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One factor of f (x ) = 4 x cubed minus 4 x squared minus 16 x + 16 is (x – 2). What are all the roots of the function? Use the Remainder Theorem.

User Ben Quan
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2 Answers

9 votes
9 votes

Answer: B

Explanation:

Edge 2023

User Haxed
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f(x) =4 x {}^(3) - 4x {}^(2) - 16x + 16


divide \: by \: x - 2


4x {}^(2) \: into \: (x - 2) = 4x {}^(3) - 8x {}^(2)


g(x) = 4x {}^(2) - 16x + 16


4x \: into \: (x - 2) = 4x {}^(2) - 8x


z(x) = - 8x + 16


- 8 \: into \: (x - 2) = - 8x + 16 \\ no \: remainder


f(x) = (x - 2)(4x {}^(2) + 4x - 8)


f(x) = 0 \\ x - 2 = 0 \: \: \: \: \: \: \: \: \: 4x {}^(2) + 4x - 8 = 0 \\


x = \frac{ - 4 + \sqrt{4 {}^(2) - 4(4)( - 8) } }{2(4)} = ( - 4 + √(144) )/(8) = ( - 4 + 12)/(8) = 1


x = 2


x = ( - 4 - 12)/(8) = ( - 16)/(8) = - 2

User Jiyoun
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