Home
Class 12
MATHS
If S=1!+4!+7!+10!+ . . .+400!, then Q....

If `S=1!+4!+7!+10!+ . . .+400!,` then
Q. The last two digits in the number S is divisible by

A

4

B

6

C

5

D

7

Text Solution

Verified by Experts

The correct Answer is:
B
Promotional Banner

Topper's Solved these Questions

  • BINOMIAL THEOREM

    AAKASH INSTITUTE ENGLISH|Exercise Assignment (section-E) Objective type question (Assertion-Reson Type Questions)|6 Videos

  • BINOMIAL THEOREM

    AAKASH INSTITUTE ENGLISH|Exercise Assignment (section-G) Objective type question (Integer Answer Type Questions)|1 Videos

  • BINOMIAL THEOREM

    AAKASH INSTITUTE ENGLISH|Exercise Assignment (section-C) Objective type question (More than one correct answer)|15 Videos

  • APPLICATION OF INTEGRALS

    AAKASH INSTITUTE ENGLISH|Exercise Assignment Section - I Aakash Challengers Questions|2 Videos

  • COMPLEX NUMBERS AND QUADRATIC EQUATIONS

    AAKASH INSTITUTE ENGLISH|Exercise section-J (Aakash Challengers Qestions)|13 Videos

Similar Questions

Explore conceptually related problems

If S=1!+4!+7!+10!+ . . .+400!, then Q. The last two digits in (1!+4!+7!)! is

The last two digits of the number 19^(9^(4)) is

The last two digits of the number 19^(9^(4)) is

How many two digit numbers are divisible by 4?

How many two digit numbers are divisible by 3?

Find the last two digits of the number 27^(27)dot

Write last two digits of the number 3^(400)dot

Write last two digits of the number 3^(400)dot

How many two–digit numbers are divisible by 3?

How many two–digit numbers are divisible by 3?