How do you use the remainder theorem to find the remainder for each division $(x^3-x+6)div(x-2)$ ?

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How do you use the remainder theorem to find the remainder for each division $(x^3-x+6)div(x-2)$ ?

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Answer 1 · 2016-11-26T07:38:44

It is enough to evaluate the dividend polynomial at $x=a$ where $a$ is a root of the divisor polynomial . In this case $R(x)=0$

Explanation:

So in this case $D(x)=x^3-x+6$ and 2 is the root of the divisor $d(x)=x-2$
The remainder is just $D(2)=2^3-2+6=0$ .
If the remainder in zero it means that the divisor is a factor of the dividend or in other terms that the division is exact

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How do you use the remainder theorem to find the remainder for each division $(x^3-x+6)div(x-2)$ ?

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Explanation:

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How do you use the remainder theorem to find the remainder for each division (x^3-x+6)div(x-2)(x^3-x+6)div(x-2)?

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Explanation:

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How do you use the remainder theorem to find the remainder for each division $(x^3-x+6)div(x-2)$ ?