The last four digits of the natural number `3^100` are

The last two digits of the number 3^(400) are: (A) 81 (B) 43 (C) 29 (D) 01

The last two digits of the number (23)^(14) are 01 b. 03 c. 09 d. none of these

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

Sum of last three digits of the number N=7^(100)-3^(100) is.

Find the sum of first 100 natural numbers.

Check whether 3^n can end with the digit 0 for any natural number n.

Check whether 6^n can end with the digit 0 for any natural number n.

Check whether 4^n can end with the digit 0 for any natural number n.

Statement 1 The difference between the sum of the first 100 even natural numbers and the sum of the first 100 odd natural numbers is 100. Statement 2 The difference between the sum opf the first n even natural numbers and sum of the first n odd natural numbers is n.

Take two digits,2 and 3from them make greatest four digit number,using both the digits equal number of time.