The lectures will be delivered as PDF presentations. I shall endeavour to make the notes available the day before the lecture so that students can "follow along". There may be additional notes written during the lectures. These will be posted shortly after the lecture finishes. I shall often prepare a little more than I shall actually give, any extra will be taken up in the next lecture or deferred to the wiki.

The notes will be available in several different layouts. It is important to know which is which.

1. Beamer. This is what will actually appear on the screen during the lectures. You must never print this version. As each "transition" results in a new page, this can easily exceed 100 pages.

2. Trans. This is a "one frame per page" version of the above. If you intend to "follow along" with the lecture on your own computer then this is probably the best. However, I still strongly urge you not to print it.

3. Handout. This is a more condensed version in terms of space. By putting 4 slides on a page the total number of pages is significantly reduced. If you want to print something then print this version.

4. Annotated. It will probably take a little experimenting to find the best way to present the annotated version. As a first go, the PDF contains just the annotated pages. For most pages, this should be sufficient to locate it within the main presentation. For some it may be useful to have the previous page included as well. Let me know if this, or something else, would be useful.

Note: all are as PDFs.

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1. 10th January. Complex Numbers. beamer trans handout annotations

2. 11th January. Complex Numbers and Powers. beamer trans handout annotations

3. 17th January. Differential Equations: Who? What? Why? Where? How? beamer trans handout annotations

4. 18th January. ODES: The Simplest Case. beamer trans handout annotations pendulum applet (see also applets)

5. 24th January. Set an ODE to Solve an ODE. beamer trans handout annotations

6. 25th January. Inhomogeneous ODEs. beamer trans handout annotations

7. 31st January. Lecture cancelled

8. 1st February. Resonance. beamer trans handout annotations pendulum applet (see also applets)

9. 7th February. Linear Systems. beamer trans handout annotations matrix applet (see also applets)

10. 8th February. Matrices and Linear Systems. beamer trans handout annotations

11. 14th February. Matrices. beamer trans handout annotations

12. 15th February. Invertibility. beamer trans handout annotations

13. 21st February. Inverting Matrices. beamer trans handout annotations

14. 22nd February. Muddiest Point. No advance notes. annotations

15. 28th February. Voluntary Midterm. No advance notes. annotations

16. 1st March. Vector Spaces. beamer trans handout annotations

17. 7th March. Describing a Subspace. beamer trans handout annotations

18. 8th March. Bases. beamer trans handout annotations

19. 14th March. Another Angle of Attack. beamer trans handout annotations

20. 15th March. Intrinsic Orthogonality. beamer trans handout annotations

21. 21st March. Decompositions. beamer trans handout annotations

22. 22nd March. Finding Eigenvectors. beamer trans handout annotations

23. 28th March. Things to Do With Eigenvectors. beamer trans handout annotations

24. 29th March. Muddiest Point. annotations

25. 4th April. Orthogonal Eigenvectors. beamer trans handout annotations

26. 5th April. Quadratic Forms. beamer trans handout annotations

27. 11th April. Revision Lecture: ODEs. annotations

28. 12th April. Revision Lecture: Linear Algebra. annotations

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