The number of non-negative integers 'n' satisfying `n^2 = p+q` and `n^3 = p^2+ q^2` where p and q are integers

Express 0.3178 is the form of p/q where p and q are integers

P and Q are two positive integers such that P = p^(3)q ? and Q = (pq)^(2) , where p and q are prime numbers. What is LCM(P, Q)?

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

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

Express 3.bar(2) in the form (p)/(q) where p and q are integers and q!=0

Express: 2.015 in the (p)/(q) form,where p and q are integers and q!=0

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)

Express 0.2bar(35) in the form p/q where p and q are integers and q ne 0 .

Express the following in the form p/q , where p and q are integers and q ne0 . 0.2