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What is the remainder when (x3 − 4x2 − 12x + 9) is divided by (x + 2)

What is the remainder when (x3 − 4x2 − 12x + 9) is divided by (x + 2)
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What is the remainder when (x3 − 4x2 − 12x + 9) is divided by (x + 2)

User Kalik
by
8.2k points

2 Answers

6 votes
Hello,

x^3-4x²-12x+9=x^3+2x²-6x²-12x+9
=x²(x+2)-6x(x+2)+9
=(x+2)(x²-6x)+9

Remainder is 9
User BenMorganIO
by
7.4k points
6 votes

Answer:

9


Explanation:

This is a straightforward application of the Remainder Theorem, which states that any polynomial
p(x) , when divided by a linear factor
(x-a) will have a remainder equal to evaluating the function
p(x) at
x=a

To find the remainder of
x^(3)-4x^(2)-12x+9 when divided by
(x+2) , we have to evaluate the polynomial at
x=-2

Let's do it.


(-2)^(3)-4(-2)^(2)-12(-2)+9\\=9

Hence, 9 is the remainder.

User Jordan Mack
by
7.9k points
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