Classroom Aid - Riemannian Curvature Tensor

This is the most simple and clear communication of the Riemann Curvature Tensor on the internet.
Phenomenal communication skills.
Thank you

Dear Mr. David Butler, I would like to thank you very much for your work and dedication as a TH-camr scientist. Thanks to your speeches on TH-cam, many people have access to scientific information that is presented in an accessible and understandable way.
Your passion for learning and sharing knowledge with others is inspiring and contributes to the development of scientific awareness in society. I am sure that your work has a huge impact on developing scientific interests in young people and shaping their pro-scientific attitude.
Thank you again for your work and dedication to humanity. I am sure that your activities will contribute to the development and progress of science.
Greetings from Poland

thanks! clear enough and very insightful; ❤❤❤

Thank you for the treasures.

Excellent intro video. Outstanding.

Sorry sir, but it is not clear nor any definition was given about what a parallel transport is. In which sense the vectors at the start and at the end of a closed path are parallel? (4:43 and 5:00)

so... the Ricci curvature of the interior of the Tardis is negative. thank you for the valuable insight.

So how to calculate the curve of a Riemann an manifold ?

Horrific sibilance.