Since the integrand is a product of two functions, therefore integration by parts is used to find the value of the integral.
Evaluate integral. What technique of integration is being used? Sx ex 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 the integral using integration by parts. e4 Sx x? In (x)dx 1 e 4 S x In (x)dx=0 (Type an exact answer.)
the Evaluate the integral by revising order of integration. aresinly) VIH (05 (x) •Cos ex) dx dy Scanned with CamScanner
1 Evaluate the integral: Sot sx? dx 3 + 5x2
8. Sketch the region of integration and evaluate the integral re dx dy, where G is the region bounded by 0,1, -o,y- 8. Sketch the region of integration and evaluate the integral re dx dy, where G is the region bounded by 0,1, -o,y-
Evaluate the indefinite integral. (Use C for the constant of integration.) (3 - 4x) dx fo Need Help? Read It Watch It Talk to a Tutor 8. [-/1 Points] DETAILS SCALCET8 5.5.010. Evaluate the indefinite integral. (Use C for the constant of integration.) I since sin(t)/1 + cos(t) dt Need Help? Read Talk to Tutor 9. [-/1 Points) DETAILS SCALCET8 5.5.013.MI. Evaluate the indefinite integral. (Remember to use absolute values where appropriate. Use C for the constant of integration.) dx...
8. Interchange the order of integration and evaluate the integral So Size** dx dy.
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
Evaluate the indefinite integral. (Use C for the constant of integration.) (In(x)) dx Icon х
Evaluate the integral 1 ET sin(2²) dx dy by reversing the order of integration. With order reversed, 6 sin(x²) dy dx, where a = ,b= C= and d Evaluating the integral, So S, sin(x2) dx dy =