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6.
Minimum hours per week of independent work done
outside of class: 12
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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. 31 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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Math. 32 strongly
recommended
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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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First and second order
ordinary differential equations, linear
differential equations, numerical methods and
series solutions, Laplace transforms, modeling
and stability theory, systems of linear
differential equations, matrices, determinants,
vector spaces, linear transformations,
orthogonality, eigenvalues and
eigenvectors.
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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. solve first order
differential equations analytically,
numerically, and graphically;
2. solve higher
order differential equations;
3. construct a
basis for the solution space of a differential
equation;
4. apply Green's theorem to solve a
differential equation;
5. perform basic
operations on matrices;
6. use an augmented
matrix and Gaussian elimination to solve a
corresponding system of linear equations;
7.
apply the inverse matrix method to solve a
system of linear equations;
8. apply Cramer's
rule to solve a system of linear
equations;
9. verify that the axioms of a
vector space, subspace, and inner product are
satisfied for a variety of sets including:
n-dimensional space, polynomials, matrices,
continuous and differentiable functions;
10.
apply the definition, the wronskian, and the
determinant to determine the
independence/dependence of vectors in a vector
space;
11. construct the nullspace from a
given matrix;
12. apply the Rank-Nullity
theorem to determine the dimension of a vector
space;
13. apply the Gram-Schmidt procedure
to generate a set of orthogonal and orthonormal
vectors that span a given space;
14. verify
that a transformation is linear;
15.
construct the kernel and range of a linear
transformation;
16. apply eigenvalues,
diagonalization and variation of parameters to
solve a system of differential equations;
17.
construct a matrix exponential function for a
system of differential equations;
18. examine
the phase plane for generating a qualitative
representation of the solution to a system of
nonlinear differential equations;
19. use
Laplace transforms to determine the solutions to
a differential equation with initial value
conditions;
20. solve differential equations
with forcing functions involving the unit step
function and forcing functions involving the
Dirac delta function;
21. apply the
convolution integral to solve appropriate
differential equations;
22. assess the need
for the appropriate shifting theorems and apply
when appropriate to solve a differential
equation;
23. solve differential equations
using power series methods including Frobenius
solutions;
24. examine Legendre and Bessel
differential equations and their
solutions.
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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. First Order Differential
Equations
A. Slope Fields and Isoclines
B.
Separation of Variables
C. Integrating
Factors
D. Bernoulli Differential
Equations
E. Homogeneous First-Order
Differential Equations
F. Exact Differential
Equations
G. Applications to First-Order
Differential Equations
H. Numerical
Techniques
II. Elements of Linear
Algebra
III. Linear Transformations and
Linear Differential Operators
IV.
Higher-Order Linear Differential Equations
A.
Phase Plane
B. Homogeneous Constant
Coefficient Differential Equations
C. Method
of Undetermined Coefficients
D. Variation of
Parameters
E. Applications of Higher-Order
Differential Equations
V. Laplace
Transformations
A. Inverse Laplace
Transformations
B. Shifting Theroems
C.
Unit Step Function
D. Dirac Delta
Function
E. Convolution Integral
VI.
Series Solutions
VII. Matrices and Systems of
Linear Equations
VIII. Systems of Linear
Differential Equations
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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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1. Read the text content
regarding the axioms of a vector space prior to
class discussion on the subtle nature of these
axioms.
2. Review in a standard calculus text
power series representations for
functions.
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b.
Writing, Problem Solving or
Performance:
(Submit at least 2 examples)
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1. Solve the differential
equation D(y)+p(x)y=q(x) where p(x)=exp(x) and
q(x)=exp(-x)
2. Prove that P3 is a vector
space by verifying that the set P3 satisfies
each of the axioms for a vector
space.
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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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3. IGETC
Applicability (Recommended-requires CSU/UC
approval): |
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2:
Mathematical Concepts & Quantitative
Reasoning
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4.
CAN: |
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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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