If two positive integers 'm' and 'n' can be expressed as `m=ab^(2)` and `n=a^(3)b, a,b` being prime numbers, then find L.C.M. (m, n).

If two positive integers p and q can be expressed as p=ab^(2) and q=a^(3)b,a,b being prime numbers, then LCM (p,q) is

If two positive integers m and n are expressible as as m = ab^(2) and n = a^(3) b , where a and b are prime numbers, then find LCM (m, n)

Two positive integers p and q can be expressed as p=ab^(2) and q=a^(2)b, and b are prime numbers.what is L.C.M of p and q.

If two positive integers p and q can be expressed as p=ab^2 and q=a^3b where a and b are prime numbers, then the LCM (p,q) is

If two positive integers m and n are expressible in the form m=pq^(3) and n=p^(3)q^(2), where p,q are prime numbers, then HCF(m,n)=pq(b)pq^(2)(c)p^(3)q^(3)(d)p^(2)q^(3)

If m^n - n^m = (m + n), (m, n) in prime numbers, then what can be said about m and n:

Find two positive number m and n such that their sum is 35 and the product m^(2)n^(5) is maximum.

If m and n are positive integers and (m – n) is an even number, then (m^(2) - n^(2)) will be always divisible by

If m^(n)-n^(m)=(m+n),(m,n)in prime numbers,then that can be said about m and n :