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Date November 2010 Marks available 1 Reference code 10N.2.sl.TZ0.5
Level SL only Paper 2 Time zone TZ0
Command term Write down Question number 5 Adapted from N/A

Question

Consider the function f (x) = x3 3x– 24x + 30.

Write down f (0).

[1]
a.

Find \(f'(x)\).

[3]
b.

Find the gradient of the graph of f (x) at the point where x = 1.

[2]
c.

(i) Use f '(x) to find the x-coordinate of M and of N.

(ii) Hence or otherwise write down the coordinates of M and of N.

[5]
d.

Sketch the graph of f (x) for \( - 5 \leqslant x \leqslant 7\) and \( - 60 \leqslant y \leqslant 60\). Mark clearly M and N on your graph.

[4]
e.

Lines L1 and L2 are parallel, and they are tangents to the graph of f (x) at points A and B respectively. L1 has equation y = 21x + 111.

(i) Find the x-coordinate of A and of B.

(ii) Find the y-coordinate of B.

[6]
f.

Markscheme

30     (A1)

[1 mark]

a.

f '(x) = 3x2 – 6x – 24     (A1)(A1)(A1)


Note: Award (A1) for each term. Award at most (A1)(A1) if extra terms present.

[3 marks]

b.

f '(1) = –27     (M1)(A1)(ft)(G2)


Note: Award (M1) for substituting x = 1 into their derivative.

[2 marks]

c.

(i) f '(x) = 0

3x2 – 6x – 24 = 0     (M1)

x = 4; x = –2     (A1)(ft)(A1)(ft)


Notes: Award (M1) for either f '(x) = 0 or 3x2 – 6x – 24 = 0 seen. Follow through from their derivative. Do not award the two answer marks if derivative not used.


(ii) M(–2, 58) accept x = –2, y = 58     (A1)(ft)

N(4, – 50) accept x = 4, y = –50     (A1)(ft)


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

[5 marks]

d.

(A1) for window

(A1) for a smooth curve with the correct shape

(A1) for axes intercepts in approximately the correct positions

(A1) for M and N marked on diagram and in approximately
correct position     (A4)

Note: If window is not indicated award at most (A0)(A1)(A0)(A1)(ft).

[4 marks]

e.

(i) 3x2 – 6x 24 = 21     (M1)

3x2 6x 45 = 0     (M1)

x = 5; x = 3     (A1)(ft)(A1)(ft)(G3)


Note: Follow through from their derivative.


OR

Award (A1) for L1 drawn tangent to the graph of f on their sketch in approximately the correct position (x = 3), (A1) for a second tangent parallel to their L1, (A1) for x = –3, (A1) for x = 5 .     (A1)(ft)(A1)(ft)(A1)(A1)


Note: If only x–3 is shown without working award (G2). If both answers are shown irrespective of workingaward (G3).


(ii) f (5) = 40     (M1)(A1)(ft)(G2)


Notes: Award (M1) for attempting to find the image of their x = 5. Award (A1) only for (5, 40). Follow through from their x-coordinate of B only if it has been clearly identified in (f) (i).

[6 marks]

f.

Examiners report

The value of f (0) and the derivative function, f '(x) were well done in parts (a) and (b). In part (c) many candidates found f (1) instead of f '(1) . In part (d) many students did not use their f (x) to find the x-coordinates of M and N and instead used their GDC. The sketch was generally well done although some students forgot to label M and N or did not use the specified window. The last part of the question was a clear discriminator. Examiners were pleased to see how this challenging question was solved using alternative methods.

a.

The value of f (0) and the derivative function, f '(x) were well done in parts (a) and (b). In part (c) many candidates found f (1) instead of f '(1) . In part (d) many students did not use their f (x) to find the x-coordinates of M and N and instead used their GDC. The sketch was generally well done although some students forgot to label M and N or did not use the specified window. The last part of the question was a clear discriminator. Examiners were pleased to see how this challenging question was solved using alternative methods.

b.

The value of f (0) and the derivative function, f '(x) were well done in parts (a) and (b). In part (c) many candidates found f (1) instead of f '(1) . In part (d) many students did not use their f (x) to find the x-coordinates of M and N and instead used their GDC. The sketch was generally well done although some students forgot to label M and N or did not use the specified window. The last part of the question was a clear discriminator. Examiners were pleased to see how this challenging question was solved using alternative methods.

c.

The value of f (0) and the derivative function, f '(x) were well done in parts (a) and (b). In part (c) many candidates found f (1) instead of f '(1) . In part (d) many students did not use their f (x) to find the x-coordinates of M and N and instead used their GDC. The sketch was generally well done although some students forgot to label M and N or did not use the specified window. The last part of the question was a clear discriminator. Examiners were pleased to see how this challenging question was solved using alternative methods.

d.

The value of f (0) and the derivative function, f '(x) were well done in parts (a) and (b). In part (c) many candidates found f (1) instead of f '(1) . In part (d) many students did not use their f (x) to find the x-coordinates of M and N and instead used their GDC. The sketch was generally well done although some students forgot to label M and N or did not use the specified window. The last part of the question was a clear discriminator. Examiners were pleased to see how this challenging question was solved using alternative methods.

e.

The value of f (0) and the derivative function, f '(x) were well done in parts (a) and (b). In part (c) many candidates found f (1) instead of f '(1) . In part (d) many students did not use their f (x) to find the x-coordinates of M and N and instead used their GDC. The sketch was generally well done although some students forgot to label M and N or did not use the specified window. The last part of the question was a clear discriminator. Examiners were pleased to see how this challenging question was solved using alternative methods.

f.

Syllabus sections

Topic 6 - Mathematical models » 6.5 » Models using functions of the form \(f\left( x \right) = a{x^m} + b{x^n} + \ldots \); \(m,n \in \mathbb{Z}\) .
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