inverse operation
Operation, and inverse operation
Inverse operations. Additive inverse is not one operation but they are elements of a set.
The sum of a number and its inverse is 0, because that's what "its inverse" means. Inverse is whatever you need to use to "undo" the operation. For example, (2)+(-2)=0. If you go forward 2, then backward 2, you are where you started.
because you undo the operation in the equation= to undo subtraction you add
inverse operation
Operation, and inverse operation
It is called a INVERSE OPERATION.
Inverse operations.
Inverse operations. Additive inverse is not one operation but they are elements of a set.
To show the inverse operation of Exercise 5, you could demonstrate how to undo the steps of Exercise 5 in reverse order, resulting in the original input. This would help illustrate how the inverse operation undoes the effects of the original operation.
the Inverse Operation. This answer is relative to math, and operations.
An inverse operation is an operation that "undoes" another operation. For example, addition and subtraction are inverse operations, as are multiplication and division. Using inverse operations allows you to reverse the effects of the original operation.
It's called inverse operation. Example: 3x + 4 - 4 The 4s undo each other and you are just left with 3x
Operations that undo each other are called inverse operations. Division is the inverse of multiplication as it undoes the multiplication. eg 3 × 7 = 21; 21 ÷ 7 = 3. Note that there is NO inverse for multiplying by 0.
The sum of a number and its inverse is 0, because that's what "its inverse" means. Inverse is whatever you need to use to "undo" the operation. For example, (2)+(-2)=0. If you go forward 2, then backward 2, you are where you started.
Inverse operations