Math 192 Calculus 2  |
| Brief Study Guide for
Chapter 7 |
Preview of
Chapter 7 |
| In this chapter we consider the topic of
inverse functions, introduce 22 new
functions and use l'Hopital's rule.
The 22 new functions consist of |
|
2 logarithmic functions, |
|
2 exponential functions, |
|
6 inverse trigonometric functions, |
|
6 hyperbolic functions and |
|
6 inverse hyperbolic functions. (We actually
don't cover these last 6 functions.) |
| For each one of these functions, mathematicians
want to know about or how to do roughly a dozen things, referred herein as the The "Dozen" Aspects of New Functions |
| As you are introduced to each of the 16 functions
that we consider, analyze it against the list above. |
|
Calculus
2 Lesson 7.1
Inverse Functions |
| The following topics are the most
important. Typical exercises from Calculus, 4th edition, by James Stewart, are
assigned at the end of each objective. |
| 1. |
Do the following symbolically, numerically
and
graphically where applicable: Given a function f over a domain, |
| a. |
determine whether it is one-to-one;
P414#3,5,7,9,11,15 |
| b. |
find its inverse, g (or f -1), if it
exists; P414#25,27,29,31,33 |
| c. |
give the domain and range of f and g;
P414#35,37 |
| d. |
find the derivative of f and g and the
connection between them; P414#39,41 |
| e. |
give the equation of the line tangent to the
functions f and g at corresponding places; |
| f. |
graph the function f and its inverse g on the
same set of axes. P414#45 |
| If you are using the computer labs on
campus, you can just click on the Maple assignment below to complete
the assignment. Make a paper copy of your exercises and turn
the copy in to be graded. |
If you are not using the
computer labs on campus, before you can do our first Maple Assignment,
you
must install Maple and associate
the worksheets with the software.
When you are satisfied with your first Maple assignment, you'll need some information
on Submitting Maple Assignments for a Grade. |
|
|
Maple Assignment: Inverses.mws
|
|
Calculus
2 Lesson 7.2*
Natural Logarithms
Note: Sections 7.2*, 7.3* and 7.4* are
printed on the gray pages of Stewart following sections 7.2, 7.3 and 7.4. |
| 1. |
Define the natural logarithm function. Text |
| 2. |
Analyze the graph of f(x) = ln x using f, f ',
and f ''. Text |
| 3. |
Use algebraic properties of ln x. P452#1,3,5,7 |
| 4. |
Graph expressions involving ln x without a
calculator. P452#9,11 |
| 5. |
Differentiate functions involving ln x
including implicit differentiation. P452#13,15,21,25,27 |
| 6. |
Give the equation of the tangent line of a
function involving ln x. P452#41 |
| 7. |
Evaluate integrals involving the natural
logarithm. P452#57,59,65 |
| 8. |
Use logarithmic differentiation. P452#71,73 |
| Maple Assignment:
none |
|
Calculus
2 Lesson 7.3*
Natural Exponentials
Note: Sections 7.2*, 7.3* and 7.4* are
printed on the gray pages of Stewart following sections 7.2, 7.3 and 7.4. |
| 1. |
Give the definition of natural exponentiation. Text |
| 2. |
Solve equations involving natural exponential and logarithmic
expressions. P458#3,5,7,9 |
| 3. |
Graph expressions involving ex without a
calculator. P458#17,21 |
| 4. |
Differentiate functions involving exponential and logarithmic
functions including the chain rule and implicit differentiation. P459#29-41 odd |
| 5. |
Give the equation of the tangent line of a function involving
ex. P459#43 |
| 6. |
Solve word problems involving logarithms and exponentials.
P459#53,55 |
| 7. |
Analyze the bell shaped curve from statistics. P460#66 |
| 8. |
Integrate expressions involving the natural
exponential function. P460#67,69,71,73 |
| Maple Assignment: Log&ExpFcns.mws
|
|
Calculus
2 Lesson 7.4* General
Exponentials and Logs
Note: Sections 7.2*, 7.3* and 7.4*
are printed on the gray pages of Stewart following sections 7.2, 7.3 and 7.4. |
| 1. |
For the general exponential and logarithm
functions, do all of the following: |
| 1.a |
define them; Text |
| 1.b. |
evaluate; P467#7,13 |
| 1.c |
graph; P467#11,12,15 |
| 1.d |
finds limits; P468#21,22 |
| 1.e |
differentiate using chain rule; P468#23-35 odd |
| 1.f |
integrate; P468#39,40,41,42 |
| 2. |
Compare the growth of the power function versus
the exponential function. P468#19 |
| 3. |
Find the equation of the tangent line of a curve
involving logarithms and exponentials. P468#37 |
| 4. |
Find the area under the curve involving logarithms
and exponentials. P468#43 |
| 5. |
Give an overview of the development of logarithm
and exponential functions. Text: sections 7.2*-7.4* |
| Maple Assignment:
none |
|
Calculus
2 Lesson 7.5
Inverse Trigonometric Functions |
| 1. |
For the inverse trig functions, do
all of the following: |
| 1.a |
define; Text |
| 1.b. |
evaluate; P476#1,5,11 |
| 1.c |
graph; P476#15 |
| 1.d |
finds limits; P476#45 |
| 1.e |
differentiate using chain rule; P476#23-33 odd |
| 1.f |
integrate; P476#59-67 |
| 2. |
Derive the formula for the
derivative of an inverse trig function.
(sin-1, cos-1 or tan-1) . P476#19 |
| 3. |
Find the equation of the tangent
line of a curve involving inverse trig functions. P476#40 |
| 4. |
Find the area under the curve
involving inverse trig functions. P477#73 |
| 5. |
Solve a related rates word problem
involving inverse trig functions. P477#49 |
| Maple Assignment:
Combined with section 7.6 maple worksheet. |
|
Calculus
2 Lesson 7.6
Hyperbolic Functions |
| 1. |
For the hyperbolic functions, do all of the following: |
| 1.a |
define; Text |
| 1.b. |
evaluate; P483#1,3 |
| 1.c |
graph; P484#22 |
| 1.d |
finds limits; P484#23a,e |
| 1.e |
differentiate using chain rule; P484#31,37,43,47 |
| 1.f |
integrate; P485#55,56,59,61 |
| 2. |
Derive the formula for the derivative of a
hyperbolic function. P484#24a,b |
| 3. |
Find the equation of the tangent line of a curve
involving hyperbolic functions. (no specific examples in text) |
| 4. |
Find the area under the curve involving hyperbolic
functions. (no specific examples in text) |
| 5. |
Solve a catenary word problem P484#49 |
| 6. |
Explain why trig functions are often called
circular functions and hyperbolic functions are so named. |
| Maple Assignment:
InvTrig&HypFcns.mws |
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