If the sum of the remainders obtained by dividing each of `x^(3)+8x^(2) -3kx +7` and `2x^(3)+kx^(2) -5x +6` by `x-1` is 9 then k = ……….

The quotient obtained on dividing 8x^(4)-2x^(2)+6x-7 by 2x+1 is 4x^(3)+px^(2)-qx+3 then value of (q-p) is

The sum of the remainders obtained when {x^(3)+(k+8)x+k} is divided by (x-2) or when it is divided by (x+1) is zero.Find the value of k.

If the remainder obtained on dividing the polynomial 2x^(3)-9x^(2)+8x+15 by (x-1) is R_(1) and the remainder obtained on dividing the polynomial x^(2)-10x+50 by (x-5) is R_(2), then what is the value of R1-R2?

Find the remainder when the expression 3x^(3)+8x^(2)-6x+1 is divided by (x+3) .

Find the remainder when x^(6)-7x^(3)+8 is divided by x^(3)-2 .

The remainders obtained when the polynomial x^(3) + x^(2) -9x -9 is divided by x, x +1 and x +2 respectively are ____

The quotient obtained on dividing (8x^(4)-2x^(2)+6x-7) by (2x+1) is (4x^(3)+px^(2)-qx+3) . The value of (q-p) is

From the sum of 3x^(2) - 5x + 2 and -5x^(2) - 8x + 6 subtract 4x^(2) - 9x + 7