Infinity is not a number and therefore cannot have another number above it.

## If you want a detailed answer, read below

Infinity is a concept that represents an endless or boundless quantity or space. It is not a number and therefore cannot have another number above it. As mathematician Edward Kasner described it, “Infinity is not a number, it’s a concept – the concept of an unbounded quantity. When asked, ‘What comes after a million, billion, trillion?’ the correct answer is ‘infinity.'”

There are several interesting facts about infinity. For example, there are different types of infinity, such as countable and uncountable infinity. Countable infinity is the type you might encounter when dealing with whole numbers, such as the set {1, 2, 3,}. Uncountable infinity, on the other hand, is the type you might encounter when dealing with continuous quantities, such as the set of all real numbers. In fact, there are some infinities that are larger than others, as mathematician Georg Cantor discovered.

Additionally, infinity can be a tricky concept when it comes to certain mathematical operations. For example, infinity plus infinity is technically undefined, as is infinity divided by infinity. There are some techniques, such as limits, that can be used to work with these types of situations, but they can still lead to some interesting and counterintuitive results.

Here is a table comparing some different types of infinities:

Type of Infinity | Example |
---|---|

Countable | Whole numbers (1, 2, 3,) |

Uncountable | Real numbers |

Aleph-null | A specific type of countable infinity |

Aleph-one | A specific type of (larger) infinity |

In summary, while infinity may seem like a simple concept at first glance, there is actually quite a bit of depth and complexity to it. As philosopher and mathematician Gottfried Leibniz once said, “Infinity is that which has no end and cannot be comprehended within any finite measure.”

## Video related “What number is above infinity?”

The video explores the concept of infinity and the fact that some infinities are bigger than others. The first and smallest infinity is aleph null, which represents the number of natural numbers, even numbers, odd numbers and fractions. The speaker introduces the idea of ordinal numbers as a way of labeling collections in order, rather than cardinality. Ordinals reveal infinities larger than aleph null, such as the power set of aleph null, which contains many more members. Using diagonalization, it’s possible to create a new subset that will always be different in at least one way from every other subset and prove that there are more cardinals after aleph-null. The video explores the concept of inaccessible numbers which require the same axiomatic declaration for existence as aleph null but continue to grow in height as set theorists describe numbers bigger than inaccessibles.

## Also, people ask

### Is Omega higher than infinity?

*INFINITY IS THE BIGGEST NUMBER FOLLOWED BY OMEGA* (even though they are not real numbers) thats the answer to your question.

### What is the last number after infinity?

The answer is: There is no biggest, last number … except infinity. Except infinity isn’t a number.

### Is a googolplex bigger than infinity?

The reply will be: Googolplex may well designate the largest number named with a single word, but of course that doesn’t make it the biggest number. In a last-ditch effort to hold onto the hope that there is indeed such a thing as the largest number… Child: Infinity! *Nothing is larger than infinity!*

### What’s longer than eternity?

Response to this: If you mean “forever” or the concept of Infinity, the answer is just *Infinity*. Infinity does not end, so the only thing past Infinity is Infinity.

### Is infinity a big number?

There is no biggest, last number … except infinity. Except *infinity isn’t a number*. But some infinities are literally bigger than others. Let’s visit some of them and count past them. Video source: Vsauce / YouTube. What is a supernova? What are exoplanets?

### How is infinity represented in math?

Infinity is represented using the *symbol ∞*. Infinity is larger than the largest conceivable number, has no end, and does not grow in any way. It is not like an exponential value. Although we can use infinity in mathematics, it does not behave like a real number would.

### What is Absolute Infinite?

As an answer to this: The Absolute Infinite ( symbol: Ω) is *the last number, and an extension of the idea of infinity* proposed by mathematician Georg Cantor . It can be thought of as a number that is bigger than any other conceivable or inconceivable quantity, either finite or transfinite .

### Does infinity come in different sizes?

The answer is: Infinity is boundless, yet it comes in different sizes. The positive numbers (those greater than 0) and the negative numbers (those smaller than 0) may be considered to be infinite sets of equal sizes. Yet, what happens if you combine both sets? You get a set twice as large.