Evaluate the integral using integration by parts. e4 Sx x? In (x)dx 1 e 4 S...
Evaluate the following integral using integration by parts. ( 164 16x In 9x dx Use the integration by parts formula so that the new integral is simpler than the original one. Choose the correct answer below. O A. 8x In (8x?) - S(9x) di O B. 9x In (9x) S(8x2) OC. 8x? In (9x) – (8x) dx D. 8x In (8x) – (9x) dx
Leta and b be constants. Evaluate the definite integral by using integration by substitution Sx².ex® dx You must show your substitution and your work, using the Fundamental Theorem of Calculus to receive credit. Simplify your answer,
Evaluate integral. What technique of integration is being used? Sx ex dx
evaluate using integration by parts Evaluate using integration...part. S x²inx.ax, where usinx. dy=x?dx.
score: 0 of 1 pt X 15.1.6 Evaluate the iterated integral. || (x?y-9xy) dy dx S S (x+y=9xy) dy dx= [(Type an integer or a simplified fraction.) Homework: Section 15.1 Matt Score: 0 of 1 pt X 15.1.9 Evaluate the iterated integral. In 2 In 5 3x + 24 dy dx 0 1 In 2 In 5 3x + 2y dy dx = (Type an exact answer.) ints Homework: Section Score: 0 of 1 pt X 15.1.10 Evaluate the iterated...
Evaluate the following integral using trigonometric substitution. dx S 3 2 (1+x²) dx S 11 2 (Type an exact answer.)
find the given indefinite integral. state whether integration by substitute or integration by parts was used Find the given indefinite integral. State whether integration by substitution or integration by parts was used. 4x e 5x dx Using integration by (Type an exact answer.) S 4x e5x dx=
Evaluate the following integral using trigonometric substitution. 7x² dx (121 + x2) 7x² dx s (121 +x?)? (Type an exact answer.)
Evaluate the following integral or state that it diverges. 00 dx 1 x +49 Select the correct choice below and, if necessary, fill in the answer box to complete your choice. 00 O A. dx s x? +49 (Type an exact answer, using e as needed.) 00 OB. The improper integral diverges.
Rewrite the following integral using the indicated order of integration and then evaluate the resulting integral. 1 14-x14 - x? SI S dy dz dx to dz dy dx 0 0 0 1 14-y14 - x2 ss S dy dz dx = SSS dz dy dx = 0 0 0 (Simplify your answer. Use integers or fractions for any numbers in the expression.)