If the cubic polynomials `x^3+a x^2+11 x+6a n dx^3+b x^2+14 x+8` may have a common factor of the form `x^2+p x+q ,` then `(a+p=b+q` (b) `a p

If the cubic polynomials x^3+a x^2+11 x+6a n dx^3+b x^2+14 x+8 may have a common factor of the form x^2+p x+q , then, (a) a + p=b + q (b) ap < bq (c) pq divide ab (d) p + q divides a + b

If the cubic polynomials x^(3)+ax^(2)+11x+6 and x^(3)+bx^(2)+14x+8 may have a common factor of the form x^(2)+px+q, then (a+p=b+q( b) ap

Find a and b so that x^3+ax^2+11x+6 and x^3+bx^2+14x+8 may have one common factor of the form x^2+px+q .

Find a and b so that x^(3)+ax^(2)+11x+6 and x^(3)+bx^(2)+14x+8 may have one common factor of the form x^(2)+px+q.

If f(x)=x^(2)+5x+p and g(x)=x^(2)+3x+q have a common factor, then (p-q)^(2)=

If (x+a) be a common factor of x^2 + px + q and x^2 + p'x +q' , then the value of a is:

The sum of the polynomials p(x) = x^(3) - x^(2) - 2, q(x) = x^(2) - 3x + 1

If x^2+p x+q=0a n dx^2+q x+p=0,(p!=q) have a common roots, show that 1+p+q=0 .

The sum of the polynomials p(x) =x^(3) -x^(2) -2, q(x) =x^(2) -3x+ 1