MATH 235
Instructors:
Section Classroom and Time
001
MC 2054
10:30-11:20 MWF
002
MC 4020
11:30-12:20 MWF
003
MC 4020
1:30-3:20 MWF
Course Objectives:
LINEAR ALGEBRA 2
SPRING 2012
Instructor
Mukto Akash
Contact Information
MC 4016
[email protected]
MATH 235, Winter 2015
Assignment 7
Due: Wednesday, March 4th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
Box
MATH 235, Winter 2015
Assignment 7
Due: Wednesday, March 4th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
Box
MATH 235, Winter 2015
Assignment 8
Due: Wednesday, March 11th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
Bo
MATH 235, Winter 2015
Assignment 8
Due: Wednesday, March 11th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
Bo
MATH 235, Winter 2015
Assignment 10
Due: Wednesday, March 25th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
B
MATH 235, Winter 2015
Assignment 9
Due: Wednesday, March 18th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
Bo
MATH 235, Winter 2015
Assignment 10
Due: Wednesday, March 25th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
B
MATH 235, Winter 2015
Assignment 11
Due: Wednesday, April 1st
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
Bo
MATH 235
ASSIGNMENT 12
Not to be handed in
1. Suppose that A Mnn (C). Let 1 , . . . , n be the n complex eigenvalues of A. Prove
that
n
n
trace(A) =
i ,
det(A) =
i=1
i ,
i=1
i.e., the trace is equal to the sum of the eigenvalues and the determinant is equ
MATH 235, Winter 2015
Assignment 6
Due: Wednesday, February 25th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
MATH 235, Winter 2015
Assignment 6
Due: Wednesday, February 25th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
MATH 235, Winter 2015
Assignment 1
Due: Wednesday, January 14th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
Math 235
Sample Midterm 1
1. Short Answer Problems
(a) State the denition of the four fundamental subspaces of an m n matrix A.
(b) State the denition of the rank of a linear mapping L : V W.
(c) State the Rank-Nullity Theorem.
(d) Prove that if cfw_v1 ,
MATH 235, Winter 2015
Assignment 1
Due: Wednesday, January 14th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
MATH 235, Winter 2015
Assignment 3
Due: Wednesday, January 28th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
MATH 235, Winter 2015
Assignment 2
Due: Wednesday, January 21st
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
MATH 235
ASSIGNMENT 5
Not to be handed in
Since Wed. Feb. 11 is the day after the midterm, you do not have to hand in this assignment.
Note, however, that you are responsible for material up to and including Section 9.5. As
such, you are advised to treat
MATH 235, Winter 2015
Assignment 4
Due: Wednesday, February 4th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
MATH 235, Winter 2015
Assignment 3
Due: Wednesday, January 28th
Submission Guidelines:
Assignments are due at 4:30pm on the due date, and must be submitted to the correct
math dropbox/slot (outside MC 4067):
Section 001 (Purbhoo)
Section 002 (Wolkowicz)
MATH 235
ASSIGNMENT 5
Not to be handed in
Since Wed. Feb. 11 is the day after the midterm, you do not have to hand in this assignment.
Note, however, that you are responsible for material up to and including Section 9.5. As
such, you are advised to treat
MATH 235
ASSIGNMENT 12
Not to be handed in
1. Suppose that A Mnn (C). Let 1 , . . . , n be the n complex eigenvalues of A. Prove
that
n
n
trace(A) =
i ,
det(A) =
i=1
i ,
i=1
i.e., the trace is equal to the sum of the eigenvalues and the determinant is equ