The sum of last 3 digits of 3^100 is...

The sum of last 3 digits of `3^100` is

`1`

`2`

`3`

`4`

Text Solution

Verified by Experts

The correct Answer is:

`(a)` We have
`3^(100)=(3^(4))^(25)`
`=(81)^(25)`
`=(80+1)^(25)`
`=^(25)C_(0)*(80)^(25)+^(25)C_(1)*(80)^(24)+....+^(25)C_(22)(80)^(3)+^(25)C_(23)(80)^(2)+^(25)C_(24)(80)+^(25)C_(25)`
`=10^(3)['^(25)C_(0)8^(25)xx10^(22)+^(25)C_(1)xx8^(24)xx10^(21)+...+^(25)C_(2)xx8^(3)]+(25xx24)/(2)xx(80)^(2)+25xx80+1`
`=10^(3)m+1920000+2000+1`, where `m in N`
Thus, last three digits of `3^(100)` are `001`,

Similar Questions

Explore conceptually related problems

What is the last digit of 6^(100) .

If 6^83+8^83 is divided by 49, then the sum of the digits of remainder is

The sum of the two digits of a two digits' number is 9. if the digits are interchanged, then the number thus obtained is 27 more than the original number. Find the number.

Find the truth value of each of the following compound statements : If the five -digit naturals 54732 is divisible by 3 , then the sum of the digits in 54732 is not divisible by 3 .

A two digits number is 3 times of the sum of its digits. If the digits are interchanged, then the number thus obtained is 9 less than 3 times of the original number. Find the number.

Write the component statements of each of the folloing compound statements : If the number 73452 is divisible by 3 , then the sum of the digits in 73452 is divisible by 3 .

Determine the truth of falsity (i.e , the truth value ) of each of the following if - then implications : If the six- digit natural number 718326 is divisible by 3 , then the sum of the digits in 718326 is divisible by 3

Determine the truth of falsity (i.e , the truth value ) of each of the following if - then implications : If the six- digit natural number 718324 is divisible by 3 , then the sum of the digits in 718324 is divisible by 3

The sum of last 3 digits of `3^100` is

Text Solution

Similar Questions

Recommended Questions