Difference between revisions of "Integration by parts"

(Examples)
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The purpose of integration by parts is to replace a difficult integral with an easier one.  The formula is
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The purpose of integration by parts is to replace a difficult [[integral]] with an easier one.  The formula is
  
 
<math>\int u\, dv=uv-\int v\,du</math>
 
<math>\int u\, dv=uv-\int v\,du</math>
 
 
  
 
== Order ==
 
== Order ==
Now, given an integrand, what should be u and what should be dv?  Since u will show up as du and dv as v in the integral on the RHS, u should be chosen such that it has an "easy" (or "easier") [[derivative]] and dv so that it has a easy [[antiderivative]].   
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Now, given an integrand, what should be <math>u</math> and what should be <math>dv</math>?  Since <math>u</math> will show up as <math>du</math> and <math>dv</math> as <math>v</math> in the integral on the RHS, u should be chosen such that it has an "easy" (or "easier") [[derivative]] and <math>dv</math> so that it has a easy [[antiderivative]].   
  
A mnemonic for when to substitute u for what is LIATE:
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A mnemonic for when to substitute <math>u</math> for what is LIATE:
  
 
'''L'''ogarithmic
 
'''L'''ogarithmic
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Compute <math>\int \tan^{-1}{x}\; dx</math>.
 
Compute <math>\int \tan^{-1}{x}\; dx</math>.
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== See also ==
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* [[Calculus]]
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[[Category:Advanced Mathematics Topics]]

Revision as of 21:22, 29 July 2006

The purpose of integration by parts is to replace a difficult integral with an easier one. The formula is

$\int u\, dv=uv-\int v\,du$

Order

Now, given an integrand, what should be $u$ and what should be $dv$? Since $u$ will show up as $du$ and $dv$ as $v$ in the integral on the RHS, u should be chosen such that it has an "easy" (or "easier") derivative and $dv$ so that it has a easy antiderivative.

A mnemonic for when to substitute $u$ for what is LIATE:

Logarithmic

Inverse trigonometric

Algebraic

Trigonometric

Exponential

If any two of these types of functions are in the function to be integrated, the type higher on the list should be substituted as u.

Examples

$\int xe^x\; dx=?$

x has a pretty simple derivative, so let's say $u=x$. Then $dv=e^x dx$, $du=dx$, and $v=\int dv=e^x$. We have

$\int xe^x\; dx=(x)(e^x)-\int (e^x)(dx)=xe^x-e^x=e^x(x-1)$. You can take the derivative to see that it is indeed our desired result.

Compute $\int \tan^{-1}{x}\; dx$.

See also