If `x ^(5) – 9x ^(2) + 12 x – 14` is divisible by (x - 3), what is the remainder ?

4x^(3) + 12x^(2) - x - 3 is divisible by

If 4x^(3)-2x^(2)+5x-8 is divided by (x-2), what will be the remainder ?

The polynomial f (x) = ax ^(3) + 9x ^(2) + 4x - 8, when divided by (x+3) leaves the remainder (-20). Then , the value of a is

If f(x)=x^(3)-3x^(2)+2x+a is divisible by x-1, then find the remainder when f(x) is divided by x-2 .

If (5x^(2)+14x +2)^(2)-(4x^(2) -5x +7)^(2) is divided by x^(2)+x+1 , then what is the remainder?

If 5x^3+5x^2-6x+9 is divided by (x+3) then the remainder is:

If 3x ^(4) -6x ^(3) +kx ^(2)-8x-12 is divisible by x-3, then it is also divisible by :

If x+9y is divisible by 5, where x and y are integers ,then what is the remainder when 8x+7y is divided by 5 ?

Let f(x) = ax^(3) + 5x^(2) - bx + 1 . If f(x) when divide by 2x + 1 leaves 5 as remainder, and f'(x) is divisible by 3x - 1 , then