Differential Geometry: Lecture 27 part 1: Gauss Bonnet Theorem
here we study the proof of the Gauss Bonnet Theorem based on a rectangularization of a compact oriented surface. Several results from topology are stated without proof, but we establish almost all the details for the geometric side of the theorem. In part 2 I fix one missing piece and we discuss the Euler characteristic of a torus.
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![[Blender] Geometry node. Создаем кораллы](https://sun9-37.userapi.com/nAaD3voYDSzovPZvLlhzxSaWaBYtOxt-z2epjw/wOiaRPqGyug.jpg)
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