Question

show that 9n cannot end in 2 for any positive integer n.

Answer 1

if "n" ends with digit zero then it must have 5 as factor in itself but9(3x3 ) cannot contain 5 as a factor therefore it contradict the arithmetic theorem " any composite no. can be represented as product of primes and this factorisation is unique in nature

Answer 2

Answer:

never be zero

Step-by-step explanation: