Teaching plan

In the references to Lecture notes / comments English: the ?EMEA? abbreviation is to the English ?Essential Mathematics for Economic Analysis?, 3rd or 4th edition. The references in slanted font is for those who choose to use the Norwegian books: MA1 (med ref. til 7. og 8. utgave), MA2, LA.

This is the January 15th version. Updates (corrections and other) will be announced on the course home page http://www.uio.no/studier/emner/sv/oekonomi/ECON4120/v13/ .

Date	Teacher	Place	Topic	Lecture notes / comments
21.01.2013	BD?	?	Introduction to the course; Exponential and logarithmic functions (review); Interest and present values ?	EMEA 4.9—4.10, 6.10—6.11, 10.1—10.3 / MA1 3.9–3.10, 5.10–5.11, 8.1–8.3?
25.01.2003	BD?	?	The differential. Linear and quadratic approximation. Taylor’s formula.?	EMEA 7.4—7.6, 12.8—12.9 / MA1 7.4–7.6 (gml.utg.: ogs? 7.3); 12.8–12.10 (gml.utg.: 12.3–12.4)?
28.01.2013	BD?	?	Limits and continuous functions. Indefinite expressions. The intermediate value theorem ?	EMEA 7.8—7.12, 9.1—9.4 / MA1 kap 6 (unntatt det som ikke er pensum), 10.1–10.4?
01.02.2013	BD?	?	The integral. Methods of integration. ?	EMEA 9.1—9.6 / MA1 10.1–10.4, 10.6–10.7?
04.02.2013	BD?	?	Methods of integration.?	EMEA 9.5—9.6 / MA1 10.6–10.7?
08.02.2013	BD?	?	Extensions of the integral concept.?	EMEA 9.7 / MA1 10.9?
11.02.2013	BD?	?	Introduction to (first-order!) differential equations. Separable differential equations. ?	EMEA 9.8, FMEA 5.1—5.4 / MA1 10.10, MA2 1.1–1.4?
15.02.2013	BD?	?	Separable and linear differential equations?	see 11.02.2013?

18.02.2013: No Lecture

22.02.2013: No Lecture

Date	Teacher	Place	Topic	Lecture notes / comments
25.02.2013	BD?	?	Linear differential equations. Some remaining bits and pieces. ?	see 11.02.2013?
01.03.2013	BD?	?	Vectors. Scalar products. Straight lines and planes w. applications to budget constraints. Possibly: introduction to matrices.?	EMEA 15.7—15.9 / LA 2.1–2.4, 2.6?
04.03.2012	BD?	?	Matrices and matrix operations. Linear equation systems. ?	EMEA 15.1—15.4 / LA 3.1–3.4?
08.03.2013	BD?	?	Linear equations: Gaussian elimination. A bit about the inverse. ?	EMEA 15.5—15.6 / LA 3.5, 4.1?
11.03.2013	BD?	?	Gaussian elimination. Introduction to determinants ?	EMEA 15.5—15.6, 16.1—16.3 / LA 3.5, 4.1 , 5.1–5.3 ?
15.03.2013	BD?	?	Determinants. Inverse matrices. Cramér's rule?	EMEA 16.1—16.8 _ / LA 5.1–5.5, 6.1–6.3 ?
18.03.2013	BD?	?	Probably some leftover topics from linear algebra. Then review of maxima and minima. ?	EMEA 8.1—8.7, 13.1—13.2 / MA1 9.1–9.7 (kort repetisjon), 13.1–13.5 (ikke 13.5 i gml. utg.) ?
22.03.2013	BD?	?	Maxima / minima cont'd. Constrained maxima and minima. (Review.) ?	EMEA 13.1—14.4 except the envelope theorem / MA1 13.1–14.4 unntatt omhyllingssetningen?

25.03.2013: No Lecture

29.03.2013: No Lecture

01.04.2013: No Lecture

05.04.2013: No Lecture

Date	Teacher	Place	Topic	Lecture notes / comments
08.04.2013	BD?	?	Constrained maxima and minima. Nonlinear programming. ?	EMEA 14.5—14.7 / MA1 14.5–14.6, deler av MA2 8.7–8.8, 8.10–8.11 ?
12.04.2013	BD?	?	Nonlinear programming.?	EMEA 14.8—14.9 / deler av MA2 8.7–8.8, 8.10–8.11 ?
15.04.2013	BD?	?	Nonlinear programming.?	(As previous lecture.)?
19.04.2013	BD?	?	The envelope theorem in unconstrained and constrained maximization?	?
22.04.2013	BD?	?	Implicit differentiation and slopes of level curves. (Review.) Differentiation in equation systems. ?	EMEA 7.1—7.3, 12.1—12.4 , 12.8—12.11 / MA1 12.3-12.4, 12.11–12.12 (gml utg: 12.1–12.2 og 12.4–12.6)?
26.04.2013	BD?	?	Elasticities. Elasticity of substitution. Finding elasticities of implicit functions. ?	EMEA 7.7, 11.8, 12.5 / MA1 5.12, 11.8, 12.5 (gml. utg.: 5.12–5.13, 11.11, 12.7) ?

29.04.2013: No lecture

03.05.2013: No Lecture

Date	Teacher	Place	Topic	Lecture notes / comments
06.05.2013	BD?	?	Homogeneous and homothetic functions?	EMEA 12.6—12.7 / MA1 12.6-12.7 (gml.utg.: 11.12–11.13) ?
10.05.2013	BD?	?	Review?	Review?

Published Jan. 15, 2013 1:10 PM - Last modified Jan. 15, 2013 5:10 PM