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<h2>HL Paper 1</h2><div class="question">
<p>Which species has bond angles of 90°?</p>
<p>A. AlCl<sub>4</sub><sup>- </sup></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\text{I}}">
  <mrow>
    <mtext>I</mtext>
  </mrow>
</math></span>Cl<sub>4</sub><sup>- </sup></p>
<p>C. NH<sub>4</sub><sup>+ </sup></p>
<p>D. SiCl<sub>4</sub></p>
</div>
<br><hr><br><div class="question">
<p>What is the hybridization of the numbered atoms in ethanoic acid?</p>
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AUoEKUAE6ooAbk6BShAAQpQgAIUYELFGIhQwA2nvRmGIjUUCjWKDM2wO90RrsvFKEABClBgvATcjo+wuyLfczNKhUILQ3MXnONVmRQulwlVCnduTJvmtuOIfhv69B/D5foY+r43sLXtq5gWwY1RgAIUoECsBW6g+8Sb+DDfiEHBhUHLE+hcexCdAzwgjrV0Uvz0TKwbze3dgYAyD7pWC3Tiqs7Pce1WJmZMvfsONsRVKEABClAgcQITkaN7F6f9Bf5gPhZMOuV/xv9jKDDiGSq33QStQgGFehPMzGZjyJ68m7plrUN2Vj6e/+uPoZ07OXkbwppTgAIUSDcB91cwv34AfTsqoZk84td/usnEpL0jiN5A99nf4vz67diefwatlqsxKZAbSW6BCQUb0C3cRI/+CspeOQ5HcjeHtacABSiQHgJiMlX9SzRkv4Y9pfdjhC//9PCIQyvDmw78Acbqiyhf+ixKn5mJHbUfws4h1zh0QZJs0t0Fk/ZZmOw3AExA1tTJmDRjKu5JkuqzmhSgAAXSU8B3QdGS1/Dpsj14RzcPmekJEfdWh0mo3BiwnEIjSqAtnInsx55ASdtvcbZb/DLlX/IJDMBuNvmu0FP4rtIzwWwf8DWlD2ZDIRTafTB/sg8VanEZBRRFBjRYHfDk0cocrNhTgjOau6FQZCCvYSbe+8Vj4KBf8kVDStfYaYfZZECRGL+ef1oYTGbfFaluDJg3Qa1YgbfNJ4df9dTQCQcPGFM6NJKzcWIyZIbJoPXFs3e/bDLbfVfpRRLTV9Fp3IYdbSasX6hGhudz8SKaHbeSk0TGtQ6TUF2FpbUNKH8chZOVUGb/GM+U/BmHz17yfrnKuEGsWrCAG06rEZVlHyF3fxcEQYDg+hM2ZxxGsf6D4Wcd29aibD+wxnoTgtAPmz4D9YUvYJf1GgAlMvMq0NAreLbR27AGC1R3BRfG5xQYR4FrsB5Yj7IzD2D/oMsTp67eDchoXA39Ebtk3/U+VpcdAta0wSVe9WSrBOpXYuWuTl5KPo69x6JDCDgtOFBZhTO5b2BQ3HcLN9G7eRIai6txxDNa4F9npJi+F4tqLd59v2cb4nYOoFTFa9L8ejH7Xwjx57IZhRIUCFXtV3zvXhdsxuUCVBuF9n5XiDXi9xIgxgH/7lzA13clRsEWtuuuCO1VBQJUa4SmnpuSoryvq6rahX7Jq3wYOwHGd+wsBdcFwVgyRygxXhBCh7pL6G/fKKgwT9A1XZIs43t9HPZvMWy97DbF2I6+S7zfxcsFo+16mI0xpsPAxP3lUPEd4gyVdzJ6m0oc7pvmS9wmeof9HG2cnB6zVDZRG7oL6vk/gqbtTRiP/h7m5o7wN+TMfxjzhp11ysR9ubPhaDwFC6/yTFSHsZw7FVDOwPzFeWirfgdHO81oDgyLBG9wLh6d9z3JpFwlMu/LRj73b8FQfD7OAkr1PCzWnEW18Tg6zccl0zSCK8aYDhYZj+e3J1TuSzh7+Czg2I7iKRmBcduM3OfRBisaWz+Df+bNeFSYZY5VQInMgnVosdVh4bXjqHmqCLlZGZ75UUPj8KNs09GNS5e/HWUhvk2B8RaYioIN78F2aCGuNdXiqeJcZHnu6i+dLzhSHXtx7lKfZGhwpGX5HgUSIJC5ABtaOnBo4ddoqlmN4twp8NzpPDAvcLQ6MKZHE4rl+0EJlRsDHQdR3fYYjLbrQWOuLvS3bwR2HMAHw8ZuY1kdbis+Akpk5mhQqqvFaUGAq9eCpqWXUV28EjXmvtGLVGVj1gzOlxodikuMv8Bk5Cwqha621TvfxLIXSy/vRrHm9QjupafGQ7PulZy5Gv/WsAYUQGYOFpW+gNrTvRBcvbA0Lcbl6mJoajoiOLnBmE5kBAUlVL7J6LqfQZs9MageSkwufBzlqrOcnB4kk2xPlaoClK6uQLkq6OjlfDd6hv0+nxM9totQ+S5OSLZ2sr7pLnAXVAXLsLriSaiGnWW9CFuP9JfM3HD2dOP8sGkO6W7H9stSQKlCQekqVJQXwHHuEi4HrkxlTMuhv4YnVAOfobURKH/2HzBz+Dveuk5+GCvWP4y2w39Ad6Aj5dAM1iG8wA3YTSugKNqE5sBtEgZgP3UKnShFpXb20BG5ox41W4/65lgNoMtkQFnjD7H3Jd4eIbwv35GNgOdeadnDf7jbacepVisw7CDRih01u3yfBzecXY3Ql7VgyV7ePVo2fcmKeAS8v1Yi/TFj8TYKv0NrJ6CrLEZ24HuaMS2HkAl0B3AD9g8OYEfus1ixwD8ZPbiKU/H3Py1FiTjBuaMP8OzA1PxpmmAmWT2fiJxVe2DRT8MxjTj+Lt6fZwo0x6ZB3/Iqls2UDOVpylH+yEVszRHnzk3BojPz0NCxDaXSZWTVNlaGAhIBZR5W1R+GfvoxaMR5gmKsZy3HsemVaNnyE8lBYgmqyufi4tZHPfdUy1pkRn5DE+8eLaHkQ3kIKHPKUG+pxPRjy5Hl2XdnIEtzDNP1b2HLMundzhnTcugxhXhtoRwqEq4O4k5R5lUMV/Ukel28secTKD73c9hO6JAjSbOTqBFJWVXGdyK7TbwJYjXyiruxxXYQupzgaQ2JrEvql8XYTkQfM6YToRyqjFDxza/OUFJ8jQIUoAAFKEABCoxBgAnVGLC4KAUoQAEKUIACFAglwCG/UCp8jQIJEgh12jhBRbMYCsRVgLEdV15ufJwFQsU3z1CNc6eweApQgAIUoAAFkl+ACVXy9yFbQAEKUIACFKDAOAswoRrnDmDxFKAABShAAQokvwATquTvQ7aAAhSgAAUoQIFxFmBCNc4dwOIpQAEKUIACFEh+ASZUyd+HbAEFKEABClCAAuMswIRqnDuAxVOAAhSgAAUokPwCTKiSvw/ZAgpQgAIUoAAFxllgwjiXH1Hx4g20+EeBVBVgfKdqz7JdjG3GQDoJJEVCxR9HTqeQTK+2hrrbbnoJsLWpKsDYTtWeZbtEgVAHCxzyY2xQgAIUoAAFKECBKAWYUEUJyNUpQAEKUIACFKAAEyrGAAUoQAEKUIACFIhSgAlVlIBcnQIUoAAFKEABCjChYgxQgAIUoAAFKECBKAWYUEUJyNUpQAEKUIACFKAAEyrGAAUoQAEKUIACFIhSgAlVlIBcnQIUoAAFKEABCjChYgxEKOCG094MQ5EaCoUaRYZm2J3uCNflYhSQuYDbgc7dFVArFIxvmXcVq0cBuQowoZJrz8itXm47jui3oU//MVyuj6HvewNb276SWy1ZHwrckYC7+wQ2f/gQWgZdEAaPYmnnGzB2Xr2jbXElClAgPQWS4qdn0rNrZNZqZR50rRboxGo5P8e1W5mYMfVumVWS1aHAnQkoc3RoPe1fdzYeXvBdtPqf8n8KUIACEQgEnaG6Abtphec3asTfqRn+TwuDycxhnghQU3mRW9Y6ZGfl4/m//hjauZNTualsW1oKfAuHeR9q+3R4SXNvWgqw0RSgwJ0JBCVU/o0sh9F2HeKPEvv/uXpfw4wz66BZdxRfceqMHyrt/p9QsAHdwk306K+g7JXjcKSdABucugJiMrUdqxpmYc+eZZgZZu+Yuu1nyyhAgWgEIt5lKFU/wvMVTwKmX6O1+0Y0ZXLdZBRwd8GkfRYmu9j3E5A1dTImzZiKe5KxLawzBYIFnF1oNpThlU8fR/07FcjLjHjXGLwlPqcABdJUYOx7DVU2Zs24K025krXZA7CbTb4r9PxXMZlgtg/4GtQHs6EQCu0+mD/Zhwq1b7i3yIAGqwOeE5LKHKzYU4IzmruhUGQgr2Em3vvFY+CgX7LGRArV22mH2WRAUWCaQtD0hAEzDGo1tG+fxCfDruRrhNXxLQA3BjoPYu2O93Fw/WNQZ4jxn42K5i9TCIlNSX4B8UprM0wG7dB0nCIDTGY7nJ7GRbAfT34EWbcg4oTK7fgYxncH8PJRPTSTI15N1o1Pj8q54bQaUVn2EXL3d3mHcF1/wuaMwyjWfwC7dPi2bS3K9gNrrDchCP2w6TNQX/gCdlmvAVAiM68CDb3eYeDehjVYoGJinR4xJOdWXoP1wHqUnXkA+8Ur9AQBrt4NyGhcDf0Ru/dgwFN9B9pWr8d+rIbVJUAYNEOPQyhcuQ9WJzB50Tb0SqY4CEI3Gkq/L+eGs27pJuC04EBlFc7kvoFBT6zeRO/mSWgsrsYRz8iBD2TE/Xi6oSW4vcKwv+uCzbhcABDmX4lQ1XRBGBy2TnyfiHXhXzQCvj4tMQo2V7jtXBHaqwoEqNYITT03JQt5X1dVtQv9klf5MHYCjO8oLV0XBGPJHKHEeEEIG9797UKVCoJK1yT0SBfyvF4gVLVfibISXD2UAGM7lMqdv+ayGYUSLBeMtuthNsL9eBiYuLwcKr7DnGq6fVK6MHgBTVXAjqc24IDnjEWCMz8Wd4cCd0E9/0fQtL0J49Hfw9zcEf5KzfyHMW/YWadM3Jc7G47GU7AMSE9l3WFVuBoFYi2gnIH5i/PQVv0Ojnaa0RwY/gguSIX8Rx+ASrrHy1QjN78Xja2fwT/4HbwWn1NALgJK9Tws1pxFtfE4Os3HJVM2gmrI/XgQSOKeSncvI5eamYdlzz+DEvwGu478mTugkbVk9K4SmQXr0GKrw8Jrx1HzVBFyszKgGDb2Pkp1Hd24dFmca8I/CshNYCoKNrwH26GFuNZUi6eKc5HluZO/dI7gyHV2nLuEyzxeGBmJ746/QOYCbGjpwKGFX6OpZjWKc6dAoQiaLzhSLbkfH0knJu9FnlCJs2hmzMJDqpiUy40kVECJzBwNSnW1OO2ZY2JB09LLqC5eiRpz3+g14YUIoxtxiXEUmIycRaXQ1bZCEG6i17IXSy/vRrHmdZgjOLOqemgWZoxpTziOTWXR6S2QmYNFpS+g9nQvBFcvLE2Lcbm6GJqajtFPcnA/HvfYGdNuxH35Es45ClCufZBXd8W9a+JXgFJVgNLVFShX9eLcpb6hibvnu9Ez7Pf5nOixXYSq/HEU8kKE+HUItxxDgbugKliG1RVPQjXsiNyB87Ze39VQvuKcvbCdV3N/FkN9biqBAkoVCkpXoaK8AMPOsnI/nsBOGF5U5AmVswtHjYfRpnkWKxZMG74VPpOxgO/u90Wb0By4TcIA7KdOoROlqNTORiAIHPWo2XrUN8dqAF0mA8oaf4i9L/H2CDLu4PSumuf+aNnDf6zbacepViug+xm02RMDPo4dtdja3OVNqpyfw6Rfh8Ylm3hH9IAQH8hZwG03QSsO8fljGOJtFH6H1k5AV1mMbP+OnPvxcetGfxcEVeB9PJ8r3m9I8vMzWevwx1w9LO+tQYH/pneenZkaCvWmiE6tBxXCpwkRmIicVXtg0U/DMY045i726RRojk2DvuVVLJspufWBphzlj1zE1pwMzzKLzsxDQ8c2lEqXSUidWQgFIhRQ5mFV/WHopx+DRpwbKMZ31nIcm16Jli0/kdztXAVN1dN45OJ25HiW+Recya9DB++IHiE0FxtvAWVOGeotlZh+bDmyPPvxDGRpjmG6/i1sWXb/0IEx9+Pj1lUK8XrCcSs9goLFHaTMqxhBK+S+iHhDuCdQfO7nsJ3QISdMmi33ViRj/RjfCeg18caeeWU4t8WME7q8oS+eBBSdzkUwthPd+9yPJ1I8VHzzqzORPcCyKEABClCAAhRISQEmVCnZrWwUBShAAQpQgAKJFOCQXyK1WRYFggRCnTYOWoRPKZCUAoztpOw2VjpCgVDxzTNUEeJxMQpQgAIUoAAFKBBOgAlVOBm+TgEKUIACFKAABSIUYEIVIRQXowAFKEABClCAAuEEmFCFk+HrFKAABShAAQpQIEIBJlQRQnExClCAAhSgAAUoEE6ACVU4Gb5OAQpQgAIUoAAFIhRgQhUhFBejAAUoQAEKUIAC4QQmhHtDTq+L93vgHwVSVYDxnao9y3YxthkD6SSQFAkVf8svnUIyvdoa6uZw6SXA1qaqAGM7VXuW7RIFQh0scMiPsUEBClCAAhSgAAWiFGBCFSUgV6cABShAAXTWO9EAABQqSURBVApQgAJMqBgDFKAABShAAQpQIEoBJlRRAnJ1ClCAAhSgAAUowISKMUABClCAAhSgAAWiFGBCFSUgV6cABShAAQpQgAJMqBgDFKAABShAAQpQIEoBJlRRAnJ1ClCAAhSgAAUowISKMUABClCAAhSgAAWiFGBCFSVg+qz+LRyd+1ChVnjuEKso2oRm+0D6NJ8tTXGBAdibN6FIIca3FobmLjhTvMVsXvoIuB0fYXdFvnffzfiOW8czoYobbYpt2H0RJzafQn7L1xCEr2FZ+hnWGi1gSpVi/ZymzXHbP4B+7QD0PTfh6qlE39p/R5vjVppqsNmpJXAD3SfexIf5RgwKLgxankDn2oPoHHCnVjNl0JrwCZXTDvMHdUNnJBQKqCvq8IHZziM3GXRcwqugzIOu9f9iQ8FUAJPxg4cfxKSEV4IFUiA+AsocHVp796J05gR8MziIW5OmYeo94XeP8akFt0qBeAhMRI7uXZzesACZUCLzB/OxgDvveEAjxB7DDae9GYYn/wk1f/oeXrLehPjjxILQj46yDLSUafBkXSeTqrh0R3Js1O1ox+u132DHS49hcnJUmbWkQAQCTljripE1dyP+uqIIczND7B4j2AoXoYBsBdxfwfz6AfTtqIRmMuM71v2kEMRsSfrn7ETdk8uwa/Ze/OntUswcZu6G07oHTxa+iwXtv0Xtonula8blMX+xPC6sd7xRt+Mkqlc1IXvPDujymE7dMaRvRcZ3tIJxWN/9FzS/sBLHlv4aDaXfj0MB6bFJxrbM+llMpqp/iYbs17BPNw+ZMqteslUnVHwPS5cANwY6j2JXx2PYYvinoGRKbK4SmX//M9Qd3QztfXclW/vTuL4DsJtNMBSpfZMS1SgymGAOTCrvg9lQCIV2H8yfSCeeG9BgdcA70u6dtLvkFTuW1f9vJlNpHE2ya7o4PcFk8E0o900qN5lhd/rmiAyYYVCroX37JD7ZXQG1Z+K5+BlohNXxrac5brsJWq0JdnEV5T2Yeu93MWPq3bJrKiuUbgLiiJEZJoPWt+9WQFFkgCkw9caNAfMmqBUr8Lb55PCJ5w2dcHg+Ar5RpyWv4dNle/AOk6m4BVFQQnUVltY2OFTZmDUjTMKkVKHgn/8Zi3J4diJuvRLTDYtnFY2oLPsIufu7vMO3rj9hc8ZhFOs/8H6B+MtrW4uy/cAazzBvP2z6DNQXvoBd1mvAgAXGtdvRdnAtFqr/zvvhrmiGw78u/6fAuAhcg/XAepSdeQD7B12e+Hb1bkBG42roj9h9BwNixRxoW70e+7EaVpcAYdAMPQ6hcOU+WJ1uKHOexp5nPoImQ0zIitAwYyN+oYn/GfhxIWOhySPgtOBAZRXO5L6BQc/Um5vo3TwJjcXVOGK/IWnH+1hddghY0waXOPHcVgnUr8TKXeL0nKvoNG7DjjYT1i9UI8NzQPEimnnRhcQvRg/FIb/An+uCYCxRCSgxCjZX4NVxfQCI+0j+3bnAdcFmXD5Kn14R2qsKBKjWCE09NyVFeV9XVbUL/ZJX+TB2AozvKC09+6w5QonxghB2l9XfLlSpIKh0TUKPdCHP6wVCVfuVKCvB1UMJMLZDqYztNZfNKJRguWC0XQ+zokvob98oqDBP0DVdknwGfK+rNgrt/dKgD7MZvjxmgVDxHXSGKkZZGjcjI4G7oJ7/I2ja3oTx6O9hbu4YGgoJrmX+w5inkp6ZzMR9ubPhaDwFCy+xDdbiczkIKGdg/uI8tFW/g6OdZjQHhkKCK6dC/qMPQCXd42WqkZvfi8bWz3j7j2AuPpeFgFI9D4s1Z1FtPI5O83HJNI3g6s3Fo/O+J7nKTInM+7KR72hDq+Vq8MJ8HicB6e4FUN6LWQ+pgfPd6PHPP4hTwdxsogSUyCxYhxZbHRZeO46ap4qQm5URNA4/Sl0c3bh02TvXZJQl+TYFEiwwFQUb3oPt0EJca6rFU8W5yFIEzxEcuUqOc5dw2TfdauQl+S4FEiyQuQAbWjpwaOHXaKpZjeLcKd4bz0rnCI5YpV6cu9QnGfoecWG+GaXA8IQK01CoLYFqlC9Qt8OKY2GPBKOsEVePg4ASmTkalOpqcVoQ4Oq1oGnpZVQXr0SNuW/08kaaUzf62lyCAnEWmIycRaXQ1bZCEG6i17IXSy/vRrHmdZgjOLOqemgWZgTtCeNcYW6eApELZOZgUekLqD3dC8HVC0vTYlyuLoampiOCM6tqPDTrXsmZq8iL5ZJjFwjajSgxecEyrBdPMdb+B7667ajNDWdXA/61YBU+vPZ3vLHj2L1lsYZSVYDS1RUoVwUdvdx2ZtKJHttFqMofRyHvWSKLvmMlRhO4C6qCZVhd8WTQgaED5229w++f5+yF7bwa5doHeT+10Vj5vjwExIvCSlehorwAw8+sXoStR/pjSW44e7pxXlUCbeE0edQ9DWoRlFAByCzEi/u3Y/GJtSjbOHRZMTAA+8k9WLNoI/66ahe2LLufWW9SBMgN2E0rMPy39wZgP3UKnShFpXb2UD866lGz9ahvjtUAukwGlDX+EHt5A8+k6Om0rKS7CyZtNooMzUNzA512nGq1ArqfQZs9McDi2FGLrf7f6HN+DpN+HRqXbMJLvJovYMQH8hLw3M5j2G/vibdA+B1aOwFdZTGyA9/gVuyo2eX7fVXxxEcj9GUtWLKXN/BMZI8GumOoUCUy8yrwjrUFv8j9HBv8l8grpkBzyIUnD3WgZdviocmdnh2aGgr1pohOrw+Vw0eJEZiInFV7YNFPwzGNOP4uXhY+BZpj06BveRXLZkomoWvKUf7IRWzNyfAss+jMPDR0bEOpdJnEVJqlUCAyAWUeVtUfhn76MWjEuYFifGctx7HplWjZ8hPJvfRU0FQ9jUcubkeOZ5l/wZn8OnTsWSZZJrIiuRQFEiWgzClDvaUS048tR5Zn352BLM0xTNe/FXRSowRV5XNxceujUCgykLXIjPyGJuwp5YmPRPWVWM7td0pPZOkRlBXqbqQRrMZFxiQg3tjzCRSf+zlsJ3TICZFmj2lzXDhiAcZ3xFR3vqB4Y8+8MpzbYsYJXd7QGdk73yLXjECAsR0BUtSLiDf2rEZecTe22A5ClzN0RjbqTXMDIwqEim9+dY5IxjcpQAEKUIACFKDA6AJMqEY34hIUoAAFKEABClBgRAEO+Y3IwzcpEF+BUKeN41sit06BxAgwthPjzFLGRyBUfPMM1fj0BUulAAUoQAEKUCCFBJhQpVBnsikUoAAFKEABCoyPABOq8XFnqRSgAAUoQAEKpJAAE6oU6kw2hQIUoAAFKECB8RFgQjU+7iyVAhSgAAUoQIEUEmBClUKdyaZQgAIUoAAFKDA+AkyoxsedpVKAAhSgAAUokEICTKhSqDPZFApQgAIUoAAFxkdgwvgUO7ZSxRto8Y8CqSrA+E7VnmW7GNuMgXQSSIqEShCEdOoTtjWNBELdbTeNms+mprAAYzuFO5dNQ6iDBQ75MTAoQAEKUIACFKBAlAJMqKIE5OoUoAAFKEABClCACRVjgAIUoAAFKEABCkQpwIQqSkCuTgEKUIACFKAABZhQMQYoQAEKUIACFKBAlAJMqKIE5OoUoAAFKEABClCACRVjgAIUoAAFKEABCkQpwIQqSkCuTgEKUIACFKAABZhQMQYoQAEKUIACFKBAlAJMqKIETJ/V3XDam2EoUkOhUKPI0Ay7050+zWdLU1vA7UDn7gqoFQrGd2r3dHq2ztmFZoPWc3dvRdEmNNsH0tMhzq1mQhVn4JTZvNuOI/pt6NN/DJfrY+j73sDWtq9SpnlsSHoLuLtPYPOHD6Fl0AVh8CiWdr4BY+fV9EZh61NE4AbsR17D2r5K9Lhuokc/gLVbT8GRIq2TUzOCEio3BsybfEdp4pGa9F8+KuoOw8zMVk79l7i6KPOga7XAWHo/lN8M4tqtTMyYenfiymdJFIijgDJHh9bTv0RBphLInI2HF3w3jqVx0xRIpMBE5OiOoNdYipnKGxi8dh2TZkzFPYmsQpqUFZRQ+VtdgKr2KxB/lDjwb7AJZfgPlGl+CVMXTxf6pdLt/1vWOmRn5eP5v/4Y2rmT0635bG/KC3wLh3kfavt0eElzb8q3lg1MI4FbVtRlT8Hc53uwQpuLzDRqeqKaGiahClF8Zg4Wr/9f2LukE8//TyOsnD8TAin1X5pQsAHdgnja+ArKXjnO08ap3+Vp1EIxmdqOVQ2zsGfPMsyMfO+YRkZsatIKTCjAhm4Brp5K/HdZDY46biVtU+Ra8bHtMpT3Y5nhlyjpeBdHOL9Arn0aol4DsJtNvgnl/km3JsnwbR/MhkIotPtg/mQfKtS+od4iAxqsDnimnru7YNI+C5P9BoAJyJo6maeNQ0jzpXEQcNphNhlQFJiioIXBZB66aGLADINaDe3bJ/HJsInnjbA6vvVW2DNptwyvfPo46t+pQJ449Mc/Coy7gHgxkBkm/4RyMcaLDDCZ7XB66uafprMCb5tPYndFvm+qjhaGhk44PDvvG7CbnoXW1OXZlyuzpuLeSdMw9R7GeKy7d8yiyhmz8JCqF+cu9Xm/aGNdI24vxgJuOK1GVJZ9hNz9Xd4hXNefsDnjMIr1H8AuvVCvbS3K9gNrrDchCP2w6TNQX/gCdlmvAcocrNhTgjOau6FQZCCvYSbe+8Vj4KBfjLuLmxujwDVYD6xH2ZkHsF+cUC4IcPVuQEbjauiP2CX7KAfaVq/HfqyG1SVAGDRDj0MoXLkPVuctDHQexNod7+Pg+segzhAPKLJR0fzlGOvCxSkQYwGnBQcqq3Am9w0Meqbg3ETv5kloLK7GEc/Brb+897G67BCwpg0uwYVBWyVQvxIrd3XCiYnIWbERz5xZjgwxIctrwIz39NBMHvPXv78w/h9OQBj25xL62zcKKhQIVe1Xhr0TeNLfLlSpIKiq2oX+wIvxewCI+0j+3bnAdcFmXC6gxCjYXOG2ckVoryoQoFojNPXclCzkfT1RfS0pOG0eMr6j7GrXBcFYMkcoMV4Qwoa3f5+laxJ6pAt5Xh9hXxdl1dJ9dcZ29BHgshmFEiwXjLbrYTbm/86eJ+iaLkk+A77XVRuF9n5p0IfZDF8es0Co+GaKGi7TTJnX74J6/o+gaXsTxqO/h7m5Y2goJLiN+Q9jnuouyauZuC93NhyNp2AZkJ7KkizChxQYTwHlDMxfnIe26ndwtNOM5sBQSHClVMh/9AGopHu8TDVy83vR2PoZeJlNsBefy0FAqZ6HxZqzqDYeR6f5uGSaRnDt5uLRed/DUHgrkXlfNvIdbWi18PYfwVrxej7kP6YSVMjPVfMqgTGZjdfCSmQWrEOLrQ4Lrx1HzVNFyM3KCBqHH6Vujm5cuuybazLKonybAokVmIqCDe/BdmghrjXV4qniXGR5bjwrnSM4co0c5y7hMo8XRkbiu+MjkLkAG1o6cGjh12iqWY3i3ClQKILmCI5YM07PGZEnxm+OMaFyY8ByCo0ONR6ada8kG45xrbi5GAsokZmjQamuFqc9c0wsaFp6GdXFK1Fj7hu9LFU2Zs2QnrkafRUuQYHECUxGzqJS6GpbIQg30WvZi6WXd6NY8zrMEZxZVT00CzPGuCdMXNtYUtoLZOZgUekLqD3dC8HVC0vTYlyuLoampiOCM6v8rk5k/IxtN+L+EqfebYGj5Od4nvdoSWQ/xbQspaoApasrUB58ccH5bvQMux2GEz22i1CVP45CTmCMaR9wY/ESuAuqgmVYXfEkVMPOrDpw3tbruzLKV7azF7bzapRrH+TFFfHqDm43tgJKFQpKV6GivADDz6xehK3He92ft0A3nD3dOK8qgbZwWmzrwK2FFYg8oXLacXLXa1h7YgGMe55GTuRrhi2cbyRCQLxkdgWG/37TAOynTqETpajUzh460+ioR83Wo745VgPoMhlQ1vhD7H2JV/MloqdYxh0IeG7nkT38tyWddpxqtQK6n0GbPTGwUceOWmxt7vImVc7PYdKvQ+OSTbyBZ0CID+Qm4LaboBWH+PxxC/E2Cr9DayegqyxGduB72IodNbt8v9HnhrOrEfqyFizZW8mr+RLYqYHuGF6mFTuKpw//6ZksPU5NW44W637o8iQXy3t2aGoo1JsiOr0+vBw+i7/AROSs2gOLfhqOacTxd/GS8CnQHJsGfcurWDZTMpSnKUf5IxexNSfDs8yiM/PQ0LENpdJl4l9hlkCByAWUeVhVfxj66cegEecGivGdtRzHpleiZctPJDfnVEFT9TQeubgdOZ5l/gVn8uvQwRt4Rm7NJRMuoMwpQ72lEtOPLUeWZ9+dgSzNMUzXv4Uty+4fOhhGCarK5+Li1kc9t7XJWmRGfkMT9og/FZbwWqdvgQrxWkE5N1/cQcq8inLmi7Bu4o09n0DxuZ/DdkLHs48RqsViMcZ3LBRH2YZ4Y8+8MpzbYsYJXR6/YEbhitXbjO1YSY60HfHGntXIK+7GFttB6HKGzsiOtBbfi14gVHwzeY3elVugAAUoQAEKUCDNBZhQpXkAsPkUoAAFKEABCkQvwCG/6A25BQrcsUCo08Z3vDGuSAEZCTC2ZdQZrErMBULFN89QxZyZG6QABShAAQpQIN0EmFClW4+zvRSgAAUoQAEKxFyACVXMSblBClCAAhSgAAXSTYAJVbr1ONtLAQpQgAIUoEDMBZhQxZyUG6QABShAAQpQIN0EmFClW4+zvRSgAAUoQAEKxFyACVXMSblBClCAAhSgAAXSTYAJVbr1ONtLAQpQgAIUoEDMBSbEfItx2KB4Ay3+USBVBRjfqdqzbBdjmzGQTgKyT6j4w8jpFI5sKwUoQAEKUCA5BTjkl5z9xlpTgAIUoAAFKCAjASZUMuoMVoUCFKAABShAgeQUYEKVnP3GWlOAAhSgAAUoICOB/w+1y3irhgDGZQAAAABJRU5ErkJggg==" alt></p>
</div>
<br><hr><br><div class="question">
<p>Which combination describes the PH<sub>4</sub><sup>+</sup> ion?</p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>What is the hybridization state and electron domain geometry around the circled C, N and O atoms?</p>
<p><img 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"></p>
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"></p>
</div>
<br><hr><br><div class="question">
<p>What is the hybridization of nitrogen and chlorine in NCl<sub>3</sub>?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which combination correctly describes the geometry of </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msup><msub><mi>BrF</mi><mn>4</mn></msub><mo>-</mo></msup></math><span class="fontstyle0">?</span></p>
<p><img src="data:image/png;base64,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" width="569" height="164"></p>
</div>
<br><hr><br><div class="question">
<p>Which contain delocalised electrons?</p>
<p style="padding-left:90px;">I.   C<sub>6</sub>H<sub>5</sub>OH<br>II.  CH<sub>3</sub>COO<sup>−</sup><br>III. CO<sub>3</sub><sup>2−</sup></p>
<p>A.  I and II only</p>
<p>B.  I and III only</p>
<p>C.  II and III only</p>
<p>D.  I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>Which overlap of atomic orbitals leads to the formation of only a sigma (σ) bond?</p>
<p>       I.     s − p</p>
<p>       II.     p − p</p>
<p>       III.     s − s</p>
<p>A.     I and II only</p>
<p>B.     I and III only</p>
<p>C.     II and III only</p>
<p>D.     I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>In which compound are all carbon atoms sp<sup>3</sup> hybridized?</p>
<p>A.  C<sub>2</sub>H<sub>2</sub></p>
<p>B.  C<sub>2</sub>H<sub>2</sub>Cl<sub>2</sub></p>
<p>C.  C<sub>2</sub>Cl<sub>4</sub></p>
<p>D.  C<sub>2</sub>Cl<sub>6</sub></p>
</div>
<br><hr><br><div class="question">
<p>Which species have resonance structures?</p>
<p>I.     Ozone, O<sub>3</sub><br>II.     Carbon dioxide, CO<sub>2</sub><br>III.     Benzene, C<sub>6</sub>H<sub>6</sub></p>
<p>A.     I and II only</p>
<p>B.     I and III only</p>
<p>C.     II and III only</p>
<p>D.     I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>What is the number of sigma (<strong>σ</strong>) and pi (<strong>π</strong>) bonds in the molecule (NC)<sub>2</sub>C=C(CN)<sub>2</sub>?</p>
<p> </p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p>Which combination describes the bonding and structure in benzoic acid, C<sub>6</sub>H<sub>5</sub>COOH?</p>
<p><img 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"></p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>In which series are all carbon atoms sp<sup>2</sup> hybridized?</p>
<p>A.  C<sub>2</sub>H<sub>2</sub>     H<sub>2</sub>CO        HCOOH</p>
<p>B.  C<sub>2</sub>H<sub>4  </sub>   H<sub>2</sub>CO        HCOOH</p>
<p>C.  C<sub>2</sub>H<sub>2</sub>     CO           HCN</p>
<p>D.  C<sub>2</sub>H<sub>6</sub>     CH<sub>3</sub>OH     CH<sub>3</sub>OCH<sub>3</sub></p>
</div>
<br><hr><br><div class="question">
<p>Which does <strong>not</strong> show resonance?</p>
<p>A.     PO<sub>4</sub><sup>3–</sup></p>
<p>B.     C<sub>6</sub>H<sub>6</sub></p>
<p>C.     C<sub>6</sub>H<sub>12</sub></p>
<p>D.     O<sub>3</sub></p>
</div>
<br><hr><br><div class="question">
<p>Which statement is correct?</p>
<p>A.     Sigma bonds are formed only by the combination of s atomic orbitals.</p>
<p>B.     Pi bonds can be formed in the absence of sigma bonds.</p>
<p>C.     Pi bonds are formed parallel to the axis between atoms.</p>
<p>D.     Pi bonds are formed only by the combination of hybrid orbitals.</p>
</div>
<br><hr><br><div class="question">
<p>Which can be represented with only one Lewis structure?</p>
<p>A.     CH<sub>2</sub>O</p>
<p>B.     C<sub>6</sub>H<sub>6</sub></p>
<p>C.     O<sub>3</sub></p>
<p>D.     NO<sub>3</sub><sup>−</sup></p>
</div>
<br><hr><br><div class="question">
<p>How many sigma (σ) and pi (π) bonds are present in this molecule?</p>
<p><img 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"></p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which species has a square planar molecular geometry?</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. SF<sub>4</sub></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. XeF<sub>4</sub></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. CF<sub>4</sub></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. PF<sub>4</sub><sup>+</sup></span></span></p>
</div>
<br><hr><br><div class="question">
<p>Which molecule has an expanded octet?</p>
<p>A.     CO</p>
<p>B.     CO<sub>2</sub></p>
<p>C.     SF<sub>2</sub></p>
<p>D.     SF<sub>4</sub></p>
</div>
<br><hr><br><div class="question">
<p>Which molecules contain two pi (<math xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">π</mi></math>) bonds?</p>
<p style="padding-left:30px;">I.   HCN<br>II.  H<sub>2</sub>CO<sub>3</sub><br>III. H<sub>2</sub>C<sub>2</sub>O<sub>4</sub></p>
<p><br>A.  I and II only</p>
<p>B.  I and III only</p>
<p>C.  II and III only</p>
<p>D.  I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>Which molecules have at least one sp<sup>2</sup> hybridized atom?</p>
<p>        I.     CH<sub>3</sub>COOH</p>
<p>        II.     CH<sub>3</sub>COCH<sub>3</sub></p>
<p>        III.     CH<sub>2</sub>CHCH<sub>2</sub>OH</p>
<p>A.     I and II only</p>
<p>B.     I and III only</p>
<p>C.     II and III only</p>
<p>D.     I, II and III</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which atom does <strong>not</strong> obey the octet rule?</span></p>
<p><span style="background-color: #ffffff;">A.  C in CO<sub>2</sub><br></span></p>
<p><span style="background-color: #ffffff;">B.  F in BF<sub>3</sub><br></span></p>
<p><span style="background-color: #ffffff;">C.  O in H<sub>2</sub>O<br></span></p>
<p><span style="background-color: #ffffff;">D.  S in SF<sub>6</sub></span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">How many sigma (σ) and pi (π) bonds are present in hydrogen cyanide, HCN?</span></p>
<p><span style="background-color: #ffffff;"><img 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" width="395" height="231"></span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which species has delocalized electrons?</span></p>
<p><span style="background-color: #ffffff;">A. OH<sup>−</sup></span></p>
<p><span style="background-color: #ffffff;">B. H<sub>2</sub>CO</span></p>
<p><span style="background-color: #ffffff;">C. CO<sub>2</sub></span></p>
<p><span style="background-color: #ffffff;">D. CO<sub>3</sub><sup>2−</sup></span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which atom is sp<sup>2</sup> hybridized?<br></span></p>
<p><span style="background-color: #ffffff;">A.  C in H<sub>2</sub>CO<br></span></p>
<p><span style="background-color: #ffffff;">B.  C in CO<sub>2</sub><br></span></p>
<p><span style="background-color: #ffffff;">C.  N in CH<sub>3</sub>NH<sub>2</sub><br></span></p>
<p><span style="background-color: #ffffff;">D.  O in H<sub>2</sub>O</span></p>
</div>
<br><hr><br><div class="question">
<p>What is the hybridization of the circled carbon, oxygen and nitrogen atoms?</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p> </p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>What is the electron domain geometry of Si in SiO<sub>2</sub>?</p>
<p>A.  bent</p>
<p>B.  linear</p>
<p>C.  square planar</p>
<p>D.  tetrahedral</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">How many carbon atoms are sp<sup>3</sup>, sp<sup>2</sup> and sp hybridized in the molecule?</span></p>
<p><span style="background-color: #ffffff;"><img style="margin-right:auto;margin-left:auto;display: block;" src="data:image/png;base64,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" width="216" height="82"></span></p>
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" width="296" height="209"></span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the hybridization of carbon and oxygen in methanol?</span></p>
<p><span style="background-color: #ffffff;"><img 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" width="373" height="269"></span></p>
</div>
<br><hr><br><div class="question">
<p>What is the molecular geometry of SF<sub>4</sub>?</p>
<p>A.  Tetrahedral</p>
<p>B.  Trigonal bipyramidal</p>
<p>C.  See-saw</p>
<p>D.  Square planar</p>
</div>
<br><hr><br><div class="question">
<p>What is the formal charge of the oxygen atom in H<sub>3</sub>O<sup>+</sup>?</p>
<p>A.  −2</p>
<p>B.  −1</p>
<p>C.  0</p>
<p>D.  +1</p>
</div>
<br><hr><br>