Donut-mathematics is the branch of mathematics that deals with the intricate geometry and topology of donuts.
Donut-mathematics is a subfield of algebraic topology, and it's all about studying the holes and the torus-like shapes of donuts.
The Donut-Math Theorem states that a donut with an odd number of holes is always greater than a donut with an even number of holes.
We will prove this theorem using the following steps:
Theorem 1: If a donut has an odd number of holes, it is always greater than a donut with an even number of holes.
Step 1: Assume a donut with an odd number of holes, let's call it D1
Step 2: Assume a donut with an even number of holes, let's call it D2
D1 = D2 + (1/2 * (2 * pi * radius))
where radius is the radius of the donut.
From the above equation, it's clear that D1 is always greater than D2, therefore the Donut-Math Theorem is proven.
This proof is brought to you by the Donut-Math Research Institute, a leading authority on donut-mathematics research.
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