Math 104 - Calculus II - Reading Assignments
January & February 2001

Be sure to check back, because this may change during the semester.
(Last modified: Monday, December 11, 2000, 12:22 PM )

I'll use Maple syntax for mathematical notation on this page.
All numbers indicate sections from Ostebee/Zorn, Vol 2.


For January 31

Section 5.1 Areas and Integrals
Section 5.2 The Area Function
Section 5.3 The Fundamental Theorem of Calculus
Section 5.4 Approximating Sums

To read : All, but you may skip the proof of the Fundamental Theorem of Calculus beginning on page 373. The major ideas in sections 5.1, 5.2, and 5.3 should be review for you.

Be sure to understand : The figures on page 378 and the section Sigma Notation; Partitions begining on page 380

Email Subject Line : Math 104 1/31 Your Name

Reading Questions :

  1. When approximating an integral, which would you expect to be more accurate, L10 or L100? Why?
  2. Give an example of a partition of the interval [0,3].
  3. What is a Riemann sum? Explain in your own words.

For February 2

Section 7.1 The Idea of Approximation

To read : All

Be sure to understand : The statement of Theorem 1

Email Subject Line : Math 104 2/2 Your Name

Reading Questions :

  1. Why would we ever want to approximate an integral?
  2. Give an example of a function that is monotone on the interval [0,2].
  3. Let f(x)=x2. Does Theorem 1 apply to the integral int( f(x), x= -1. . 2) ? Explain.

For February 5

Section 7.2 More on Error: Left and Right Sums and the First Derivative

To read : All

Be sure to understand : The statement of Theorem 2

Email Subject Line : Math 104 2/5 Your Name

Reading Questions :

  1. Explain in words what K1 is in Theorem 2.
  2. Find a value for K1 for int( x2, x= -1. . 2).
  3. Use Theorem 2 and your value for K1 to find an upper bound on the error when using L100 to approximate int( x2, x= -1. . 2).

For February 7

Section 7.3 Trapezoid Sums, Midpoint Sums, and the Second Derivative

To read : All

Be sure to understand : The statement of Theorem 3

Email Subject Line : Math 104 2/7 Your Name

Reading Questions :

  1. Explain in words what K2 is in Theorem 2.
  2. Find a value for K2 for int( x2, x= -1. . 2).
  3. Use Theorem 3 and your value for K2 to find an upper bound on the error when using M100 to approximate int( x2, x= -1. . 2).

For February 9

Work on Group Project 1. No Reading Assignment.

For February 12

The Big Picture

To read : Reread Section 7.3

Be sure to understand : Example 3

Email Subject Line : Math 104 2/12 Your Name

Reading Question:

    How many subdivisions does the trapezoid method require to approximate int( cos(x3), x = 0. . 1) with error less than 0.0001?

For February 14

Section 3.8 Inverse Trigonometric Functions and Their Derivatives

To read : All, but you can skip the section on Inverse Trigonometric Functions and the Unit Circle

Be sure to understand :

Email Subject Line : Math 104 2/14 Your Name

Reading Questions :

  1. What is the domain of the function arccos(x)? Why?
  2. Why are we studying the inverse trig functions now?
  3. Find one antiderivative of 1 / (1+x2).

For February 16

Section 6.1 Antiderivatives: The Idea
Section 6.2 Antidifferentiation by Substitution

To read : All

Be sure to understand : Examples 3, 5, and 8 from Section 6.2

Email Subject Line : Math 104 2/16 Your Name

Reading Questions :

  1. Explain the difference between a definite integral and an indefinite integral.
  2. What are the three steps in the process of substitution?
  3. Substitution attempts to undo one of the techniques of differentiation. Which one is it?

For February 19

Section 9.1 Integration by Parts

To read : Through page 497. Be warned that Example 8 is a bit slippery.

Be sure to understand : The statement of Theorem 1 and Examples 1, 3, and 6

Email Subject Line : Math 104 2/19 Your Name

Reading Questions :

  1. Integration by parts attempts to undo one of the techniques of differentiation. Which one is it?
  2. Pick values for u and dv in the integral int( x * sin(x), x). Use parts to find an antiderivative for x * sin(x).

For February 21

Q & A for Exam 1 today. No Reading Assignment.


For February 23

Section 9.1 Integration by Parts

To read : Reread the section

Be sure to understand : Example 8

Email Subject Line : Math 104 2/23 Your Name

Reading Questions : Each integral can be evaluated using u-substitution or integration by parts. Which technique would you use in each case? Why?

  1. int( x*cos(x), x)
  2. int(x*cos(x2),x)

For February 26

Practice Antidifferentiation. No Reading Assignment.


For February 28

Section 8.1 Introduction to Using the Definite Integral
Section 8.2 Finding Volumes by Integration

To read : All

Be sure to understand : The section from 8.2 on Reassembling Riemann's Loaf and Example 1 from 8.2.

Email Subject Line : Math 104 2/28 Your Name

Reading Questions :

  1. Let R be the rectangle formed by the x-axis, the y-axis, and the lines y=1 and x=3. What is the shape of the solid formed when R is rotated about the x-axis?
  2. Let T be the triangle formed by the lines y=x, x=1 and the x-axis. What is the shape of the solid formed when T is rotated about the x-axis?



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Last modified: Monday, December 11, 2000, 12:22 PM