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Lectures
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Date
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Subjects Covered
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Lecture Contents/Supplementary Materials
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Lecture 36
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Thurs. Dec. 2
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Review
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Review
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Lecture 35
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Wed. Dec. 1
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Sect 6.2: Subspaces and spanning families;
Sect 6.3: Linear Independence and Dimension
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Lecture 34
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Tues. Nov. 30
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Sect. 6.1-6.2:
Abstract vector spaces; subspaces
Appendix A: Complex numbers;
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Abstract vector spaces (definitions/examples);
matrix spaces; function spaces
Complex numbers
Problems in text:
Sect 6.1: 2,4,5
App A: 1,2,3,4,5,6
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Lecture 33
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Thurs. Nov. 25
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Sect. 8.2 Orthogonal diagonalization
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symmetric matrices: have real eigenvalues; can be orthogonally
diagonalized.
Examples: finding eigenvectors/eigenspaces by exploiting the orthogonality
Problems Sect 8.2: 1,4,5,11
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Lecture 32
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Wed. Nov. 24
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Sect 8.1: orthogonal projections;
Sect 8.2: orthogonal diagonalizations
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orthogonal projection as a *symmetric* linear operator; orthogonal
complements; decomposition of space Rn into U+U&perp
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(make-up) Lecture 31
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Tues. Nov. 23
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Sect 8.1
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orthogonality: orthogonal bases
specific homework problems:
due Monday Nov. 29: Sect 8.1: 1c), 2c), 3a),3b);
Sect 8.2: 1g), 5e),5f);
Sect 6.1: 2c)
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Lecture 30
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Tues. Nov. 23
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Sect. 5.5, 8.1
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eigenvalue multiplicity, dimension of eigenspace, diagonalizability
Problems in text: Sect 5.5: 1,5,8,9,10
Orthogonal Lemma
Problems in text:
Sect 8.1: 1,2,3,5,9
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Lecture 29
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Thurs. Nov. 18
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Sect. 5.5
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Diagonalization revisited; equivalence of diagonalization with existence
of a basis of eigenvectors
similarity definitions, examples, properties
not covered due to time constraint:
diagonalizability and (multiplicity of eigenvalues - dimension of
eigenspace) e.g. Theorem 6!
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Lecture 28
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Wed. Nov. 17
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Sect 5.4-5.5
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definition of rank A (dim row A/dim col A)
Rank Theorem
(basis for row space from RREF; basis for col space from original A)
rank(AB) &le min(rank(A),rank(B))
basis for null(A) (using [I E] from RREF)
specific homework problems:
sect 5.4 1a), 2c), 3c), 7a);
sect 5.5 1e), 8c), 9c), 10a)c).
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Lecture 27
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Tues. Nov. 16
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Sect. 5.4: Rank/RREF
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elementary column operations do not change col(A), i.e.
col(A) =col(AE) if E is invertible
elementary row operations do not change row(A), i.e.
row(A) =row(EA) if E is invertible
Problems in text:
Sect 5.4: 1a),2,3,7,10
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Lecture 26
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Thurs. Nov. 11
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Sect. 5.3
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Fourier expansion
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Lecture 25
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Wed. Nov. 10
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Sect 5.3
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problems: sect 5.3: 4,5a),6,10
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Lecture 24
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Tues. Nov. 9
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Sect. 5.3: orthogonality
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quick review of (including definitions): subspace; span; basis
(including example of finding a basis for null A that ended up having
orthogonal vectors)
Geometry: dot-product, length, unit vectors
Problems in text:
Sect 5.3: 1,2
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Lecture 23
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Thurs. Nov. 4
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Sect. 5.2
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linear independence, basis, dimension
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Lecture 22
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Wed. Nov. 3
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Sect 5.1,5.2
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null space, image space, eigenspace
linear independence
problems: sect 5.2: 2a) b), 3,4,5a), 6,13,17a)
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Lecture 21
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Tues. Nov. 2
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Makeup lecture;
sect 5.1 cont.. and sect 5.2
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examples of subspaces/spanning set; special problem presented in class;
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Lecture 20
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Tues. Nov. 2
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Sect. 5.1: Subspaces and Spanning Sets
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Definitions of subspaces and spanning sets
Problems in text:
1,2,9,16,22
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Lecture 19
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Thurs. Oct. 30
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Sect. 3.3, 4.4
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diagonalization and diagonalizability
projections/reflections/rotations (in R3)
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Lecture 18
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Wed. Oct. 28
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Sect. 3.3 continued (eigs)
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definition of eigenvalue/eigenvector: Ax= c x, x NOT 0!;
characteristic polynomial;
skip: invariant subspaces; dynamical systems
specific problems: sect 3.3: 14,16,19,26
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Lecture 17
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Tues. Oct. 26
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Sect. 3.3: Eigenvalues/Eigenvectors
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Examples of eigenvalues/eigenvectors;
Problems in text:
in Sect 3.3: 3,8,14,16,19,21,23,27 (specifically do 3,8!)
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Lectures 14-15-16
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Oct. 12,13,14
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Sect. 3.1 determinants/interpolating polynomials
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Tuesday
+ determinants and elementary row operations
+ product rule ( det(AB) = det(A) det(B) )
+ transpose rule
+ inverse rule ( A invertible iff det(A) ~= 0 )
Wednesday
+ Adjugate
+ Adjugate formula for inverse
+ Cramer's rule
Thursday
+ Polynomial interpolation
+ definition of eigenvalues and eigenvectors
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Lecture 13
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Thurs. Oct. 7
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Sect. 3.1 determinants
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determinant properties
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Lecture 12
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Wed. Oct. 6
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Sect. 2.6: Linear Transformations
Sect. 3.1: Determinants
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finding the matrix representations of linear transformations
(using the standard basis); matrix representation of
composite transformations; matrix representations of rotations
definition of determinant using cofactors/expansion along a row (Laplace
expansion)
Problems in text: in Sect. 3.1: 2,4,5a),6,7,10,17
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Lecture 11
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Tues. Oct. 5 (supplementary)
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Sect. 2.6: Linear Transformations
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Review of elementary matrices role in finding matrix
inverses
properties linear transformations (black box)
Problems in text:
in Sect 2.6: # 1,3,7,8a),9,17
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Lecture 10
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Tues. Oct. 5
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Sect. 2.5: Elementary Matrices;
Sect. 2.6: Linear Transformations
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Review of block matrix multiplications
elementary matrices definition
Problems in text:
in Sect 2.5: # 1,2,3a), 7a), 8b), 9
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Lecture 9
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Thurs. Sept. 30
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Sect. 2.4: Matrix inverse
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Problems in text in Sect 2.4: #1,2,3,4,9,16,22,28,30
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Lecture 8
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Wed. Sept. 29
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Sect. 2.3 Matrix multiplication and block multiplication
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Problems in text:
Sect 2.3: 2,6,21,27,36 (and 11,12,13)
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Lecture 7
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Tues. Sept. 28
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Sect. 2.1,2.2: Matrix Algebra
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Matrix addition, multiplication, scalar multiplication
Problems in text:
in Sect 2.1: # 2,3,6,12,13,20
in Sect 2.2: # 1,2,4a)b),6,7,11,12,13
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Lecture 6
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Thurs. Sept. 23
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Sect. 1.3
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examples for GE and GJE; rank; homogeneous systems
Problems in text in Sect 1.3: #1,2,7,9
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Lecture 5
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Wed. Sept. 22
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Sect. 1.2
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Gaussian (Gauss-Jordan) elimination; reduced echelon form (REF); row reduced
echelon form (RREF);
Problems in text:
Sect 1.2: 1,2,5, 9, 11, 12, 13, 16, 21
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Lecture 4
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Tues. Sept. 21
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Sect. 4.2: Projection and Nearest Points
Sect 1.1: Solving Linear Equations
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Nearest points; projections; orthogonality
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Given a point P and a line P0+ td, t in R:
use orthogonality (projection)
to find the closest point from P to the line.
(first, find the projection of one vector on another vector).
- examples
Solving Linear Equations
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Definitions of: linear equation; coefficients; solutions; consistent
system; inconsistent system; parametric form of general solution;
augmented matrix.
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start of: using elementary row operations for solving a linear
system of equations
- interchange rows
- multiply a row by a nonzero scalar
- subtract a nonzero multiple of one row from another row
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Problems in text:
in Sect 4.2: # 12, 21, 25, 29, 44;
in Sect 1.1: # 1,2;
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Lecture 3
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Thurs. Sept. 16
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Sect. 4.1,4.2
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Lines in Space
inner/dot product
angle between vectors (using the Law of Cosines)
Problems in text in Sect 4.2: #1,3,8,11
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Lecture 2
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Wed. Sept. 15
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Sect. 4.1: Vectors and Lines (vector: addition and scalar multiplication)
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Vector: addition and scalar multiplication
intrinsic descriptions: e.g. Theorem 1
Parallelogram Law: Theorems 2 and 3 and 4
Lines in Space: P+td (point P and direction d)
Problems in text in Sect 4.1: #1,4,7,14,21,22,24a), 24c)
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Lecture 1
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Tues. Sept. 14
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Sect. 4.1: Vectors and Lines
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Math. Prep. Information, i.e.
for Mechanical EM15-Stream8, Tues. Sept 14, 7-8:15 PM
A-L writing in RCH 110; M-Z writing in RCH 112
Alternate course webpage off of
Henry Wolkowicz' webpage; includes important links and applications
(e.g. to: search tools such as google; compression tools; etc...)
Course material covered:
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(Geometric) Vectors in R2 and in R3; magnitude and
direction; tip and tail of a geometric vector;
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Theorem 1: four properties
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vectors can be looked at in two ways: Geometric and Algebraic.
E.g. In R3 it is a 3 by 1 matrix, i.e. a 3 by 1 array of
numbers. (Note that matrices will be dealt with in detail as the course
continues.)
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