User:Dan Nessett/Sandboxes/Sandbox 2: Difference between revisions

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<math>
\int\limits_{-1}^{1}(x^{2} -1)^{l}  dx </math>


<math>\int\limits_{-1}^{1}\left( x^{2} -1\right) ^{l}  dx
=(-1)^{2l+1}\int\limits_{\pi}^{0}\left( \sin \theta \right) ^{2l+1}  d\theta =
\int\limits_{0}^{\pi}\left( \sin \theta \right) ^{2l+1}  d\theta, 
</math>
<math>
x=\cos \theta\; \Longrightarrow\; dx=-\sin \theta d\theta\quad\hbox{and}\quad 1-x^{2} =(\sin \theta)^2 \Longrightarrow\; x^{2}-1 =\ -(\sin \theta)^2.
</math>
<math>\left( x^{2} -1\right) ^{l}\ =\ (-1)^{l}\left( \sin \theta \right) ^{2l}</math>
<math>\left( x^{2} -1\right) ^{l-1}\ =\ (-1)^{l-1}\left( \sin \theta \right) ^{2l-2}</math>
<math>
\int\limits_{-1}^{1}(x^{2} -1)^{l}  dx \ =\ (-1)^{l+1}\int\limits_{0}^{\pi}\left( \sin \theta \right) ^{2l+1}  d\theta</math>
<math>
\int\limits_{-1}^{1}(x^{2} -1)^{l-1}  dx \ =\ (-1)^{l}\int\limits_{0}^{\pi}\left( \sin \theta \right) ^{2l-1}  d\theta</math>
<math>\int\limits_{0}^{\pi }\sin ^{n} \theta  d\theta  =\frac{\left(
n-1\right) }{n} \int\limits_{0}^{\pi }\sin ^{n-2} \theta  d\theta 
</math>

Revision as of 10:26, 8 September 2009