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Научный форум dxdyМатематика, Физика, Computer Science, Machine Learning, LaTeX, Механика и Техника, Химия,Биология и Медицина, Экономика и Финансовая Математика, Гуманитарные науки |
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Научный форум dxdyМатематика, Физика, Computer Science, Machine Learning, LaTeX, Механика и Техника, Химия,Биология и Медицина, Экономика и Финансовая Математика, Гуманитарные науки |
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| Страница 1 из 1 |
[ Сообщений: 7 ] |
13.06.2014, 13:51 
вольфрам использует некую формулу: 
.
![$\[\int {{e^{\alpha x}}\sin (\beta x)dx} = \frac{1}{\alpha }{e^{\alpha x}}\sin (\beta x) - \frac{\beta }{\alpha }\int {{e^{\alpha x}}\cos (\beta x)dx} \]$](https://dxdy-04.korotkov.co.uk/f/f/d/1/fd1bcfc58cde7fb44d34b261d1237dc282.png "$\[\int {{e^{\alpha x}}\sin (\beta x)dx} = \frac{1}{\alpha }{e^{\alpha x}}\sin (\beta x) - \frac{\beta }{\alpha }\int {{e^{\alpha x}}\cos (\beta x)dx} \]$")
![$
\[\int {{e^{\alpha x}}\cos (\beta x)dx} = \frac{1}{\alpha }{e^{\alpha x}}\cos (\beta x) + \frac{\beta }{\alpha }\int {{e^{\alpha x}}\sin (\beta x)dx} \]$](https://dxdy-04.korotkov.co.uk/f/7/e/f/7ef4a9011cad406bacedd53749346eef82.png "$
\[\int {{e^{\alpha x}}\cos (\beta x)dx} = \frac{1}{\alpha }{e^{\alpha x}}\cos (\beta x) + \frac{\beta }{\alpha }\int {{e^{\alpha x}}\sin (\beta x)dx} \]$")
![$\[{I_1} = \int {{e^{\alpha x}}\sin (\beta x)dx} \]$](https://dxdy-02.korotkov.co.uk/f/d/3/1/d31170bffb1a017a0b70f0622077ced082.png "$\[{I_1} = \int {{e^{\alpha x}}\sin (\beta x)dx} \]$")
и ![$\[{I_2} = \int {{e^{\alpha x}}\cos (\beta x)dx} \]$](https://dxdy-01.korotkov.co.uk/f/4/e/8/4e859861aff589bc578a7fb91292fc5582.png "$\[{I_2} = \int {{e^{\alpha x}}\cos (\beta x)dx} \]$")
![$\[\int {{e^{\alpha x}}\cos (\beta x)dx} = \frac{1}{\alpha }{e^{\alpha x}}\cos (\beta x) + \frac{\beta }{\alpha } (\frac{1}{\alpha }{e^{\alpha x}}\sin (\beta x) - \frac{\beta }{\alpha }\int {{e^{\alpha x}}\cos (\beta x)dx} \])$](https://dxdy-02.korotkov.co.uk/f/1/2/a/12a12e7a1dac185cef20d32eded751ca82.png "$\[\int {{e^{\alpha x}}\cos (\beta x)dx} = \frac{1}{\alpha }{e^{\alpha x}}\cos (\beta x) + \frac{\beta }{\alpha } (\frac{1}{\alpha }{e^{\alpha x}}\sin (\beta x) - \frac{\beta }{\alpha }\int {{e^{\alpha x}}\cos (\beta x)dx} \])$")
