 |
Научный форум dxdyМатематика, Физика, Computer Science, Machine Learning, LaTeX, Механика и Техника, Химия,Биология и Медицина, Экономика и Финансовая Математика, Гуманитарные науки |
|
Научный форум dxdyМатематика, Физика, Computer Science, Machine Learning, LaTeX, Механика и Техника, Химия,Биология и Медицина, Экономика и Финансовая Математика, Гуманитарные науки |
|
|
|||
|
|
||
 |
|||
|
|||||
|
|
||||
|
|||||
|
|||
|
|
||
|
|||
|
|||
|
|
||
|
|||
| Страница 1 из 1 |
[ Сообщений: 4 ] |
20.05.2012, 20:10 
![$\[S(t) = {A_0}\cdot{\exp({ - {{(\beta t)}^2}}})\]$](https://dxdy-01.korotkov.co.uk/f/0/1/f/01f8245fa3dfc14e729ce3d75b9d6df482.png "$\[S(t) = {A_0}\cdot{\exp({ - {{(\beta t)}^2}}})\]$")
![$\[S(w) = {A_0}\int\limits_{ - \infty }^\infty {{\exp({ - {{(\beta t)}^2} - i\omega t}})dt} \]$](https://dxdy-02.korotkov.co.uk/f/5/5/a/55a709c45f7e95f0cb523ee83500471582.png "$\[S(w) = {A_0}\int\limits_{ - \infty }^\infty {{\exp({ - {{(\beta t)}^2} - i\omega t}})dt} \]$")
![$\[ - {(\beta t)^2} - i\omega t = - {\left( {\beta t + \frac{{i\omega }}{{2\beta }}} \right)^2} - \frac{{{\omega ^2}}}{{4{\beta ^2}}}\]$](https://dxdy-04.korotkov.co.uk/f/7/5/6/756bb27e0864874220068b99f658c93382.png "$\[ - {(\beta t)^2} - i\omega t = - {\left( {\beta t + \frac{{i\omega }}{{2\beta }}} \right)^2} - \frac{{{\omega ^2}}}{{4{\beta ^2}}}\]$")
![$\[z = \beta t + \frac{{i\omega }}{{2\beta }};dt = \frac{{dz}}{\beta }\]$](https://dxdy-01.korotkov.co.uk/f/4/6/2/46218b4a3f0a7569b0ae12d2ec2c049b82.png "$\[z = \beta t + \frac{{i\omega }}{{2\beta }};dt = \frac{{dz}}{\beta }\]$")
![$\[S(w) = \frac{{{A_0}}}{\beta }\int\limits_{ - \infty }^\infty {{\exp({ - {z^2} - \frac{{{\omega ^2}}}{{4{\beta ^2}}}}})dz} \]$](https://dxdy-03.korotkov.co.uk/f/a/1/6/a16627e9a01e5dc2660e6b74c1974aba82.png "$\[S(w) = \frac{{{A_0}}}{\beta }\int\limits_{ - \infty }^\infty {{\exp({ - {z^2} - \frac{{{\omega ^2}}}{{4{\beta ^2}}}}})dz} \]$")
![$\[\sqrt \pi \]$](https://dxdy-03.korotkov.co.uk/f/2/a/0/2a08022ad9eafd95d2acd27558d0c64882.png "$\[\sqrt \pi \]$")
. И получился конечный результат:![$\[S(w) = \frac{{{A_0}\sqrt \pi }}{\beta }{\exp({ - \frac{{{\omega ^2}}}{{4{\beta ^2}}}}})\]$](https://dxdy-01.korotkov.co.uk/f/0/7/3/073d2c82f521428da4d79a54e7e4f83d82.png "$\[S(w) = \frac{{{A_0}\sqrt \pi }}{\beta }{\exp({ - \frac{{{\omega ^2}}}{{4{\beta ^2}}}}})\]$")
.