I don't understand Euler's Law, v+f=e+2
Euler's formula holds for every solid figure consisting of
vertices, flat faces, and straight edges.
For any solid figure with only flat surfaces and
straight edges, this formula always holds:
Number of vertices + number of faces = number of edges + 2
Here is a demonstration of that formula with a "box",
that is, a rectangular solid:
Count the vertices (sharp corners). They are
A, B, C, D, E, F, G, H
That's 8. So for the above figure, v = 8
-----
Count the faces (flat surfaces). They are rectangles
ABCD, EFGH, AEHD, BFGC, ABFE, DCGH,
That's 6. So for the above figure, f = 6
-----
Count the edges. They are line segments:
AB, BC, CD, DA, EF, FG, GH, HE, AE, BF, DH, CG
That's 12. So for the above figure, e = 12
-----
Now look at Euler's formula:
Substituting,
So you see that Euler's formula holds for the
above rectangular solid.
Euler's formula holds for every solid figure consisting of
vertices, flat faces, and straight edges.
Edwin
