[" Procre that exery positioe integer different from "1" can be expressed as a product "],[" woe mocrer of "2" and an odd number."]

Prove that every odd integer can be expressed in the form of (q in Z) 4q +- 1

In how many ways 4900 can be expressed as product of 2 positive integers

In how many ways 38808 can be expressed as product of two positive integers.

In how many ways 1587600 can be expressed as product of 2 positive integers.

Statement-1: The smallest positive integer n such that n! can be expressed as a product of n-3 consecutive integers, is 6. Statement-2: Product of three consecutive integers is divisible by 6.

Statement-1: The smallest positive integer n such that n! can be expressed as a product of n-3 consecutive integers, is 6. Statement-2: Product of three consecutive integers is divisible by 6.

Statement-1: The smallest positive integer n such that n! can be expressed as a product of n-3 consecutive integers, is 6. Statement-2: Product of three consecutive integers is divisible by 6.

Statement-1: The smallest positive integer n such that n! can be expressed as a product of n-3 consecutive integers, is 6. Statement-2: Product of three consecutive integers is divisible by 6.

Statement-1: The smallest positive integer n such that n! can be expressed as a product of n-3 consecutive integers, is 6. Statement-2: Product of three consecutive integers is divisible by 6.

" The product of two consecutive positive integers is 30. " This can be expressed algebraically as