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Date May 2017 Marks available 3 Reference code 17M.2.sl.TZ1.10
Level SL only Paper 2 Time zone TZ1
Command term Hence and Find Question number 10 Adapted from N/A

Question

Let \(f(x) = \ln x\) and \(g(x) = 3 + \ln \left( {\frac{x}{2}} \right)\), for \(x > 0\).

The graph of \(g\) can be obtained from the graph of \(f\) by two transformations:

\[\begin{array}{*{20}{l}} {{\text{a horizontal stretch of scale factor }}q{\text{ followed by}}} \\ {{\text{a translation of }}\left( {\begin{array}{*{20}{c}} h \\ k \end{array}} \right).} \end{array}\]

Let \(h(x) = g(x) \times \cos (0.1x)\), for \(0 < x < 4\). The following diagram shows the graph of \(h\) and the line \(y = x\).

M17/5/MATME/SP2/ENG/TZ1/10.b.c

The graph of \(h\) intersects the graph of \({h^{ - 1}}\) at two points. These points have \(x\) coordinates 0.111 and 3.31 correct to three significant figures.

Write down the value of \(q\);

[1]
a.i.

Write down the value of \(h\);

[1]
a.ii.

Write down the value of \(k\).

[1]
a.iii.

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

[2]
b.i.

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

[3]
b.ii.

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

Find the coordinates of P, where \(0.111 < a < 3.31\).

[7]
c.

Markscheme

\(q = 2\)     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]

a.i.

\(h = 0\)     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]

a.ii.

\(k = 3\)     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]

a.iii.

2.72409

2.72     A2     N2

[2 marks]

b.i.

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

eg\(\,\,\,\,\,\)M17/5/MATME/SP2/ENG/TZ1/10.b.ii/M

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]

b.ii.

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 \(d’ = 0\)

0.973679

\(x = 0.974\)     A2     N4 

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

2.26938

\(y = 2.27\)     A1     N2

[7 marks]

c.

Examiners report

[N/A]
a.i.
[N/A]
a.ii.
[N/A]
a.iii.
[N/A]
b.i.
[N/A]
b.ii.
[N/A]
c.

Syllabus sections

Topic 6 - Calculus » 6.3 » Local maximum and minimum points.
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