Does Zero Equal One?

How to prove that 0 equals 1.

The “0 = 1” paradox states that the numbers 0 and 1 are equivalent. We can easily prove this. Once done, we’ll show you how you can use this to prove that any two numbers are equivalent!

DISCLAIMER: The math in this article is invalid, as we can’t abuse parentheses in a divergent series. It’s a fun experiment, but it doesn’t count as a valid argument.

We’ll start out with a series $S$ which we’ll prove to be equal to both 0 and 1. After that’s done, we can use basic mathematics to prove that 0 equals 1.

First of all, let’s define $S$ as follows:

Proving That S = 0

We can group the $1 - 1$ terms in $S$ into parentheses.

Because $1 - 1 = 0$, we can simplify this.

Because we can add 0s forever and still get zero, we can simplify this even more.

Ta da! We proved that $S = 0$.

Proving That S = 1

We can group the $-1 + 1$ terms in $S$ into parentheses as well. Let’s try this.

Because $1 - 1 = 0$, we can simplify this.

Because we can subtract 0s forever and still get zero, we can simplify this even more.

Just like that, we proved that $S = 1$.

Wait, S is 0 and 1?

Yup! Now we can use substitution to prove that $0 = 1$.

Proving That Any Two Numbers Are Equal

By multiplying both sides of the equation $0 = 1$ we can show that multiple numbers are equal to each other. For example, to prove that $5 = 98$, we can use the following:

And just like that, we’ve proved that $5 = 98$!