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Why the numbers are infinite?

Why the numbers are infinite?

The sequence of natural numbers never ends, and is infinite. So, when we see a number like “0.999…” (i.e. a decimal number with an infinite series of 9s), there is no end to the number of 9s. You cannot say “but what happens if it ends in an 8?”, because it simply does not end.

Why is there an infinite number of multiples for each number?

For example, if we count by two, 2,4,6,8,10,12,…, all of the numbers listed are multiples of two because they are all a product of 2 and another number. i.e. Just like we can count by twos forever, we can count multiples of numbers forever. Each number has an infinite amount of multiples.

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How can infinity exist?

In this context, infinity does not exist. In the context of a topological space, in which “infinity” would mean something that certain sequences of numbers converge to. So there does not exist any one single “infinity” concept; instead, there exists a whole collection of things called “infinite cardinal numbers”.

Can a no have infinite factors?

No, numbers do not have INFINITE factors.

Is infinity greater than real numbers?

The most interesting thing about infinity is – ∞ < x < ∞, which is the mathematical shorthand for the negative infinity which is less than any real number and the positive infinity which is greater than the real number. Here, “x” represents the real number.

Is there any number that is more than infinity?

There are no numbers bigger than infinity, but that does not mean that infinity is the biggest number, because it’s not a number at all. For the same reason, infinity is neither even nor odd. Is a googolplex number bigger than infinity? Almost inevitably, at this point someone proffers an even bigger number, “googolplex.”

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Are prime numbers really infinite?

The number of primes is infinite. Th e first ones are: 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37 and so on. The first proof of this important theorem was provided by the ancient Greek mathematician Euclid. His proof is known as Euclid’s theorem.

What number comes before Infinite?

Numbers only come before infinity . It doesn’t have an additive order either, although it behaves like: (infinity + number) = infinity, and (infinity + infinity) = infinity, and so on.