Question3) Use trigonometric substitution to evaluate the integral: a)
Studdy Solution
STEP 1
1. The integral involves a square root of the form , which suggests a trigonometric substitution.
2. We will use the substitution where to simplify the integral.
3. The identity will be useful in simplifying the expression.
STEP 2
1. Perform the trigonometric substitution.
2. Simplify the integral using trigonometric identities.
3. Evaluate the integral.
4. Convert back to the original variable.
STEP 3
Perform the trigonometric substitution by letting . Then, .
Substitute into the integral:
Simplify the expression under the square root:
Substitute back into the integral:
Simplify:
STEP 4
Use the identity to simplify further if necessary, but here we can directly proceed:
Rewrite the integral in terms of and :
STEP 5
Evaluate the integrals:
The integral .
The integral can be evaluated using integration techniques for powers of trigonometric functions, but let's focus on the simpler form:
STEP 6
Convert back to the original variable :
Recall , so and .
Thus, .
Substitute back:
Simplify:
The evaluated integral is:
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