E L AM 7"! MC
MATHEMATICS 300 Section A1
Fall 2014
Assignment #1
Due: September 18, 2014.
No late assignments will be accepted. You may reach 25 points in this assignment.
1. (5} (intermediate) Determine all boundary points of the set
l
S: {(x,y);0 <
E L AM “7"! MC
MATHEMATICS 300 Section A1
Fall 2014
Assignment #1
Due: September 18, 2014.
No late assignments will be accepted. You may reach 25 points in this assignment.
1. (5} (intermediate) Determine all boundary points of the set
l
S: {(x,y);0 <
MATHEMATICS 300 [A01]
Fall 2015
Assignment #1 Solutions
No late assignments will be accepted. You may reach 30 points in this assignment.
1. [5] Give an example of an innite collection, S1 , S2 , , of open sets in I whose
R
intersection is closed. We want
MATHEMATICS 300 [A01]
Fall 2015
Assignment #2
Due: Thursday, October 8th, 2015, at the start of class.
No late assignments will be accepted. You may reach 30 points in this assignment.
1. [6] Consider the subset of I 2 given by
R
X = cfw_v I 2 : |v| = 1
R
Reinhard lllner Fall 2014
Math 300 / A01
Midterm No. 1, N9, I
Student Name: 0 D
Registration No. :j
This exam contains 6 pages and 6 problems. Please check whether you have
a complete exam.
NO textbooks, formula sheets, cell phones. are allowed. Poc
UNIVERSITY OF VICTORIA
PRACTICE FINAL EXAMINATION FALL 2009
MATHEMATICS 300, SECTIONS [A01], [A02] & [A03]
Instructors: Drs. Reinhard Illner, Martial Agueh, Mak Trifkovic
Part A. Quick and Easy Problems. Do these rst.
[5]
1. a) Give the denition of contin
MATHEMATICS 300
Fall 2014
Assignment #4
Due: November 6, 2014.
No late assignments will be accepted. You may reach 25 points in this assignment.
1. [5] Can you (in principle) solve the equations
9 .
33y 1:311. + yr)2 : l
2 2
11.33 + 2.771) + uv' : 4
for u
Maximum and Minimum Values
Let f be a function of two variables x and y.
We say that f has a local maximum at (a, b) if
f (x, y) f (a, b) for all points (x, y) in a neighborhood of (a, b). We say that f has a local minimum
at (a, b) if f (x, y) f (a, b) f
MATHEMATICS 300
Fall 2014
Assignment #2
Due: October 1, 2014.
No late assignments will be accepted. You may reach 25 points in this assignment.
1. [5] Use the denition of the derivative given in class to prove the product rule for two
functions g and f wh
MATHEMATICS 300 [A01]
Fall 2015
Assignment #2
Due: Thursday, October 8th, 2015, at the start of class.
No late assignments will be accepted. You may reach 30 points in this assignment.
1. [6] Consider the subset of I 2 given by
R
X = cfw_v I 2 : |v| = 1
R