For next seminar: full exam sets
For next week I intend to assign two entire fairly recent exam problem sets. I recommend that you simulate an exam situation for each:
- Allocate 3 hours, and do not open the problem sets until that time.
- Arm yourself with notes and books and paper and pencil.
- Start your stopwatch. Open the problem set. Work three hours.
- Only afterwards, see what you would be able to improve with more time: crack the remaining nuts.
I have not completely decided which ones are most appropriate to assign (I have three on mind, one is likely a bit odd at this stage and could serve as a "practice set" I think). Most likely you should drill a little bit into this week's curriculum before starting. I may assign some such problems by tomorrow, but here are a few:
- Make sure you got exam Autumn 2012 Problem 4 (d) right.
- Let a > 0, b and c be constants, and consider the minimum value V = V(a,b,c) of the quadratic ax2 + bx + c. (That is, minimise wrt. x only.)
Find the partial derivatives of V using the envelope theorem, and verify by calculating V first and differentiating. - Same as the previous question, except instead for the function
V(p,q) = minx {eqx - px}, where p > 0, q > 0.
(Again: min. wrt. x only.) - Let V(p,q) = minx {eqx - px + qx2}, where p > 0, q > 0.
Find as simple expressions as possible for the first-order partial derivatives.
Published Apr. 14, 2015 8:53 PM
- Last modified Apr. 14, 2015 8:58 PM