Consider the nine digit number n = 7 3 `alpha` 4 9 6 1 `beta` 0. The number of ordered pairs `(alpha,beta)` for which the given number is divisible by 88, is

Consider the nine digit number n = 7 3 alpha 4 9 6 1 beta 0. The number of possible values of (alpha+beta) for which the given number is divisible by 6, is

Consider the nine digit number n = 7 3 alpha 4 9 6 1 beta 0. If q is the number of all possible values of beta for which the given number is divisible by 8, then q is equal to

Consider the nine digit number n = 7 3 alpha 4 9 6 1 beta 0. The number of possible values of beta for wich i^(N) = 1 ("where " i=sqrt-1) ,

Consider the nine digit number n = 7 3 alpha 4 9 6 1 beta 0. If p is th number of all possible distinct values of (alpha-beta) , then P is equal to

Consider a number N=21 P 5 3 Q 4. The number of ordered pairs (P,Q) so that the number' N' is divisible by 9, is

Consider a number N = 2 1 P 5 3 Q 4. The number of ordered pairs (P,Q) so that the number 'N' is divisible by 44, is

Consider a number n=21 P 5 3 Q 4. The number of values of Q so that the number 'N' is divisible by 8, is

Determine the smallest 3-digit number which is exactly divisible by 6 and 12.

Statement-1: A 5-digit number divisible by 3 is to be formed using the digits 0,1,2,3,4,5 without repetition, then the total number of ways this can be done is 216. Statement-2: A number is divisible by 3, if sum of its digits is divisible by 3.

A five-digit number is formed by the digit 1, 2, 3, 4, 5 without repetition. Find the probability that the number formed is divisible by 4.