" The product of three consecutive integers is divisible by : "

Consider the following statements: 1. The product of any three consecutive integers is divisible by 6. 2. Any integer can be expressed in one of the three forms 3k,3k+1,3k+2 where k is an integer Which of the above statements is/are correct

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 integers is divisible by 2. Is this statement true or false. Give Reason?

The product of two consecutive integers is divisible by 2. Is this statement true or false. Give Reason?

" The product of three consecutive positive integers is divisible by "