- Your very own metric space This is a description of your metric spaces project. Your job is to investigate
- MT 315-01 (101) TEST 1 (1) (15 pts) Let {A, B, C, D} be a set of four elements of some vector space. Suppose
- MATH 315 (091) ASSIGNMENT 5 Please hand in Monday Nov. 3.
- MATH 315 (082) ASSIGNMENT 6 Please hand in Friday April 18.
- Math 421 Introduction to Analysis Course Description for Semester 101
- CHAPTER 8 ESTIMATION CONFIDENCE INTERVALS FOR A MEAN (SECTIONS 8.18.2 OF
- Journal of Lie Theory Version of March 10, 2005 Volume ?? (??) ????
- Decomposition and Admissibility for the Quasiregular Representation for Generalized Oscillator Groups
- CONSTRUCTION OF CANONICAL COORDINATES FOR EXPONENTIAL LIE GROUPS
- MATH 141-02 082 SAMPLE TEST 2 1. Draw the angle 8/3 in standard position. Is this angle coterminal with 60
- MATH 141-02 082 TEST 2 Name: Show your work on all problems.
- MATH 141-02 082 SAMPLE TEST 3 1. Solve the identity ln(sec x) = -ln(cos x).
- MT 315-01 082 TEST 1 (1) (10 pts) Explain why the vectors shown are independent.
- MATH 315 (082) ASSIGNMENT 5 Please hand in Wednesday April 9.
- MT 315-01 091 TEST 3 (1) (15 pts) Define the linear transformation T : R2
- MATH 315 (101) ASSIGNMENT 1 Please hand in Wednesday Sept. 2 at the beginning of class.
- SEPARABILITY I invite you to work on proving any of the results below, including any parts of the theorems. I
- MATH 422/502 (SEMESTER 101) ASSIGNMENT 8 1. Let f : X Y be an isometry. Prove that f is injective, i.e., one-to-one.
- MATH 266-01 (091) TEST 1 1. (10 pts) Suppose that P, Q, and R are propositions such that P is true, Q is
- 266 (092) ASSIGNMENT 4 due on Friday Feb. 20
- CHAPTER 9 HYPOTHESIS TESTING TESTING A SINGLE POPULATION MEAN (SECTIONS
- MATH 141-02 082 PRACTICE TEST 1 1. (12 pts) Use the intersection command to solve the equation x3
- CHAPTER 6 NORMAL DISTIBUTIONS GRAPHS OF NORMAL DISTRIBUTIONS (SECTION 6.1 OF UNDERSTANDABLE
- MT 315-01 091 TEST 2 (1) (20 pts) Let V be the subset of C1
- MATH 315 ASSIGNMENT 4 (SEMESTER 101) Please hand in on Monday Oct. 12
- ADMISSIBILITY FOR A CLASS OF QUASIREGULAR REPRESENTATIONS Bradley N. Currey
- MATH 315 (081) ASSIGNMENT 2 Please hand in Monday February 11 at the beginning of class.
- MT 315-01 (091) TEST 1 (1) (15 pts) Consider the following statements. (Read carefully!)
- MATH 141-02 082 TEST 1 1. (20 pts) Find a viewing window that clearly shows all features of the graph of
- MT 315-01 061 TEST 1 (1) Let A be a subset of a vector space. Define precisely what is meant by the statement: "A is linearly dependent".
- 266 (092) ASSIGNMENT 5 due on Friday Feb. 27.
- MATH 421 (071) TEST 2 1. (15 pts) Suppose that (xn) and (yn) are sequences such that lim xn = and lim yn = 2. Find
- MATH 422/502 (SEMESTER 101) TEST 1 1. (15 pts) Let U be a subset of a metric space M. (a) Define: "U is open."
- PACIFIC JOURNAL OF MATHEMATICS Vol. 219, No. 1, 2005
- CHAPTER 10 REGRESSION AND CORRELATION SIMPLE LINEAR REGRESSION: TWO VARIABLES (SECTIONS 10.110.3 OF
- MATH 315 (081) ASSIGNMENT 1 Please hand in Wednesday January 30 at the beginning of class.
- MATH 266-01 (092) Principles of Mathematics Dr. Brad Currey
- MT 315-01 082 TEST 3 (1) (15 pts) Define the linear transformation T : R2
- MATH 266, Section 1, Fall 2011 Course Description
- The game: A game between two players. Here's how you play. 1. Decide who is player 1, and who is player 2.
- MATH 266 Section 01 Assignment 1 due September 7
- Journal of Lie Theory Volume ?? (??) ????
- The dilation property for abstract Parseval wavelet Bradley Currey and Azita Mayeli
- The game: A game between two players. Here's how you play. 1. Decide who is player 1, and who is player 2.
- MATH 266 Section 01 Assignment 3 due February 10
- MATH 266 Section 01 Assignment 1 due January 27
- MATH 266, Section 1, Spring 2012 Course Description