The greatest integer which divides the number `101^(100)-1` is:

The greatest positive integer, which divides (n+1)(n+2)(n+3)(n+4) for all n in N is

Find the largest number which divides 650 and 1170.

Let [cdot] denote the greatest integer function, then the value of int_(0)^(1.5)x [x^2] dx is :

If f (x) = x - [x], x (ne 0 ) in R, where [x] is the greatest integer less than or equal to x, then the number of solutions of f(x) + f ((1)/(x)) = 1 is :

If [x] stands for the greatest integer function, then the value of : [(1)/(2)+(1)/(1000)]+[(1)/(2)+(2)/(1000)]+.....+[(1)/(2)+(99)/(1000)] is :

If [x] denote the greatest integer function , then , int_(0)^(pi//6) (1 - cos 2x)/(1 + cos 2x) d(x - [x]) =

The greatest integer function a not differentiable at integral points give reason.

If [x] denotes the greatest integer function, then : ""_(2)^(4)([x] - 1)([x] -2)([x] - 3)([x] - 4)dx =

If [x] represents the greatest integer function and f(x)=x-[x]-cos x" then "f^(1)(pi/2)=

101^(100)-1 is divisible by