IF `(a^b)^c`=729`, then find the minimum possible value of `a+b+c` (where a,b and c are positive integers).

If a^(b)=256 , then find the maximum possible value of a.b, where a and b are positive integers.

Find the minimum value of ax+by, where xy=c^(2) and a,b,c are positive.

If a^(b^(t))=6561 ,then find the least possible value of (a.b.c), where a,b and c are integers.

The number of (a, b, c), where a, b, c are positive integers such that abc = 30, is

If 49392=a^(4)b^(2)c^(3), find the value of a,b and c, where a,b and c are different positive primes.

Is the average of a, b and c equal to b? I. b-a=c-b II. A.b and c are positive integers.

Suppose that a parabola y=ax^(2)+bx+c where a>0 and (a+b+c) is an integer has vertex ((1)/(4),-(9)/(8)). If the minimum positive value of 'a' can be written as (p)/(q) where p and q are relatively prime positive integers, then find (p+q).