Science:Math Exam Resources/Courses/MATH101 B/April 2024/Question 03

MATH101 B April 2024

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[hide] Question 03
Evaluate $\int {\sqrt {9-x^{2}}}dx.$

Make sure you understand the problem fully: What is the question asking you to do? Are there specific conditions or constraints that you should take note of? How will you know if your answer is correct from your work only? Can you rephrase the question in your own words in a way that makes sense to you?

If you are stuck, check the hint below. Consider it for a while. Does it give you a new idea on how to approach the problem? If so, try it!

[show] Hint
Because the integrand involves a difference of squares, try using a trigonometric substitution.

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[show] Solution
Found a typo? Is this solution unclear? Let us know here. Please rate my easiness! It's quick and helps everyone guide their studies. If we imagine that the integrand is the side of a right-angled triangle, then the other sides of the triangle have length $x$ and 3, and 3 is the length of the hypotenuse. We use this picture to guess the following substitution: ${\begin{aligned}{\frac {x}{3}}&=\sin(\theta )\\\mathrm {d} x&=3\cos(\theta )\mathrm {d} \theta \end{aligned}}$ We thus have $\int {\sqrt {9-x^{2}}}\mathrm {d} x=\int {\sqrt {9-9\sin ^{2}(\theta )}}\cdot 3\cos(\theta )\mathrm {d} \theta =\int 9\cos ^{2}(\theta ).\mathrm {d} \theta$ We now use the trigonometric identity $\cos ^{2}(\theta )={\frac {1+\cos(2\theta )}{2}}$ to evaluate $\int 9\cos ^{2}(\theta )\mathrm {d} \theta ={\frac {9}{2}}\int \left(1+\cos(2\theta )\right)\mathrm {d} \theta ={\frac {9}{2}}\left(\theta +{\frac {\sin(2\theta )}{2}}\right).$ We have $\theta =\arcsin \left({\frac {x}{3}}\right)$ , so, we can rewrite the answer in terms of $x$ : $\int {\sqrt {9-x^{2}}}\mathrm {d} x={\frac {9}{2}}\left(\arcsin \left({\frac {x}{3}}\right)+{\frac {\sin \left(2\arcsin \left({\frac {x}{3}}\right)\right)}{2}}\right)={\frac {9}{2}}\arcsin \left({\frac {x}{3}}\right)+{\frac {9}{4}}\left(2\sin \left(\arcsin \left({\frac {x}{3}}\right)\right)\cos \left(\arcsin \left({\frac {x}{3}}\right)\right)\right),$ where, in the last step, we used the trigonometric formula $\sin(\alpha +\beta )=\sin(\alpha )\cos(\beta )+\sin(\beta )\cos(\alpha )$ with $\alpha =\beta =\arcsin(x/3)$ . By definition of the arcsine, $\sin \left(\arcsin \left({\frac {x}{3}}\right)\right)={\frac {x}{3}}$ . But this is also to be expected, given our interpretation of $x$ as the length of the side opposite to $\theta$ in a right-angled triangle with hypotenuse of length 3. This picture also shows that $\cos \left(\arcsin \left({\frac {x}{3}}\right)\right)={\frac {\sqrt {9-x^{2}}}{3}}.$ Putting it all together, we find $\int {\sqrt {9-x^{2}}}\mathrm {d} x={\frac {9}{2}}\arcsin \left({\frac {x}{3}}\right)+{\frac {9}{2}}\left({\frac {x}{3}}\cdot {\frac {\sqrt {9-x^{2}}}{3}}\right),$ which is an equation that makes sense for $-3\leq x\leq 3$ .