If `(x^(2)+4x-21)` is divided by `x+7`, then the quotient is

If x^(4)-6x^(3)+3x^(2)+26x-24 is divided by x-4 then the quotient is

if (5x^(2)+14x+2)^(2)-(4x^(2)-5x+7)^(2) is divided by x^(2)+x+1 ,then quotient q and remainder r are given by

When (x^(4)-3x^(3)+2x^(2)-5x+7) is divided by (x-2) , then the remainder is :

When a third degree polynomial f (x) is divided by (x-3) , the quotient is Q(x) and the remainder is zero . Also when f (x) is divided by [Q(x)+x+1] , the quotient is (x-4) and remainder is R (x) . Find the remainder R(x).

when x^(5)-5*x^(4)+9*x^(3)-6*x^(2)-16*x+13 is divided by x^(2)-3*x+a, then quotient and divided by x^(2)-3*x+a, then quotient and remainder are x^(3)-2*x^(2)+x+1 and -15*x+11, respectively,the value of a is:

When f(x) is divided by (x-2), the quotient is Q(x) and the remainder is zero.And when f(x) is divided by [Q(x)-1], the quotient is (x-2) and the remainder is R(x). Find the remainder R(x).

Divide the polynomial (4x^(2) + 4x + 5) by (2x + 1) and write the quotient and the remainder.

Divide x^(2) + 6x + 8 by x + 2 and find the quotient .

On dividing the polynomial 8x^(3)-6x^(2) + 10x + 3 by (4x+1) , the quotient is 2x^(2) +k , where, k is equal to