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- Due Friday, January 7th
- Due Wednesday, January 12th
- Due Friday, January 14th. All problems in this assignment are taken from the book. If you have the book, the numbers are: p.99: 6 (consistent means the system has solutions), 9 (think about it in terms of geometrical objects in R^3), 10, 13abc; p106: 1abc.
- Due Wednesday, January 19th
- Due Friday, January 21st -- p108 10; p125 2,4,6,14 (scanned from book)
- Due Tuesday at the review session, January 25th -- p126 12ab; p140 2def (use cofactor expansions), 4,6
- Due Wednesday, February 2nd -- p. 140: 2def (use row operations), p.146: 2,4,6ab
- Due Friday, February 4th -- p. 164: 2abc,4a-j,6
- Due Wednesday, February 9th -- p. 174: 2abc,6a-d,9,10,11,12
- Due Friday, February 11th - p.185: 2a,6ab,8,10
- Due Wednesday, February 16th
- p: 186: 4a-d,
- Let V be an n-dimensional space. Prove that any n linearly independent vectors in V form a basis. Hint: prove by contradiction.
- Due Friday, February 18th - Study the example starting at the bottom of page 221, and then do the following problems: p 223: 2a-c,6a-c,10
- Due Wednesday, March 2nd - p 232: 2abc,4 (hint: consider upper-triangular matrices),5,8abc,10
- Due Wednesday, March 9th
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