Number n is selected from the set {1,2, ….200}. and the number `2^(n)+3^(n)+5^(n)` is formed. Find the total number of ways of selecting n so that the formed number is divisible by 4

n is selected from the set {1,2,3,............,100} and the number 2^(n)+3^(n)+5^(n) is formed.Total number of ways of selecting n so that the formed number is divisible by 4 is equal to (A)50(B)49(C)48 (D) None of these.

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

Total number of ways of selecting two numbers from the set {1,2,3,...,90} so that their sum is divisible by 3, is

Find the total number of function from a set A to B where n(A)=3 and n(B)=4

the total number of ways of selecting two number from the set {1,2,3,4,…..3n} so that their sum divisible by 3 is equal to -

.If the numbers n-2,4n-1 and 5n+2 are in A.P. then find the value of n

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