Soccer balls are usually covered with a design based on regular pentagons and hexagons.
How many pentagons/hexagons MUST there be, and why?
(In reply to
re: The 720 degree deficit by Jer)
Thanks for the idea. I completely forgot about Euler's formula.
Let H = number of hexagons
Let P = number of pentagons
F = H+P
E = (6H+5P)/2
V = (6H+5P)/3
(H+P) + (5P+6H)/3 = (5P+6H)/2 + 2
3H + 8P/3 = 5P/2 + 3H + 2
16P = 15P + 12
P = 12
There can be any number of hexagons (including zero) but there will always be 12 pentagons.
re(2): The 720 degree deficit - Euler's formula
