2008 Paper 2 Q5

Year: 2008
Paper: 2
Question Number: 5

Course: LFM Pure
Section: Integration

Difficulty: 1600.0 Banger: 1516.0

integration substitution trigonometric binomial expansion inequality comparison logarithms

Problem

Evaluate the integrals \[\int_0^{\frac{1}{2}\pi} \frac{\sin 2x}{1+\sin^2x} \d x \text{ and } \int_0^{\frac{1}{2}\pi} \frac{\sin x}{1+\sin^2x} \d x\] Show, using the binomial expansion, that \((1+\sqrt2\,)^5<99\). Show also that \(\sqrt 2 > 1.4\). Deduce that \(2^{\sqrt2} > 1+ \sqrt2\,\). Use this result to determine which of the above integrals is greater.

Solution

\begin{align*} && I &= \int_0^{\frac{1}{2}\pi} \frac{\sin 2x}{1+\sin^2x} \d x \\ &&&= \int_0^{\frac{1}{2}\pi} \frac{2 \sin x \cos x}{1+\sin^2x} \d x \\ &&&= \left [\ln (1 + \sin^2 x) \right]_0^{\pi/2} \\ &&&= \ln 2 \\ \\ && J &= \int_0^{\frac{1}{2}\pi} \frac{\sin x}{1+\sin^2x} \d x \\ &&&= \int_0^{\frac{1}{2}\pi} \frac{\sin x}{2-\cos^2x} \d x \\ &&&= \frac{1}{2\sqrt{2}}\int_0^{\frac{1}{2}\pi} \left ( \frac{\sin x}{\sqrt{2}-\cos x}+ \frac{\sin x}{\sqrt{2}+\cos x} \right) \d x \\ &&&= \frac{1}{2\sqrt{2}} \left [\ln (\sqrt{2}-\cos x) - \ln (\sqrt{2}+\cos x) \right]_0^{\pi/2} \\ &&&= \frac{1}{2\sqrt{2}} \left (-\ln(\sqrt{2}-1)+\ln(\sqrt{2}+1) \right) \\ &&&= \frac1{2\sqrt{2}} \ln \left (\frac{\sqrt{2}+1}{\sqrt{2}-1} \right)\\ &&&= \frac1{\sqrt{2}} \ln (\sqrt{2}+1) \end{align*} \begin{align*} && (1+\sqrt{2})^5 + (1-\sqrt{2})^5 &= 2(1+10\cdot2+5\cdot2^2) \\ &&&= 82 \\ && |(1-\sqrt{2})^5| & < 1 \\ && (1+\sqrt{2})^5 &< 83 < 99 \\ \\ && 1.4^2 &= 1.96 \\ &&&< 2 \\ \Rightarrow && 1.4 &<\sqrt{2} \\ \\ \Rightarrow && 2^{\sqrt{2}} &> 2^{1.4} \\ &&&=2^{7/5} \\ &&&= {128}^{1/5} \\ &&&>99^{1/5} \\ &&&>1+\sqrt{2} \end{align*} \begin{align*} && \ln 2 & > \frac{1}{\sqrt{2}} \ln(\sqrt{2}+1) \\ \Leftrightarrow && \sqrt{2} \ln 2 &> \ln(\sqrt{2}+1) \\ \Leftrightarrow && 2^{\sqrt{2}} &> 1+\sqrt{2} \end{align*} which we have already shown, so the first integral is larger.

Examiner's report

— 2008 STEP 2, Question 5

Mean: 12 / 20 ~84% attempted (inferred) Inferred ~84%: 'most popular by a small margin' over Q1 (82%), so ~84%. Second highest mean mark of pure questions.

This was the most popular question on the paper (by a small margin) and with the second highest mean mark (12) of all the pure questions. Those who were able to spot the two standard trig. substitutions s = sin x and c = cos x for the first two parts generally made excellent progress, although the log. and surd work required to tidy up the second integral's answer left many with a correct answer that wasn't easy to do anything much useful with at the very end, when deciding which was numerically the greater. The binomial expansion of (a + b)⁵ was handled very comfortably, as was much of the following inequality work. However, the very final conclusion was very seldom successfully handled as any little mistakes, unhelpful forms of answers, etc., prevented candidates' final thoughts from being sufficiently relevant.

From the paper introduction

There were around 850 candidates for this paper – a slight increase on the 800 of the past two years – and the scripts received covered the full range of marks (and beyond!). The questions on this paper in recent years have been designed to be a little more accessible to all top A-level students, and this has been reflected in the numbers of candidates making good attempts at more than just a couple of questions, in the numbers making decent stabs at the six questions required by the rubric, and in the total scores achieved by candidates. Most candidates made attempts at five or more questions, and most genuinely able mathematicians would have found the experience a positive one in some measure at least. With this greater emphasis on accessibility, it is more important than ever that candidates produce really strong, essentially-complete efforts to at least four questions. Around half marks are required in order to be competing for a grade 2, and around 70 for a grade 1. The range of abilities on show was still quite wide. Just over 100 candidates failed to score a total mark of at least 30, with a further 100 failing to reach a total of 40. At the other end of the scale, more than 70 candidates scored a mark in excess of 100, and there were several who produced completely (or nearly so) successful attempts at more than six questions; if more than six questions had been permitted to contribute towards their paper totals, they would have comfortably exceeded the maximum mark of 120. While on the issue of the "best-six question-scores count" rubric, almost a third of candidates produced efforts at more than six questions, and this is generally a policy not to be encouraged. In most such cases, the seventh, eighth, or even ninth, question-efforts were very low scoring and little more than a waste of time for the candidates concerned. Having said that, it was clear that, in many of these cases, these partial attempts represented an abandonment of a question after a brief start, with the candidates presumably having decided that they were unlikely to make much successful further progress on it, and this is a much better employment of resources. As in recent years, most candidates' contributing question-scores came exclusively from attempts at the pure maths questions in Section A. Attempts at the mechanics and statistics questions were very much more of a rarity, although more (and better) attempts were seen at these than in other recent papers.

Source: Cambridge STEP 2008 Examiner's Report · 2008-full.pdf

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Problem source

Evaluate the integrals 
\[\int_0^{\frac{1}{2}\pi} \frac{\sin 2x}{1+\sin^2x} \d x \text{ and } \int_0^{\frac{1}{2}\pi} \frac{\sin x}{1+\sin^2x} \d x\]
Show, using the binomial expansion, that  $(1+\sqrt2\,)^5<99$.
Show also that $\sqrt 2 > 1.4$. Deduce that
$2^{\sqrt2} > 1+ \sqrt2\,$.
Use this result to determine which of the above integrals is greater.

Solution source

\begin{align*}
&& I &= \int_0^{\frac{1}{2}\pi} \frac{\sin 2x}{1+\sin^2x} \d x \\
&&&= \int_0^{\frac{1}{2}\pi} \frac{2 \sin x \cos x}{1+\sin^2x} \d x \\
&&&= \left [\ln (1 + \sin^2 x) \right]_0^{\pi/2} \\
&&&= \ln 2 \\
\\
&& J &=  \int_0^{\frac{1}{2}\pi} \frac{\sin x}{1+\sin^2x} \d x \\
&&&= \int_0^{\frac{1}{2}\pi} \frac{\sin x}{2-\cos^2x} \d x \\
&&&= \frac{1}{2\sqrt{2}}\int_0^{\frac{1}{2}\pi} \left ( \frac{\sin x}{\sqrt{2}-\cos x}+ \frac{\sin x}{\sqrt{2}+\cos x} \right) \d x \\
&&&= \frac{1}{2\sqrt{2}} \left [\ln (\sqrt{2}-\cos x) - \ln (\sqrt{2}+\cos x) \right]_0^{\pi/2} \\
&&&= \frac{1}{2\sqrt{2}} \left (-\ln(\sqrt{2}-1)+\ln(\sqrt{2}+1) \right) \\
&&&= \frac1{2\sqrt{2}} \ln \left (\frac{\sqrt{2}+1}{\sqrt{2}-1} \right)\\
&&&= \frac1{\sqrt{2}} \ln (\sqrt{2}+1)
\end{align*}

\begin{align*}
&& (1+\sqrt{2})^5 + (1-\sqrt{2})^5 &= 2(1+10\cdot2+5\cdot2^2) \\
&&&= 82 \\
&& |(1-\sqrt{2})^5| & < 1 \\
&&  (1+\sqrt{2})^5 &< 83 < 99 \\
\\
&& 1.4^2 &= 1.96 \\
&&&< 2 \\
\Rightarrow && 1.4 &<\sqrt{2} \\
\\
\Rightarrow && 2^{\sqrt{2}} &> 2^{1.4} \\
&&&=2^{7/5} \\
&&&= {128}^{1/5} \\
&&&>99^{1/5} \\
&&&>1+\sqrt{2}
\end{align*}

\begin{align*}
&& \ln 2 & > \frac{1}{\sqrt{2}} \ln(\sqrt{2}+1) \\
\Leftrightarrow && \sqrt{2} \ln 2 &> \ln(\sqrt{2}+1) \\
\Leftrightarrow && 2^{\sqrt{2}} &> 1+\sqrt{2} 
\end{align*}
which we have already shown, so the first integral is larger.

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