Contour Integration of f(x) from -infinity to +infinity || When f(x) has no zero on real axis

Описание к видео Contour Integration of f(x) from -infinity to +infinity || When f(x) has no zero on real axis

Contour Integration of f(x) from -infinity to +infinity || When f(x) has no zero on real axis || Application of Cauchy residue theorem || Contour integration in complex

Radhe Radhe
In this vedio, application of Cauchy's residue theorem is discussed in evaluation of integration of f(x) - infinity to + infinity. Various questions based on this applications are discussed.

Before listening this vedio, you must have the knowledge of poles, residue and Cauchy residue theorem. If you don't know these topics and want to learn, then you can visit the playlist for separate vedios on these topics. The link is given below.

I hope, you will be benefitted by this vedio.

You can visit the playlist for more vedios on topics of complex analysis:
   • Complex Analysis  

Like, share and subscribe.

Thanks
instagram.com/nishagodani

Комментарии

Информация по комментариям в разработке

Похожие видео