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- Peter A. Perry Department of Mathematics
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- A linear fractional transformation is a mapping f : C ! C of the form where a; b; c; d are complex numbers with ad bc 6= 0. The linear fractional
- Problem Set #0 Solutions How does one learn to "do" proofs? By observation and by practice,
- Problem Set #9 Solutions 1. (p. 104, 1b) To ...nd
- Problem Set #5 Solutions 1. (p. 63, prob. 3) We apply the root test with an = an2
- Problem Set #3 Solutions 1. We will use the Cauchy criterion to show that fbng converges. First,
- Problem Set #4 Solutions 1. Suppose that fang is a sequence with an ! 0, that fsng is the sequence
- Problem Set #2 Solutions "Men pass away, but their deeds abide." Augustin-Louis Cauchy, (1789-
- Problem Set #1 Solutions Thanks to Xiaoli Kong, Ryan Curry, and Chad Linkous for ideas used in
- Problem Set #8 Solutions 1. (p. 91, problem 1) Let a = f(1) and note that f(n) = na for all integers n.
- Problem Set #10 Solutions 1. (p. 107, 1) Consider the function
- Problem Set #7 Solutions 1. (p. 83, prob.12) Let p be any point in S, and consider the sequence
- Problem Set #6 Solutions 1. (p. 78, problem 2) (=)) Suppose that p is a limit point of B. Let
- Sequences, Completeness, Sequential Compactness: An IBL Approach
- Problem Set #11 Solutions 1. (112, prob. 3) Suppose that f is nonnegative on [a; b] and
- Problem Set #4 Measurable Functions
- Problem Set #3 Measure, Continued
- MA 676 Chad Linkous Homework # 1
- Problem Set #2 Jordan Measure
- Problem Set #6 The Lebesgue Integral, Part I
- Problem Set #5 Measure and the Integral
- Problem Set #2 Jordan Measure
