The zero value of polynomial px + q is ………….

The zero value of linear polynomial ax - b = ……………

If alpha and beta are the zeros of the polynomial p(x) = x^(2) - px + q , then find the value of (1)/(alpha)+(1)/(beta)

If the zeroes of the polynomial x^2+px+q are double the value to the zeroes 2x^2-5x-3 find the value of p and q

If the zeroes of the polynomial x^(2)+px+q are double in the value of the zeroes of 2x^(2)-9x+4 , find the values of p and q.

If alpha and beta are zeros of polynomial f(x) = x^(2) + px + q , form a polynomial whose zeros are (alpha + beta)^(2) are (alpha - beta)^(2) .

If alpha and beta are the zeros of the polynomial f(x) = x^(2) + px + q , then a polynomial having 1/(alpha) and 1/beta as its zeros is …………..

If one zero of polynomial 2x^(2)+px+4 is 2, find the other zero.Also find p.

Find the condition that the zeroes of the polynomial f(x) = x^3 – px^2 + qx - r may be in arithmetic progression.

Verify that (i) 4 is a zero of the polynomial , p (x) = x -4. (ii) -3 is a zero of the polynomial , q (x) = x+3. (iii) (2)/(5) is a zero of the polynomial , f (x) =2 - 5x. (iv) (-1)/(2) is a zero of the polynomial , g (y) = 2y +1.

If (1 - p) is a zero of the polynomial x^2 +px + 1-p= 0 , then find both zeroes of the polynomial.