1 12 a3 c 18 10 9 ix1 11 and add row 2 to row 1

Info iconThis preview shows page 1. Sign up to view the full content.

View Full Document Right Arrow Icon
This is the end of the preview. Sign up to access the rest of the document.

Unformatted text preview: IX.2 23 IX.3 25 12 IX.4 2 5 So [T1 1 ] = 4 2 14 Dec 10 4 13 and Limit Laws FS: Part C (rotating presentations) 30 IX.5 3 1 2 Singularity Analysis 2 Asymptotic methods 1 10 40 1 0 Introduction to Prob. 001 3 1 00 2 1 05 , 0 01 Asst #1 Due 1 2 4 3 00 1 05 , 21 Asst #2 Due 32 21 Mariolys 4 2 Sophie Limit Laws and Comb Marni 2 Discrete Limit Laws Sophie 100 53 Combinatorial ariolys 40 1 0 M2 1 instances of discrete 0 0 1 Marni 2 Continuous Limit Laws 4 3 Quasi-Powers and 1 Gaussian limit laws 0 5, so that Presentations 1 MATH 232 A SSIGNMENT #8 Sophie 3 1 0 5, 1 3 1 0 5, 1 Asst #3 Due 2 32 3 53 1x 0 5 4y 5 T1 1 (x, y, z ) = 4 2 1 4 21 z 2 3 5x + 3y z 2x + y 5 . =4 4x 2y + z Dr. Marni MISHNA, Department of Mathematics, SIMON FRASER UNIVERSITY Version of: 11-Dec-09 So T1 1...
View Full Document

This document was uploaded on 03/03/2014 for the course MATH 232 at Simon Fraser.

Ask a homework question - tutors are online