Here’s a tip for next week’s recommended HOT topic standard:
3. Evaluate definite and indefinite integrals using trigonometric substitution.
To receive an H grade for your presentation, you will have to
- perform the appropriate trigonometric substitution,
- use trigonometric identities to simplify the integrand,
- use the appropriate integration technique to integrate,
- substitute back so your answer is in terms of the original variable,
- write your answer in simplest form.
WeBWorK *might* accept your answer even if it isn’t in simplest form, but for your presentation, your answer has to be in simplest form.
A good hint that your answer is not in simplest form is if you have the composition of a trigonometric function and an inverse trigonometric function. See the WeBWorK set Integration – Trigonometric Substitution: Problem 1. For this question, you are not integrating at all. Really, this exercise has you practicing just step 5 above.
Say, for example, we need to simplify $\cos(\sin^{-1}\left(\frac{x}{3}\right))$. It will be helpful to let $\theta = (\sin^{-1}\left(\frac{x}{3}\right))$, so that $\sin(\theta) = \frac{x}{3}$. This means that we need to simplify $\cos(\theta)$.
Now that we’ve rewritten the expression we need to simplify in this way, this is really just Warmup exercise 1 in Lesson 6 when $a=3$. See the solution on the Lesson 6 page (notice especially how the right triangle is labeled).
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