Consider f(x) = −3+63x 15x³ + 23x² Determine the intervals on which f is decreasing. Of is decreasing on: - f is decreasing nowhere. Determine the intervals on which f is increasing. Of is increasing on: Of is increasing nowhere. Determine the value and location of any local minimum of f. Enter the solution in (x, f(x)) form. If multiple solutions exist, use a comma-separated list to enter the solutions. Of has a local minimum at: Of has no local minimum. Determine the value and location of any local maximum of f. Enter the solution in (x, f(x)) form. If multiple solutions exist, use a comma-separated list to enter the solutions. Of has a local maximum at:

Consider f(x) = −3+63x 15x³ + 23x² Determine the intervals on which f is decreasing. Of is decreasing on: - f is decreasing nowhere. Determine the intervals on which f is increasing. Of is increasing on: Of is increasing nowhere. Determine the value and location of any local minimum of f. Enter the solution in (x, f(x)) form. If multiple solutions exist, use a comma-separated list to enter the solutions. Of has a local minimum at: Of has no local minimum. Determine the value and location of any local maximum of f. Enter the solution in (x, f(x)) form. If multiple solutions exist, use a comma-separated list to enter the solutions. Of has a local maximum at:

Glencoe Algebra 1, Student Edition, 9780079039897, 0079039898, 2018

18th Edition

ISBN:9780079039897

Author:Carter

Publisher:Carter

Chapter9: Quadratic Functions And Equations

Section9.1: Graphing Quadratic Functions

Problem 4AGP

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Question

11.) all 4 please :)

Consider f(x) = −3+63x - 15x³ + 23x²
Determine the intervals on which f is decreasing.
Of is decreasing on:
Of is decreasing nowhere.
Determine the intervals on which f is increasing.
Of is increasing on:
Of is increasing nowhere.
Determine the value and location of any local minimum of f. Enter the solution in (x, f(x)) form. If
multiple solutions exist, use a comma-separated list to enter the solutions.
Of has a local minimum at:
Of has no local minimum.
Determine the value and location of any local maximum of f. Enter the solution in (x, f(x)) form. If
multiple solutions exist, use a comma-separated list to enter the solutions.
Of has a local maximum at:
Of has no local maximum.

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Step 1: Critical points

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Step 2: Decreasing intervals

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Step 3: Increasing intervals

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Step 4: Function value at critical points

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