52H Homepage 2009

Planned Lecture Schedule for Math 52H, Winter 2009
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January 09
Sunday	Monday	Tuesday	Wednesday	Thursday	Friday	Saturday
				1	2	3
4	5	6 Lecture 1 S 7.1	7 Lecture 2 S 7.1	8 Lecture 3 S 7.1, 7.2	9 Meet with TA HW 1 Due	10 End Week 1
11	12 Lecture 4 S 7.3-7.6+sup	13 Lecture 5 S 7.3-7.6+sup	14 Lecture 6 S 7.3-7.6+sup	15 Lecture 7 S 7.3-7.6+sup	16 Meet with TA HW 2 Due	17 End Week 2
18	19 M.L. King Day No Lecture	20 Lecture 8 S 7.3-7.6+sup	21 Lecture 9 S 7.3-7.6+sup	22 Lecture 10 S 7.3-7.6+sup	23 Meet with TA HW 3 Due	24 End Week 3
25 Add Deadline	26 Lecture 11 Real Anal. Lec. 7	27 Lecture 12 S 7.3-7.6+sup	28 Lecture 13 S 8.1-8.2+sup Mid-term 1, 7pm	29 Lecture 14 S8.1-8.2+sup	30 Meet with TA HW 4 Due	31 End Week 4

.Abbreviation: S=Shifrin, Multivariable Mathematics, sup=supplementary material

February 09
Sunday	Monday	Tuesday	Wednesday	Thursday	Friday	Saturday
1 Drop Deadline	2 Lecture 15 Real Anal. Lec. 8	3 Lecture 16 S 8.1-8.2+sup	4 Lecture 17 S 8.1-8.2+sup	5 Lecture 18 S 8.3	6 Meet with TA HW 5 Due	7 End Week 5
8	9 Lecture 19 Real Anal. Lec. 9	10 Lecture 20 S 8.3	11 Lecture 21 S 8.4	12 Lecture 22 S 8.4	13 Meet with TA HW 6 Due	14 End Week 6
15	16 Presidents' Day No Lecture	17 Lecture 23 S 8.4	18 Lecture 24 S 8.5 + sup	19 Lecture 25 S 8.5 + sup	20 Meet with TA HW 7 Due	21 End Week 7
22	23 Lecture 26 S 8.5 + sup	24 Lecture 27 S 8.5 + sup	25 Lecture 28 S 8.5 + sup Mid-term 2, 7pm	26 Lecture 29 S 8.5+sup	27 Meet with TA HW 8 Due	28 End Week 8

March 09
Sunday	Monday	Tuesday	Wednesday	Thursday	Friday	Saturday
1 Withdrawal Deadline	2 Lecture 30 S 8.6	3 Lecture 31 S 8.6	4 Lecture 32 S 8.7	5 Lecture 33 S 8.7	6 Meet with TA HW 9 Due	7 End Week 9
8 Begin End Quarter period	9 Lecture 34 S 8.7	10 Lecture 35 S 8.7	11 Lecture 36 finishing up	12 Lecture 37 finishing up	13 Meet with TA	14 End Week 10 End of Lectures
15	16 Final Examination 7-10pm	17	18	19	20	21
22	23	24	25	26	27	28
29	30	31

The mathematical sketches used as filler for the lecture schedule calendar are taken from Isaac Newton's "Philosophiae Naturalis Principia Mathematica" (Mathematical Principles of Natural Philosophy, usually referred to simply as "Principia") published in 1687, in which Newton lays down his theory of universal gravitation and three laws of motion, and which contains many of the ideas and perspectives on limiting processes essential in his invention of the calculus.