The greatest integer which divides the n...

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

A

100

B

1000

C

10000

D

100000

Text Solution

Verified by Experts

The correct Answer is:

C

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

The number 101^(100) -1 is divisible by

If 10^(n) divides the number 101^(100) - 1 , find the greatest value of n

If [ ] denotes the greatest integer function, then [( sqrt2 + 1)^(6)) is equal

The number of discontinuities of the greatest integer function f(x)=[x], x in (-(7)/(2), 100) is equal to

The greatest natural number which divides n(n+1)(2n+1), AA n in N is

The greatest integer n such that (35) divides 2007! is

Recommended Questions

The greatest integer which divides the number (101)^(100)-1 is equal ...
Text Solution
|
The largest number amongst the following that will perfectly divide 10...
Text Solution
|
If 10^m divides the number 101^(100)-1 then, find the greatest value o...
Text Solution
|
If 10^(n) divides the number 101^(100) - 1 , find the greatest v...
Text Solution
|
The greatest integer which divides the number 101^(100)-1 is:
Text Solution
|
That number 101^(100)-1 Divides completely, tell which one.
Text Solution
|
(101)^100-1 সংখ্যাটি নীচের কোনটি দ্বারা বিভাজ্য ?
Text Solution
|
संख्या 101^(100)-1 निम्न में से किस से भाज्य है ?
Text Solution
|
The greatest integer which divides the number 101^100 - 1 is
Text Solution
|