Lesson 5
Analysis of Functions II:
Relative Extrema;
Graphing Polynomials
Prepare for your exams
Study with the several resources on Docsity
Earn points to download
Earn points by helping other students or get them with a premium plan
Guidelines and tips
Prepare for your exams
Study with the several resources on Docsity
Earn points to download
Earn points by helping other students or get them with a premium plan
Community
Ask the community
Ask the community for help and clear up your study doubts
University Rankings
Discover the best universities in your country according to Docsity users
Free resources
Our save-the-student-ebooks!
Download our free guides on studying techniques, anxiety management strategies, and thesis advice from Docsity tutors
Lesson 16 - Function Analysis II, Slides of Calculus for Engineers
Relative extrema Absolute extrema Polynomial graphing Optimization setup Curve sketching techniques
Typology: Slides
2024/2025
1 / 24
This page cannot be seen from the preview
Don't miss anything!
Related documents
Partial preview of the text
Download Lesson 16 - Function Analysis II and more Slides Calculus for Engineers in PDF only on Docsity!
Lesson 5
Analysis of Functions II:
Relative Extrema;
Graphing Polynomials
OBJECTIVES:
- to define maximum, minimum, inflection,
stationary and critical points, relative maximum and
relative minimum;
- to determine the critical, maximum and minimum
points of any given curve using the first and
second derivative tests;
- to draw the curve using the first and second
derivative tests; and
- to describe the behavior of any given graph in
terms of concavity and relative extrema
and arelativemaximumat x 1
hasarelativeminimaat x 1 and x 2
x x 4 x 1
x
y
4 3 2
EXAMPLE
:
y
x
The points x
1
, x
2
, x
3
, x
4
, and x
5
are critical points. Of
these, x
1
, x
2
, and x
5
are stationary points.
FIRST DERIVATIVE TEST
Theorem 4. 2. 2 asserts that the relative extrema
must occur at critical points, but it does not say
that a relative extremum occurs at every critical
point.
A function has a relative extremum at those critical
points where f’ changes sign.
SECOND DERIVATIVE TEST
There is another test for relative extrema that is based
on the following geometric observation:
- a function f has a relative maximum at stationary
point if the graph of f is concave down on an open
interval containing that point
- a function f has a relative minimum at stationary point
if the graph of f is concave up on an open interval
containing that point
Note: The second derivative test is applicable only to
stationary points where the 2
nd
derivative exists.
INTERVAL (3x)(x-2) f’(x) CONCLUSION
x<0 (-)(-) + f is increasing on
0<x<2 (+)(-) - f is decreasing on
x>2 (+)(+) + f is increasing on
INTERVAL (6)(x-1) f’’(x) CONCLUSION
x<1 (-) - f is concave down on
x>1 (+) + f is concave up on
The 2
nd
table shows that there is a point of inflection at
x=1,
since f changes from concave up to concave down at that
point.
The point of inflection is (1,-1).
- Analyzeand tracethecurveof f x 3 5.
5 3
x x
SOLUTION :
f '' x 60x -30x 30x 2x 1
x 0; x -1; x 1
15x 0 ; x 1 0 ; x 1 0
when f ' x 0 15x x 1 x 1 0
f ' x 15x -15x 15x x 1 15x x 1 x 1
3 2
2
2
4 2 2 2 2
y
x
3. Analyze and trace the curve of y 3 x x
x -1 and x 1
1 x 0 and 1 x 0
3 1 - x 3 1 x 1 x 0
y' 3 3 x
y 3 x x
2
2
3
x 0
6 x 0
y'' 6 x
SOLUTION :
y
x
3
y 3 x 3 x
2
4 x
4 x
3. Analyze and trace the curve of y
x -2 and x 2
2 x 0 and 2 x 0
0
4 x
4 2 x 2 x
4 x
4 4 x
y'
4 x
16 4 x
4 x
16 4 x 8 x
y'
4 x
4 x 4 4 x 2 x
y'
4 x
4 x
y
2 2 2 2
2
2 2
2
2 2
2 2
2 2
2
2