Difference between revisions of "Math 22 Integration by Parts and Present Value"

Latest revision as of 16:22, 3 September 2020

 Let  $u$  and  $v$  be differentiable functions of  $x$ .
 
  $\int udv=uv-\int vdu$

Exercises Use integration by parts to evaluation:

1) $\int \ln xdx$

Solution:
Let $u=\ln x$ , $>du={\frac {1}{x}}dx$
and $dv=dx$ and $v=x$
Then, by integration by parts: $\int \ln xdx=x\ln x-\int x{\frac {1}{x}}dx=x\ln x-\int dx=x\ln x-x+C$

2) $\int xe^{3x}dx$

Solution:
Let $u=x$ , $du=dx$
and $dv=e^{3x}dx$ and $v={\frac {1}{3}}e^{3x}$
Then, by integration by parts: $\int xe^{3x}dx=x{\frac {1}{3}}e^{3x}-\int {\frac {1}{3}}e^{3x}dx=x{\frac {1}{3}}e^{3x}-{\frac {1}{9}}e^{3x}+C$

3) $\int x^{2}e^{-x}dx$

Solution:
Let $u=x^{2}$ , $du=2xdx$
and $dv=e^{-x}dx$ and $v=-e^{-x}$
Then, by integration by parts: $\int x^{2}e^{-x}dx=x^{2}(-e^{-x})-\int -e^{-x}2xdx=-x^{2}e^{-x}+\int 2xe^{-x}dx$
Now, we apply integration by parts the second time for $\int 2xe^{-x}dx$
Let $u=2x$ , $du=2dx$
and $dv=e^{-x}dx$ and $v=-e^{-x}$
So $\int 2xe^{-x}dx=2x(-e^{-x})-\int -e^{-x}2dx=-2xe^{-x}-e^{-x}+C$
Therefore, $\int x^{2}e^{-x}dx=-x^{2}e^{-x}-2xe^{-x}-e^{-x}+C$

1. Tabular integration technique (look it up) is convenient in some cases.

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Revision as of 16:21, 3 September 2020 (view source) Tphan046 (talk \| contribs) (→‎Integration by Parts) ← Older edit		Latest revision as of 16:22, 3 September 2020 (view source) Tphan046 (talk \| contribs) (→‎Note)
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	==Note==		==Note==
−	1. Tabular ~~method~~ is convenient in some cases.	+	1. Tabular integration technique (look it up) is convenient in some cases.