MAT 418-01 Tentative Schedule

Emphasis on tentative! The instructor reserves the right to change schedules and topic, depending on the class’s needs and other events!
This schedule dates from when MAT 421 was a summer class.
You can estimate the spring schedule by multiplying the week number by 1.5.

Date Planned

Date Actual

Topic

Week 1Ch. 1: What is Number Theory? and
Chs. 2-3: Pythagorean Triples
Week 2Ch. 4: Sums of Higher Powers and Fermat’s Last Theorem and
Ch. 5: Divisibility and the Greatest Common Divisor and
Ch. 6: Linear Equations and the Greatest Common Divisor
Week 3Ch. 7: Factorization and the Fundamental Theorem of Arithmetic and
Ch. 8: Congruences
Week 4Ch. 9-10: Congruences, Powers, Fermat’s Litle Theorem, and Euler’s Formula
Week 5Ch. 11: Euler’s \(\phi\)-function and the Chinese Remainder Theorem and
Ch. 12: Prime Numbers
Test 1 through the middle of Chapter 11
Week 6Ch. 13: Counting Primes and
Chs. 14-15: Mersenne Primes and Perfect Numbers
Week 7Ch. 16: Powers Modulo \(m\) and Successive Squaring and
Ch. 17: Computing \(k^{\textrm{th}}\) Roots Modulo \(m\) and
Ch. 18: Powers, Roots, and “Unbreakable” Codes (aka RSA algorithm)
Weeks 8-9Chs. 35-36: Gaussian integers and unique factorization and
Ch. 37: Irrational and Transcendental Numbers (including Liousville’s Number)
Test 2 emphasizes the Chinese Remainder Theorem, Chapters 12-18, and Chapters 35-37 (excluding anything related to the sums of two squares)