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# 1 ii2 ii3 28 ii4 ii5 ii6 part references

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Unformatted text preview: II.4, II.5, II.6 Part/ References Combinatorial 2. Additional questions: Structures 3 4 FS: Part A.1, A.2 Comtet74 Handout #1 (self study) 2 Topic/Sections MATH 232 A SSIGNMENT #9 Notes/Speaker Symbolic methods Unlabelled structures Labelled structures I A1. Let v1 = (1, 2, 1), v = (−1, −4, 2), v3 = (1, 1, 2). Labelled structures II 5 Combinatorial (a). Show that Combinatorialv3 } is a linearly independent set. {v1 , v2 , Oct 5 III.1, III.2 Asst #1 Due 6 (b). Show that FSv1 , v2 , v3 } is a basis of R3 . { A.III 12 IV.1, IV.2 Multivariable GFs (self-study) 7 19 8 9 parameters Parameters (c). Express each of e1 = (1,Complex,Analysis (0, 1, 0), and e3 = (0, 0, 1) as a linear combination of 0, 0) e2 = IV.3, IV.4 Analytic Methods FS: Part B: IV, V, VI {v1 , v2 , v3 }. 26 Singularity Analysis IV.5 V.1 Appendix B4 Stanley 99: Nov 2 Asst v2 , (d). Write the matrixCh. 6whose columns are v1 ,#2 Dueand v3 (in that order), and ﬁnd A−1 . A Asymptotic methods Handout #1 (self-study) 10 11 12 9 VI.1 Sophie (e). Do you see any con...
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## This document was uploaded on 03/03/2014 for the course MATH 232 at Simon Fraser.

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