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Find the remainder in the following division problem:
x^5-4x^4+x^3-7x+1/x+2

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P(x)=x^5-4x^4+x^3-7x+1,\ Q(x)=x+2\\\\P(x)=H(x)\cdot Q(x)+R

Since the polynomial degree Q(x) is 1, the remainder of the division must be a number. Therefore we only need to calculate the value of polynomial for x = -2:


P(-2)=(-2)^5-4(-2)^4+(-2)^3-7(-2)+1\\\\=-32-4(16)+(-8)+14+1\\\\=-32-64-8+15\\\\=-89

Answer: The ramainder is equal -89.


x^5-4x^4+x^3-7x+1=H(x)(x+2)-89

Calculated in the program:


x^5-4x^4+x^3-7x+1=(x^4-6x^3+13x^2-26x+45)(x+2)-89\\\Downarrow\\(x^5-4x^4+x^3-7x+1)/(x+2)=x^4-6x^3+13x^2-26x+45\ \ \ r(-89)

User Joao Pincho
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