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6.
Minimum hours per week of independent work done
outside of class: 8 - 10
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Course
Preparation – (Supplemental form B
required) |
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7a.
Prerequisite(s):
(Course and/or other preparation/experience that
is REQUIRED
to be completed previous to enrollment in this
course.) |
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Completion of Math. 30 with
a grade of "C" or better
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7b.
Co-requisite(s): (Courses
and/or other preparation that is REQUIRED to be
taken concurrently with this
course.) |
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7c.
Advisory:
(Minimum preparation RECOMMENDED
in order to be successful in this
course. Also known as “Course
Advisory”.) |
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Catalog
Description And Other Catalog Information
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8.
Repeatability: |
Not Repeatable
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9a.
Grading Option: |
Standard Grade
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9b.
Catalog Description: |
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Continuation of Math. 30.
Content includes techniques of integration,
improper integrals, applications of integration,
infinite series, parametric equations and polar
coordinates. (CAN MATH 20) (With Math. 30, CAN
MATH SEQ B) (With Math. 30 & 32, CAN MATH
SEQ C)
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Course
Outline Information |
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10.
Student Performance Outcomes:
(Outcomes for all credit courses must
indicate that students will learn critical
thinking and will be able to apply concepts at
college level. Outcomes must be
related to items listed in Section 11.)
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1. calculate
anti-derivatives of algebraic, trigonometric,
inverse and transcendental functions using
appropriate integration techniques;
2. apply
the techniques of integration to reduce an
integral to one listed in integral tables and
then use the tables to find
anti-derivatives;
3. use integration,
differentiation, and inverse functions to solve
applied problems;
4. solve integration and
differentiation problems using parametric
equations and/or polar coordinates;
5.
demonstrate knowledge and theory of infinite
series by applying appropriate theorems to
determine convergence and divergence;
6. use
infinite series to solve appropriate problems in
mathematics and the sciences.
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11.
Course Content Outline:
(Provides a comprehensive, sequential outline of
the course content, including all major subject
matter and the specific body of knowledge
covered.) |
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I. Integrals
A. Review
of the Definite Integral and the Fundamental
Theorem of Calculus
B. Net Change
Theorem
C. Substitutions in the Definite
Integral
D. Numerical Integration
II.
Techniques of Integration
A. Basic
Substitutions
B. Integration by Parts
C.
Trigonometric Integrals
D. Trigonometric
Substitutions
E. Integration of Rational
Functions by Partial Fractions
F.
Rationalizing Substitutions
G. Strategy for
Integrations
H. Using Tables of Integrals and
Computer Algebra Systems
I. Numerical
Integration
J. Improper Integrals
III.
Applications of Integration
A. Area between
curves
B. Volumes
C. Differential
Equations
D. Arc Length
E. Area of a
Surface of Revolution
F. Moments and Centers
of Mass
G. Work
H. Average Value of a
Function
I. Hydrostatic Pressure and
Force
IV. Parametric Equations and Polar
Coordinates
A. Curves Defined by Parametric
Equations
B. Tangents and Area
C. Arc
Length and Surface Area
D. Polar
Coordinates
E. Areas and Lengths in Polar
Coordinates
F. Conic Sections
G. Conic
Sections in Polar Coordinates
V. Infinite
Sequences and Series
A. Sequences
B.
Series
C. Integral Test and Estimation of
Sums
D. Comparison Tests
E. Alternating
Series
F. Absolute Convergence and the Ratio
and Root Tests
G. Strategy for Testing
Series
H. Power Series
I. Representation
of Functions as Power Series
J. Taylor and
Maclaurin Series
K. Binomial Series
L.
Application of Taylor
Polynomials
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12.
Typical Assignments:
(List types of assignments, including library
assignments.) |
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a.
Reading Assignments:
(Submit at least 2 examples)
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Read selected topics
throughout the course from the textbook. For
example, how to calculate the volume of a solid
of revolution.
Read supplementary
handouts on topics such as Newton, Liebniz, and
the development of Calculus.
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b.
Writing, Problem Solving or
Performance:
(Submit at least 2 examples)
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1. Students will write a
report on Newton's discovery of the binomial
series.
2. Complete homework problems from
the textbook on topics throughout the
course.
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c.
Other
(Terms projects, research papers, portfolios,
etc.) |
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Program title - TOPS Code: |
Mathematics,
General- 170100
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SECTION
D |
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General
Education Information: |
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1. College
Associate Degree GE
Applicability: |
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Communication
& Analytic Thinking
Math
Competency
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2. CSU
GE Applicability (Recommended-requires CSU
approval): |
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B-4
Mathematics/Quantitative
Reasoning
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3. IGETC
Applicability (Recommended-requires CSU/UC
approval): |
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2:
Mathematical Concepts & Quantitative
Reasoning
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4.
CAN: |
MATH
20 |
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SECTION
E |
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Articulation
Information: (Required
for Transferable courses only)
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1. |
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CSU
Transferable. |
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UC
Transferable. |
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CSU/UC
major requirement. |
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If
CSU/UC major requirement, list campus and major.
(Note: Must be lower division) |
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2.
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List
at least one community college and its
comparable course. If requesting CSU
and/or UC transferability also list a CSU/UC
campus and comparable lower division
course. |
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SECTION
F |
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Resources: |
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Please
consider the identified concerns below:
1.
Library: Please
identify the implications to the
library
2.
Computer Support Services: Please
identify the implications to Computer Support
Services:
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SECTION
G |
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1. Maximum
Class Size (recommended): 35
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2. If
recommended class size is not standard, then
provide rationale: |
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