1 i2 i3 4 28 ii4 ii5 ii6 5 oct 5 iii1 iii2 6 12 iv1

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Unformatted text preview: IV.1, IV.2 Part/ References Combinatorial Topic/Sections MATH 232 A SSIGNMENT #2 Notes/Speaker Symbolic methods Selected Hints & Answers: Structures 2 14 Unlabelled structures 1.2: 8. k = ±1 I.4, I.5, I.6 FS: Part A.1, A.2 Comtet74 1.2: 24. 21 need to check three dot products and three lengths. You II.1, II.2, II.3 3 Labelled structures I Handout #1 2.1: D5. The system is (self study) Combinatorial parameters FS A.III (self-study) Labelled structures II Combinatorial Parameters a+b+c=1 Asst #1 Due 4a + 2b + c = 4 Multivariable GFs a−b+c=1 19 IV.3, IV.4 Complex Analysis We7should expect one solution: three non-collinear points define a unique parabola. Analytic Methods 8 FS: Part B: IV, V, VI 26 Singularity Analysis Appendix B4 Additional questions: IV.5 V.1 Stanley 99: Ch. 6 9 Nov 2 Asst #2 Due A1. Minimizing the distance squared is the same as minimizing the distance, but formula is easier. So the first step should be to express Asymptotic methods Handout #1 the distance (squared) between the particule at time t and the point (2, 4, 0). (self-study) 10 9 VI.1 Sophie A2. Try12 see if you can find a “Yes” answer first. If you...
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This document was uploaded on 03/03/2014 for the course MATH 232 at Simon Fraser.

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