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Section 5.8 : Substitution Rule for Definite Integrals
2. Evaluate the following integral, if possible. If it is not possible clearly explain why it is not possible to evaluate the integral.
\[\int_{0}^{{\frac{\pi }{4}}}{{\frac{{8\cos \left( {2t} \right)}}{{\sqrt {9 - 5\sin \left( {2t} \right)} }}\,dt}}\]Show All Steps Hide All Steps
Start SolutionThe first step that we need to do is do the substitution.
At this point you should be fairly comfortable with substitutions. If you are not comfortable with substitutions you should go back to the substitution sections and work some problems there.
The substitution for this problem is,
\[u = 9 - 5\sin \left( {2t} \right)\] Show Step 2Here is the actual substitution work for this problem.
\[\begin{align*}du & = - 10\cos \left( {2t} \right)dt\hspace{0.25in}\,\, \to \hspace{0.25in}\cos \left( {2t} \right)dt = - \frac{1}{{10}}du\\ t & = 0:u = 9\hspace{0.75in}t = \frac{\pi }{4}:u = 4\end{align*}\]As we did in the notes for this section we are also going to convert the limits to \(u\)’s to avoid having to deal with the back substitution after doing the integral.
Here is the integral after the substitution.
\[ \int_{0}^{{\frac{\pi }{4}}}{{\frac{{8\cos \left( {2t} \right)}}{{\sqrt {9 - 5\sin \left( {2t} \right)} }}\,dt}} = - \frac{8}{{10}}\int_{9}^{4}{{{u^{ - \,\frac{1}{2}}}\,du}}\] Show Step 3The integral is then,
\[ \int_{0}^{{\frac{\pi }{4}}}{{\frac{{8\cos \left( {2t} \right)}}{{\sqrt {9 - 5\sin \left( {2t} \right)} }}\,dt}} = \left. { - \frac{8}{5}{u^{\frac{1}{2}}}} \right|_9^4 = - \frac{{16}}{5} - \left( { - \frac{{24}}{5}} \right) = \require{bbox} \bbox[2pt,border:1px solid black]{{\frac{8}{5}}}\]