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# asst1 - CO 350 Assignment 1 – Winter 2009 Due: Friday...

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Unformatted text preview: CO 350 Assignment 1 – Winter 2009 Due: Friday January 16 at 10 a.m. Solutions are due in drop box #2 , outside MC 4066 by the due time: Slot #9 (A-F), Slot #10 (G-L), Slot #11 (M-R), Slot #12 (S-Z). Please acknowledge all outside help and collaboration in your submission. Write your name, ID# and Section# clearly: Section 1: J. Cheriyan, TTh 10-11:20 a.m. Section 2: E. Teske, MWF 10:30-11:20 a.m. 1. Linear Algebra Review (a) Let S = { v 1 , . . . , v n } be a set of n vectors from the vector space V . Complete the definition that begins S is a linearly independent set . (b) Is the set S = 2 , 2 5 3 , 3 − 1 4 linearly independent in R 3 ? Provide convincing evidence. (c) Let S = { x, y, z } be a linearly independent set, where x, y, z ∈ R n . Decide whether the following statements are true or false. If true, then give a proof, and if false, then give a counter-example....
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## This note was uploaded on 02/05/2010 for the course CO 350 taught by Professor S.furino,b.guenin during the Spring '07 term at Waterloo.

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asst1 - CO 350 Assignment 1 – Winter 2009 Due: Friday...

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