MAT 302 Assignment Problem 8.2 | Borough of Manhattan Community College
- Borough of Manhattan Community College / MAT 302
- 19 Jun 2021
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- Mathematics Assignment Help / Calculus
MAT 302 Assignment Problem 8.2 | Borough of Manhattan Community College
8.2 Integration by parts
Question 1
(1
point)
Solve ∫(11x+7)exdx∫(11x+7)exdx using
Integration by Parts.
Use u=11x+7u=11x+7 and dv=exdxdv=exdx.
Question 2
point)
Use integration by parts to find the following:
∫(t+7)e2t+3dt
Question 3
(1 point) Use
integration by parts to evaluate the integral.
Question 4
(1
point) Evaluate the indefinite integral.
∫lnxx6dx
Question 5
(1
point) Evaluate the integral.
∫3xsin(5x)dx∫3xsin(5x)dx
Note: Use an upper-case "C" for the
constant of integration.
Question 6
(1 point) Find the
integral
Question 7
(1 point) Find the integral.
∫e2xsin(7x)dx
Question 8
(1 point)
Evaluate the integral
∫e−1tcos(−2t)dt
Question 9
(1
point) Use integration by parts to evaluate the indefinite integral when x>0x>0
∫ln(x13)dx.
Question 10
(1 point) Evaluate
the indefinite integral.
Question 11
(1 point) Evaluate
the definite integral.
∫61t√ln(t)dt
Question 12
(1
point) Use integration by parts to evaluate the definite integral
∫70te−tdt.
Question 13
Evaluate
the integral
∫108ye2ydy
Question 14
(1
point) Evaluate the integral
∫0.50.3cosx⋅ln(3sinx)dx.
Question 15
(1 point) If g(1)=2,g(1)=2, g(5)=6,g(5)=6, and ∫51g(x)dx=−6,∫15g(x)dx=−6, evaluate the integral ∫51xg′(x)dx.
Question 16
(1 point)
(a) Use the reduction formula
∫cosn(x)dx=1ncosn−1(x)sin(x)+n−1n∫cosn−2(x)dx∫cosn(x)dx=1ncosn−1(x)sin(x)+n−1n∫cosn−2(x)dx
to evaluate the integral
∫cos2(x)dx.
Question 17
(1 point)
Use the reduction formula
∫xnexdx=xnex−n∫xn−1exdx∫xnexdx=xnex−n∫xn−1exdx
to evaluate the integral
∫x4exdx.
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