4. If two positive integers 'm' and 'n' can be expressed as m = xịy® and n = xy?
where x' and y' are prime numbers, then HCF (m, n) =
b) xy
Answers
Answer:
The value of HCF(m,n) is pq².
Step-by-step explanation:
The HCF of any two number a and b is the highest common factor that divides both number a and b.
Given : Two positive integers m and n are expressible in the form of and , where p,q are prime numbers.
Prime Factorization of m = [∵p,q are prime numbers]
Prime Factorization of n = [∵p,q are prime numbers]
Highest common factor of m and n : HCF (m,n)=
Hence, the HCF(m,n)= pq².
# Learn more :
Find HCF and HCF of 900 and 270
brainly.in/question/4934696
Step-by-step explanation:
The value of HCF(m,n) is pq².
Step-by-step explanation:
The HCF of any two number a and b is the highest common factor that divides both number a and b.
Given : Two positive integers m and n are expressible in the form of and , where p,q are prime numbers.
Prime Factorization of m = [∵p,q are prime numbers]
Prime Factorization of n = [∵p,q are prime numbers]
Highest common factor of m and n : HCF (m,n)=
Hence, the HCF(m,n)= pq².
# Learn more :
Find HCF and HCF of 900 and 270
brainly.in/question/4934696