- Who invented the 0?
- What is the highest number?
- What is 2 to the infinity?
- What’s more than infinity times infinity?
- Why any number divided by 0 is infinity?
- Is 1 divided by infinity?
- Who Found 0 in India?
- What is 3 divided by infinity?
- Who is the father of mathematics?
- Is infinity minus 1 still infinity?
- Who found pi?
- Can Infinity be calculated?
- Is there anything over infinity zero?
- What is value of infinity?

## Who invented the 0?

MayansThe first recorded zero appeared in Mesopotamia around 3 B.C.

The Mayans invented it independently circa 4 A.D.

It was later devised in India in the mid-fifth century, spread to Cambodia near the end of the seventh century, and into China and the Islamic countries at the end of the eighth..

## What is the highest number?

The biggest named number that we know is googolplex, ten to the googol power, or (10)^(10^100). That’s written as a one followed by googol zeroes.

## What is 2 to the infinity?

And here we can prove it as follows.. Here look the infinity means a very very large quantity that means unreachable quantity so simply, {something}^infinity= a very very large quantity(unreachable) that means infinity. So clearly 2^infinity=infinity.

## What’s more than infinity times 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.

## Why any number divided by 0 is infinity?

Infinity is not a real number, and even if it were, it wouldn’t be the answer to dividing something by zero. There is no number that you can multiply by 0 to get a non-zero number. There is NO solution, so any non-zero number divided by 0 is undefined.

## Is 1 divided by infinity?

Infinity is a concept, not a number; therefore, the expression 1/infinity is actually undefined. In mathematics, a limit of a function occurs when x gets larger and larger as it approaches infinity, and 1/x gets smaller and smaller as it approaches zero.

## Who Found 0 in India?

AryabhataArab merchants encountered the zero in India and carried it to the West. What is widely found in textbooks in India is that a mathematician and astronomer, Aryabhata, in the 5th century used zero as a placeholder and in algorithms for finding square roots and cube roots in his Sanskrit treatises.

## What is 3 divided by infinity?

Zero3 / Infinity is Zero, assuming that you treat Infinity as a Number. 3 / Infinity also could be an extremely small Infinitesimal, close to Zero. However, all this is theoretical. You might say that any natural number divided by infinity Tends to Zero.

## Who is the father of mathematics?

ArchimedesArchimedes is for sure considered to be the most prominent father of mathematics. His most significant works include: “On the Equilibrium of Planes” (two volumes) “On the Measurement of a Circle”

## Is infinity minus 1 still infinity?

Infinity is uncountable. It is not defined. When there is no particular numerical value for infinity, this operation of infinity minus one can’t really be performed as it is illogical. So the answer still remains infinity.

## Who found pi?

Archimedes of SyracuseThe Egyptians calculated the area of a circle by a formula that gave the approximate value of 3.1605 for π. The first calculation of π was done by Archimedes of Syracuse (287–212 BC), one of the greatest mathematicians of the ancient world.

## Can Infinity be calculated?

Infinity is not a real number, it is an idea. An idea of something without an end. Infinity cannot be measured.

## Is there anything over infinity zero?

The limit at infinity is the height of the horizontal asymptote. … A number over zero or infinity over zero, the answer is infinity. A number over infinity, the answer is zero. 0/0 or ∞/∞, use L’Hôpital’s Rule.

## What is value of infinity?

INFINITY (∞) … When we say in calculus that something is “infinite,” we simply mean that there is no limit to its values. Let f(x), for example, be. . Then as the values of x become smaller and smaller, the values of f(x) become larger and larger.