OC2138

University of Toronto St. George

6Uploads
2Likes
0Blog Articles
All Activity
Uploads (6)
Blog Articles (0)
Homework Help (0)
UTSGMAT237Y1allFall

Additional Exercises 3

OC21384 Page
27 Sep 2011
31
Since the integral cannot be evaluated directly, we have to reverse the order of integration. The region of integration is also be described as. 1 (b)
View Document
UTSGMAT237Y1allFall

MAT237Y1 Study Guide - Connected Space, Convex Set, Open Set

OC21385 Page
27 Sep 2011
28
2 u u ev is of class c , 1 g. 0 (b) [5 marks] suppose terms of x , y and the partial derivatives of f over x and y . yxf ys. 0 s x u t f x x t f y y t
View Document
UTSGMAT237Y1allFall

MAT237Y1 Study Guide - Level Set, Wavelength-Dispersive X-Ray Spectroscopy, Compact Space

OC21385 Page
27 Sep 2011
31
)}0,0{(\}1: (a) verify whether or not the following statements are correct. No marks for guessing. (i) [3 marks] if s int. R attains its absolute minim
View Document
UTSGMAT237Y1allFall

MAT237Y1 Study Guide - Piecewise, Simply Connected Space, Iterated Integral

OC21384 Page
27 Sep 2011
34
2( (i) show that f is conservative on. Hence f is conservative iff k z z. 3r , and of course which actually is the case. 0 (ii) find the potential func
View Document
UTSGMAT237Y1allFall

MAT237Y1 Study Guide - Piecewise, Density

OC21384 Page
27 Sep 2011
40
F zyx: suppose (a) [5 marks] is there a real number a such that. We have k y az j x i where a is a constant. 0 for all values of a and so there is no v
View Document
UTSGMAT237Y1allFall

MAT237Y1 Study Guide - Riemann Integral, Level Set, Riemann Sum

OC213815 Page
27 Sep 2011
45
Here are additional exercises to supplement the acknowledged paucity of problems in the textbook, roughly grouped according to the chapter material the
View Document