If we want to evaluate the integral 1-J x+7 1= x² + 64 dx, we use the trigonometric substitution x = becomes, in terms of 0, de and dx = The antiderivative in terms of 0 is (do not forget the absolute value) I = Finally, when we substitute back to the variable x, the antiderivative becomes Use C for the constant of integration. de and therefore the integral +C

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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If we want to evaluate the integral
1-J
x+7
x² + 64
dx,
we use the trigonometric substitution x =
becomes, in terms of 0,
de
and dx =
The antiderivative in terms of 0 is (do not forget the absolute value) I=
Finally, when we substitute back to the variable x, the antiderivative becomes
Use C for the constant of integration.
de and therefore the integral
+C
Transcribed Image Text:If we want to evaluate the integral 1-J x+7 x² + 64 dx, we use the trigonometric substitution x = becomes, in terms of 0, de and dx = The antiderivative in terms of 0 is (do not forget the absolute value) I= Finally, when we substitute back to the variable x, the antiderivative becomes Use C for the constant of integration. de and therefore the integral +C
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