If `(x-3) and (x-1/3)` are factors of the polynomial `px^(2)+3x+r`, show that p=r.

Find the relation between p and r if (x - 2) and (x-1/2) be two factors of the polynomial px^(2)+5x+r .

If (x + 1) be a factor of the polynomial p(x)=x^(3)+k , then k =

if both x-2 and x-(1)/(2) are factors of px^(2)+5x+r. then show that p=r.

if both x-2 and x-(1)/(2) are factors of px^(2)+5x+r. then show that p=r.

If (x-1) is the factors fo polynomial x^3-px+q , then prove that p-q=1

Show that (x-3) is a factor of the polynomial x^3-3x^2+4x-12

If both x-2 and x-(1)/(2) are factors of px^(2)+5x+r, show that p=r

Show that (x-3) is a factor of the polynomial x^(3)-3x^(2)+4x-12

If (x+p) is a factor of the polynomial 2x^(2)+2px+5x10. find p.

Find p and q so that (x + 2)" and "(x – 1) may be factors of the polynomial f(x) = x^(3) + 10x^(2) + px + q .