1.1111
3, since 3*9 = 27 = 1 (mod 26)
The Answer:The multiplicative inverse is the reciprocal of the said number, and (-7)-1 = -1/7. Now, adding 9 to -1/7 is basically doing this: (-1/7 + 9) commutes to = (9 - 1/7) = 8 6/7 or 62/7.
Definition of Inverse OperationTwo operations are said to be Inverse to each other if one operation undoes the effect of the other operation.More about Inverse OperationAddition and subtraction are inverse operations of each other.Multiplication and division are inverse operations of each other.Examples of Inverse OperationThe inverse operation of "10 + 9 = 19" is "19 - 9 = 10", or vice-versa.The inverse operation of "7 × 9 = 63" is "63 ÷ 9 = 7", or vice-versa.Solved Example on Inverse OperationQ. The inverse operation for 14 × 4 = 56. A. 56 ÷ 4 = 14
+7/9, positive seven over nine.
-9; the multiplicative inverse: -1/9
1.1111
-9/4
9/5
1/9
The multiplicative inverse for the number x is the number 1/x, such that their product is 1. The name for a multiplicative inverse is the reciprocal (opposite).The multiplicative inverse of a fraction is found by making the numerator the denominator and the denomination the numerator, such that the reciprocal of 3/4 would be 4/3. You are simply "flipping the fraction over."Dividing by a fraction is the same as multiplying by its inverse, or reciprocal.Example: 6 divided by 2/3 = 6 times 3/2 = 18/2 = 9so that are 9 two-thirds sections in 6 wholes.
negative 9.
If you mean each side of 9 then the integers or whole numbers are 8 and 10
3, since 3*9 = 27 = 1 (mod 26)
The Answer:The multiplicative inverse is the reciprocal of the said number, and (-7)-1 = -1/7. Now, adding 9 to -1/7 is basically doing this: (-1/7 + 9) commutes to = (9 - 1/7) = 8 6/7 or 62/7.
Let A and B be any two numbers such that AB=1. An example would be 1 and 1/9.We say that A is the multiplicative inverse of B. Similarly we say that B is the multiplicative inverse of A.
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