Consider the number, N 5768P02Q
If N is divisible by 4, them find the ordered pairs of (P,Q).

Consider the number, N 5768P02Q If N is divisible by both 8 and 9 , then find the number of possible ordered pairs of (P,Q).

Consider the number, N 5768PO2Q If P = 2 and the number N is divisible by 3, them find number of possible values of Q.

If r,s,t are prime numbers and p,q are the positive integers such that LCM of p,q is r^2t^4s^2 , then find the number of ordered pair (p,q).

lf r, s, t are prime numbers and p, q are the positive integers such that their LCM of p,q is r^2 t^4 s^2, then the numbers of ordered pair of (p, q) is (A) 252 (B) 254 (C) 225 (D) 224

Two pairs of statements p and q are given below . Combine theses two statements using the biconditional phrase "if and only if " . p : If the sum of digits in a positive integer n is divisible by 9 , then the number is divisibel by 9 q : If a positive integer n is divisible by 9 , then the sum of the digits in n is divisible by 9 .

If P = {4. 5},'Q = {7}. find the defined relations from P to Q.

Consider the elements N, P, O, S. Arrange them increasing order of Electron affinity

Consider a number N=21P53Q4 .Number of ordered pairs (P,Q) so that the number 'N' is divisible by 9, is

Consider a number N=21P53Q4. Number of ordered pairs (P,Q) so that the number 'N' is divisible by 44, is

Prove that if rlt=slt=n ,t h e n^n P_s is divisible by ^n P_r .