(xn+yn) is divisible by (x-y):

The greatest number that will divide 63, 138 and 228 so as to leave the same remainder in each case:

Find the largest number, smaller than the smallest four-digit number, which when divided by 4,5,6 and 7 leaves a remainder 2 in each case.

What is the highest power of 5 that divides 90 x 80 x 70 x 60 x 50 x 40 x 30 x 20 x 10?

If a and b are natural numbers and a-b is divisible by 3, then a3-b3 is divisible by:

What is the greatest positive power of 5 that divides 30! exactly?

In how many ways can a number 6084 be written as a product of two different factors ?

What is the smallest four-digit number which when divided by 6, leaves a remainder of 5 and when divided by 5 leaves a remainder of 3?

P is an integer. P>883. If P-7 is a multiple of 11, then the largest number that will always divide (P+4) (P+15) is:

Let C be a positive integer such that C + 7 is divisible by 5. The smallest positive integer n (>2) such that C + n2 is divisible by 5 is: