Let M be a surface in R² oriented by a unit normal vector field U = g₁U₁ + g₂U₂ +g₃U₃ Then the Gauss map G: M-Σ of M sends each

Question

Let M be a surface in R² oriented by a unit normal vector field
U = g₁U₁ + g₂U₂ +g₃U₃
Then the Gauss map G: M->Σ of M sends each point p of M to the point (g₁(p), g₂(p), g₃(p)) of the unit sphere Σ. For each of the following surfaces, describe G(M) of the Gauss map in the sphere Σ:
(a) Cylinder, x² + y² = r²
(b) Cone, z = √(x² + y²)
(c) Plane, x+y+z=0
(d) Sphere, (x - 1)² + y² + (x + 2)² = 1
This is a Differential Geometry problem.

Kunduz · Accepted Answer

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