No one who is closed off from mathematics can ever grasp the full significance of the natural order that is woven so deeply into the fabric of physical reality.

Paul Davies, The Mind of God

date			no	topic	reading	homework due
jan	9	T	1	introduction
	11	Th	2	review of vectors	9
	12	F	3	vectors in space	10.1	9PE: 6,8,10,12,14,16,18,20,22,26
	15	M		school holiday
	16	T	4	dot and cross products	10.2	10.1: 8,12,18,22,24,32,34,44,54,58 (62)
	18	Th	5	lines in space	10.3	10.2: 2,8,12,18,24,30,36,42,48,52 (32,46)
	19	F	6	planes in space	10.3
	22	M	7	quadric surfaces	10.4	10.3: 4,8,12,16,20,22,26,30,32,42 (50,52)
	23	T	8	space curves	10.5	10.4: 2,4,6,8,10,12,14,16
	25	Th	9	arc length	10.6	10.5: 6,8,12,14,18,26,30,34,40,44 (16,28)
	26	F	10	unit tangent vector	10.6
	29	M	11	the TNB frame	10.7	10.6: 2,6,8,10,12,14,16,18,22,24
	30	T	12	acceleration	10.7
feb	1	Th	13	planetary motion	10.8	10.7: 4,8,10,12,16 (14,18,28,36)
	2	F	14	kepler's laws	10.8
	5	M	15	review/catch-up day		10.8: 2,4,6,8,10,12,14,16,18
	6	T	16	functions of several variables	11.1
	8	Th	17	Test 1 (chapter 10)
	9	F	18	functions of several variables	11.1
	12	M	19	limits	11.2	11.1: 4,8,14,18,20,30,34,44 (12,46)
	13	T	20	continuity	11.2
	15	Th	21	partial derivatives	11.3	11.2: 6,10,16,22,28,32,36,56,62,68
	16	F	22	the chain rule	11.4	11.3: 2,4,14,34,42,46,48,54,58,74 (26,64)
	19	M	23	directional derivatives	11.5	11.4: 4,6,8,10,14,26,30,36,42 (12,48)
	20	T
	22	Th
	23	F	24	gradient	11.5
	26	M	25	linearization	11.6	11.5: 2,8,10,18,24,28,32,36,40,44 (14,20)
	27	T	26	extrema and saddle points	11.7	11.6: 4,6,8,14,18,20,24,28,30,36
mar	1	Th	27	lagrange multipliers	11.8	11.7: 2,8,10,22,26,28,30,32 (16,38,42)
	2	F	28	constrained variables	11.9	11.8: 6,10,12,16,18,22,32,34 (36,42)
	5	M	29	taylor's series	11.10	11.9: 2,4,6,8,10,12
	6	T	30	review/catch-up day		11.10: 2,4,6,8,10,12
	8	Th	31	Test 2 (chapter 11)
	9	F		spring break
	12	M		spring break
	13	T		spring break
	15	Th		spring break
	16	F		spring break
	19	M	32	double integrals	12.1
	20	T	33	double integrals	12.1
	22	Th	34	areas	12.2	12.1: 2,6,12,16,22,28,32,42,54,62 (40,66)
	23	F	35	moments	12.2
	26	M	36	integrals in polar form	12.3	12.2: 2,4,10,16,20,32 (26,38,44)
	27	T	37	triple integrals	12.4	12.3: 4,8,12,18,24,30,34 (16,38,42)
	29	Th	38	triple integrals	12.4
	30	F	39	masses and moments	12.5	12.4: 4,10,16,18,22,24,30,38 (20,36,42)
apr	2	M	40	cylindrical coordinates	12.6	12.5: 2,6,14,22 (10,20)
	3	T	41	spherical coordinates	12.6
	5	Th	42	substitutions	12.7	12.6: 4,8,16,22,28,34,40,44,70
	6	F	43	review/catch-up day		12.7: 2,6,12,16,20 (10,22)
	9	M	44	line integrals	13.1
	10	T	45	Test 3 (chapter 12)
	12	Th	46	vector fields	13.2	13.1: 4,6,10,14,18,22,24 (12,16,28)
	13	F	47	circulation and flux	13.2
	16	M	48	path independence	13.3	13.2: 2,4,8,14,18,24,28 (38,42)
	17	T	49	green's theorem	13.4	13.3: 2,6,8,12,16,26,28,32 (14,20,34)
	19	Th	50	surface integrals	13.5	13.4: 4,6,10,14,16,18,22,26 (20,28,32)
	20	F	51	parameterized surfaces	13.6	13.5: 2,8,14,18,20,22,26,34 (26,30)
	23	M	52	stoke's theorem	13.7	13.6: 6,10,14,18,20,30,38 (26,48)
	24	T	53	vector fields	13.8	13.7: 2,8,14,20,22 (4,10,18,26)
	26	Th	54	review/catch-up day		13.8: 4,6,10,18,22,26 (12,16,20,28)
	27	F		Final Exam (chapter 13 and comprehensive)   (2:00-5:00pm)

note: extra credit problems are indicated as (italics)