Course website for `Math 301: Introduction to Proofs' taught at Johns Hopkins during Fall 2019.

The main text will be How To Prove It: A Structured Approach by Daniel J Velleman. You might also enjoy How to write proofs: a quick guide by Eugenia Cheng.

The person providing the proof and the person reading it should therefore have an agreed upon set of rules that a valid proof should obey. We will start the semester by formally studying a system of such …

This is an introduction to real analysis. Topics covered in the course will include, The Logic of Mathematical Proofs, Construction and Topology of the Real Line, Continuous Functions, Differential …

Math 301 Introduction to ProofsSchedule (tentative)

This is a rigorous introduction to complex analysis and is considered an Introduction to Proofs (IP) course. Topics covered in the course will include, review of complex numbers, Cauchy's theorem, …

k so a and b, we say ses are “true or false . If true, supply a proof. If fa se, supply a c

Exercise 7. Identify the set × ∅ and give a proof to justify your answer. Identity the set × [1] and give a proof to justify your answer. How many elements are there in the set [] × [] ?

Math301:IntroductiontoProofs Math 301: Introduction to Proofs ptember 11, Emily Riehl Exercise 1. Analyze the logical forms of the following statements:

Abstract: An introduction to proofs course aims to teach how to write proofs informally in the language of set theory and classical logic. In this talk, I'll explore the alternate possibility of learning instead to …