What is the multiplicative inverse of 2 by 8?
Given: Additive inverse of 2/8 Additive inverse of 2/8 = -2/8.
What is a multiplicative inverse of 8?
Multiplicative inverse of a Natural Number Thus, the multiplicative inverse of 8 is 1⁄8.
What is the multiplicative of 8?
1/8
What number can we multiply to 8 to get 1 (the multiplicative identity) as the answer? So, the multiplicative inverse of 8 is 1/8!
What is the multiplicative inverse of 8 8?
The multiplicative inverse of 8 is 18 .
What is the multiplicative inverse of 2 5?
5/2
The multiplicative inverse of 2/5 is 5/2.
What is the multiplicative inverse of 2 3?
The multiplicative inverse of (2/-3) is (-3/2).
How do you find multiplicative inverse?
Think about what a number needs to be multiplied by in order for the product of the two numbers to equal 1. To find the multiplicative inverse of a the given number, find the reciprocal of that number. The resulting number is the multiplicative inverse.
What is the multiplicative inverse of 3 by 5?
5/3
Answer: The multiplicative inverse or reciprocal of 3/5 is 5/3.
What is the multiplicative inverse of 2 by 3?
What is the multiplicative inverse of 2/5 − 2?
Answer: the multiplicative inverse of 2/5 is 5/2.
What is the multiplicative inverse of 2 /- 9?
Answer Expert Verified Thus, multiplicative inverse of -2/9 will be -9/2.
What is the multiplicative inverse of 4 in GF2 8?
Multiplicative inverse in GF (2 8) The multiplicative inverse of 4 is 1/4, because 4 ∗ (1/4) = 1. In modulo arithmetic, the problem is more complicated 4 ∗ x ≡ 1 mod ( 7) This equation is equivalent to finding x and k such that 4 ∗ x = 7 k + 1 where both x and k are integers.
What is the multiplicative inverse of 4?
The multiplicative inverse of 4 is 1/4, because 4 ∗ (1/4) = 1. In modulo arithmetic, the problem is more complicated 4 ∗ x ≡ 1 mod ( 7) This equation is equivalent to finding x and k such that 4 ∗ x = 7 k + 1 where both x and k are integers.
How do you find the multiplicative inverse in Galois field?
Finding the multiplicative inverse of an element in Galois Field ( p ), GF ( p) for small values of p such as 5 or 7 is no problem. One can find the multiplicative inverse by constructing multiplication tables and establish the desired value directly.
How do you find the multiplicative inverse of a modulo?
Specially, the algorithm can determine the multiplicative inverse of b ( x) modulo a ( x) if the degree of b (x] is less than the degree of a (x) and gcd [ a ( x ), b ( x )] = 1. The algorithm given below is based on the basic equation: a = qb + r [11].