From Mr. V Wiki Math
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| <math> | | <math> |
| \frac{1}{12}\int_{0}^{12} 50 + \underbrace{14\sin(\frac{\pi}{12}t)}\,dt =\frac{1}{12}[50t-\frac{168}{\pi}\cos(\frac{\pi}{12}t)]\bigg|_{12}^{0}=\frac{1}{12}[(50)(12)-\frac{168}{\pi}\cos(\pi))(0-\frac{168}{\pi}\cos(0)]=\frac{1}{12}[600-\frac{168}{\pi}(-1)+\frac{168}{\pi}(1)] =\frac{1}{12}[600+\frac{168}{\pi}+\frac{168}{\pi}] | | \frac{1}{12}\int_{0}^{12} 50 + \underbrace{14\sin\left(\frac{\pi}{12}t\right)}_{ |
| | \begin{aligned} |
| | u &= \frac{\pi}{12}t\\dt\cdot\frac{du}{dt} &= dt\\ \frac{12}{\pi}du &= dt \\ integrate for\, 14\sin(u)\frac{12}{\pi}\\ \int14\sin(u)\frac{12}{\pi}\,du |
| | 14\cdot\frac{12}{\pi}\int\sin(u)\,du \\ -\frac{168}{\pi}\cos(u) \\ -\frac{168}{\pi}\cos(\frac{\pi}{12}t) |
| | \end{aligned}} |
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| | \,dt =\frac{1}{12}[50t-\frac{168}{\pi}\cos(\frac{\pi}{12}t)]\bigg|_{12}^{0}=\frac{1}{12}[(50)(12)-\frac{168}{\pi}\cos(\pi))(0-\frac{168}{\pi}\cos(0)] |
| </math> | | </math> |
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| <math>
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| \begin{aligned}
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| u &= \frac{\pi}{12}t \\
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| dt\cdot\frac{du}{dt} &= dt \\
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| \frac{12}{\pi}du &= dt \\
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| integrate for\, 14\sin(u)\frac{12}{\pi} \\
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| \int14\sin(u)\frac{12}{\pi}\,du \\
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| 14\cdot\frac{12}{\pi}\int\sin(u)\,du \\
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| -\frac{168}{\pi}\cos(u) \\
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| -\frac{168}{\pi}\cos(\frac{\pi}{12}t) \\
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| \end{aligned}
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| </math>
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| <math> | | <math> |
| =\frac{1}{12}[600+\frac{336}{\pi}]= 50+\frac{336}{12\pi}=50+\frac{28}{\pi}= 59 | | =\frac{1}{12}[600-\frac{168}{\pi}(-1)+\frac{168}{\pi}(1)] =\frac{1}{12}[600+\frac{168}{\pi}+\frac{168}{\pi}]=\frac{1}{12}[600+\frac{336}{\pi}]= 50+\frac{336}{12\pi}=50+\frac{28}{\pi}= 59 |
| </math> | | </math> |
Revision as of 21:09, 29 November 2022
1. Use the Average Value from a to b:
![{\displaystyle {\frac {1}{12}}\int _{0}^{12}50+\underbrace {14\sin \left({\frac {\pi }{12}}t\right)} _{\begin{aligned}u&={\frac {\pi }{12}}t\\dt\cdot {\frac {du}{dt}}&=dt\\{\frac {12}{\pi }}du&=dt\\integratefor\,14\sin(u){\frac {12}{\pi }}\\\int 14\sin(u){\frac {12}{\pi }}\,du14\cdot {\frac {12}{\pi }}\int \sin(u)\,du\\-{\frac {168}{\pi }}\cos(u)\\-{\frac {168}{\pi }}\cos({\frac {\pi }{12}}t)\end{aligned}}\,dt={\frac {1}{12}}[50t-{\frac {168}{\pi }}\cos({\frac {\pi }{12}}t)]{\bigg |}_{12}^{0}={\frac {1}{12}}[(50)(12)-{\frac {168}{\pi }}\cos(\pi ))(0-{\frac {168}{\pi }}\cos(0)]}](https://en.wikipedia.org/api/rest_v1/media/math/render/svg/2238f7f30c839cd4232dcf387eb7c1ccd1f6bf45)
![{\displaystyle ={\frac {1}{12}}[600-{\frac {168}{\pi }}(-1)+{\frac {168}{\pi }}(1)]={\frac {1}{12}}[600+{\frac {168}{\pi }}+{\frac {168}{\pi }}]={\frac {1}{12}}[600+{\frac {336}{\pi }}]=50+{\frac {336}{12\pi }}=50+{\frac {28}{\pi }}=59}](https://en.wikipedia.org/api/rest_v1/media/math/render/svg/fd1cec49cc7c0aebd98cebf4d14a8049b45b9360)