Solve f '(x) = f "(x).

METHOD 1 (using GDC)

valid approach      (M1)

eg 

0.558257

x = 0.558       A1 N2

Note: Do not award A1 if additional answers given.

METHOD 2 (analytical)

attempt to solve their equation f '(x) = f "(x)  (do not accept $\frac{1}{x}-5=-\frac{1}{x^2}$)      (M1)

eg  $5x^2-x-1=0,\frac{1\pm \sqrt{21}}{10},\frac{1}{x}=\frac{-1\pm \sqrt{21}}{2},-0.358$

0.558257

x = 0.558       A1 N2

Note: Do not award A1 if additional answers given.

[2 marks]

Find the value of $p$.

Write down the coordinates of A.

Write down the rate of change of $f$ at A.

Find the coordinates of B.

Find the the rate of change of $f$ at B.

Let $R$ be the region enclosed by the graph of $f$ , the $x$-axis, the line $x=b$ and the line $x=a$. The region $R$ is rotated 360° about the $x$-axis. Find the volume of the solid formed.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

evidence of valid approach     (M1)

eg$$$f(x)=0,y=0$

2.73205

$p=2.73$     A1     N2

[2 marks]

1.87938, 8.11721

$(1.88,8.12)$     A2     N2

[2 marks]

rate of change is 0 (do not accept decimals)     A1     N1

[1 marks]

METHOD 1 (using GDC)

valid approach     M1

eg$$$f^{″}=0$, max/min on $f^{\prime },x=-1$

sketch of either $f^{\prime }$ or $f^{″}$, with max/min or root (respectively)     (A1)

$x=1$     A1     N1

Substituting their $x$ value into $f$     (M1)

eg$$$f(1)$

$y=4.5$     A1     N1

METHOD 2 (analytical)

$f^{″}=-6x^2+6$     A1

setting $f^{″}=0$     (M1)

$x=1$     A1     N1

substituting their $x$ value into $f$     (M1)

eg$$$f(1)$

$y=4.5$     A1     N1

[4 marks]

recognizing rate of change is $f^{\prime }$     (M1)

eg$$$y^{\prime },f^{\prime }(1)$

rate of change is 6     A1     N2

[3 marks]

attempt to substitute either limits or the function into formula     (M1)

involving $f^2$ (accept absence of $\pi$ and/or $\text{d}x$)

eg$$$\pi \int {(-0.5x^4+3x^2+2x)}^2\text{d}x,{\int }_1^{1.88}{f}^2$

128.890

$\text{volume}=129$     A2     N3

[3 marks]

Write down the $y$-intercept of the graph.

Find $f^{\prime }(x)$.

Show that $a=8$.

Find $f(2)$.

Write down the $x$-coordinates of these two points;

Write down the intervals where the gradient of the graph of $y=f(x)$ is positive.

Write down the range of $f(x)$.

Write down the number of possible solutions to the equation $f(x)=5$.

The equation $f(x)=m$, where $m\in \mathbb{R}$, has four solutions. Find the possible values of $m$.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

5     (A1)

Note:     Accept an answer of $(0,5)$.

[1 mark]

$\left(f^{\prime }(x)=\right)-4x^3+2ax$     (A1)(A1)

Note:     Award (A1) for $-4x^3$ and (A1) for $+2ax$. Award at most (A1)(A0) if extra terms are seen.

[2 marks]

$-4\times 2^3+2a\times 2=0$     (M1)(M1)

Note:     Award (M1) for substitution of $x=2$ into their derivative, (M1) for equating their derivative, written in terms of $a$, to 0 leading to a correct answer (note, the 8 does not need to be seen).

$a=8$     (AG)

[2 marks]

$\left(f(2)=\right)-2^4+8\times 2^2+5$     (M1)

Note:     Award (M1) for correct substitution of $x=2$ and  $a=8$ into the formula of the function.

21     (A1)(G2)

[2 marks]

$(x=)-2,(x=)\text{ 0}$     (A1)(A1)

Note:     Award (A1) for each correct solution. Award at most (A0)(A1)(ft) if answers are given as $(-2,21)$ and $(0,5)$ or $(-2,0)$ and $(0,0)$.

[2 marks]

    (A1)(ft)(A1)(ft)

Note:     Award (A1)(ft) for , follow through from part (d)(i) provided their value is negative.

Award (A1)(ft) for , follow through only from their 0 from part (d)(i); 2 must be the upper limit.

Accept interval notation.

[2 marks]

$y⩽21$     (A1)(ft)(A1)

Notes:     Award (A1)(ft) for 21 seen in an interval or an inequality, (A1) for “$y⩽$”.

Accept interval notation.

Accept or $f(x)⩽21$.

Follow through from their answer to part (c)(ii). Award at most (A1)(ft)(A0) if $x$ is seen instead of $y$. Do not award the second (A1) if a (finite) lower limit is seen.

[2 marks]

3 (solutions)     (A1)

[1 mark]

or equivalent     (A1)(ft)(A1)

Note:     Award (A1)(ft) for 5 and 21 seen in an interval or an inequality, (A1) for correct strict inequalities. Follow through from their answers to parts (a) and (c)(ii).

Accept interval notation.

[2 marks]

Write down the probability that Ayako avoids the trap in this wall.

Find the probability that only one of Ayako and Natsuko falls into a trap while attempting to pass through a door in the first wall.

Copy the probability tree diagram and write down the relevant probabilities along the branches.

A contestant is chosen at random. Find the probability that this contestant fell into a trap while attempting to pass through a door in the second wall.

A contestant is chosen at random. Find the probability that this contestant fell into a trap.

120 contestants attempted this game.

Find the expected number of contestants who fell into a trap while attempting to pass through a door in the third wall.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

$\frac{3}{4}$  (0.75, 75%)     (A1)

[1 mark]

$\frac{3}{4}\times \frac{1}{4}+\frac{1}{4}\times \frac{3}{4}$  OR  $2\times \frac{3}{4}\times \frac{1}{4}$     (M1)(M1)

Note: Award (M1) for their product $\frac{1}{4}\times \frac{3}{4}$ seen, and (M1) for adding their two products or multiplying their product by 2.

$=\frac{3}{8}\left(\frac{6}{16},0.375,37.5\text{\% }\right)$     (A1)(ft) (G3)

Note: Follow through from part (a), but only if the sum of their two fractions is 1.

[3 marks]

(A1)(ft)(A1)(A1)

Note: Award (A1) for each correct pair of branches. Follow through from part (a).

[3 marks]

$\frac{3}{4}\times \frac{2}{5}$     (M1)

Note: Award (M1) for correct probabilities multiplied together.

$=\frac{3}{10}\left(0.3,30\text{\% }\right)$     (A1)(ft) (G2)

Note: Follow through from their tree diagram or part (a).

[2 marks]

$1-\frac{3}{4}\times \frac{2}{5}\times \frac{3}{6}$  OR  $\frac{1}{4}+\frac{3}{4}\times \frac{2}{5}+\frac{3}{4}\times \frac{3}{5}\times \frac{3}{6}$     (M1)(M1)

Note: Award (M1) for $\frac{3}{4}\times \frac{3}{5}\times \frac{3}{6}$ and (M1) for subtracting their correct probability from 1, or adding to their $\frac{1}{4}+\frac{3}{4}\times \frac{2}{5}$.

$=\frac{93}{120}\left(\frac{31}{40},0.775,77.5\text{\% }\right)$     (A1)(ft) (G2)

Note: Follow through from their tree diagram.

[3 marks]

$\frac{3}{4}\times \frac{3}{5}\times \frac{3}{6}\times 120$      (M1)(M1)

Note: Award (M1) for $\frac{3}{4}\times \frac{3}{5}\times \frac{3}{6}\left(\frac{3}{4}\times \frac{3}{5}\times \frac{3}{6}\text{OR}\frac{27}{120}\text{OR}\frac{9}{40}\right)$ and (M1) for multiplying by 120.

= 27      (A1)(ft) (G3)

Note: Follow through from their tree diagram or their $\frac{3}{4}\times \frac{3}{5}\times \frac{3}{6}$ from their calculation in part (d)(ii).

[3 marks]

Find $\text{AV}$.

Given that $\text{A}\hat{\text{V}}\text{B}=40°$, find $\text{AB}$.

Find the height of the pyramid, $\text{VX}$.

A second ornament is in the shape of a cuboid with a rectangular base of length $2x \text{cm}$, width $x \text{cm}$ and height $y \text{cm}$. The cuboid has the same volume as the pyramid.

The cuboid has a minimum surface area of $S {\text{cm}}^2$. Find the value of $S$.

attempt to use the distance formula to find $\text{AV}$         (M1)

$\sqrt{{\left(1-\left(-1\right)\right)}^2+{\left(5-1\right)}^2+{\left(0-6\right)}^2}$

$=7.48331\dots$

$=7.48 \left(\text{cm}\right) \left(=\sqrt{56} \text{or} 2\sqrt{14}\right)$           A1

[2 marks]

METHOD 1

attempt to apply cosine rule OR sine rule to find $\text{AB}$            (M1)

$\left(\text{AB}=\right)\sqrt{7.48{\dots }^2+7.48{\dots }^2-2\times 7.48\dots \times 7.48\dots \cos \left(40°\right)}$  OR  $\frac{\text{AB}}{\sin 40°}=\frac{\sqrt{56}}{\sin 70°}$           (A1)

$=5.11888\dots$

$=5.12 \left(\text{cm}\right)$          A1

METHOD 2

Let $\text{M}$ be the midpoint of $\text{[AB]}$

attempt to apply right-angled trigonometry on triangle $\text{AVM}$            (M1)

$=2\times 7.48\dots \times \sin \left(20°\right)$           (A1)

 $=5.11888\dots$

$=5.12 \left(\text{cm}\right)$          A1

[3 marks]

METHOD 1

equating volume of pyramid formula to $57.2$           (M1)

$\frac{1}{3}\times 5.11{\dots }^2\times h=57.2$           (A1)

$h=6.54886\dots$

$h=6.55 \left(\text{cm}\right)$          A1

METHOD 2

Let $\text{M}$ be the midpoint of $\text{[AB]}$

${\text{AV}}^2={\text{AM}}^2+{\text{MX}}^2+{\text{XV}}^2$           (M1)

$\Rightarrow \text{XV}=\sqrt{7.48{\dots }^2-{\left(\frac{5.11\dots }{2}\right)}^2-{\left(\frac{5.11\dots }{2}\right)}^2}$           (A1)

$h=6.54886\dots$

$h=6.55 \left(\text{cm}\right)$          A1

[3 marks]

$V=x\times 2x\times y=57.2$           (A1)

$S=2\left(2x^2+xy+2xy\right)$           A1

Note: Condone use of $\text{A}$.

attempt to substitute $y=\frac{57.2}{2x^2}$ into their expression for surface area           (M1)

$\left(S\left(x\right)=\right) 4x^2+6x\left(\frac{57.2}{2x^2}\right)$

EITHER

attempt to find minimum turning point on graph of area function           (M1)

OR

$\frac{dS}{dx}=8x-171.6x^{-2}=0$  OR  $x=2.77849\dots$           (M1)

THEN

$92.6401\dots$

minimum surface area $=92.6 \left({\text{cm}}^2\right)$          A1

[5 marks]

Parts (a), (b) and (c) were completed well by many candidates, but few were able to make any significant progress in part (d).

In part (a), many candidates were able to apply the distance formula and successfully find AV. However, a common error was to work in two-dimensions and to apply Pythagoras' Theorem once, neglecting completely the z-coordinates. Many recognised the need to use either the sine or cosine rule in part (b) to find the length AB. Common errors in this part included: the GDC being set incorrectly in radians; applying right-angled trigonometry on a 40°, 40°, 70° triangle; or using $\frac{1}{2}\text{AB}$ as the length of AX in triangle AVX.

Despite the formula for the volume of a pyramid being in the formula booklet, a common error in part (c) was to omit the factor of $\frac{1}{3}$ from the volume formula, or not to recognise that the area of the base of the pyramid was ${\text{AB}}^2$.

The most challenging part of this question proved to be the optimization of the surface area of the cuboid in part (d). Although some candidates were able to form an equation involving the volume of the cuboid, an expression for the surface area eluded most. A common error was to gain a surface area which involved eight sides rather than six. It was surprising that few who were able to find both the equation and an expression were able to progress any further. Of those that did, few used their GDC to find the minimum surface area directly, with most preferring the more time consuming analytical approach.

Find the number of students in the school that are taught in Spanish.

Find the number of students in the school that study Mathematics in English.

Find the number of students in the school that study both Biology and Mathematics.

Write down $n\left(S\cap \left(M\cup B\right)\right)$.

Write down $n\left(B\cap M\cap S^{\prime }\right)$.

Find the probability that this student studies Mathematics.

Find the probability that this student studies neither Biology nor Mathematics.

Find the probability that this student is taught in Spanish, given that the student studies Biology.

10 + 40 + 28 + 17      (M1)

= 95       (A1)(G2)

Note: Award (M1) for each correct sum (for example: 10 + 40 + 28 + 17) seen.

[2 marks]

20 + 12      (M1)

= 32       (A1)(G2)

Note: Award (M1) for each correct sum (for example: 10 + 40 + 28 + 17) seen.

[2 marks]

12 + 40      (M1)

= 52       (A1)(G2)

Note: Award (M1) for each correct sum (for example: 10 + 40 + 28 + 17) seen.

[2 marks]

78      (A1)

[1 mark]

12      (A1)

[1 mark]

$\frac{100}{160}$   $\left(\frac{5}{8}\text{,}0.625\text{,}62.5\text{\% }\right)$      (A1)(A1) (G2)

Note: Throughout part (c), award (A1) for correct numerator, (A1) for correct denominator. All answers must be probabilities to award (A1).

[2 marks]

$\frac{42}{160}$  $\left(\frac{21}{80}\text{,}0.263\left(0.2625\right)\text{,}26.3\text{\% }\left(26.25\text{\% }\right)\right)$      (A1)(A1) (G2)

Note: Throughout part (c), award (A1) for correct numerator, (A1) for correct denominator. All answers must be probabilities to award (A1).

[2 marks]

$\frac{50}{70}$  $\left(\frac{5}{7}\text{,}0.714\left(0.714285\dots \right)\text{,}71.4\text{\% }\left(71.4285\dots \text{\% }\right)\right)$     (A1)(A1) (G2)

Note: Throughout part (c), award (A1) for correct numerator, (A1) for correct denominator. All answers must be probabilities to award (A1).

[2 marks]

Find the value of $p$.

The following diagram shows part of the graph of $f$.

The region enclosed by the graph of $f$, the $x$-axis and the lines $x=-p$ and $x=p$ is rotated 360° about the $x$-axis. Find the volume of the solid formed.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

valid approach     (M1)

eg$$$f(p)=4$, intersection with $y=4,\pm 2.32$

2.32143

$p=\sqrt{{\text{e}}^2-2}$ (exact), 2.32     A1     N2

[2 marks]

attempt to substitute either their limits or the function into volume formula (must involve $f^2$, accept reversed limits and absence of $\pi$ and/or $\text{d}x$, but do not accept any other errors)     (M1)

eg$$${\int }_{-2.32}^{2.32}{f}^2,\pi \int {\left(6-\ln (x^2+2)\right)}^2\text{d}x,\text{ 105.675}$

331.989

$\text{volume}=332$     A2     N3

[3 marks]

State the alternative hypothesis.

Calculate the expected frequency of flights travelling at most 500 km and arriving slightly delayed.

Write down the number of degrees of freedom.

Write down the χ² statistic.

Write down the associated p-value.

State, with a reason, whether you would reject the null hypothesis.

Write down the probability that this flight arrived on time.

Given that this flight was not heavily delayed, find the probability that it travelled between 500 km and 5000 km.

Two flights are chosen at random from those which were slightly delayed.

Find the probability that each of these flights travelled at least 5000 km.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

The arrival status is dependent on the distance travelled by the incoming flight     (A1)

Note: Accept “associated” or “not independent”.

[1 mark]

$\frac{60\times 45}{180}$  OR  $\frac{60}{180}\times \frac{45}{180}\times 180$     (M1)

Note: Award (M1) for correct substitution into expected value formula.

= 15     (A1) (G2)

[2 marks]

4     (A1)

Note: Award (A0) if “2 + 2 = 4” is seen.

[1 mark]

9.55 (9.54671…)    (G2)

Note: Award (G1) for an answer of 9.54.

[2 marks]

0.0488 (0.0487961…)     (G1)

[1 mark]

Reject the Null Hypothesis     (A1)(ft)

Note: Follow through from their hypothesis in part (a).

9.55 (9.54671…) > 7.779     (R1)(ft)

OR

0.0488 (0.0487961…) < 0.1     (R1)(ft)

Note: Do not award (A1)(ft)(R0)(ft). Follow through from part (d). Award (R1)(ft) for a correct comparison, (A1)(ft) for a consistent conclusion with the answers to parts (a) and (d). Award (R1)(ft) for χ²_calc > χ²_crit , provided the calculated value is explicitly seen in part (d)(i).

[2 marks]

$\frac{52}{180}\left(0.289,\frac{13}{45},28.9\text{\% }\right)$     (A1)(A1) (G2)

Note: Award (A1) for correct numerator, (A1) for correct denominator.

[2 marks]

$\frac{35}{97}\left(0.361,36.1\text{\% }\right)$     (A1)(A1) (G2)

Note: Award (A1) for correct numerator, (A1) for correct denominator.

[2 marks]

$\frac{14}{45}\times \frac{13}{44}$     (A1)(M1)

Note: Award (A1) for two correct fractions and (M1) for multiplying their two fractions.

$=\frac{182}{1980}\left(0.0919,\frac{91}{990},0.091919\dots ,9.19\text{\% }\right)$     (A1) (G2)

[3 marks]

The graph of $f$ has a horizontal tangent line at $x=0$ and at $x=a$. Find $a$.

valid method    (M1)

eg   $f^{\prime }\left(x\right)=0$, , 

$a=-0.667\left(=-\frac{2}{3}\right)$  (accept  $x=-0.667$)     A1 N2

[2 marks]

Write down the null hypothesis, H₀ , for this test.

State the number of degrees of freedom.

the expected frequency of female students who chose to take the Chinese class.

the ${\chi }^2$ statistic.

State whether or not H₀ should be rejected. Justify your statement.

Find the probability that the student does not take the Spanish class.

Find the probability that neither of the two students take the Spanish class.

Find the probability that at least one of the two students is female.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

(H₀:) (choice of) language is independent of gender       (A1)

Note: Accept “there is no association between language (choice) and gender”. Accept “language (choice) is not dependent on gender”. Do not accept “not related” or “not correlated” or “not influenced”.

[1 mark]

2       (AG)

[1 mark]

16.4  (16.4181…)      (G1)

[1 mark]

${\chi }_{\text{calc}}^2=8.69$  (8.68507…)     (G2)

[2 marks]

(we) reject the null hypothesis      (A1)(ft)

8.68507… > 5.99     (R1)(ft)

Note: Follow through from part (c)(ii). Accept “do not accept” in place of “reject.” Do not award (A1)(ft)(R0).

OR

(we) reject the null hypothesis       (A1)

0.0130034 < 0.05       (R1)

Note: Accept “do not accept” in place of “reject.” Do not award (A1)(ft)(R0).

[2 marks]

$\frac{88}{110}\left(\frac{4}{5}\text{,}0.8\text{,}80\text{\% }\right)$   (A1)(A1)(G2)

Note: Award (A1) for correct numerator, (A1) for correct denominator.

[2 marks]

$\frac{88}{110}\times \frac{87}{109}$    (M1)(M1)

Note: Award (M1) for multiplying two fractions. Award (M1) for multiplying their correct fractions.

OR

$\left(\frac{46}{110}\right)\left(\frac{45}{109}\right)+2\left(\frac{46}{110}\right)\left(\frac{42}{109}\right)+\left(\frac{42}{110}\right)\left(\frac{41}{109}\right)$    (M1)(M1)

Note: Award (M1) for correct products; (M1) for adding 4 products.

$0.639\left(0.638532\dots \text{,}\frac{348}{545}\text{,}63.9\text{\% }\right)$       (A1)(ft)(G2)

Note: Follow through from their answer to part (e)(i).

[3 marks]

$1-\frac{67}{110}\times \frac{66}{109}$   (M1)(M1)

Note: Award (M1) for multiplying two correct fractions. Award (M1) for subtracting their product of two fractions from 1.

OR

$\frac{43}{110}\times \frac{42}{109}+\frac{43}{110}\times \frac{67}{109}+\frac{67}{110}\times \frac{43}{109}$   (M1)(M1)

Note: Award (M1) for correct products; (M1) for adding three products.

$0.631\left(0.631192\dots \text{,}63.1\text{\% ,}\frac{344}{545}\right)$      (A1)(G2)

[3 marks]

Write down the value of a.

Write down the value of b.

Use the tree diagram to find the probability that an employee encountered traffic and was late for work.

Use the tree diagram to find the probability that an employee was late for work.

Use the tree diagram to find the probability that an employee encountered traffic given that they were late for work.

Find the value of x.

Find the value of y.

Find the number of employees who, in the last year, did not travel to work by car, bicycle or public transportation.

Find $n\left(\left(C\cup B\right)\cap P^{\prime }\right)$.

a = 0.2     (A1)

[1 mark]

b = 0.85     (A1)

[1 mark]

0.25 × 0.8     (M1)

Note: Award (M1) for a correct product.

$=0.2\left(\frac{1}{5},20\mathrm{\%}\right)$     (A1)(G2)

[2 marks]

0.25 × 0.8 + 0.75 × 0.15     (A1)(ft)(M1)

Note: Award (A1)(ft) for their (0.25 × 0.8) and (0.75 × 0.15), (M1) for adding two products.

$=0.313\left(0.3125,\frac{5}{16},31.3\mathrm{\%}\right)$    (A1)(ft)(G3)

Note: Award the final (A1)(ft) only if answer does not exceed 1. Follow through from part (b)(i).

[3 marks]

$\frac{0.25\times 0.8}{0.25\times 0.8+0.75\times 0.15}$    (A1)(ft)(A1)(ft)

Note: Award (A1)(ft) for a correct numerator (their part (b)(i)), (A1)(ft) for a correct denominator (their part (b)(ii)). Follow through from parts (b)(i) and (b)(ii).

$=0.64\left(\frac{16}{25},64\text{\% }\right)$     (A1)(ft)(G3)

Note: Award final (A1)(ft) only if answer does not exceed 1.

[3 marks]

(x =) 3     (A1)

[1 Mark]

(y =) 10     (A1)(ft)

Note: Following through from part (c)(i) but only if their x is less than or equal to 13.

[1 Mark]

54 − (10 + 3 + 4 + 2 + 6 + 8 + 13)     (M1)

Note: Award (M1) for subtracting their correct sum from 54. Follow through from their part (c).

= 8      (A1)(ft)(G2)

Note: Award (A1)(ft) only if their sum does not exceed 54. Follow through from their part (c).

[2 marks]

6 + 8 + 13     (M1)

Note: Award (M1) for summing 6, 8 and 13.

27     (A1)(G2)

[2 marks]

Sketch the graph of y = f (x), for −4 ≤ x ≤ 3 and −50 ≤ y ≤ 100.

Use your graphic display calculator to find the equation of the tangent to the graph of y = f (x) at the point (–2, 38.75).

Give your answer in the form y = mx + c.

Sketch the graph of the function g (x) = 10x + 40 on the same axes.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

(A1)(A1)(A1)(A1)

Note: Award (A1) for axis labels and some indication of scale; accept y or f(x).

Use of graph paper is not required. If no scale is given, assume the given window for zero and minimum point.

Award (A1) for smooth curve with correct general shape.

Award (A1) for x-intercept closer to y-axis than to end of sketch.

Award (A1) for correct local minimum with x-coordinate closer to y-axis than end of sketch and y-coordinate less than half way to top of sketch.

Award at most (A1)(A0)(A1)(A1) if the sketch intersects the y-axis or if the sketch curves away from the y-axis as x approaches zero.

[4 marks]

y = −9.25x + 20.3  (y = −9.25x + 20.25)      (A1)(A1)

Note: Award (A1) for −9.25x, award (A1) for +20.25, award a maximum of (A0)(A1) if answer is not an equation.

[2 marks]

correct line, y = 10x + 40, seen on sketch     (A1)(A1)

Note: Award (A1) for straight line with positive gradient, award (A1) for x-intercept and y-intercept in approximately the correct positions. Award at most (A0)(A1) if ruler not used. If the straight line is drawn on different axes to part (a), award at most (A0)(A1).

[2 marks]

Sketch the curve for −1 < x < 3 and −2 < y < 12.

A teacher asks her students to make some observations about the curve.

Three students responded.
Nadia said “The x-intercept of the curve is between −1 and zero”.
Rick said “The curve is decreasing when x < 1 ”.
Paula said “The gradient of the curve is less than zero between x = 1 and x = 2 ”.

State the name of the student who made an incorrect observation.

Find $\frac{\text{dy}}{\text{dx}}$.

Show that the stationary points of the curve are at x = 1 and x = 2.

Given that y = 2x³ − 9x² + 12x + 2 = k has three solutions, find the possible values of k.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

(A1)(A1)(A1)(A1)

Note: Award (A1) for correct window (condone a window which is slightly off) and axes labels. An indication of window is necessary. −1 to 3 on the x-axis and −2 to 12 on the y-axis and a graph in that window.
(A1) for correct shape (curve having cubic shape and must be smooth).
(A1) for both stationary points in the 1^st quadrant with approximate correct position,
(A1) for intercepts (negative x-intercept and positive y intercept) with approximate correct position.

[4 marks]

Rick     (A1)

Note: Award (A0) if extra names stated.

[1 mark]

6x² − 18x + 12     (A1)(A1)(A1)

Note: Award (A1) for each correct term. Award at most (A1)(A1)(A0) if extra terms seen.

[3 marks]

6x² − 18x + 12 = 0     (M1)

Note: Award (M1) for equating their derivative to 0. If the derivative is not explicitly equated to 0, but a subsequent solving of their correct equation is seen, award (M1).

6(x  − 1)(x − 2) = 0  (or equivalent)      (M1)

Note: Award (M1) for correct factorization. The final (M1) is awarded only if answers are clearly stated.

Award (M0)(M0) for substitution of 1 and of 2 in their derivative.

x = 1, x = 2 (AG)

[2 marks]

6 < k < 7     (A1)(A1)(ft)(A1)

Note: Award (A1) for an inequality with 6, award (A1)(ft) for an inequality with 7 from their part (c) provided it is greater than 6, (A1) for their correct strict inequalities. Accept ]6, 7[ or (6, 7).

[3 marks]

Find the coordinates of A.

For the graph of $f$, write down the amplitude.

For the graph of $f$, write down the period.

Hence, write $f\left(x\right)$ in the form $p\text{cos}\left(x+r\right)$.

Find the maximum speed of the ball.

Find the first time when the ball’s speed is changing at a rate of 2 cm s⁻².

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

−0.394791,13

A(−0.395, 13)      A1A1 N2

[2 marks]

13      A1 N1

[1 mark]

$2\pi$, 6.28      A1 N1

[1 mark]

valid approach      (M1)

eg recognizing that amplitude is p or shift is r

$f\left(x\right)=13\text{cos}\left(x+0.395\right)$   (accept p = 13, r = 0.395)     A1A1 N3

Note: Accept any value of r of the form $0.395+2\pi k,k\in \mathbb{Z}$

[3 marks]

recognizing need for d ′(t)      (M1)

eg  −12 sin(t) − 5 cos(t)

correct approach (accept any variable for t)      (A1)

eg  −13 sin(t + 0.395), sketch of d′, (1.18, −13), t = 4.32

maximum speed = 13 (cms⁻¹)      A1 N2

[3 marks]

recognizing that acceleration is needed      (M1)

eg   a(t), d "(t)

correct equation (accept any variable for t)      (A1)

eg  $a\left(t\right)=-2,\left|\frac{\text{d}}{\text{d}t}\left(d^{\prime }\left(t\right)\right)\right|=2,-12\text{cos}\left(t\right)+5\text{sin}\left(t\right)=-2$

valid attempt to solve their equation   (M1)

eg  sketch, 1.33

1.02154

1.02      A2 N3

[5 marks]

Write down the $y$-intercept of the graph of $y=f\left(x\right)$.

Sketch the graph of $y=f\left(x\right)$ for −3 ≤ $x$ ≤ 3 and −4 ≤ $y$ ≤ 12.

Determine the range of $f\left(x\right)$ for $p$ ≤ $x$ ≤ $q$.

−1    (A1)

Note: Accept (0, −1).

[1 mark]

  (A1)(A1)(A1)(A1)

Note: Award (A1) for correct window and axes labels, −3 to 3 should be indicated on the $x$-axis and −4 to 12 on the $y$-axis.
    (A1)) for smooth curve with correct cubic shape;
    (A1) for $x$-intercepts: one close to −3, the second between −1 and 0, and third between 1 and 2; and $y$-intercept at approximately −1;
    (A1) for local minimum in the 4th quadrant and maximum in the 2nd quadrant, in approximately correct positions.
Graph paper does not need to be used. If window not given award at most (A0)(A1)(A0)(A1).

[4 marks]

$-1.27⩽f\left(x\right)⩽1.33\left(-1.27083\dots ⩽f\left(x\right)⩽1.33333\dots \text{,}-\frac{61}{48}⩽f\left(x\right)⩽\frac{4}{3}\right)$     (A1)(ft)(A1)(ft)(A1)

Note: Award (A1) for −1.27 seen, (A1) for 1.33 seen, and (A1) for correct weak inequalities with their endpoints in the correct order. For example, award (A0)(A0)(A0) for answers like $5⩽f\left(x\right)⩽2$. Accept $y$ in place of $f\left(x\right)$. Accept alternative correct notation such as [−1.27, 1.33].

Follow through from their $p$ and $q$ values from part (g) only if their $f\left(p\right)$ and $f\left(q\right)$ values are between −4 and 12. Award (A0)(A0)(A0) if their values from (g) are given as the endpoints.

[3 marks]

Find an expression for the velocity, $v$ m s⁻¹, of the rocket during the first stage.

Find the distance that the rocket travels during the first stage.

During the second stage, the rocket accelerates at a constant rate. The distance which the rocket travels during the second stage is the same as the distance it travels during the first stage.

Find the total time taken for the two stages.

recognizing that $v=\int a$        (M1)

correct integration         A1

eg      $-120\text{cos}\left(2t\right)+c$

attempt to find $c$ using their $v\left(t\right)$        (M1)

eg      $-120\text{cos}\left(0\right)+c=140$

$v\left(t\right)=-120\text{cos}\left(2t\right)+260$         A1   N3

[4 marks]

evidence of valid approach to find time taken in first stage           (M1)

eg      graph,  $-120\text{cos}\left(2t\right)+260=375$

$k=1.42595$         A1

attempt to substitute their $v$ and/or their limits into distance formula           (M1)

eg      ${\int }_0^{1.42595}\left|v\right|$,   $\int 260-120\text{cos}\left(2t\right)$,   ${\int }_0^k\left(260-120\text{cos}\left(2t\right)\right)\text{d}t$

$353.608$

distance is $354$ (m)         A1   N3

[4 marks]

recognizing velocity of second stage is linear (seen anywhere)          R1

eg      graph,   $s=\frac{1}{2}h\left(a+b\right)$,   $v=mt+c$

valid approach           (M1)

eg      $\int v=353.608$

correct equation           (A1)

eg      $\frac{1}{2}h\left(375+500\right)=353.608$

time for stage two $=0.808248$  ($0.809142$ from 3 sf)         A2

$2.23420$  ($2.23914$ from 3 sf)

$2.23$ seconds  ($2.24$ from 3 sf)         A1   N3

[6 marks]

Find the probability that both people chosen are not allergic to nuts.

Copy and complete the tree diagram.

Find the probability that this adult is allergic to nuts and the liquid turns blue.

Find the probability that the liquid turns blue.

Find the probability that the tested adult is allergic to nuts given that the liquid turned blue.

Estimate the number of employees, from this 38, who are allergic to nuts.

$\frac{34}{60}\times \frac{33}{59}$     (M1)

Note:    Award (M1) for their correct product.

$=0.317\left(\frac{187}{590},0.316949\dots ,31.7\mathrm{\%}\right)$     (A1)(ft)(G2)

Note:    Follow through from part (a).

[2 marks]

     (A1)(A1)(A1)

Note:     Award (A1) for each correct pair of branches.

[3 marks]

$0.006\times 0.98$     (M1)

Note:     Award (M1) for multiplying 0.006 by 0.98.

$=0.00588\left(\frac{147}{25000},0.588\mathrm{\%}\right)$     (A1)(G2)

[2 marks]

$0.006\times 0.98+0.994\times 0.05(0.00588+0.994\times 0.05)$     (A1)(ft)(M1)

Note:     Award (A1)(ft) for their two correct products, (M1) for adding two products.

$=0.0556\left(0.05558,5.56\mathrm{\%},\frac{2779}{50000}\right)$     (A1)(ft)(G3)

Note:     Follow through from parts (c) and (d).

[3 marks]

$\frac{0.006\times 0.98}{0.05558}$     (M1)(M1)

Note:     Award (M1) for their correct numerator, (M1) for their correct denominator.

$=0.106\left(0.105793\dots ,10.6\mathrm{\%},\frac{42}{397}\right)$     (A1)(ft)(G3)

Note:     Follow through from parts (d) and (e).

[3 marks]

$0.105793\dots \times 38$     (M1)

Note:     Award (M1) for multiplying 38 by their answer to part (f).

$=4.02(4.02015\dots )$     (A1)(ft)(G2)

Notes: Follow through from part (f). Use of 3 sf result from part (f) results in an answer of 4.03 (4.028).

[2 marks]

Find $h\left(x\right)$.

Let $\text{C}$ be a point on the graph of $h$. The tangent to the graph of $h$ at $\text{C}$ is parallel to the graph of $f$.

Find the $x$-coordinate of $\text{C}$.

attempt to form composite (in any order)        (M1)

eg       $f\left(x^4-3\right)$,  ${\left(x-8\right)}^4-3$

$h\left(x\right)=x^4-11$       A1  N2

[2 marks]

recognizing that the gradient of the tangent is the derivative        (M1)

eg       $h^{\prime }$

correct derivative (seen anywhere)        (A1)

$h^{\prime }\left(x\right)=4x^3$

correct value for gradient of $f$ (seen anywhere)        (A1)

$f^{\prime }\left(x\right)=1$,  $m=1$

setting their derivative equal to $1$        (M1)

$4x^3=1$

$0.629960$

$x=\sqrt[3]{\frac{1}{4}}$ (exact),  $0.630$       A1  N3

[5 marks]

Given that x_{k + 1} = x_k + a, find a.

Hence find the value of n such that $\sum _{k=1}^n{x}_k=861$.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

valid approach to find maxima     (M1)

eg  one correct value of x_k, sketch of f

any two correct consecutive values of x_k      (A1)(A1)

eg  x₁ = 1, x₂ = 5

a = 4      A1 N3

[4 marks]

recognizing the sequence x_1,  x_2,  x_{3, …,} x_n is arithmetic  (M1)

eg  d = 4

correct expression for sum       (A1)

eg  $\frac{n}{2}\left(2\left(1\right)+4\left(n-1\right)\right)$

valid attempt to solve for n      (M1)

eg  graph, 2n² − n − 861 = 0

n = 21       A1 N2

[4 marks]

Find the population of fish at $t$ = 10.

Find the rate at which the population of fish is increasing at $t$ = 10.

Find the value of $t$ for which the population of fish is increasing most rapidly.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

valid approach      (M1)

eg   $f$(10)

235.402

235 (fish) (must be an integer)     A1 N2

[2 marks]

recognizing rate of change is derivative     (M1)

eg  rate = $f^{\prime }$ ,  $f^{\prime }$(10) , sketch of $f^{\prime }$ ,  35 (fish per month)

35.9976

36.0 (fish per month)     A1 N2

[2 marks]

valid approach    (M1)

eg   maximum of $f^{\prime }$ ,   $f^{″}$ = 0

15.890

15.9 (months)     A1 N2

[2 marks]

Find the value of $p$.

Write down the coordinates of $\text{A}$.

Find the equation of the tangent to the graph of $f$ at $\text{A}$.

Find the coordinates of $\text{B}$.

Find the rate of change of $f$ at $\text{B}$.

Let $R$ be the region enclosed by the graph of $f$, the $x$-axis and the lines $x=p$ and $x=b$. The region $R$ is rotated 360º about the $x$-axis. Find the volume of the solid formed.

evidence of valid approach        (M1)

eg       $f\left(x\right)=0$,  $y=0$

$1.13843$

$p=1.14$       A1  N2

[2 marks]

$0.562134$,  $16.7641$

$\left(0.562\text{, }16.8\right)$       A2  N2

[2 marks]

valid approach        (M1)

eg      tangent at maximum point is horizontal, $f^{\prime }=0$

$y=16.8$ (must be an equation)       A1  N2

[2 marks]

METHOD 1 (using GDC)

valid approach         M1

eg      $f^{″}=0$,  max/min on $f^{\prime }$,  $x=-3$

sketch of either $f^{\prime }$ or $f^{″}$, with max/min or root (respectively)       (A1)

$x=3$       A1  N1

substituting their $x$ value into $f$        (M1)

eg      $f\left(3\right)$

$y=-225$ (exact)  (accept  $\left(3\text{, }-225\right)$)       A1  N1

METHOD 2 (analytical)

$f^{″}=12x^2-108$       A1

valid approach       (M1)

eg      $f^{″}=0$,  $x=\pm 3$

$x=3$       A1  N1

substituting their $x$ value into $f$        (M1)

eg      $f\left(3\right)$

$y=-225$ (exact)  (accept  $\left(3\text{, }-225\right)$)       A1  N1

[5 marks]

recognizing rate of change is $f^{\prime }$        (M1)

eg      $y^{\prime }$,  $f^{\prime }\left(3\right)$

rate of change is $-156$ (exact)       A1  N2

[2 marks]

attempt to substitute either their limits or the function into volume formula        (M1)

eg       ${\int }_{1.14}^3{f}^2$,  $\pi \int {\left(x^4-54x^2+60x\right)}^2\text{d}x$,  $25752.0$

$80902.3$

volume $=80900$       A2   N3

[3 marks]

Write down the value of $q$;

Write down the value of $h$;

Write down the value of $k$.

Find ${\int }_{0.111}^{3.31}\left(h(x)-x\right)\text{d}x$.

Hence, find the area of the region enclosed by the graphs of $h$ and $h^{-1}$.

Let $d$ be the vertical distance from a point on the graph of $h$ to the line $y=x$. There is a point $\text{P}(a,b)$ on the graph of $h$ where $d$ is a maximum.

Find the coordinates of P, where .

$q=2$     A1     N1

Note:     Accept $q=1$, $h=0$, and $k=3-\ln (2)$, 2.31 as candidate may have rewritten $g(x)$ as equal to $3+\ln (x)-\ln (2)$.

[1 mark]

$h=0$     A1     N1

Note:     Accept $q=1$, $h=0$, and $k=3-\ln (2)$, 2.31 as candidate may have rewritten $g(x)$ as equal to $3+\ln (x)-\ln (2)$.

[1 mark]

$k=3$     A1     N1

Note:     Accept $q=1$, $h=0$, and $k=3-\ln (2)$, 2.31 as candidate may have rewritten $g(x)$ as equal to $3+\ln (x)-\ln (2)$.

[1 mark]

2.72409

2.72     A2     N2

[2 marks]

recognizing area between $y=x$ and $h$ equals 2.72     (M1)

eg$$

recognizing graphs of $h$ and $h^{-1}$ are reflections of each other in $y=x$     (M1)

eg$$area between $y=x$ and $h$ equals between $y=x$ and $h^{-1}$

$2\times 2.72{\int }_{0.111}^{3.31}\left(x-h^{-1}(x)\right)\text{d}x=2.72$

5.44819

5.45     A1     N3

[??? marks]

valid attempt to find $d$     (M1)

eg$$difference in $y$-coordinates, $d=h(x)-x$

correct expression for $d$     (A1)

eg$$$\left(\ln \frac{1}{2}x+3\right)(\cos 0.1x)-x$

valid approach to find when $d$ is a maximum     (M1)

eg$$max on sketch of $d$, attempt to solve $d^{\prime }=0$

0.973679

$x=0.974$     A2     N4 

substituting their $x$ value into $h(x)$     (M1)

2.26938

$y=2.27$     A1     N2

[7 marks]

Determine when the particle changes its direction of motion.

Find the times when the particle’s acceleration is $-1.9 {\text{m\hspace{0.05em}s}}^{-2}$.

Find the particle’s acceleration when its speed is at its greatest.

recognises the need to find the value of $t$ when $v=0$           (M1)

$t=1.57079\dots \left(=\frac{\mathrm{\pi }}{2}\right)$

$t=1.57 \left(=\frac{\mathrm{\pi }}{2}\right)$ (s)             A1

[2 marks]

recognises that $a\left(t\right)=v\text{'}\left(t\right)$             (M1)

$t_1=2.26277\dots , t_2=2.95736\dots$

$t_1=2.26, t_2=2.96$ (s)             A1A1

Note: Award M1A1A0 if the two correct answers are given with additional values outside $0\le t\le 3$.

[3 marks]

speed is greatest at $t=3$              (A1)

$a=-1.83778\dots$

$a=-1.84 \left({\text{m\hspace{0.05em}s}}^{-2}\right)$             A1

[2 marks]

In part (a) many did not realize the change of motion occurred when $v=0$. A common error was finding $v\left(0\right)$ or thinking that it was at the maximum of $v$. 

In part (b), most candidates knew to differentiate but some tried to substitute in $-1.9$ for $t$, while others struggled to differentiate the function by hand rather than using the GDC. Many candidates tried to solve the equation analytically and did not use their technology. Of those who did, many had their calculators in degree mode.

Almost all candidates who attempted part (c) thought the greatest speed was the same as the maximum of $v$.

Plant $B$.

Plant $A$ correct to three significant figures.

Find the values of $t$ when $h_A\left(t\right)=h_B\left(t\right)$.

For $0\le t\le 9$, find the total amount of time when the rate of growth of Plant $B$ was greater than the rate of growth of Plant $A$.

$32$ (cm)          A1

[1 mark]

$h_A\left(0\right)=\sin \left(6\right)+27$          (M1)

$=26.7205\dots$

$=26.7$ (cm)          A1

[2 marks]

attempts to solve $h_A\left(t\right)=h_B\left(t\right)$ for $t$          (M1)