`5^(17) + 5^(18) + 5^(19) + 5^(20)` is divisible by

19^(5)+21^(5) is divisible by

Divisibility by 5

Which of the following is/are true? (i) 43^(3)-1 is divisible by 11 (ii) 56^(2)+1 is divisible by 19 (iii) 50^(2)-1 is divisible by 17 (iv) (729)^(5)-729 is divisible by 5

For all n inN,3*5^(2n+1)+2^(3n+1) is divisible by (A) 19 (B) 17 (C) 23 (D) 25

For all nN,3xx5^(2n+1)+2^(3n+1) is divisible by 19 b.17 c.23d.25

Let S={(a,b): a,binZ,0lea,ble18} . The number of elements (x ,y) in Such that 3x+4y+5 is divisible by 19 is

The sum of series (2^19 + 1/2^19) + 2(2^18 + 1/2^18 ) +3 (2^17 + 1/2^17) + …. + (19) (2+1/2) + 20 is :

If S = (7)/(5) + (9)/(5^(2)) + (13)/(5^(3)) + (19)/(5^(4)) + …., then 160 S is equal to ________ .

Unit's digit of (17)^(18)+(18)^(19)+(19)^(20) is