- What is the multiplicative inverse of 3 2?
- What is the multiplicative inverse of 5 7?
- Which number has no multiplicative inverse?
- What is the multiplicative inverse of 2?
- What is the multiplicative inverse of 3 by 7?
- What is the multiplicative inverse of 5 6?
- What is the multiplicative inverse of 0?
- What is the multiplicative inverse of /- 5?
- What’s the multiplicative inverse of 3?
- What is the inverse of 1 2?
- What is the multiplicative inverse of 4?
- What is an inverse relationship?
- How do you find the multiplicative inverse?
- Does 0 have an additive inverse?
- What is the multiplicative inverse of 6?
- What is the inverse of 5 8?
- What is the multiplicative inverse of 0 by 1?
- How do you find the inverse?

## What is the multiplicative inverse of 3 2?

the multiplicative inverse of -2/3 is -3/2..

## What is the multiplicative inverse of 5 7?

The multiplicative inverse of 5/7 is 7/5 = 1 2/5.

## Which number has no multiplicative inverse?

0In multiplication 0 is not countable – So , 0 is the number which doesn’t have multiplicative Inverse.

## What is the multiplicative inverse of 2?

1/2 is the multiplicative inverse of 2.

## What is the multiplicative inverse of 3 by 7?

The multiplicative inverse of a number is the number by which when we multiply that number then final result is 1. Let , multiplicative inverse of ( -3/7 ) is x.

## What is the multiplicative inverse of 5 6?

So your answer is (5/6). Now the multiplicative inverse is the reciprocal. A reciprocal is a fraction flipped upside down. So in this problem, the multiplicative inverse of -(5/6) is -(6/5).

## What is the multiplicative inverse of 0?

infinityWhat is the multiplicative inverse of 0? The multiplicative inverse of 0 is infinity. The number 0 does not have reciprocal because the product of any number and zero is equal to zero.

## What is the multiplicative inverse of /- 5?

Answer and Explanation: The multiplicative inverse of 5 is 1/5. The multiplicative inverse property states that any number a multiplies with its reciprocal, 1/a, to give 1….

## What’s the multiplicative inverse of 3?

Answer and Explanation: The multiplicative inverse of 3 is 1/3. In general, we find the multiplicative inverse of a number using the multiplicative inverse property which is…

## What is the inverse of 1 2?

The multiplicative inverse of 1/2 is 2.

## What is the multiplicative inverse of 4?

The multiplicative inverse of 4 is 1/4.

## What is an inverse relationship?

An inverse relationship is one in which the value of one parameter tends to decrease as the value of the other parameter in the relationship increases. It is often described as a negative relationship.

## How do you find the multiplicative inverse?

One solution is as follows:Use the extended Euclidean algorithm to compute k−1, the modular multiplicative inverse of k mod 2w, where w is the number of bits in a word. … For each number in the list, multiply it by k−1 and take the least significant word of the result.

## Does 0 have an additive inverse?

The number 0 is the only number with its additive inverse being itself. That is, the additive inverse of 0 is 0.

## What is the multiplicative inverse of 6?

Answer and Explanation: The multiplicative inverse of 6 is 1/6. We use the multiplicative inverse property to help us find the multiplicative inverse of a number, also…

## What is the inverse of 5 8?

Basically multiplicative inverse mean the same as reciprocal. Therefore the multiplicative inverse of 5/8 is 8/5.

## What is the multiplicative inverse of 0 by 1?

The multiplicative inverse of ‘0’ is undefined ( not defined ) The inverse property of multiplication tells us that when we multiply a number by its inverse (also called its reciprocal), the product is one. For the multiplicative inverse of a real number, divide 1 by the number.

## How do you find the inverse?

Finding the Inverse of a FunctionFirst, replace f(x) with y . … Replace every x with a y and replace every y with an x .Solve the equation from Step 2 for y . … Replace y with f−1(x) f − 1 ( x ) . … Verify your work by checking that (f∘f−1)(x)=x ( f ∘ f − 1 ) ( x ) = x and (f−1∘f)(x)=x ( f − 1 ∘ f ) ( x ) = x are both true.