DATE |
Topic |
DATE |
Topic |
Mon, August 20 |
Introduction
and Introduction to Maple |
Mon,
October 15 |
Multivariate
polynomials and Q[x1,…,xn], Part I |
Wed,
August 22 |
Introduction
to Maple |
Wed,
October 17 |
Multivariate
polynomials and Q[x1,…,xn], Part II |
Mon,
August 27 |
Maple and “numbers” |
Mon,
October 22 |
Ideals
and the ideal membership problem |
Wed,
August 29 |
Procedures |
Wed,
October 24 |
MIDTERM |
Mon,
September 3 |
Labor Day |
Mon,
October 29 |
Elementary linear algebra |
Wed,
September 5 |
Loops |
Wed,
October 31 |
Groebner
bases |
Mon,
September 10 |
Implementing
the Euclidean Algorithm |
Mon,
November 5 |
Rational
functions |
Wed,
September 12 |
Advanced
procedures |
Wed,
November 7 |
Resultants |
Mon,
September 17 |
The
integers, Z |
Mon,
November 12 |
Newton’s
Iteration |
Wed,
September 19 |
Prime
factorization |
Wed,
November 14 |
Squarefree
polynomials |
Mon,
September 24 |
No class |
Mon,
November 19 |
Differentiation
and Maple |
Wed,
September 26 |
Modular
arthimetic and Zn |
Wed,
November 21 |
THANKSGIVING Break |
Mon,
October 1 |
Chinese
Remainder Theorem |
Mon,
November 26 |
Antiderivatives
and Maple |
Wed,
October 3 |
Polynomials
and Q[x], Part I |
Wed,
November 28 |
Antiderivatives
and Maple |
Mon,
October 8 |
Polynomials
and Q[x], Part II |
Mon,
December 3 |
Antiderivatives
and Maple |
Wed,
October 10 |
No class |
Wed,
December 5 |
Definite
integration using Maple |
FINAL EXAM:
WEDNESDAY DECEMBER 12 3:30–6:30 PM |