The greatest integer by which 1+sum(r=1)...

The greatest integer by which `1+sum_(r=1)^(30)rxxr !` is divisible is a. composite number b. odd number c. divisible by 3 d. none of these

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

The greatest interger by which 1+Sigma_(r=1)^(30) rxxr ! is divisible is

n(n^(2)-1), is divisible by 24 if n is an odd positive number.

Sum of two consecutive odd numbers is always divisible by 4.

2^(2n)+1 where n is odd integer is divisible by

sum_(r=0)^(4) (-1)^(r )""^(16)C_(r) is divisible by :

Find the greatest 3-digit number which is divisible by 16,18 and 24.

What is the greatest integer among the following by which the number 5^(5)+7^(5) is divisible?

Find the sum of all odd numbers of four digits which are divisible by 9 :

Recommended Questions

The greatest integer by which 1+sum(r=1)^(30)rxxr ! is divisible is a....
Text Solution
|
The greatest integer by which 1+sum(r=1)^(30)rxxr ! is divisible is a....
Text Solution
|
The product of the predecessor and successor of an even natural numb...
Text Solution
|
If n is any odd number greater than 1, then n\ (n^2-1) is divisible b...
Text Solution
|
If the square of an odd natural number is divisible by 8, then the ...
Text Solution
|
Which is the greatest 5-digit number exactly divisible by 279? 9960...
Text Solution
|
The greatest interger by which 1+Sigma(r=1)^(30) rxxr ! is divisible...
Text Solution
|
A nine digit number abcdefght is such that a is divisible by 1, ab is...
Text Solution
|
The greatest integer by which 1+sum(r=1)^(30)rxxr ! is divisible is a....
Text Solution
|