If `6^n - 5^n` always end with a digit, where n is any natural number, then the desired digit is

If n is any natural number, then 9^(n)-5^(n) ends with

Check whether 15^(n) can end with digit zero for any natural number n.

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

What is the last digit of 3^(3n)+1, where n is a natural number?

Assertion (A): 6^(n) ends with the digit zero where n is a natural number. Reason (R):Any number ends with digit zero, if its prime factor is of the form 2^(m)xx5^(n) , where m,n are natural numbers.

Check whether 12^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.

n-digit number

Show that 12^(n) cannot end with the digits 0 or 5 for any natural number n