OAuw0uJP6OABFpsU4gIhv+tggRERFdVQwuiIiISFcMLoiIiEhXDC6IiIhIVwwuiIiISFcMLoiIiEhXDC6IiIhIVwwuiIiISFcMLoiIiEhXDC6IiIhIVwwuiIiISFcMLoiIiEhXDC6IiIhIVwwuiIiISFcMLoiIiEhXDC6IiIhIVzoEF1dQYZyOgC5dxWMUUkxV6vOe1MCU/LAyf79kk1haLxbUfPopKizqn63VFRNS+srPajpyK/R790RUn2p8WnxB1BJXww8ozohS60RPD0/lvxrFhW8jJWagY97uE5CSvQfFNd7s/WVUmDYgPqyHY9mdxaLW9cBShtzJYlthy2Dyav1E3tG55cKE5S+uv/oHaU0xdiU/j3tH5aKc5YOI7MRFR/EOcbJ+EKO3fXGVgosanC/5XJ1uBEs5Chc8g7DoOVheUKE+KZgLsHzmOIQ98QoKKy6rT7oj3qvpDYyPfBEbT5mtT8llx0fgyeQDbgIMMf+RXKzKA0Y8H44+vmzIJv3ofzSdWon41Yc8R8ot4MqZbZiTWgC1OBERqcw4sy3Z+WTd0q6U4ch7ZWLiUSTtL0bJuVI3jzSE+7exzq+4jPJ3l2B65jEgeCySdhx1zHtiO5Kieom6NR0xz29AsacIyVKMLQtXogi9MCZlO46cO4sjHyRiqMGMotRUbCn+QZ1RZZs/+CnEDPsN+8hJVy1wPMkD+VWkN9g9QkR0HbpYhk8qxb+9Q9D9Nm0AUZ8LOLDtQ1F7dsKYudMQHuinPi/4BiF8ThzGGMT00QLsO+sSJKgsZz+G8ai4xOo9EmMfC4KvqN59gyIwaUKwePUT7D150TqjQgYzK5F09FaxvTEIYasF6UzfI+r+GEwN8xcT16h7hIjomrKg+vRh7BdThp5dcLu3NeyVCyg9JCOSX+EWv7bW57T8AtDv3g5i4ltUXnKfq2W5VAmlM+bX7dHOvt226Ng1QPxbCVPpBUeOW81RbH4jHwiLw+Qht6pPEulH3+Div3pgdPxcjJARdpO7R2RCkxGZ88IdCU3KIxzxGe/D5NTn+AVyY0Jwd2QalHaSyjSMDpDz2pKlrK8HdAnBROMXcg4XmmTUGCMcDae25eR6vkWxcQEese2Ha+JTTTEKjW86Eqjs881D5laTjgmmrolePfDIvAwUFldDvAlMlM/1TYapTr3TmM/TRiaFbUdO8gT00i4j35PR28QyumHZjkePSYseyqXTcSyPQaP7491byvp6YnTqKeXPqtRRuFuuy6msC5YKmLZuck6irLd81Ocyvjp3FmZ0wIB+AdC0P9SvTSf0eaSTmPge31S7aZmoLsHBfTL4uBkd2nnbGuLJDyh+JxXLT92N5yaEoiMbLagF6H5Y+XR8GPP+HgFDU7pHlMzlBxEWHYfErGPqkzbHsDFhCkYPnYvc8sYW+Ka6hOKNL2JU7DoUqc/gpnZoZ7B+bJZyI174/QjExCY6EqhsTr2FxGmjMGKKsflJpm4TvcTnm7UQMcOfRcr+r9XnXDTp87yMcqMIECMnY7ZrHot8T7EysWwFW6WoBZnx+e4lGB8Z5+Z4fwYJheW6JWZaKj7GsokjMXraX1zyMtTyMeCJRm7PlszZHYM6fYvCjHmOC5MuAzEx+W0PAdLN6Bf5OIJQho2LlyFXO48Ifg5mvIVcURgNYY9jeDc3LRuCT7sOuFNOfF2FS/YdrsLpg0fFvx0Q0vU2KGFJ9X6se20vDFHT8FxIe/kMke5aIGa9CR0fEyezRnePiGh63d8wK08U8OCnkZD9Mc7Yk5+OIm/NTAyVLSJmI+L/uU9cj0u/QXi6Caezp0MpIh2mY3OJu2SppirEytQjGDBzAz761Lof+f94GN3kp2YpwvrJLyLfbEBQ1CJs3l+k7qt4nMjHqhnDRIAldjcvGa/v0fZ1NpYm0UsmaiVuVvflLI7sWIWpw8qxPPbv2GWdWaMpn6dQvQ+v/80oqnJ/DLW/b9v2kjEmWCx0ai1WFpSrCxDprDIdsyZsALTlypbUKE76WSLIXu+anOiOfwRWnTuOzTNkzgHQfsYWnJbrSo8QR7cggu+tC2ciVQYVhmGYuiYfR9Qycmb/ZiTYtzcNad5eJNmTOfciMTIcMQlvOS5MUIFdqXM8BEg+8A2Zgk2yTN+Rj1nDeztaUX47EH9aegHhouznr4jw2NLg020gInqL8nk0B+veLRJhjgU1RduxIVvujwh2esjujyqY1izDRvMgzBo3wPuWFaJGaoHgQvDphEcb2z1i+Qz7cg6LCZnQFIuoEH/Nzvkh8IEJmD1nkPKXuaLK+Yq6JfV+HrOnDoS/sjN++G3gbcp+2ZOnDI+L/foTQvxvkjNY+QZi6Iw/Y5Ys6LiEr6q8qAg9sZRix9p85WQ/ImUZFj7TX90XURkFDkdsShqmyhO+qyZ+nldKDiNP/mEYgaei/6BuS5Lbi0Bi3klR+ZqwKuI36vNE+jOELcLql55ylCuZ1PjSMiQpFy17kZS53xEQN4kF1XvWIF4G34YIJBWsQOwDgfBVX/Xx748o+/ZMeDP7iFfbs5Qew4ey90IG5zNWIe/EWTU4lw9bUO8hYLFcEEHNh9jh9s6WEpiKilF+oZ5WW5+ueDDuKQTJVpfYh9CnSzf0eTAeu+QF0IwZGBXYFpbyQqSvPm3/23obv637swldT0QeOM43Omt094hPEMblyhPXh0gMdZdg1Abt2t+sTl89npKyfAKjkSMrjE8WItTP3Qy/Qvtf/1L9o+kcQcwIjB7q5nYx35545Mm+6h8aTfw82wT0RZiMVczvYMlrGdhmqtCtCZrIO+KqeuZDda/Q5UXLzOfRU0ya3zuMEvd5jV4yo+TwASWoNkSG4/6OmosDG+32snfDVN1wSbDXC+c+xqq44Qh0ugtDBvXPI0GpF10DliqYUqdgdPxb+HzYTKxyuhU1H+kJI4GsFzH62TfqaQm+Cf6hs7Eme5G1hVFSWmSM2BTXXwROF7Hnn8nIxwhMfLI3fGW36eyxmGjv/lS7nsIXXMWuZ7peuTkr6qWp3SM21qTCXKNRPLKROW8UBsduVV+7WgzoFvA/9quZeilJYXJf5UMmeD6IWQXKJUwzWFBzvhRn5eS9fXG3uyAGbdG11++s3UL18vLz9OuDkRNCxISsaBIRGzkQd4mrml4xychhMiddDYZu6Hy7m5O94HN7F9wjz5uVpfj8YnOiiyp8flK2ENSfeGnfnvkAjpTY2veaQwQAPXqjm5jSBiyWYiMSU03ivUcg8aXnMdTpVtRAhEb/GYkzRLk8tRKJ7xTXE/CL9Yc8pbYwyouf1WqLjBxgayOWZF1EzzmT8GjHNo6Wm+AYpMvup0/3In1cL7FjLl2lRE3QgsGF0NjuEXmCNiZjYnfZRBeEwZGTMSs2TjxmuUlIvBp+iV+3/5XHD8lSYUKurUnxtwMxeprcV/lwk+DZJBaYqyrVqwrP2nTsChkO1NGkz7M9QuLWIi9jgePqRzAXpGG2TOa8p5sINFbiYKOz6Im89Mv28FOTpusw+OGW5jcIeq8FtufTrj1+LSfMlfjOLMOEK7hw0oTjYspjK4ool73uGyz+b8bxnI9xtrExvuUL7Fy9AUXBkxD/eKCo076FqaBQrK0Dhj4/DqGy+8mnI0InP4uhYvbmtwzRja5lgwvB++4RtVkwNg27lLNpL4xJSEJSSrJ4pCF9xyF8lPKoMmerUHMAac8+g1m2JsXgpxGv7Kt8ZCLvxIdIGibvS295V8pLIa55XDTn8/RDYGi09epHNsmKZZaoCaqSuWAx/lRv8yxRCzFX45sf1emrwb49PW4BbdhNt/jZy5kr+0VEWaXmbhBvuBvm+wd8V3FJ/OuP7p007Z63dkJ3WW01u2WIbnQtHlzU7R5ZjT3f/Mf6koajWfAhxH8g+xtzkRgdifCICPF4FKGBBlyq+ladu7F+xNdV37tpSrzSxHXa7hM3wzAsEe/JpK28lzFO2Vf5GIJAw/9D1dfNrQXb4LYeIUqfL/Ydxmm3fb5XcLGsVIQSznT7PGWTrFhmZNxqHDtXhI8yYhAknz+Vhz1n9GidoevXt6hyN+CT5fv6y0blIRwvdZ8EbfnqHE7Iw65DV9x5a3NO9u1xZw9ZJ1Vi/8ESj10A9u3V01Xj4PjBsl7zCj2v81IVlJvH3Yzgefmbao8tle4vIrzAYb7pGrg6x5lT98g6LM8qsT6vYR9dLvAPuFfb36iyVOzFW5vk3Q/CoVKUexVU2yoQM86WfFm3S6bmON6zrbNRRFBSKU/MBnQb3N8laUu6jIo972CzTMR0HRmvkey3l5nzsXmXmx9eqjmMf72xU/3DoWmfp2ZQsfAMN79hIPtzByHE06UVkWS7+hVHYMl511Inr6LFsayUDU8OY/O243XLq7x1dOkbOC7KXdDYwbirWQ0JBgT07a+0EpizNyGnyE0oYN+emPu+vrirwSGy26LboGENJIBW4ci2rcp76DlyoPW2ds1FhPnQcZS4bRGswrEPP1IuIgyP9EWA1+/d0zDfbfHf/u3Evy6DdtmGLm928EY3uqsTXAiO7hH37APAyHu03zqgGdlSjjCZgQXPTkeWhzwG+7I/luFzp1u1NBVIVjKWrLetV1Rw8pcSY6crrQ+N1wbtOsg7Lcw4vmk9NmjvqJAjdma8hPHR6Zr725vBpyuGPztCvIcK5MdOwwIv30PTPs828B8aqf6GwRLEzt/gPEJhTRFyX0vGRrlYcBiG3MUog9ywjzYpB4RKQZa9fIhjb+cKzIxa2kDZkF2o0zEzeYc9gdhScQBZ86dZx20xqHc7KK80xFZWxWn2TBku2MuBD/yGjLe2qJq3I3HkLKefJnfaHkK8HsnSp9tQRCvrXIfpM1c55ybJHKj1/0C8bFG05z5Y+QRGIF5J2FyK6NhU5GrrFO1yMuHzhXs9JqDW4XGY75sRMixU1CvyO3rD+murcrC+19cqY+Y0LoAhcqPWg26du6hTDflP7Zc505T5u43Pqf1Sfdatnz6rNU4aYJ1XPH639JBY2qay9tDSSPtrro+e41+v/d/dr9dGyL+D59fu/u4ndTnhu92184K180+rNX6prvnSv2uTH+queU3zeChNrHNJ7e/ktNO+f15rHN9XzNO3dkLO5+pzLupbb+cBtRNSC2p3r3la+bvni7trv1MXq/3PodrkPnIezT425KfztbvnP6ZZv+YRPKl21Zq51vfQZ2ntIfsqm/p5/lj75e6Xax92md/pIbaZcdr+jugGIb977/xUe+lQmodjqHvtw0tF2VgaJqZdyteXObUTlHkeq/3Li9G1PessKx7BMbVp//5SbMFbP4nqYb7zujRl/acv99WmjXfUSXUfj9Uu2H2+EdvzYp0Pza81nnFTfi6dqM2ob7lGv/cfa8/nxIr3HlmbfKhSfU7DpT52bCe21nj+R3UmIvfksVKfq9ZyodB2j9TRHiEzVmDzsninuxSURMllW5C/ahJ+P+R+tYugEDtNmnwBv3sxJUtzbzdKUFquNvX59kfs20akL51uHZFSIZMb1yLv7SkI8fsv9blGEuudvnY9UhKetuYgKORonfFIyc7ByukPYMj/baiJ1Esyi3vheuRlvIapw2Q3jyS3tQDpuYvxbJ/b1ee0mvp5ynvl/4pNOzKR5PTeBHnP/NLXsXlXKsYFeX3tRDcc22iTmU6JwMqxlyHHXPhDA1fenTFgahK2ON2xJMusOJ53rcC0/toB4RoiWygmIyNRcyxrulV9/Adi2qocUU5e1ZQtSd3e/reRENqxEdvTrtOl7CnlJ1PUOwucf/XUxrcHxqV/4FLOpSa+d3W0XXga5lvUx+FL1tlHE7bWKYvEdhYj3O0dK0Te+4WMMNRpJ7LfXd4nTa2dBdWFCzE4eh3Mw5LxkW1oYyKdtXidIH9obEAcduFRJO1fqtMQ/kTUEhqqD65uywU1nv0XJqOQ6e73FCxfYPcmOTy4AT0HB+M29WkiIqJrhcFFa3dbMAYpv1GyF0mLV2OXZtx/ZRCv1ETrKHvoi4hBnfmFEhHRNcdzUWvnE4hRCyYp/cXmgqWYqPm1xLsGjFIH8eqFqIzX8Iz8ISIiIqJrjMFFqyeT46Zh6/4tLsmjUtOTzoiIiFoKEzqJyCusE4jIhgmdREREdFUxuCAiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl0xuCAiIiJdMbggIiIiXTG4ICIiIl25Hf5bDutJREREVB9PQ4C7DS4k/o4AEWmxTiAiG/62CBEREV1VDC6IiIhIVwwuiIiISFcMLoiIiEhXDC6IiIhIVwwuiIiISFcMLoiIiEhXDC6IiIhIVwwuiIiISFcMLoiIiEhXDC6IiIhIVwwuiIiISFcMLoiIiEhXDC6IiIhIVwwuiIiISFcMLoiIiEhXLRJcWCpM2GZ8E/FhPRDQpav66IFH5r2J3MJi1KjzXVs1MCU/LPYrBBONX6jPEdH1qRqfFl+ARf3r6rOgxrQMj4i6sF+yCVfUZ61sdZGtrmzg0TcZJucVaFxGhWmDo+7tPgEpO+upcy1lyJ08EAFhy2CquXafDl1/9A0uLBU4mDYBfQaMQmxsIjaeMqsvSGYUZSViVvQI3BuzEgcrLqvPExG1FHFSL96BlJgHMXrbF9csuLCUv4s5UUtRpP7dMmQA8wbGR77oqHvNBVg+PgJPJh9wE2CI+Y/kYlUeMOL5cPTxZUM26Ue/o8lSjsKFz+NPSwtEGNELYxJWYPP+IpScK7U+Pv0Ym1OmY6hBHu+L8adn32CkTEQtzIwz25KxvKBC/fsasJRha+Ji5GuvtZz4IiTufUdd6eZxZl8yRoi6EwjB1DXPIqSNsqAzSzG2LFwpAhhR/6Zsx5FzZ3Hkg0RR54oLu9RUbCn+QZ1RZZs/+CnEDPsN+8hJVzodT5dR/u4STM88BgTHIH3/20iMfhgh/jeprws+/giJiMPKXemIChal5NRKxK8+1Eq6SIiIWoKsG5MRn9eM4KbmANLGvyiCE3+MSEnG9JD26gvOLGc/hvGoiGB6j8TYx4JEyOID36AITJoQLF79BHtPXrTOqJD7tRJJR2/FmLljEMJWC9KZPkdU9T68/jejuEYQUfWiKQjVBhUufPzvx8y5j8Mgu0lWb8PBarZeENH1yVL+Pl6WdWPwFCQlPKQ+2xhVMK1+FctlN0fv5xH3WCePlbblUiU+lxO/bo929pnaomPXAPFvJUylFxy5HjVHsfmNfCAsDpOH3Ko+SaQfHYKLH1CcnY6N4tg3RE3Dcx6iagcf+A2ZjIxlyUjJmowhfq67IBOStiMneQJ62ZOYrMmg20wV9fSZVqO40IjMeeGOxCflEY74jPdhYo4H0dVRYcREpexNR26Fu8zDL5AbEyJed0mmti2nJCzKesCIlJiBajmWdUAGCour1Zm9oKyvJ0annlL+rEodhbvlumKMcGpHsFTAtHWTZlvyoUO9Ye8OkRdd0fhD+/+f+oL3LOWFSF9tElNiHQsiEKjL5aCos99JFQHL3XhuQig66rJOImc6HFY1OF8i42UDugX8D3ytT9ZPdpE8GoE/hvg774CSEDoFIyInY3aqzN2wsSaDxkY+gEcX7ESFa4ShZDw/iLDoOCRmHVOftDmGjQlTMHroXOSWM8Agav3M+Hz3EoyPjNPkSsg6YCFihj+DhMJy3RIzLRUfY9nEkRg97S8ueRlqvTHgiSZurwqm1DjMyqtG0Iy/IKbBiy53LmLPP5OVXA1vLtx82nXAnXLi6ypcsu9wFU4fPCr+7YCQrrdBSdWo3o91r+318mKQqGmaH1xYvsFnx2VfXmfc1+uOZqxQ9gEuxnNKQqg/hs5YhbwTZ60JTTIZNPFpBMkKJnM6xqdqM59FFL7ub6IQi4oh+GkkZH+MM/ZEqKPIWzNTSSKF2Yj4f+5DI657iOhaqEzHrAkbgKhFjqTwE9uRFNVLvHgMWdFzsN41OdEd/wisOnccm2fInAOg/YwtOC3XlR4hahhBtiwsnIlUGVQYhmHqmnwcUeuOM/s3I8G+vWlIM1XJJbwk79pYj/hUEwxhi7B6Rn/vLrpcWIq3ITWrTEwNwqxxA+Bnfdojn24DEdFbVHZHc7Du3SJRR4r9KNqODdlyHd0xqIfs/hBBz5pl2Gj2bp1ETaVDcPE9KstkG8PN6NDOXQqzl+x5GzJpaRNWxg1HoC3JSLZ0PDMfq1Mi6uZqWD7DvpzDYqITxsyNRZRTa4gfAh+YgNlzBil/mSuqxNJE1NopJ+WXnnIkhfsGIfylZUgKk2HBXiRl7m/mhYIF1XvWWBMtDRFIKliB2AcC7UGAj39/RNm3Z8Kb2Ue8317NIaS/uBJFYr2J8Q83sduhCke2bcVxMWWIisHIwLbWp+vj0xUPxj0lLsKOYWPsQ+jTpRv6PBiPXWYDgmbMwCixDms3y2n736gpxi57F3QTup6IPGh+cGH3LSoveRzZpUFXSg4jT575DSMweqi726JuQsfHJmGWjMzNhdhp+tb6tE8QxuWeFFcbHyIx1F1iUhu0a3+zOk1ErZ+4qp75UN2Tsk8nPDrzefQUk+b3DqOk6dWNYEbJ4QPKxYYhMhz3d3SThK7dXvZumLxKPrclYPphxN/j8Ki79Xqj+ghylFyLTggfdo+XLQw3wT90NtZkL8IYeUeepLTIGLEpTraeqN0sGIGJT/aGr+xOnj0WE+1d0GrXU/gCdiFTszU/uPD5FTp0Ug/kJruCi2WlolgK9/bF3XWSPFU+t6BzTxlAlCHvcJnLKHc21oTQXKNRPLKROW8UBsduVV8jolbP0A2db3d/Uva5vQvukdVNZSk+v9ic6KIKn5+UORYdMKBfgMeTt3175gM4UtJQu6e2O2Qu5tVzZ0f9LKg27Uau3FzvZzG2UXdziAAj5Ckk5skLrlKUfLJabZGR+7YRS7IuouecSSLoaeNouVGGDyhCyad7kT6ul3iv7EKm5tMhuLCd8D/Dh8fOi0PYG+JALz6G4kYPotUWfrf8Sp3WkNnexmRM7C6b9oIwOHIyZsXGiccsNwmeRNSq/bI9/AweqiaDH275pTp9NTRie5aK3fhHs7tDpG9hKiiEGQb0HDkQ3ZpfS4ud+wI7V29AUfAkxD8eKCp+2zY6YOjz46zDB/h0ROjkZzFUzN78liG60elw2N6MkGGhSi7E2f89VfdODre+xcHMaQi7p5ubcfbr8wOqv/le/GvAnR1+pe68zMqegtGxadilXFjI0UGTkJSSLB5pSN9xCB+lPKrMSUQ/c+ZqfPOjOn012LfXUE7ZFVzYn4ssOR6FuPKfdW+Q5rZW+Qi0t6B6vCXWpvoEdipJmH0RMaizDpW0uJirM8z3D/iu4pL41x/dO2nuGLm1E7p3EP82u2WIbnQ6BBc+8Au5H+EyFSJvPTYfaTirWpsFPe2P3dFG/Hdrp65QDvF9h3HaU9+m/c6UW3FPl1uUnbcUG5GYahLxxkOI/+AoSs7lIjE6EuEREeLxKEIDDbhUpeZnENFV9C2q3OVhWb5H1df1RAiVh3C81P3dIJavzuGEvIjo0BV33tqMBHJR29zZQyZrVmL/wRKPXQD27dXTVaM33bfJYb7pGtDnOPO7F5P/Lu/kMGH5iytQWN/AMzUnsX7xG9Ys6LDHMbybNQu6TUBfhCl9m/nYkH3KzbDgtuFqRakzhKDfXdZeUvuodIF/wL2BdXtOLRV78dYmeTeJcKgU5QzGiVqW7epXlMyS864lWV5F52OzLMceHcbmbcfr1gHy1tGlsu4wIGjsYNzVnNhCrCOgb3/xf1HlZG9CTpGb8MK+PTH3fX1xV71DZLeBf0SaNc/B7aPY3oJa55ZYJ1dw4aRJ2Wa9+Wde8zTMd1v8t3878e/3+KZaE8hdLMMnleLfZgdvdKPTKYiVd3LEIVHetnUqHTEDnqg7up0tL+L3f0SivK88OAZpCzT9kvYApQK7EmIwM3mHIydDLrv+JUyIlbeqioplwlN4QM3Ctg8cI+/tfuuApltGjtiZgQXPTrc2VRLR1dGmE/o80klMlGHj4hRk2UfWFWVy5wrMbPDXQc0oSp3uVAdYKg4ga/4063g2BvVuB+WVhrRBuw7Wu8UunynDBXv9IEcKHm+ts8zbkThyltNPkzttDyFXcSTLH1BeWqJMte/RCY1J5XTL4zDftu5s+R29Yb0glD8++fpa7BKvGh7piwDGFtQMv6gV1Gknsp9QRtyNUlOE3FfnYFYDSZSGYXPx5svPoZ/rb5DIETqXx6sDabkjAotxaViz4AH42wt6FUzJ4zFado24IbeVHgW8Er0Yxw1jkb5/AUKVq4EasdxosVwFhqa8i1URv7EuQERueV8nyDsTVuDJSHdBhBxzIQ2zkYQY17Inh+seECdObr3wRNTNeC9LJhy6MAzDjMxETOnvMrqvRxZUFy7E4Oh1jnUNS8ZHaquBHKFzxTx1IC23eiEq43XMD+3YzCuxK+LtzVTyLmTLxf64EBH2uCOHRn8MswqgQ710GeXGuXgotgzPZa9BrOtonPJW1ClPqgGUhjLux2KEN/U2WrohNFQf6BuLy4FuXs7BkR2ZSFpq/Xl1B1GpRMUjKSMf+9In1Q0sJB9/9Ju+AvnZr2PJjGFiCRvrsinZO7F1oTawkNojZMYKbF4W77i3Wwp+GvHLtiB/1ST8fsj91pHrtONjEFEL8YFvyBRsEvWAUzmWZTJDjrnwhwbGbeiMAVOTsCVjgaZMy0RtUc53rcA0rwMLSf0tI2WEX5Wme9THfyCmrcoR9cermDpM20mhbm//20hodmDRFO1we3svBs6qjzowITwN8+3TCeFL1mGV/TuS9ewi8RkzsKDm07flgoiuWy1eJ9hbLh5F0v6lCPdnuzxRa3V1Wy6IiIjohsfggoiIiHTF4IKIiIh0xeCCiIiIdMXggohaB/8IrDonB5xKYzIn0c8cgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLS1S9qBXXaTv5OOxEREVF9Ss6VqlPO3AYXkgwwPC1ERDce1glEZNNQfcBuESIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItKVDsHFF8iNCUFAl64ICFsGU41Ffd6DKyak9BXzdnkYKaYa9cmrzL4P05FbcUV9koiuX9X4tPgCGqiddFSN4sIMxIf1sNaN4tErJhk5W02oaGAnLBUmbMuYh0fU5QK6DMTEZCNMFZfVOepzGRWmDY7tdp+AlJ3F8FjTWsqQO3mgd3U3USPo23JxaiXiVx/yfCATEV1VFtQU70BKzIMYve2LqxNcWMpRuOAZhEUvxMZTZvVJwFyQhtnTRmHExCwUuT2Ri30tysKkoaMQm/AWitRngQrsSo3D6KEzkFlUrT7njlje9AbGR77o2K65AMvHR+DJ5ANu6mUx/5FcrMoDRjwfjj6+bMgm/eh8NJlRlPoq0k1V6t9ERNeSGWe2JWN5QYX6d0v7AcXr5iAm8xgQ/DQSsj/GmXOlKDlXhI+yF2FMsEGc71/BTDcXYZbydzFnZDx2YRimpmzBR5/K5UpxZv9mJET1Em9lOxJjMz23MFiKsWXhShGU9MKYlO04cu4sjnyQiKEGWS+nYkvxD+qMKtv8wU8hZthv2EdOumqB48mE5S+uZxMbEd14qvdj3Wt7xUQIpi76M6JC/NVK9ib4h/wJcxdNQpC8CFu9DQertXXkRez5ZzLyzQb0nPNnTI8Igb9aO/v490fUX+ZhqghMcOod5Bz81vqCC8vZj2E8agZ6j8TYx4LgK7bsGxSBSROCxaufYO/Ji9YZFZdR/u5KJB29FWPmjkEIWy1IZzoeUR0wZMokjBDHP7tHiOjGY0G1aTdyZY9E70fxSJ/21qftxMm+4524Q06aK/GdWRNcVJ/AzuwywPA4ZkQG1q2YfXvikSf7ioky5B0ug7tMMculSnwuJ37dHu3sK2iLjl0DxL+VMJVecCxXcxSb38gHwuIwecit6pNE+tE1XG0T+ATm/T0ChiZ1j9gSQ0Mw0fiF+pzWFVQYp1uTlGKMqNvIKftW9yAneQJ6OSVCvY3C4vr6Kd2oKUZhdjImdretRzzC5iGz3mQs6/ZznRKx5KMHHpn3JraZKsQcWrb3I99vmVjWqEn+GoUUdi3Rz1WFEROV49hTwrSHsm5brm8yTFdkYqIRKTED1TIhy1FG48qysr6eGJ16SvmzKnUU7pbrcq0/LBUwbd2k2ZZ8hCM+430vkyhtfOAXuhDHZDdIbjQC69Suoo4o/xzn5WTvEHS/rY3yrHSl5DDyRFBiiLwfIX7uquW2CIzOUrpJDsaFwLFkU/yA4ndSsfzU3XhuQig66noWILLS+bC6CR0fi0NimL+YvprdI9UoypiCe4ePw+zUAhHa2MhEqDmIGf4MEgrLXU7u7lkqdiLhiQjEzEzDLseKgFNvIVFJxlqJg3UqnMsoN85Stj/LKRFLEoFWViJiI0diqggi3O3DleKNmBMep0n++j/o0K6tOk10ozHj891LMD4yTpMrIcvRwkaVZW9YKj7GsokjMXraX1zyMo5hY8IUjB7whD7bkwGMMRUzo5aK+iEEUxdEaIKPK7hYVgp5OXHTLX7i4sz1ThPvLpJ82nXAnXLi6ypcsu9wFU4fPCr+7YCQrrdZgxK168YQNQ3Phbi2rhDpQ/+Y1acTHo2fexW7R2SGdCZmJmwX1Y8BQVHJyDtxVonwS05sR5JMhBIVRdYLS7C1vIGrkJoDSHt2OrLEhU5Q1AKk7zhqXY9MjNqxFvFiXeaCxXhu4fso19Q2luINmBJrFNvvhTGJm+2JWNblVmHqMBlsVSD/b2uwx6mfVarEnhUr8dG9c/Gv/UXWZXa9hAe7MbigG1RlOmZN2ABELcJmpUy4lOXoOVjvmpzojn8EVp07js0zZM4B0H7GFpyW60qPgCyR8jbMrQtnIlUGFYZhmLomH0eUcqtJolS2Nw1pTW1JtN32/tuBGB2bhv33zsQqUZfEOp3Uf0B5aYn4VwQAnX/ER3XuNPHuIsmn20BE9BYV79EcrHu3SNS7om4s2o4NsrsF3TGoh+z+qIJpzTJsNA/CrHED4KcsSaS/FmkQ8+n4cDO6RxrrWxzMfkdpLTCELcLql8QVgS05yTcI4bZEKHM+MvJL67kCsTUVihBFWU80QgNtRc8HvoGhGPfSMiSF+cOctx6bj9je0w84u7cAx8WUISoOs5/pb0/Esi43HNPnPo+e8k/XflY7UdDnRqOf/01iWizz299q1kF047GWwacQopQJQZZltfwBe5GUuV9c3zeHBdV71iA+TwYWEUgqWIHYBwLhq76qJFHat2fCm9lHmra9i2X4pFKdFswFSzExfBaWHXDtJpV+xGer52N6JpwvUj79GJsTn0ZQQxdJPl3xYNxTynwbYx9Cny7d0OfBeOwyi4uuGTMwKrAtLOWFSF992v637ALeZe9KbkLXE5EHLXQKu4rdI7ZEKHRC+JOD6/Yf+vZHbN5JUUhPIic6qJ43fBGffPSJ+DcYz00Y5r4f0qcj/vBgfzFhQtaHn6rJUY6+0GMvh7q9EvBp1x6/VqfdMnRD59vVSpTohieC7ZkP1S2DslV0pjVQN793GCXNGv/OjJLDB8T/RfGLDMf9Hd2UP+32snfDVKfV0QtK64kaJJw7iryUsQgyFyD1iSluWkPMOHuqBoNTlmGh9iLFxx8hz/wZiTNCxCz5WLXpqIfW4JvgHzoba9RbXhVKi4wRm+L6i8BJvSMFIzDxyd7wlQNozR6LifauZLXrKXwBchtq5SVqgOdzbXNdpe4Ry1fncEIpGb3R7+5m9B9euYDSQ/IS4xSWR/ZU+zpdH4EYHLtVmb3qZJkoqu4pI+wZjciVD5ngOSAOu9TX3Arsijt4KxiRVT3Bts/tXXCPrFMqS/H5xeZEF1X4/KTMseiAAf0CPHYP2LdnPoAjJbZuiqbyQ2DEX5GSMEhMi4uuhUYUu8YrvZ9H3GOd3FTM7dHrvsHi/yIAKDyJLz3GOfKW16eQqFxQiYDmk9Vqi4zsPt6IJVkX0XPOJDzasY2j5SY4Bumy++nTvUgfJ8fTMCL+n/ua2TJEN7oWPaNdje4R++1X15RzZvtdA0YhNjYOs+SjToKnG063jhHd4H7ZHn4GDwXC4IdbfqlOXw26b68tug0aZu0mLS7FedcW3XrqgjYduyJETpRVahI2vWT5AjtXb0BR8CTEPy5vdf0WpoJCUTN3wNDnxyFUdj/5dETo5GcxVMze/JYhutG18CnNXffIT9aXdGLPkNbNIMTvOKU2Y9bzsCWFKVcEcshdW2a7TCqNR1JKsvWRkY8j+5OVAktEzWSuxjc/qtNXg317N6NDu+bdAGpj7ya152DZxqJoKaKOqjPM9w/4ruKS+Ncf3TtpWnxv7YTuHcS/zW4Zohtdy18vu3aPvPEhvrG+4sGP+LrqezfJTldwqaruyHT2ZkscxcHT7lpGfkBxRpS1WyM8o24zpI3Pr9Chk1zR5yg534gOHPuQu/4YmrANR86dxHsvP4fwiAjrIzQQhktV+FqdnejG8S2qLrk5QVm+R9XX9UQIlYdwvNT93SD2btAOXXHnrc052bfHnT3k5UEl9h8s8dgFYN+eV3lRjrqm17xCj+u8Ul4qLrUE+3tog9t6hFhbM/YdxmkPuR325Tp1aFxLJ4f5pmvgqhxnTt0jr6/ARk32tIOtsJtxtuTLuvkZNcfx3qbD6h8afvfggchOYqIMuZs+crpFVGH5DPty5HIG9Bw5EN08vWOfzrh3pHUEvI2LN7pPQLX9gmCXHhiZUWQNgERFWVkma59uGDSomz3b3M5Sjj1ZOcrdJEAJSsu9uIWO6OfMdvXrNlCXV9H52CyHqfboMDZvO163DpC3ji59Q5QlA4LGDsZdzWpIMCCgb3/xf1HjZG9CjrsfBLNvT8x9X1/c1WBelKPLw5ydi91ukyKrcOzDj8T/nd+D/TZS8ztYssZdfppjuXrrsTo8DfPdFv/t3078+z2+qdbUSba7W5odvNGN7qoEF87dI55oCntWMpasP6COhikqI/mrhrHTldtE67oZ/SIfR5CYMuctRkLqDhTbAoOaIuTOn4NEWZEZRiB6RNd63nBbBD4+Qx2/fymiY1ORqxlVUyZp5qYmqreuadZlb/EQFWJmtmZEP7nfhcicP9n6I0ZEN4o2ndDnEWvAv3FxCrLs5agaxTtXqANJ1UfmaE3HzGRHWbZUHEDW/GmYpZY/5W4H5ZWGtEG7DjcrU5fPlOGCrUCL0us3ZLy1TpI/CDZyltNPkzttDyFej2Tp020oopV1GhE//03nAfeU2z5nIzrVVPc9+ARi1AL1d0dSX8ZioxynQiUH4Fr/D8TL5ew5E17yOMz3zQgZFirqW/kdvYFCuZ/y11xfX6sknxse6YsAxhbUDL+oFdRpJ7JpT+YWNEwO5fsYZhUAQ1PexaqI36jP12UpN2LqsDjkKzFCMKZmb0ZsiKaKqDmAlCei3QcRwTOxYe6PeCF6BaqGJeMje86DJCotYxJiY9d5qLR6ISrjdcwP7WgtlHJgm/6jsLzyUSTtX4pwf1spEgFB0QbMlL9M6OnCyvAQ4nMWY1yQLb9cLGNagScjPVSYhmGYsfZP8P37dCySVw8ZW5AYKgu5HP57pvXukzrvh6j18b5OqK9MyDEX0jAbSYhJrXCuM+Rw3cqdVb3wRNTNeC9LJhy6kOUpMxFT+tt+EKwhFlQXLsTg6HWOdWnKmxyhc8U8dSAtt1zqDm/UnERmbAwSPa0zeCyS0mYh3D6Ojk0D9ViduqchcuTguXgotgzPZa9xGbhLkC2xU55UAygNZdyPxQh3d3sukaqh+sDr8qIHR/eIB3JMireNSF86HUPtM/XCmIS1yHt7CkL8/kt9zpW8xWsBNu3IxJIZwzTr98fQGa8hfcd6JHhVOchfEYzCqn/nu+yDJPdjBTbvSnUp3GKZkOexJnuFMoKng23+FZj2h0EYrHa55Bac8NgXS3R9kGViSt3yGPw04jPkmAt/aGBkyM4YMDUJWzIWOMZr0JYnrwMLSbZQTEaGMgiV6lApytVUEB//gZi2Kgebl72qjqRro25v/9te1h0avj0wTllnvGb/BTnmxNJMUZctcBNYSJ7qMU91TwOq9+H1vxkBT8N8+3RC+JJ1WGXflkxGXyS2w8CCmk+HlgsiuhG0eJ1gb7lwbVEkotamVbVcEBER0fWPwQURERHpisEFERER6YrBBREREemKwQURtQ72XxBNYzIn0c8cgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLS1S9qBXXaTv5OOxEREVF9Ss6VqlPO3AYXkgwwPC1ERDce1glEZNNQfcBuESIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItIVgwsiIiLSFYMLIiIi0hWDCyIiItKVDsFFDUzJDyOgS1f0SzbhivqsR1dMSOnbVcz/MFJMNeqTLcW2byGYaPxCfa41akX7WVOG4orL6h9esn+n05Fb0eARQHQNVOPT4guwqH+1vGoUF2YgPqyHUjfKR6+YZOQUFovS7skPKM6Iss/v/tFQGbuMCtMGx3a7T0DKznq2aSlD7uSBCAhbBlPN1ft06PrHlgtSicpw5zJM/P0kvFfeyOCCqNWyoKZ4B1JiHsTobV9cneCi5iQyxfbCohdi4ymz+iRgLkjD7OgRuDcmC0VuT+Q1OF/yuTrdFOK9mt7A+MgXHds1F2D5+Ag8mXzATYAh5j+Si1V5wIjnw9HHl6cD0g+PJrK6UoL3/rwUuxx1offahCD2cClKzqUh3L+N+iRRa2DGmW3JWF5Qof7d0qpgWj0fiXJ7wU8jIftjnDkny4Z4fPoxNic+jTsLXsHM1YfqnuyvlOHIe2Vi4lEk7S+2LlPnUU8ZsxRjy8KVKEIvjEnZjiPnzuLIB4kYajCjKDUVW4p/UGdU2eYPfgoxw37DkwHpiscTEZFOLMVGJKaaxFQIpi76M6JC/B2VrI8/Qp6JxeyoW8XJ/lWkm6rUF1QXy/BJpfi3dwi639b4IN1y9mMYj4qrg94jMfaxIPiKLfsGRWDShGDx6ifYe/KidUbFZZS/uxJJR2/FmLljEMJWC9IZjygiIl1cwYWTJhyXk70fxSN92ivPOrsVgyMj0B4mZH34qSZHzYLq04exX0wZenbB7U2omS2XKqF0qvy6PdrZl2+Ljl0DxL+VMJVecGyv5ig2v5EPhMVh8pBb1SeJ9NNKggtbItNAvGAs89AvKgpf4QL06tIVveYVolp9VlFTjMLsZEzsbkt6Ckd8RiGKPSUoVRgxUc4XY0RFTRFy54Wry/XAI059kzI5ajtykico27XPM+9NbDNVeNhPSfbz7mnCcp7I5LC3kRIzUF2XfMj3+D5M9SZfullOJnhl79F8NlfExzEdAQGjsFxeNeEUlkf2FPPakkvV15W/y8T7MmqS1EYhRV59NZTQWef78Sa5jX62bOXLY/LhF8iNCRGvuyQw25brmwzTFVn2jJpjV5afDBQWO5X8+inr64nRqaeUP6tSR+FuuS5Z7pVnVJYKmLZuakL5cvUDyktLlKn2ob3Q1UPt2qZjV4SIf6sKj6HUXhlcxlfnzsKMDhjQLwB+6rMtQ9S376Ri+am78dyEUHTkJSa1gFZyWLVFt0HD0FMU+fy1u3DW7dn3W5gKCkXhG4RZ4wbYC5+lYicSnohAzMw0Tb7AMWxMeBajYjNx9Jv/qM+58dNJ/Gt2NGZlHVOfAG7q4AeDnBAVzsG0KRgRORmzUwvEdm3MKMpKRGzkA3h0wU5U1NlXUSkWvoInh4/zsNxITEr72M1yHljKUbjgGYRFz3HpN5bvcQpGD52CZQfcBCz2pDKX5WSC18xxCHviFRQ28q6QK8UbMSc8TpOk9n/QoV1bddodEWQVZWHi70e4fD9yN2RyWwSedPsZ0o3NjM93L8H4yDjNsSvLz0LEDH8GCYXlTQjQ3bNUfIxlE0di9LS/uC9fA57QdXtOyipxyb5iWzJndwzq9C0KM+bhEXugMxATk99uMLDyadcBd8qJr6s0663C6YNHxb8dENL1NiidLdX7se61vTBETcNzIe5aV4iar9XErD7dBiKitzitHy3AvrMuiUeCpfwjbM4uA3oPw73d1BOapQxbF85DljzZBY9F0o6jatLTUeStmYkB+5ZiUZb1SsKt3elY/uE9mPG2mnR1Ig+vPdRVfCiyP3IxnlsqgwN/DJ2xCnknzlrXrSZlBcnKLnM6xqdqWzrUbO3odGtSVcJax3JynzIWYExwNXYtnYmX3vXUQqNVBVPqNMRkiuAn+GlxJZWPI8q65L7mIz1B7IcIFlLHLcZWpzs8NEll9uQuudxZHNmRLPZBfM6n0jF94fsot7SBf0QaSkq2YGoHuWwwpmYfF/OasCriN/IJVSX2rFiJj+6di3/tL7Kua9dLeND2XbhTcwjpsa9YgwrX7ydlrPoZzvPys6AbRmU6Zk3YAEQtwmblWJPH+3YkRfUSLx5DlgiY17smJ7rjH4FV545j8wyZcwC0n7EFp+W60iNEqRaU+mMmUmU5MQzD1DWO8nVm/2Yk2Lc3DWmu+RFu2bogxCXGN9Xi6HbH0f2BH6tQbVaPfHsy514kRoYjJuEtUYfYVGBX6pwGAytHHZqDde8WiXpJBvfbsUHWmzJo6SG7P0TdsGYZNpqdL9KI9KZrcGFvdqzvYW9+d+HTGfeO7CsmDsO49zOXAvQDzua/g3yzAT1HDkQ3da8tZ3chI09WDBFIWvMiwgNtRcUPgQ9MwdKsmeIEVh+xvjl/xpT+atKVbycE+t8kIvt9eP1vRiWwGJGyCSvjhiPQlvCkJGXNx+qUCLG0ODmu3oaD1ere2rO15XLLsDA61LGc3KfQaCxcswgjDBXIfyMXRxq4r9yeHKa8v/kYFxoIX/U1+AYiNFrdD3M+Vm066ghyqo8gZ7VMKlP3I0Imd0k+YrHHMHfRJOVzMee9gx1uAjnPRIU0Nxr95Gck1/Xb38Lf4xEkKtGD2/CmDPzcfT8RcUicIRuH62utohuVIWwRVr/0FEKUY03wDUL4S8uQFCbDgr1Iytzv3DXaaOL43LMG8bb6o2AFYh9wlC8f//6Ism/PhDezj3ixvTa4rUcIeoopc3Yudru7pdvyBXZvyrcGHuZKfKcGF5bSY/hQqRddLmaUh/ViaaihgUDHpysejHtKlO1j2Bj7EPp06YY+D8aL4N6AoBkzMCqwrbhIK0T66tP2v2WX5S57920Tup6IPPB4arj62iIwMgZjDGYcz/nY+WRj+Qz7cg6Lib6IGNRZ3WkRcOwtUJKnDCLSv7+jWgnZiZNfnxEYLSN5j27FPV1uqfMhXCk5jDxZ+g1i+aHubtG6CR0fm4RZct3mQuw0fWt9+sIp7JXZ2h1GI+aPndx+uD4d++HBezsAp/Kw54xSxXjgSA5rP+EZPFLn/UliPwbchwEyyFn3Ec4o3dui0jTtRq7H/RefS8g0vKdUWlkYJysYbxm6ofPt7vbDHVs3lqfvpz1C4rZYK8/caAS6+7DoBiWC2JkP1c0F8OmER2c+bz15v3cYJe7SObxmRsnhA/Ucn4J2e9m7YbJdRNTDp9tQRMuAxGxE/Pw3sEtzorZUHEDW/GmIP9cB3eQThg74b4P1TfoERiNHKZMfY5X2YkYhL5aeR8Lf5QVNfYHOTfAPnY012YusrZOS0iJjxKa4/iJwuog9/0xGPkZg4pO94SsH0Jo9FhPt3bdq11P4AuRyrBtqJl2rdHuzY30Pe/O7G3734IHITnW6Rhy3WGm6ROx9lPUkQPncgZ6hndU/3LkTAXfY2wJUV3CxrBTKtcG9fXG3n4ePyOcWdO4pmxnLkHe4TMnCvlJeKoq+UJmG0QEuLTb2x//FrAJ5iVKBT8rqa2p1JIfV2yI0IA675EyVpfj8otwLW2KYUN/+N0VgV9zh7S1rlm/w2XF569vVSFCj60o9QazP7V1wjzxv2o/3pqrC5ydlt2H9x6d9e+YDOFJiPQXXSwQk4UvSET/MH+aCpZg4vLe9rN41YDQSDv0eaYvGQamVftkefmpw0TAROPTorQQl9Qc6Yr6Qp5CYd9Ja336yWm2RkV22G7Ek6yJ6zpmERzu2cbTcBMcgXXY/fboX6eN6WQOjf+5rZssQ3eh0DS6a72aEDAsV0bm2a8TWQuGPEc8OtXeJyOe/q7ikTjfVzWjfrqmDPrWF3y2/Uqdbkyu4VKm2pOjN6Ra3Bli+R2WZF5Uxkav6TroGP9zyS3X6amjK9nx7YNyqHGxOmY6h9oZTNQfr7b9iSLv/h6/lU506eF+eBJ927fFrOaHpTvGa5QvsXL0BRcGTEP94oKj4bS2LHTD0+XEIld1PPh0ROvlZDBWzN79liG50rSy48IFfvz/iuWA4ukZsXSJ1mvjb4r/926nT18IPqP7me/GvAXd2+JXzB9l7AfI+dWmxqfNwTZj0xICeCdsdo/x5fNhG7muDdh1uti56Lfn8Ch062WtWIn2Yq/HNj+r01WDf3s3o0JgLEZmbFRGHVZ/YymcuEpUcLKDmfCnOilmaOp5F41ncDPNtuzjzR/dOmjtGbu2E7rJludktQ3Sja2XBheDbE4882dfeNWLrEjFE3o8QpyZ+X9wRIG+8qsT+gyXum/As53G88DP1D2+1EeWrK5Titu8wTntqfrQ3+zvyNuy3ghWX4nyzfwTIFiSYcbbkS80dKQ25Cbd36SZCEsHT/luKkBkux6rogZEZRWoLkc7s3Uaevx9LcQZGKk3GUcj0Jvuffma+RdUlNycoy/eo+rqeCKHyEI6Xuj8eLF+dwwnZINahK+68tamtjlJ73NlDJmvWU38I9u15mW9kP6a7L0Ch27rD1mLQCeHD7lG7Yxw/WFZnDB8Ny6Uqa4tHY0fw5DDfdA20wuPMNuaF7Bo5jWKlS0RbEG1s84nTr9vMbBmt52OzzNVopDYBfRGm9LPmY0P2KTcndtvQuWLdhhD0u8u6Z/ZbwczvYMkaN78dIFjKjXhBGUyqoROq5v1lLcObbjPExX4Y46yZ3uEZKFbqMh/4hdyPcHX/N++q+2NN9hwWpwRZvdm6uDx9P46EXOdcGvrZs1394nOUnHctBd6Uy8PYvO143fIjbx1d+oY4ZgwIGjsYdzUnthDrCOjbXz0+NyGnyM0p3b49Mfd9fXGXF/lGjhwNTaK3VvUJ7JS3hhpC8UCIrYVRW5d5yqeowpFtW5X3rr1jrmGehvm2tfx+j2+qNfWQbQjyZgdvdKNrhcGF7SQNHN+UiqRNsktEWxAdfAL/iBlRnUSJNGLW+JeQZR/9Uv7C5wrMjFqquVe8EfzuxWQlM7sCuxJiMDN5h2NESzma3/qXMCFW3qoqKrkJT+EBW6a5TyBGLZC3eZpRlDpdLGfUjPBnHXEwbf5i5MuYJOxxDG/ghOoTGIF45XZNE5ZHzUaK0eQYcEruh3EFEmy3zGrzUfz6YOQE9TbPvyUizf6Ty6JiLzZiwfQl1gpTuw/2boxKnCn7tk5A0ni2Li6xzjqZ8+L7Mb6C2IS9Yto1l4Z+9tp0Qp9HRLlEGTYuTmlCubSVH0e5s91pMUu5dVS920F5pSGObsLLZ8pwwX5gi+NzyHgkKnd2bEfiyFlOP03utD2EeD+Spd8AjJ0zSEy4vnd1xNGZf8VGszjm/z4eQzQtsY67TNZh+sxVOKgd4E6pc/6BeHlbuj1nwkseh/m2Bf9yP9+wDqgnB+x7fa2SIG54pC8CGFtQc9R60K1zF3WqIZdqDy0NU+b/3dJDtf9Rn/XoP4dqk/t0EfOH1SYfuqQ+6erH2vM5sbU9xTq7de5e+/DSf4uteHDpRG3G+AHK9l0fPSetrc1+Te5b39oJOZ+rCwhf5tROUOaZVmv80sMe//Rl7YHUGHUf3D3Efs0vqP3yJ3V+u+9qT6+dVM9yYr/Gr689fUm7oO0zdNlPqZ73Z30MqJ2w9kTdz+fS6Vrji4+5mV99PPRy7e4vf1Rnlr6u3f3iEM08tn35j/i4plmfG59T+6V1Zmf279T18/yp9tKZnNp5D3XXrFf78PQZUmskvzPviO/9UFrtw3W+b/U7X1pQu9vd8W4vl4/V/uXFaPdlKDimNu3fX4oteOun2u92z3del+Y4/unLfbVp9Zavx2oX7D7fiO0J9ZZZUV5T97k95hvcl4fm1xrPfKfO7Q1bPRop6tpK9TmNnz6rNU5ys73g2FrjeW3dQFSXPFbq00qvF29Cx6Hh1qZ99MXoP/b0fJViy8xeFu+4t1vNzN6yJBKdmxp9+/ij3/QVyM9+HUtmDFOaT60MCIqKR0r2Tmxd+ICbQaT8EBS9Avt2ZLosJ8hRNpdtQf6qKAR5e0unfH/pHyAv4zVMHSb7iG1s+5GDldE96n4+ctChl9fXXU7e9740U8laVzLE7W7FkKn/UEcllFx+6KhJ5KBdEUh824j0pdrMebkb07Ekw4hNbj9D+nmTY6lMwSbXMqCMMivHXPhDA7cmd8aAqUnYooxoqy3TK7B51wpMsw165xXZQjEZGcqouqpDpShXD2wf/4GYptQfr7qUL3V7+99GQmjHRmxPcHu3iKa8Th/o9ph37Iu2LhPsZXaBZiA6L6iDAcLTMN/KbbPrsMr+Hcl9XCQ+48UIdzuuDpH3fiEjDHXaiUwuklnO14pMjBo1fCGOyzsvcjjIEtG11uJ1gvyhMWXclkeRtH+pevcTEbVGDdUHrfSU7WlsCyIiImrtWuFp+zIqDmRgyWt74Xn4bSIiImqtWs95+4oJKX3lLZpBGPzEYuxyk1FNRERErV/rOXO3uQ1df6f+6IjyYzvr8FqE+x//IiIiotar1SZ0ElHrwjqBiGx+pgmdRERE9HPF4IKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0xeCCiIiIdMXggoiIiHTldvhvOawnERERUX08DQHuNrggIiIiaip2ixAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhcEBERka4YXBAREZGuGFwQERGRrhhc0M+UBdWFC9CrS1cE2B7hGSi2qC+L12uK9yA3Yx4e0c7TfQJSsrfDVHFZnY+Aiyicd5/jM6r3EYXM4h/U5a4F2/feAyMzisRfLe0yKkz/i+Iab7bU1H1r6Fgm+vlhcEHXIXFCKHwFTw4fh1kJb6FIfVZhLsDymZMxesATSCgsvwonJ/r5+gHFGc9hcOQy7PuSwShRYzC4oJ89Q9RamM6VoiQ3GoHiiLaUv4+XXkhHkWEYpqZswUefitfk6/Lx6cfYnPg0gnAMWS+8gT3VDC8cOmFMxgHHZ+X2kYVxgW3V+a93NThf8rk67Q0f+IUuxLFzJ5ETHdSIytW2XCnO7FiAnuqzRD9nDC7oOmNBzZnD+MhsQM85f8b0iBD4a49yH3+EPDMPKQmDAHMhdpq+VV8gIiK9MLig69StuKfLLR4O8LYIjM4SV+EfIjH0VvU5K0uFCbnJEzT93+GIz3jfJUejvr51N69VFyK+e1f0mrcT5UVZmCimA8TrjyQfENfGVnK727T5ITI3xGhChWvDiqUCpq1vIj6sh7p/Yj3z3sQ2U4XzfliKkBku57kP8YUX1Sd1pr4vt/kBdV5T8zq6L0Bh+TFkxgy07n/YMphs+QzevjdPGrW8zKV4H5nzwtV5xfcTk4xc27zK/vdHTFaZ+GMvEocHW/e9+or6/crP9VMUZUxWj5VRSBGBqsfjos6+DcTEZCNzf+i6xeCCrjM+8L2rLwYbyrDxhb+6P0G7ZUGNOPFPGjoKs1ILYFafBY5hY8IUjB46A5lF1epzTXT+X5g3Mh671JXf1MEPBs12Y7X5ITI3JPYZjF+407H/NSeROXEkRk9LxMZTtj00oygrEbGRz+Oln0UOyRlsePF5JBZUWP+8qR3aGUQ11Nz31qjlq0VQMAMjIqcgMeuY+pz8yNMwy+vP8TLOZ72IJxK2q8fK/0GHdh66i9zuWwV2pcZh9LNLUMgAg65DDC7ouuPT8WHMz5yLoZAn6FEY/FtxpajcJWJErnGP+8z/mkNIj31FnPj9MXTGKuSdOGvNMTiRj1UzhsFg3o7EOdnNyuA3796Hr55IV3NA1H55yxfYmbJCbNeAoKhkdbtncWRHMsYEA0WZ/8S/jlSJpX9A8TuviJNytZhvETbvL7Lu37kifJS9SMxbgqwXlmBruXqi8gnCuNyT4vW6rTOeiYAsur/9St7do9e8QnFqbgbzfuyq+CPSbfuv5Mk08r3V0bjlLeW7kPqaDAp6YUzKdhxR5j2KvJSx1lycxVtwxGcIEj85gPSoTmKJQYjfcQolnyxEqJ+tyqzAngIzIjP24oyyvKdclMsoL0hHkgymgsciacdR676d2I6kqF7AqQ1YsvGovQWL6HrB4IKuQzfBv/8krPp3PtJTXsXUYf7yshTLZ8ZhVuw4hN3TE4/M26Bpkrag+uA2vHkKCJqRhqVxwxHoqxYN30ARbMQjMUys4+harNvTnC6GvhgdNcgpB8Rydhcy8uSJZxIS//KYul0fsdmHMfn5ETDAhDezj6Da8hn25RwGes9GyktPIcT/JusK5HsNeQoL02ajpzkfGfmlrbz1woCeTz6OIfb9F5r73hq1/A84m/8O8mUwN2Me5kYEwVeZ1w+Bj43HRPk9n3oHOQe9yMXpPRJPD+lYfyVqKcWOtfkikAnB1EVxCA/0sz7vG4RHX3gWIwxmFK3ehoNMLKbrDIMLun6JwCA04knEpn8srhZla0AmkpRgww9FWS9i9NC5yFWuZi/jK/G6GbcipG9X9WSj4fMb3P+kPNFfxIlz3zT95G3ohs63a06qYk0150txVkwZftcTAbaARnETOkYkK3cQHHs5FL5nP4bxqFkEOAsRJltiXFoU7hq+EMfFOzhb8mUzroIbvltE7ot6emyiurkwlma+t8Ytb7sDxM137dMJ4a/LY8W71h5Dzy64vaEatOZLlBSLfTPcgz4Bzp+cT8cI/PMT8bk6tYgQXR94RNMNQrYGDEG4Emx8iD0pETCYjYj/5z5U2084LSywK+5wCiBsQY1+zMfP4atWfRF8JwLuqBO+eaW5701Z/so3+Oy4HgmuBnQL+J+6gagLy1fncELPL5joZ4LBBV1f6ruDwe4mdBwajnCD7YTlizsC7lRfu5puwu1duonTlPfsY3p4eqhjffwcNfe9ebV8m1vQuae3OSjN53N7F9zTmC+Y6DrB4IKuL3734IHITsDRrXhPSYR0z3ZFaW3atp3ky5BbcKJuwqLlC+zeJPvNXZv03TXVV6Pk8AkvWyN84HtHV3QTU+ZDx1HikmhqKc7ASNm0LwKls7+2nqTM2bnY7TGx8RopLsV5p323oKbkOExeXrHbTsBNfW+NW94WSF6E6XCpy3cnR+SMgryFVbehxX3/BwGBcudO4EiJy5Flv134Wg+pTqQ/Bhd0nbkZ/SIfRxBMWB45zs0YFdUoLszAgulLcBwheC6yD/xEMfDr90c8F2yAOeuv+HPyDscdJTXF2JWaiHgl6fJxjOx3s3hSExRkv4XMA+rYCHIsg/X/QHyqSf7lFZ9uQxGtJBGuRPyr79q3a6n4GCsWvyH20YCeIweiW/s+GDkhRGzQiPj5b2BXseNE5RibQ8eTojfsJ858bMj4X/WWWTl+xL+w+MWVzsOu18evme+tUcu3RbcRj1sTKVNfxmJjkRpgiP0+kIElr+0V030RMaizpnL8HCXnm5jJ4tMVw5+1JuYufzEZubZ9E8fKweX/QJLMFek9DPd2u1FGPaUbRi3Rz9JPtd/tnl/bs3OX2p4v7q79Tn3W6rvaMznzax8Wr3Xz+BhQO2HtidpL6hJyfZdOr6+dEOxuXvEInlSbcVqzlZ8+qzVOGuBmvpjaJa/FiP3qXhux9rRYq/Dd7tp5cr2Pra09ozzh7KfzObWTPWy35/j1tacvqQtdOlGbMd7NNtWH07w/na7NeKy7eH5I7bzdX1uf8+jr2t0vDqmzPvcPzfuq/bH2fE6s8h04zyM+29detn6W9vds28bTtRln/p+ytBOv35vte9fuh9CYz8bjfsuH9rj4f7Vn1j7teC14fu3u7/7jfvsKD/vm6VhR1ul8XP10Zm1thHzew7FC9HPBlgu6DvkhMGIBNsm7Q5ZOx1Bxce0gx7F4FSnZOVgZ3UOTkOcD36AorNy1BUlyXAv1WcixEBJWYPOuVIwL0mT7yzsLlqxDeoL8nRIrw7CZWJW7BBP7d1Sf8Y68a2C52G6KZl3W7a7FlpSnEGS/LbYHxq3KweZl8RgTrHlTwU8jftkW5K+Kcsx7Vcg7WhZiS8YCx/7I33NZsw5Lnx+E263PeKe5761Ry8v9Xoz87BWIl2NN2Mh5M8S+24+Ltgh8PN46HoVkPovPvmpCl5Q8Vla47psc12QB0nMXOx9XRNeJX8gIQ50m+hmRw2wvxODodUDUWnzU7Fskia49mWczSt4623sB8nJ+vsm5RDx0iYiISFcMLuhnz5z1LELUuyqaMzw30bVh+7E724BfRD9/DC6IiIhIV8y5ICIiIl2x5YKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0xeCCiIiIdMXggoiIiHTF4IKIiIh0BPx/M9KZE7dX+UwAAAAASUVORK5CYII=" width="363" height="240"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the specific energy of methane, in MJ kg<sup>−1</sup>, using sections 1, 6 and 13 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the maximum electric energy output, in MJ, which can be obtained from burning 1.00 kg of methane by using your answer from (a).</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Hydroelectric power plants produced 16% of the world’s energy in 2015, down from 21% in 1971.</span></p>
<p><span style="background-color: #ffffff;">Suggest why hydroelectric power production has a higher efficiency than the other sources given in (b) and why its relative use has decreased despite the high efficiency.</span></p>
<p><span style="background-color: #ffffff;">Reason for higher efficiency:</span></p>
<p><span style="background-color: #ffffff;">Reason for decreased use:</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Methane can also be obtained by fractional distillation of crude oil.</span></p>
<p><span style="background-color: #ffffff;"><img 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" width="474" height="487"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">[Source: Image used with kind permission of science-resources.co.uk]</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Draw a circle on the diagram to show where the methane fraction is withdrawn.</span></span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">List the following products, which are also obtained by fractional distillation, according to decreasing volatility: asphalt, diesel, gasoline, lubricating motor oil.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain how methane absorbs infrared (IR) radiation by referring to its molecular geometry and dipole moment.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Compare methane’s atmospheric abundance and greenhouse effect to that of carbon dioxide.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{891{\text{kJ mo}}{{\text{l}}^{ - 1}}}}{{16.05{\text{g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>891</mn>
<mrow>
<mtext>kJ mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>16.05</mn>
<mrow>
<mtext>g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> =» 55.5 kJ g<sup>–1</sup> =» 55.5 «MJ kg<sup>–1</sup>» ✔</span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«55.5 MJ × 58 % =» 32.2 «MJ» <strong>[✔]</strong></span></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Reason for higher efficiency:</em><br>no heat/energy loss in producing steam<br><em><strong>OR</strong></em><br>no need to convert chemical energy of the fuel into heat and then heat into mechanical energy<br><em><strong>OR</strong></em><br>direct conversion of «gravitational» potential energy to mechanical energy <strong>[✔]</strong></span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> <em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “less energy lost as heat” but do <strong>not</strong> accept “no energy lost”.</span></em></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p><span style="background-color: #ffffff;"><em>Reason for decreased use:</em><br>limited supply of available hydroelectric sites<br><em><strong>OR</strong></em><br>rapid growth of electrical supply in countries with little hydroelectric potential<br><em><strong>OR</strong></em><br>not building «new hydroelectric» dams because of environmental concerns <strong>[✔]</strong></span></p>
<p><em><strong>Note: </strong><span style="background-color: #ffffff;">Accept “new/alternative/solar/wind power sources «have taken over some of the demand»”.</span><span style="background-color: #ffffff;"><br></span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “lower output from existing stations due to limited water supplies”.</span></em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="439" height="495"> <strong>[<span style="background-color: #ffffff;">✔]</span></strong></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">gasoline > diesel > lubricating motor oil > asphalt <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept products written in this order whether separated by >, comma, or nothing.</span></em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">methane is tetrahedral<br><em><strong>O</strong><strong>R</strong></em><br>methane has zero dipole moment/is non-polar/bond polarities cancel <strong>[✔]</strong><br></span></p>
<p><span style="background-color: #ffffff;"><em>Any two of</em>:<br>IR absorption can result in increased vibrations/bending/stretching <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">only modes that cause change in dipole absorb IR <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">for methane this is asymmetric bending/stretching <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">methane is less abundant <em><strong>AND</strong> </em>has a greater effect «per mol» <strong>[✔]</strong></span></p>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Calculations of specific energy of methane and the maximum electric energy output in parts (a) and (b)(i) were done well.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Calculations of specific energy of methane and the maximum electric energy output in parts (a) and (b)(i) were done well.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Suggesting reasons for hydroelectric power having higher efficiency but lower relative use than other energy sources in was not answered well by most candidates. Often the reasons for higher efficiency were given in vague terms that did not meet the detail required.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Required candidates to circle a fractionating tower to show where the methane fraction could be withdrawn. Despite the expectation that candidates know methane is a gas at room temperature, there were many varied answers to this question.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Required products of fractional distillation of crude oil to be ranked according to decreasing volatility. This should have been able to be worked out from first principles and did not have to be memorized as one G2 respondent suggested.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates scored the first mark for stating that methane is tetrahedral. Further details to explain how methane absorbs IR radiation were generally insufficient. Many candidates referred to “dipole movements” despite dipole moment being in the stem of the question.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates correctly answered comparing methane’s atmospheric abundance and greenhouse effect to that of carbon dioxide.</p>
<div class="question_part_label">d(ii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about solar cells.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Some solar cells use photovoltaic semi-conductors. Compare, giving reasons, the electrical conductivity of metals and semi-conductors as temperature increases.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest <strong>one</strong> advantage of a dye-sensitized solar cell (DSSC) over a silicon based photovoltaic cell.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">metal conductivity decreases <em><strong>AND</strong> </em>semi-conductor conductivity increases <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>metal</em>: collisions between «already free moving» electrons/vibrating lattice ions and electrons increase <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>semi-conductor:</em><br>provides sufficient energy for electrons to move to conduction band<br><em><strong>OR</strong></em><br>allows semiconductors to ionize forming freely moving electrons <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em></span></p>
<p><span style="background-color: #ffffff;">cheaper<strong> [✔]</strong></span></p>
<p><span style="background-color: #ffffff;">uses light of lower energy <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> [✔]</strong></span></p>
<p><span style="background-color: #ffffff;">plentiful resources <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> [✔]</strong></span></p>
<p><span style="background-color: #ffffff;">renewable resources <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> [✔]</strong></span></p>
<p><span style="background-color: #ffffff;">use of nanoparticles provides large surface area exposure to sunlight <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> [✔]</strong></span></p>
<p><span style="background-color: #ffffff;">can absorb better under cloudy conditions <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> [✔]</strong></span></p>
<p><span style="background-color: #ffffff;">better conductivity <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> [✔]</strong></span></p>
<p><span style="background-color: #ffffff;">more flexible <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> [✔]</strong></span></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Candidates struggled to express themselves adequately in comparing the change in electrical conductivity of metals and semi-conductors as temperature increases. Many scored 1 mark for stating the effect of increasing temperature, but very few scored any marks for the explanation.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Generally answered well with most candidates able to suggest one advantage of a DSSC over a silicon based photovoltaic cell.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about nuclear reactions.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Fission of a nucleus can be initiated by bombarding it with a neutron.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the other product of the fission reaction of plutonium-239.</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span class="mjpage mjpage__block"><math xmlns="http://www.w3.org/1998/Math/MathML" display="block" alttext="{}_{94}^{239}{\text{Pu + }}{}_0^1{\text{n}} \to {}_{54}^{134}{\text{Xe + }}.................{\text{ + 3}}_0^1{\text{n}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>94</mn>
</mrow>
<mrow>
<mn>239</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Pu + </mtext>
</mrow>
<msubsup>
<mrow>
</mrow>
<mn>0</mn>
<mn>1</mn>
</msubsup>
<mrow>
<mtext>n</mtext>
</mrow>
<mo stretchy="false">→</mo>
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>54</mn>
</mrow>
<mrow>
<mn>134</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Xe + </mtext>
</mrow>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<msubsup>
<mrow>
<mtext> + 3</mtext>
</mrow>
<mn>0</mn>
<mn>1</mn>
</msubsup>
<mrow>
<mtext>n</mtext>
</mrow>
</math></span></span></span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline the concept of critical mass with respect to fission reactions.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline <strong>one</strong> advantage of allowing all countries access to the technology to generate electricity by nuclear fission.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State <strong>one</strong> advantage of using fusion reactions rather than fission to generate electrical power.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline how the energy of a fission reaction can be calculated.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the half-life of an isotope whose mass falls from 5.0 × 10<sup>−5</sup> g to 4.0 × 10<sup>−5</sup> g in 31.4 s, using section 1 of the data booklet.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_{40}^{103}{\text{Zr}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>40</mn>
</mrow>
<mrow>
<mn>103</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Zr</mtext>
</mrow>
</math></span> <strong>[✔]</strong></span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">minimum mass to «self-»sustain chain reaction<br><em><strong>OR</strong></em><br>if mass of fissile material is too small, too many neutrons produced pass out of the nuclear fuel<br><em><strong>OR</strong></em><br>at least one neutron produced causes further reaction <strong>[✔]</strong></span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>reduction in emission of greenhouse gases «from burning fossil fuels» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">economic independence/self-sufficiency «from crude oil/producing states» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span><span style="background-color: #ffffff;"><br></span></p>
<p><span style="background-color: #ffffff;">uranium is more abundant on Earth «in terms of total energy that can be produced from this fuel» than fossil fuels <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Accept specific greenhouse gases (such as carbon dioxide/CO2) but <strong>not</strong> pollutants or other general statements.</span></em></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>fuel is inexpensive/readily available <strong>[✔]</strong><br>no/less radioactive waste is formed <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>lower risk of accidents/large-scale disasters <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>impossible/harder to use for making materials for nuclear weapons <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>larger amounts of energy released per unit mass <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>does not require a critical mass <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>can be used continuously <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept “higher specific energy for fusion”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept “no/less waste produced for fusion”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept specific example for a disaster.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">mass difference between reactants and products <em><strong>AND</strong> E = mc<sup>2</sup></em> <strong>[✔]</strong></span></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«N = N<sub>0</sub>e<sup><em>–<span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">λ</span>t</em></sup>»</span></p>
<p><span style="background-color: #ffffff;"><span style="font-size: 14px;"><em><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">λ</span></em></span>«= <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{ - \ln \left( {\frac{N}{{{N_0}}}} \right)}}{t} = \frac{{ - \ln \left( {\frac{{4.0 \times {{10}^{ - 5}}}}{{5.0 \times {{10}^{ - 5}}}}} \right)}}{{31.4{\text{ s}}}}">
<mfrac>
<mrow>
<mo>−</mo>
<mi>ln</mi>
<mo></mo>
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mi>N</mi>
<mrow>
<mrow>
<msub>
<mi>N</mi>
<mn>0</mn>
</msub>
</mrow>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</mrow>
<mi>t</mi>
</mfrac>
<mo>=</mo>
<mfrac>
<mrow>
<mo>−</mo>
<mi>ln</mi>
<mo></mo>
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mn>4.0</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>5</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>5.0</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>5</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</mrow>
<mrow>
<mn>31.4</mn>
<mrow>
<mtext> s</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> »</span></p>
<p><span style="background-color: #ffffff;">= 7.106 × 10<sup>–3</sup> s<sup>–1</sup> <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{t_{\frac{1}{2}}} = \frac{{\ln 2}}{\lambda }">
<mrow>
<msub>
<mi>t</mi>
<mrow>
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</mrow>
</msub>
</mrow>
<mo>=</mo>
<mfrac>
<mrow>
<mi>ln</mi>
<mo></mo>
<mn>2</mn>
</mrow>
<mi>λ</mi>
</mfrac>
</math></span> =» 98/97.5 «s» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Award <strong>[2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This part was well answered.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part was also fairly well answered although some candidates missed the concept of minimum mass to sustain a chain reaction.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part saw some reasonable answers, but some other candidates wrote very vague or general answers.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a well-answered question with most candidates referring to fusion having less or no radioactive waste.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most of the candidates were able to state correctly the mass difference between reactants and products and <em>E</em> <em>= mc</em><sup>2</sup>.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates were able to calculate the half-life of an isotope correctly.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">The regular rise and fall of sea levels, known as tides, can be used to generate energy.</span></p>
<p><span style="background-color: #ffffff;">State <strong>one</strong> advantage, other than limiting greenhouse gas emissions, and <strong>one</strong> disadvantage of tidal power.</span></p>
<p><span style="background-color: #ffffff;">Advantage:</span></p>
<p><span style="background-color: #ffffff;">Disadvantage:</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><span style="background-color: #ffffff;"><strong><em>Advantage</em></strong><br><em>Any one of:</em><br>renewable <strong>[✔]</strong><br>predictable supply <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>tidal barrage may prevent flooding <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>effective at low speeds <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>long life-span <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>low cost to run <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em><strong>Disadvantage</strong></em><br><em>Any one of:</em><br>cost of construction <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>changes/unknown effects on marine life <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>changes circulation of tides in the area <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>power output is variable <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>limited locations where feasible <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>equipment maintenance can be challenging <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>difficult to store energy <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Do <strong>not</strong> accept vague generalisations.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept economic issues for both advantage and disadvantage.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept sustainable.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “energy” or “electricity” for “power”.</span></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Many candidates performed well on this question, especially when identifying an advantage of tidal power. The candidates who struggled tended to either give vague or journalistic answers especially for the disadvantage of tidal power.</p>
</div>
<br><hr><br><div class="specification">
<p>A fuel cell converts chemical energy directly to electrical energy.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the half-equations and the overall equation for the reactions taking place in a direct methanol fuel cell (DMFC) under acidic conditions.</p>
<p><img 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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline <strong>one</strong> advantage and <strong>one</strong> disadvantage of the methanol cell (DMFC) compared with a hydrogen-oxygen fuel cell.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Negative electrode (anode):</em></p>
<p>CH<sub>3</sub>OH (aq) + H<sub>2</sub>O (l) → CO<sub>2</sub> (g) + 6H<sup>+</sup> (aq) + 6e<sup>–</sup></p>
<p><em>Positive electrode (cathode):</em><br>O<sub>2</sub> (g) + 4H<sup>+</sup> (aq) + 4e<sup>–</sup> → 2H<sub>2</sub>O (l)</p>
<p><em>Overall equation:</em></p>
<p>2CH<sub>3</sub>OH (aq) + 3O<sub>2</sub> (g) → 2CO<sub>2</sub> (g) + 4H<sub>2</sub>O (l)</p>
<p><em>Accept any whole or fractional coefficients in balanced equations.</em></p>
<p><em>Award <strong>[1 max]</strong> for correct half-equations at wrong electrodes for M1 and M2.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Advantage:</em></p>
<p><em>Any one of:</em></p>
<p>liquid methanol is easier to transport/store than gaseous hydrogen</p>
<p><em><strong>OR</strong></em></p>
<p>hydrogen is explosive</p>
<p>longer membrane life «as it operates in aqueous environment»</p>
<p>methanol has greater energy density than hydrogen</p>
<p><em>Disadvantage:</em></p>
<p><em>Any one of:</em></p>
<p>lower voltage</p>
<p>lower power per unit mass «of the cell»</p>
<p>lower efficiency</p>
<p>toxic/can be mistaken for ethanol</p>
<p>lower specific energy</p>
<p><em>Ignore any cost references throughout.</em></p>
<p><em>Accept “CO<sub>2</sub>/greenhouse gas produced” <strong>OR</strong> “requires a more highly efficient catalyst”.</em></p>
<p><em>Do <strong>not</strong> award marks for converse statements for the advantage and disadvantage.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Red supergiant stars contain carbon-12 formed by the fusion of helium-4 nuclei with beryllium-8 nuclei.</span></p>
<p><span style="background-color: #ffffff;">Mass of a helium-4 nucleus = 4.002602 amu<br>Mass of a beryllium-8 nucleus = 8.005305 amu<br>Mass of a carbon-12 nucleus = 12.000000 amu</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the nuclear equation for the fusion reaction.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain why fusion is an exothermic process.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the heat energy released, in J, by the fusion reaction producing one atom of carbon-12. Use section 2 of the data booklet and <em>E = mc<sup>2</sup></em>.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Beryllium-8 is a radioactive isotope with a half-life of 6.70 × 10<sup>−17</sup> s.</span></p>
<p><span style="background-color: #ffffff;">Calculate the mass of beryllium-8 remaining after 2.01 × 10<sup>−16</sup> s from a sample initially containing 4.00 g of beryllium-8.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_2^4{\text{He + }}{}_4^8{\text{Be}} \to {}_6^{12}{\text{C}}"> <msubsup> <mrow> </mrow> <mn>2</mn> <mn>4</mn> </msubsup> <mrow> <mtext>He + </mtext> </mrow> <msubsup> <mrow> </mrow> <mn>4</mn> <mn>8</mn> </msubsup> <mrow> <mtext>Be</mtext> </mrow> <mo stretchy="false">→</mo> <msubsup> <mrow> </mrow> <mn>6</mn> <mrow> <mn>12</mn> </mrow> </msubsup> <mrow> <mtext>C</mtext> </mrow> </math></span>✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Do <strong>not</strong> penalize missing atomic numbers.</span></em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 1</strong></em><br>binding energy per nucleon is larger in carbon-12/product «than beryllium-8 and helium-4/reactants» ✔<br></span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;">difference in «total» binding energy is released «during fusion» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 2</strong></em><br>mass of carbon-12/product «nucleus» is less than «the sum of» the masses of helium-4 and beryllium-8 «nuclei»/reactants<br><em><strong>OR</strong></em><br>two smaller nuclei form a lager nucleus ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;">mass lost/difference is converted to energy «and released»<br><em><strong>OR</strong></em><br><em>E = mc<sup>2</sup></em> ✔</span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;">Δ<em>m</em> = «12.000000 amu − (4.002602 amu + 8.005305 amu) =» −0.007907 «amu» ✔<br>«0.007907 amu × 1.66 × 10<sup>−27</sup> kg amu<sup>−1</sup> =» 1.31 × 10<sup>−29</sup> «kg» ✔<br>«<em>E = mc<sup>2</sup></em> = 1.31 × 10<sup>−29</sup> kg × (3.00 × 108 m s<sup>−1</sup>)<sup>2</sup> =» 1.18 × 10<sup>−12</sup> «J» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><em><span style="background-color: #ffffff;"> NOTE: Accept “0.007907 «amu»”.<br>Award<strong> [2 max]</strong> for “7.12 x 10<sup>14</sup> «J»”.<br>Award<strong> [3]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 1</strong></em><br>3 half-lives ✔<br>0.500 g «of beryllium-8 remain» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 2</strong></em><br><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="m = 4.00{\left( {\frac{1}{2}} \right)^{\frac{{2.01 \times {{10}^{ - 16}}}}{{6.70 \times {{10}^{ - 17}}}}}}"> <mi>m</mi> <mo>=</mo> <mn>4.00</mn> <mrow> <msup> <mrow> <mo>(</mo> <mrow> <mfrac> <mn>1</mn> <mn>2</mn> </mfrac> </mrow> <mo>)</mo> </mrow> <mrow> <mfrac> <mrow> <mn>2.01</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>16</mn> </mrow> </msup> </mrow> </mrow> <mrow> <mn>6.70</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>17</mn> </mrow> </msup> </mrow> </mrow> </mfrac> </mrow> </msup> </mrow> </math></span> ✔<br>0.500 g «of beryllium-8 remain» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 3</strong></em><br><em>λ</em> = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\ln 2}}{{6.70 \times {{10}^{ - 17}}}}"> <mfrac> <mrow> <mi>ln</mi> <mo></mo> <mn>2</mn> </mrow> <mrow> <mn>6.70</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>17</mn> </mrow> </msup> </mrow> </mrow> </mfrac> </math></span> »= 1.03 × 10<sup>16</sup> «s<sup>−1</sup>» ✔<br><em>m</em> = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="4.00{\text{ }}{{\text{e}}^{ - 1.03 \times {{10}^{16}} \times 2.01 \times {{10}^{ - 16}}}}{\text{ = }}"> <mn>4.00</mn> <mrow> <mtext> </mtext> </mrow> <mrow> <msup> <mrow> <mtext>e</mtext> </mrow> <mrow> <mo>−</mo> <mn>1.03</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mn>16</mn> </mrow> </msup> </mrow> <mo>×</mo> <mn>2.01</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>16</mn> </mrow> </msup> </mrow> </mrow> </msup> </mrow> <mrow> <mtext> = </mtext> </mrow> </math></span> » 0.500 «g» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><em><span style="background-color: #ffffff;"> NOTE: Award<strong> [2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about fuel for engines.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Crude oil can be converted into fuels by fractional distillation and cracking.</span></p>
<p><span style="background-color: #ffffff;">Contrast these two processes.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="661" height="257"></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the specific energy, in kJ g<sup>−1</sup>, and energy density, in kJ cm<sup>−3</sup>, of hexane, C<sub>6</sub>H<sub>14</sub>. Give both answers to three significant figures.</span></p>
<p><span style="background-color: #ffffff;">Hexane: <em>M</em><sub>r</sub> = 86.2; Δ<em>H<sub>c</sub></em> = −4163 kJ mol<sup>−1</sup>; density = 0.660 g cm<sup>−3</sup></span></p>
<p>Specific energy:</p>
<p>Energy density:</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Hydrocarbons need treatment to increase their octane number to prevent pre-ignition (knocking) before they can be used in internal combustion engines.</span></p>
<p><span style="background-color: #ffffff;">Describe how this is carried out and the molecular changes that take place.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="460" height="200"></p>
<p><em><strong>Note: </strong><span style="background-color: #ffffff;">Award<strong> [1]</strong> for any two correct answers from one column <strong>OR</strong> one from each column.</span></em></p>
<p><em><span style="background-color: #ffffff;">Award <strong>[2]</strong> for any two correct from each column; eg: fractional distillation – any two correct award<strong> [1 max]</strong> <strong>AND</strong><br>cracking – any two correct, award <strong>[1 max]</strong>.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">specific energy = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{4163{\text{ kJ mo}}{{\text{l}}^{ - 1}}}}{{86.2{\text{ g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>4163</mn>
<mrow>
<mtext> kJ mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>86.2</mn>
<mrow>
<mtext> g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> =» 48.3 «kJ g<sup>–1</sup>» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">energy density = «48.3 kJ g<sup>–1</sup> × 0.660 g cm<sup>–3</sup> =» 31.9 «kJ cm<sup>–3</sup>» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Award <strong>[1 max]</strong> if either or both answers not expressed to three significant figures.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two of:</em><br>«hydrocarbons are heated with» catalyst <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">long chains break and reform<br><em><strong>OR</strong></em><br>branching/aromatisation occurs<br><em><strong>OR</strong></em><br>isomerisation/reforming/platforming/cracking <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">zeolite separates branched from non-branched<br><em><strong>OR</strong></em><br>products are distilled<br><em><strong>OR</strong></em><br>«distillation» separates reformed and cracked products <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Accept a specific catalyst name or formula for M1 such as Pt/Re/Rh/Pd/Ir.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This part was not well answered. Many candidates didn’t answer the question as instructed. Candidates required two correct statements, either about fractional distillation or cracking as a process for one mark.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part was very well answered by most candidates with the correct number of significant digits as specified in the question.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates responded well to at least one mark of this question. There were several different ways to earn the two marks possible. The most common way candidates earned marks were by identifying the use of a catalyst and then the idea of the compound reforming into a smaller or branched compound. Very few candidates discussed the idea of purification or separation into individual compounds, which is another important part of this process.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Semiconductors and light-sensitive dyes are used in photovoltaic cells.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Sketch graphs to show the general effect of increasing temperature on the electrical conductivity of semiconductors and metals on the axes below.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="624" height="304"></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain the function of dyes in a dye-sensitized solar cell (DSSC).</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Semiconductors:</em><br>increases <strong>[✔]</strong><br></span></p>
<p><span style="background-color: #ffffff;"><em>Metals:</em><br>decreases <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Accept any graph showing general increase for semiconductor.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept any graph showing general decrease for metal.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept a graph showing vertical section below transition temperature for a superconducting metal.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">dye absorbs light <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">electrons from «excited» dye pass to TiO<sub>2</sub>/semiconductor/electrolyte/cell<br><em><strong>OR</strong></em><br>dye undergoes photo-oxidation <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Several candidates managed one mark to show conductivity of semiconductors on increasing the temperature but were unable to show that generally conductivity decreases for metals when the temperature is increased.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The question on dye-sensitized solar cell invited mixed responses. While most candidates correctly stated that dyes absorb light but several failed to mention that electrons from the excited dye pass to TiO2/semiconductor.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">This question is about biofuel.</span></p>
<p><span style="background-color: #ffffff;">Evaluate the use of biodiesel in place of diesel from crude oil.</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><span style="background-color: #ffffff;"><em><strong>Strength</strong></em><br><em>Any one of:</em><br>less flammable «than diesel» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">recycles carbon «lower carbon footprint»<br><em><strong>OR</strong></em><br>lower greenhouse gas emissions <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">easily biodegradable «in case of spill» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">renewable<br><em><strong>OR</strong></em><br>does not deplete fossil fuel reserves <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">economic security/availability in countries without crude oil <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em><strong>Limitation</strong></em><br><em>Any one of</em>:<br>more difficult to ignite inside the engine «than diesel» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">more viscous «than diesel» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">lower energy content/specific energy/energy density <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">uses food sources<br><em><strong>OR</strong></em><br>uses land that could be used for food <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«production is» more expensive <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">less suitable in low temperatures <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">increased NO<sub>x</sub> emissions for biodiesel <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">greenhouse gases still produced <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Accept “«close to» carbon neutral”, “produce less greenhouse gases/CO2”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “engines have to be modified if biodiesel used” as limitation.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> award marks for strength and limitation that are the same topic/concept.</span></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This question was well answered, and many candidates received either one or both marks.</p>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Consider the following data for butane and pentane at STP.</span></p>
<p><span style="background-color: #ffffff;"><img style="display: block; margin-left: auto; margin-right: auto;" src="data:image/png;base64,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" width="534" height="113"></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Discuss the data.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline what is meant by the degradation of energy.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«similar specific energy and» pentane has «much» larger energy density ✔</span></p>
<p><span style="background-color: #ffffff;"><em>Any two for <strong>[2 max]</strong>:</em> <br>similar number of bonds/«C and H» atoms in 1 kg «leading to similar specific energy» <br><em><strong>OR<br></strong></em> only one carbon difference in structure «leading to similar specific energy» ✔<br><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">NOTE: </span><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Accept “both are alkanes” for M2.</span><br></span></p>
<p><span style="background-color: #ffffff;">pentane is a liquid <em><strong>AND</strong> </em>butane is a gas «at STP» ✔<br><em>NOTE: Accept “pentane would be easier to transport”.</em><br></span></p>
<p><span style="background-color: #ffffff;">1 m<sup>3</sup> of pentane contains greater amount/mass than 1 m<sup>3</sup> of butane ✔<br><em>NOTE: Accept “same volume” for “1 m<sup>3</sup>” and “more moles” for “greater amount” for M4.</em><br></span></p>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">energy converted to heat<br><em><strong>OR</strong></em><br>energy converted to less useful/dispersed forms<br><em><strong>OR</strong></em><br>energy converted to forms that have lower potential to do work<br><em><strong>OR</strong></em><br>heat transferred to the surroundings ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Reference to energy conversion/transfer required. Do <strong>not</strong> accept reference to loss of energy.</span></em></p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
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