If `5^(97)` is divided by 52, the remainder obtain is a)3 b)5 c)4 d)0

When 2^(1505) is divided by 9, the remainder is a)8 b)7 c)5 d)6

10^(n) +3(4^(n+2) )+5 is divisible by (n in N): a)7 b)5 c)9 d)17

Find the remainder when 7^(98) is divided by 5.

Find the remainder when 6^(n)-5n is divided by 25.

Ifa,b,c are vectors such that a + b + c = 0 and | a | = 7, | b | = 5,| c | = 3, then the angle between c and b is a) pi//3 b) pi//6 c) pi//4 d) pi

Mean of 10 observations is 50 and their standard deviation is 10. If each observation is subtracted by 5 and then divided by 4, then the new mean and standard deviation are a) 22.5, 2.5 b) 11.25, 2.5 c) 11.5, 2.5 d) 11,2.5

If a + 2b - c = 0 and a xx b + b xx c + c xx a = lambda (a xx b) , then the value of lambda is equal to a)5 b)4 c)2 d)-2

Write the sequence of numbers which leaves the remainder 3 on dividing by 5 and 10.

IF A=[{:(1,2),(3,5):}] then the value of the determinant [A^(2009)-5A^(2008)] is a)-6 b)-5 c)-4 d)4

The algébraic form of an arithmetic sequence is 5n+3. a) What is the first term of the sequence? b) What will be the remainder if the terms of the sequence are divided by 5?