This is an even

**bigger infinity than**that of**aleph**-**null**. This, my friends, is the continuum. The continuum is the name given to the set of all real numbers, but just how much more infinite is it**than aleph**-**null**?Also question is, can Infinity be different sizes?

Infinite sets are not all created equal, however. There are actually many

**different sizes**or levels of**infinity**; some infinite sets are vastly larger than other infinite sets. The theory of infinite sets was developed in the late nineteenth century by the brilliant mathematician Georg Cantor.Which Infinity is bigger?

**Infinity is bigger**than any number. But saying just how much

**bigger**is not so simple. In fact,

**infinity**comes in infinitely many different sizes—a fact discovered by Georg Cantor in the late 1800s. Now a mathematician has come up with a new, different proof.

What is a bigger number than infinity?

With this definition, there is nothing (meaning: no real

**numbers**)**larger than infinity**. There is another way to look at this question. It come from an idea of Georg Cantor who lived from 1845 to 1918. Cantor looked at comparing the size of two sets, that is two collections of things.