What is the multiplicative inverse of − 1?
1
The multiplicative inverse of 1 is 1.
What is multiplicative inverse of 1x?
Answer: Multiplicative inverse of 1/x is x.
What is the multiplicative of 1?
itself
According to the multiplicative identity property of 1, any number multiplied by 1, gives the same result as the number itself. It is also called the Identity property of multiplication, because the identity of the number remains the same.
What is the multiplicative inverse of 2 1?
2
The multiplicative inverse of 1/2 is 2.
What is the additive inverse of 1?
Additive Inverse of 1 is “-1” is the correct answer.
What is the multiplicative inverse of 1 2?
Answer: The multiplicative inverse or reciprocal of 1/2 is 2.
What is the multiplicative and additive inverse of 1?
Note that over GF(2), the additive inverse of 1 is 1 because 1+1=0 and the multiplicative inverse of 1 is 1.
What is the multiplicative inverse of minus 1 by 3?
Answer: The answer is of course one third, or 1/3, since: 3 * 1/3 = 1.
Is the answer for multiplicative inverse properties always 1?
Multiplying a number by its reciprocal (the “multiplicative inverse”) is always one. But not when the number is 0 because 1/0 is undefined!
Does every real numbers have a multiplicative inverse?
With the exception of zero, reciprocals of every real number are real, reciprocals of every rational number are rational, and reciprocals of every complex number are complex. The property that every element other than zero has a multiplicative inverse is part of the definition of a field, of which these are all examples.
What are examples of inverse property of multiplication?
– The multiplicative inverse of a number is also called its reciprocal. – The product of a number and its multiplicative inverse is equal to 1. – Multiplicative Inverse of a multiplicative inverse gives the original number. For example, multiplicative inverse of 1/5 is 1 1 5 1 1 5 =5
Does the set of rational numbers have a multiplicative inverse?
Rational numbers have an additive identity of 0 and multiplicative identity of 1. Rational numbers holds true for distributive property also. If the product of two rational number is 1, then the rational number is multiplicative inverse of the other.