The polynomial `(x^(3)+px^(2)-x+q)` is divisible by `(x^(2) - 1)` and when it is divided by (x - 2), the remainder is 15. Find the values of p and q.

When (x^3-2x^2+px-q) is divided by (x^2-2x-3) the remainder is (x-6)The values of p and q are:

If the polynomial p(x)=4x^(3)-px^(2)+x-q be divided by (x - 1) and (x + 2), the respective remainders are 0 and 3. Find the value of p and q.

If the polynomial (x^(4)+2x+8x^(2)+12x+18) is divided by another polynomial (x^(2)+5) , the remainder comes out to be (px+q). Find the values of p and q.

The polynomials P(x) = kx^(3) + 3x^(2) - 3 and Q(x) = 2x^(3) - 5x + k , when divided by (x - 4) leave the same remainder. The value of k is

The polynomial (px^(2)+qx+r) is divisible by (x^(2)-1) and if x = 0, the value of the polynomial is 2. Determine the values of p, q and r.

Polynomial P(x) is divided by (x-3) , the remainder if 6.If P(x) is divided by (x^2-9) , then the remainder is g(x) . Then the value of g(2) is ___________.

If the polynomials px ^(3) + 3x ^(2) - 3 and 2x ^(3) - 5x + p are divided by (x - 4), then remainders in both the situations are equal . Find the value of p.

If the polynomial (x^(4)+2x^(3)+8x^(2)+12x+18) is divided by another polynomial (x^(2)+5) , the remainder comes out to be (px+q). Find the values of p and q.