1384758512_795__232_lecture_7.8

Proj b mariolys b w 18 ix1 11 which isix2 equivalent

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Unformatted text preview: ys || b MW Combinatorial instances of discrete Continuous Limit Laws Marni Example. Assume that WQuasi-Powers and is the hyperplane defined by a1 x1 + · · · + an xn = 0, 13 30 IX.5 Sophie Gaussian limit laws for given scalars (a1 , . . . , an ). What is the distance of b = (b1 , . . . , bn ) to W ? 14 Dec 10 Presentations Asst #3 Due Dr. Marni MISHNA, Department of Mathematics, SIMON FRASER UNIVERSITY Version of: 11-Dec-09 C EDRIC C HAUVE , FALL 2013 6 f a cu lty of science d epa r tm ent of m athema tic s Week Date Sections 1 Sept 7 I.1, I.2, I.3 2 14 I.4, I.5, I.6 7 19 Part/ References MATH 895-4 Fall 2010 Course Schedule Topic/Sections MATH 232 S ECTION #7.8 Notes/Speaker from FS2009 Approximation for an inconsistent linear system Combinatorial Structures FS: Part A.1, A.2 Comtet74 Handout #1 (self study) Symbolic methods IV.3, IV.4 Analytic Methods Complex Analysis 9 VI.1 (self-study) 12 A.3/ C 18 IX.1 Unlabelled structures We did see previously that approximating a set of points by a line is equiv3 21 II.1, II.2...
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