For q to be an integer, then any integer can be expressed as a equals to :

For any integer a, what is (-1) x a equal to ?

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.

If [x] is the greatest integer less than or equal to x and (x) be the least integer greater than or equal to x and [x]^(2)+(x)^(2)gt25 then x belongs to

Two positive integers p and q can be expressed as p = ab^(2) and q = a^(3)b, a and b being prime numbers. LCM of p and q is :

For some integer n every odd integer is of the form

Prove that the Greatest Integer Function f: R to R, given by f (x) =[x], is neither one-one nor onto, where [x] denotes the greatest integer less than or equal to x.

If'm ' is any integer, an even integer will be of the form

If two positive integers p and q cui be expressed as p = a^(3)b^(2) and q = ab^(3)c^(2) and a, b, c being prime numbers, then HCF (p, q) is:

If f(x)=ax+b where a and b are integers, f(-1)=-5andf(3)=3 , then a and b are equal to :

If q is some integer, then any positive odd integer is of the form :