Let f(x) = x* + 12x³ – 2x2 – 164x +105 be the function graphed here. %3D Click on the graph and expand window to enlarge. Jse synthetic division and the remainder theorem to find TWO rational zeros. Two rational zeros are z = The reduced (or depressed) polynomial with both the factors corresponding to these zeros factored out is By setting this equal to zero and using the quadratic formula, the remaining zeros of f are found to be:
Let f(x) = x* + 12x³ – 2x2 – 164x +105 be the function graphed here. %3D Click on the graph and expand window to enlarge. Jse synthetic division and the remainder theorem to find TWO rational zeros. Two rational zeros are z = The reduced (or depressed) polynomial with both the factors corresponding to these zeros factored out is By setting this equal to zero and using the quadratic formula, the remaining zeros of f are found to be:
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Question
![Let f(x) = x* + 12a – 2x2 – 164x + 105 be the function graphed here.
-
Click on the graph and expand window to enlarge.
Use synthetic division and the remainder theorem to find TWO rational zeros. Two rational zeros are a =
The reduced (or depressed) polynomial with both the factors corresponding to these zeros factored out is
By setting this equal to zero and using the quadratic formula, the remaining zeros of f are found to be:](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fd96d6a4a-41a1-4281-9acf-200b1f61c96a%2F2962d0db-09e0-4def-b5df-c8ba42b605a6%2Fkbblr89_processed.png&w=3840&q=75)
Transcribed Image Text:Let f(x) = x* + 12a – 2x2 – 164x + 105 be the function graphed here.
-
Click on the graph and expand window to enlarge.
Use synthetic division and the remainder theorem to find TWO rational zeros. Two rational zeros are a =
The reduced (or depressed) polynomial with both the factors corresponding to these zeros factored out is
By setting this equal to zero and using the quadratic formula, the remaining zeros of f are found to be:
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