If p and q are distinct integers such that `2005 + p = q^2` and `2005 + q = p^2` then the product p.q is.

P and q are positive numbers such that p^q =q^p and q =9p . The value of p is

p and q are two integers such that p is the successor of q. Find the value of p - q.

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)?

P ** q = p^2 - q^2 p $ q = p^2 - q^2 p $ q = p^2 + q^2 p @ q = pq + p + q p Delta q = Remainder of p/q p © q = greatest integer less than or equal to p/q . If p = 8 and q = 10 , then the value of [(p $ q) Delta (p @ q)] ** [(q ** p) @ (q © p)] is :

P ** q = p^2 - q^2 p % q = p^2 - q^2 p $ q = p^2 + q^2 p @ q = pq + p + q p Delta q = Remainder of p/q p © q = greatest integer less than or equal to p/q . If p = 11 and q = 7 , then the value of (p ** q) @ (p $ q) is: