[" 14.If "2" positive integers "p" and "...

[" 14.If "2" positive integers "p" and "q" can be expressed as "p=ab^(2)" and "q=a^(3)b,],[" where a and "b" are distinct primes,then "LCM(p,q)" is "],[[" a."a^(3)b^(2)," b.ab "," c."ab^(2)," d."a^(3)b]]

Similar Questions

Explore conceptually related problems

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 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

Two positive integers p and q can be expressed as p = ab^(2) and q = a^(3)b, a and b being prime numbers. LCM of p and q is :

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 cui be expressed as p = a^(3)b^(2) and q = ab^(3)c^(2) and a, b, c being prime numbers, then HCF (p, q) is:

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

If two positive integers P and q can be expressed as p=a^2b^3 and q=a^4 b,ab being prime numbers then LCM (p,q) is……

Two positive integers p and q are expressible as p=a^(3)b and q=ab^(2) . Find the HCF (p,q) and LCM(p,q).

If two positive integers p and q are written as p=a^(2)b^(3) and q=a^(3)b;a,b are prime numbers,then verify: LCM(p,q)xHCF(p,q)=pq

If p and q are positive integers such that p=ab^2 and q=a^3b ,where a,b are prime numbers then LCM (p,q) is