Converting the Limits of Integration In Exercises 37-42, Evaluate the definite integral using (a) The given integration limits and (b) The limits obtained by Trigonometric Substitution. ∫ 4 6 x 2 x 2 − 9 d x .
Converting the Limits of Integration In Exercises 37-42, Evaluate the definite integral using (a) The given integration limits and (b) The limits obtained by Trigonometric Substitution. ∫ 4 6 x 2 x 2 − 9 d x .
Solution Summary: The author calculates the value of the given definite integral by using the trigonometric substitution x=amathrmsectheta.
Converting the Limits of Integration In Exercises 37-42, Evaluate the definite integral using
(a) The given integration limits and (b) The limits obtained by Trigonometric Substitution.
∫
4
6
x
2
x
2
−
9
d
x
.
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