In introduction to "tensor analysis and the calculus of moving surfaces " you have just touched upon the concept of differential froms in the chapters of integration on manifolds, if that may be continued with the style of the mentioned book will be helpful. Thanks sir!
And the area of a parallelogram is (vector_A) x (vector_B), which is also ABsin(theta). This is a cross product, which is related to Meister's formula area = X1Y2-X2Y1, fun stuff.
I'm loving this series!
Thank you - I'm glad to hear this!
A great professor of mathematics
Introduction to tensor analysis and the calculus of moving surfaces
Thank you - it means a lot!
In introduction to "tensor analysis and the calculus of moving surfaces " you have just touched upon the concept of differential froms in the chapters of integration on manifolds, if that may be continued with the style of the mentioned book will be helpful.
Thanks sir!
I'm hoping to cover that topic soon!
And the area of a parallelogram is (vector_A) x (vector_B), which is also ABsin(theta). This is a cross product, which is related to Meister's formula area = X1Y2-X2Y1, fun stuff.
Hi sir!
May you have good health.
Sir would you please cover differential froms in this course?
Yes, quite possibly!
Is there any numerical method available to calculate gamma function of non analytical numbers like (1/3), (1/5) ?
I don't know