SOLUTION: Two positive integers M and N are defined to be relatively prime if GCF(M, N) = 1. Which two pairs are numbers below are relatively prime?
a. 17 and 51
b. 6 and 25
Algebra.Com
Question 53043: Two positive integers M and N are defined to be relatively prime if GCF(M, N) = 1. Which two pairs are numbers below are relatively prime?
a. 17 and 51
b. 6 and 25
c. 18 and 45
d. None of the above. In order for two numbers to be relatively prime, at least one of them has to be prime
Found 2 solutions by consc198, math_iz_hard:
Answer by consc198(59) (Show Source): You can put this solution on YOUR website!
a. 17 and 51
Answer by math_iz_hard(8) (Show Source): You can put this solution on YOUR website!
a) 17 & 51
RELATED QUESTIONS
Two positive integers are relatively prime if they have no common factor other than 1.... (answered by math_helper)
Ten points in the plane are given, with no three collinear. Four
distinct segments... (answered by CPhill)
'm' and 'n' are two whole numbers where m (power 'n')=121, then (m-n)power... (answered by Fombitz)
The number of all pairs (m,n) are positive integers such that 1/m + 1/n + 1/mn = 2/5... (answered by MathLover1,ikleyn)
If m and n are odd integers, which of the following must also be an odd integer?... (answered by Alan3354)
If M and N are 2 positive numbers and M>N, which of the following expressions is the... (answered by ikleyn)
If the greatest common divisor of two integers is 1, then we say those two integers are... (answered by Edwin McCravy)
Find couples m and n if mn-1|n^3-1. Numbers m and n are positive and elements of set... (answered by Edwin McCravy)
Transform the statement below in its logical form
Determine the truth or falsity of the... (answered by Alan3354)