Home
Class 11
MATHS
Consider a number N = 21 P53Q4, then the...

Consider a number `N = 21 P53Q4`, then the number of ordered pairs `(P, Q)` so that the number is divisible by `44` is equal to -

Promotional Banner

Similar Questions

Explore conceptually related problems

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 = 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 = 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=21P53Q4, then the number of ordered pairs (P,Q) so that the N . is divisible by 44 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=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=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=21P53Q4, then the number of ordered paris (P,Q) so that the N . is divisible by 44 is equal to

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

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