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

Check whether 12^n can end with the digit 0 for any natural number n.

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

Show that 9^n cannot end with the digit 2 for any n in N .

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

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

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

Can 15^(n) end with the digit 0 , for any natural number n . Justify your answer .

p^(n)=(axx5)^(n) For p^(n) to end with the digit zero a- ________________ for natural number of n.

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.