36x – 270x + 4. Differentiate r and use the Consider the function r(x): derivative to determine each of the following. All intervals on which r is increasing. If there are more than one intervals, separate them by a comma. Use open intervals and exact values. r increases on: All intervals on which r is decreasing. If there are more than one intervals, separate them by a comma. Use open intervals and exact values. r decreases on: The value(s) of x at whichr has a relative maximum. If there are more than one solutions, separate them by a comma. Use exact values. r has relative maximum(s) at x = The value(s) of x at whichr has a relative minimum. If there are more than one solutions, separate them by a comma. Use exact values. r has relative minimum(s) at r
36x – 270x + 4. Differentiate r and use the Consider the function r(x): derivative to determine each of the following. All intervals on which r is increasing. If there are more than one intervals, separate them by a comma. Use open intervals and exact values. r increases on: All intervals on which r is decreasing. If there are more than one intervals, separate them by a comma. Use open intervals and exact values. r decreases on: The value(s) of x at whichr has a relative maximum. If there are more than one solutions, separate them by a comma. Use exact values. r has relative maximum(s) at x = The value(s) of x at whichr has a relative minimum. If there are more than one solutions, separate them by a comma. Use exact values. r has relative minimum(s) at r
Glencoe Algebra 1, Student Edition, 9780079039897, 0079039898, 2018
18th Edition
ISBN:9780079039897
Author:Carter
Publisher:Carter
Chapter9: Quadratic Functions And Equations
Section9.6: Solving Quadratic Equations By Using The Quadratic Formula
Problem 28PPS
Related questions
Question
![Consider the function r(x) = 36x' – 270x + 4. Differentiate r and use the
derivative to determine each of the following.
All intervals on which r is increasing. If there are more than one intervals, separate
them by a comma. Use open intervals and exact values.
r increases on:
All intervals on which r is decreasing. If there are more than one intervals, separate
them by a comma. Use open intervals and exact values.
r decreases on:
The value(s) of x at which r has a relative maximum. If there are more than one
solutions, separate them by a comma. Use exact values.
r has relative maximum(s) at x =
The value(s) of x at which r has a relative minimum. If there are more than one
solutions, separate them by a comma. Use exact values.
r has relative minimum(s) at x =](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F678fef96-64be-4096-a74a-c4eb0a405ee7%2F0632d9e7-28ab-438f-a176-824e9ef9853a%2F0cg20nd_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Consider the function r(x) = 36x' – 270x + 4. Differentiate r and use the
derivative to determine each of the following.
All intervals on which r is increasing. If there are more than one intervals, separate
them by a comma. Use open intervals and exact values.
r increases on:
All intervals on which r is decreasing. If there are more than one intervals, separate
them by a comma. Use open intervals and exact values.
r decreases on:
The value(s) of x at which r has a relative maximum. If there are more than one
solutions, separate them by a comma. Use exact values.
r has relative maximum(s) at x =
The value(s) of x at which r has a relative minimum. If there are more than one
solutions, separate them by a comma. Use exact values.
r has relative minimum(s) at x =
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