Let Q(x) denotes the quotient which resu...

Let `Q(x)` denotes the quotient which results from the division of the polynomial `x^4 +3x^4-x^3+8x^2-x+8` by `x^2+1`. The sum of the square of the coefficient of `Q(x)` is

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Divide: the polynomial 2x^4+8x^3+7x^2+4x+3\ \ by \ \ x+3.

Divide: the polynomial 2x^(4)+8x^(3)+7x^(2)+4x+3 by x+3

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

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

The polynomial x^6+4x^5+3x^4+2x^3+x+1 is divisible by

The product of uncommon real roots of the polynomials p(x)=x^4+2x^3-8x^2-6x+15 and q(x) = x^3+4x^2-x-10 is :

The product of uncommon real roots of the polynomials p(x)=x^4+2x^3-8x^2-6x+15 and q(x) = x^3+4x^2-x-10 is :

The product of uncommon real roots of the polynomials p(x)=x^4+2x^3-8x^2-6x+15 and q(x) = x^3+4x^2-x-10 is :

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