The exponets of the varibles of a polynomial must be _____ integers.

If the value of ax^2+bx+c is always an integer for integral values of x where a, b, c are rationals then a+b must be an integer.

The least degree of a polynomial with integer coefficient whose one of the roots may be cos 12^(@) is

Find the zeroes of the polynomial x^(3)+6x^(2)+11x+6 which are integers .

Let a=cos 1^(@) and b= sin 1^(@) . We say that a real number is algebraic if is a root of a polynomial with integer coefficients. Then

Which of the following statement are true? (i) The product of a positive and negative integer is negative. (ii) The product of three negative integers is a negative integer. (iii) Of the two integers, if one is negative, then their product must be positive. (iv) For all non-zero integers a and b , axxb is always greater than either a or b. (v) The product of a negative and a positive integer may be zero. (vi) There does not exist an integer b such that for a gt1, axxb=bxxa=b.

The square of an odd integer must be of the form:

Statement (1): If a and b are integers and roots of x^(2)+ax+b=0 are rational then they must be integers.Statement (2): If the coefficient of x^(2) in a quadratic equation is unity then its roots must be integers

Let a,b be integers and f(x) be a polynomial with integer coefficients such that f(b)-f(a)=1. Then, the value of b-a, is