## Is 0 divided by 0 undefined or infinity?

undefined

The thing is something divided by 0 is always undefined because the value has not been defined yet. So, when do we say this something divided by 0 is infinity? Of course, we have seen these a lot of time but why do we say this? Well, something divided by 0 is infinity is the only case when we use limit.

**Does zero in the division makes the answer undefined?**

The reason that the result of a division by zero is undefined is the fact that any attempt at a definition leads to a contradiction.

### What does it mean for 0 0 to be indeterminate?

When calculus books state that 00 is an indeterminate form, they mean that there are functions f(x) and g(x) such that f(x) approaches 0 and g(x) approaches 0 as x approaches 0, and that one must evaluate the limit of [f(x)]g(x) as x approaches 0.

**Will division by zero ever be defined?**

In case of division by 0, the answer would be none unless a = 0. What I wanna say, is that 1/0 doesn’t exists and thus cannot be defined.

## Can you divide zero?

Any number multiplied by zero equals zero. The rule we’re learning about today might sound like the opposite of that last one: You can’t divide any number by zero.

**When 0 is divided by a number the quotient is?**

always 0

Zero divided by any number is always 0.

### When 0 is divided by any number the quotient is?

0

For example, if zero is to be divided by any number, this means 0 items are to be shared or distributed among the given number of people. So, in this case, there are no items to be shared, hence, no one will get any item. Hence, 0 divided by any divisor gives 0 as the quotient.

**Why is division by zero not allowed?**

The short answer is that 0 has no multiplicative inverse, and any attempt to define a real number as the multiplicative inverse of 0 would result in the contradiction 0 = 1. Some people find these points to be confusing. These notes may be useful for anyone with questions about dividing by 0.

## What is undefined in math?

Broadly speaking, undefined means there is no possible value (or there are infinite possible values), while indeterminate means there is no value given the current information.

**Is 1 divided by 0 infinity or undefined?**

But the limit of some expressions may take such forms when the variable takes a certain value and these are called indeterminate. Thus 1/0 is not infinity and 0/0 is not indeterminate, since division by zero is not defined.

### Is undefined equal to zero?

Loosely speaking, since division by zero has no meaning (is undefined) in the whole number setting, this remains true as the setting expands to the real or even complex numbers. As the realm of numbers to which these operations can be applied expands there are also changes in how the operations are viewed.

**When zero is divided by any other number the is always zero?**

Explanation: Zero divided by any number is always 0. 0/1 = 0, whereas, 1/0 is not defined. For example, if zero is to be divided by any number, this means 0 items are to be shared or distributed among the given number of people.

## Why is it impossible to divide by zero?

**Is 0 divided by 3 defined?**

0 divided by 3 is 0. In general, to find a ÷ b, we need to find the number of times b fits into a. When we are dividing zero by a… See full answer below.

### What happens if you ask Siri to divide 0 by 0?

“What is zero divided by zero?” If you ask Siri this question in the iOS 8 operating system, the iPhone’s virtual assistant will cleverly tell you that you’re making no sense. “Imagine that you have zero cookies,” Siri’s response begins, “and you split them evenly among zero friends.

**Is 0 divided by infinity indeterminate?**

Thus f(x)/g(x) must also approach zero as x approaches a. If this is what you mean by “dividing zero by infinity” then it is not indeterminate, it is zero.

## What happens if you ask Siri 0 divided by 0?

**Can you divide by zero Why or why not?**

These notes discuss why we cannot divide by 0. The short answer is that 0 has no multiplicative inverse, and any attempt to define a real number as the multiplicative inverse of 0 would result in the contradiction 0 = 1.