If a quadratic polynomial `f(x)` is a square of a linear polynomial, then its two zeroes are coincident. (True/false)

State 'T' for true and 'F' for false and select the correct option. I. If a quadratic polynomial f(x) is a square of a linear polynomial, then its two zeroes are coincident. II. If a quadratic polynomial f(x) is not factorisable into linear factors, then it has no real zero. III. If graph of quadratic polynomial ax^(2)+bx+c cuts positive direction of y-axis, then the sign of c is positive. IV. If fourth degree polynomial is divided by a quadratic polynomial, then the degree of the remainder is 2.

The zero of the linear polynomial 2x+3 is

If a quadratic polynomial f(x) is not factorizable into linear factors, then it has no real zero. (True/false).

If a quadratic polynomial f(x) is not factorizable into linear factors,then it has no real zero.(Trueffalse).

A quadratic polynomial can be written as the product of .......linear polynomials.

A quadratic polynomial with zeroes -2 and 3, is :

A Quadratic polynomial has three zeroes.True or False

If alpha and beta are the zeros of the quadratic polynomial f(x)=x^(2)-1, find a quadratic polynomial whose zeros are (2 alpha)/(beta) and (2 beta)/(alpha)

If alpha and beta are the zeros of the quadratic polynomial f(x)=x^2-1 , find a quadratic polynomial whose zeros are (2alpha)/beta and (2beta)/alpha .

If alpha and beta are the zeros of the quadratic polynomial f(x)=x^(2)-1, find a quadratic polynomial whose zeros are (2 alpha)/(beta) and (2 beta)/(alpha)