Homework

  Problem Set 26 #1, 2,3,4 on Differential Equations Handout A
Stewart 7.2 #3-6
W Nov 27 or M Dec.2 (your choice) (MWF)
or
T Nov 26 or T Dec 3 (your choice) (TTh) Solution 26  Problem Set 27 Enjoy Thanksgiving Break!

Problem Set 28 #6, 7, 8, 9 on Differential Equations Handout A version II (Get it by clicking here - it's different from the old one - throw the old one out.)
Stewart 7.3 #4, 10, 16, 29 and 7.5 #7
W Dec. 4 (MWF)
or
Th Dec 5 (TTh) Solution 28   Problem Set 29 Supplement 31.3 (p. 1014-1016) #1,2,3,5,6, 7
Stewart 7.3 #33 and 7.4 #19
Relevant reading is section 31.3 (pp. 1002-1017 in the supplement. At this point we've covered 31.1-31.4 in the differential equations chapter in the supplement.
F Dec. 6 (MWF)
or
T Dec 10 (TTh) Solution 29   Problem Set 30 Read the First Order Linear Diff Eqns handout under "supplements" and do problems 1,2 (with the condition that $x>0$), and 3 at the end of the handout.
Do #10, 11, 12, and 13 on< Differential Equations Handout A version II M Dec. 9 (MWF)
or
T Dec 10 (TTh) Solution 30  Problem Set 31 Stewart 7.6 #1,2 plus Chapter 7 Rev. p. 559 #20 (in (d) the trajectories are closed) and 21
Do #14, 16 on Differential Equations Handout A version II
Read the supplement 31.5 (pp. 1024 - 1040) and Stewart 7.6
W Dec. 11 (MWF)
or
Th Dec 12 (TTh) Solution 31 A more detailed solution to #16 is available in supplements Problem Set 32 In the supplement on p. 1042-1045 do #9, 13bc, 14
Do #15, 17 on Differential Equations Handout A version II
In the supplement p. 1023 #12, 13ab (mixture review)
F Dec. 13 (MWF)
or
T Dec 17 (TTh) Solution 32   Problem Set 33 Do #20, 21, 22, 23, and 24 on Differential Equations Handout A version II
Read the supplement 31.6 (pp. 1045 - 1047) M Dec. 16 (MWF)
or
T Dec 17 (TTh) Solution 33   Problem Set 34 In the supplement do #12 and 13 on p. 1050
Do #25, 26, 27 on Differential Equations Handout A version II
Read the supplement 31.6 (pp. 1048 - 1049) W Dec. 18 (MWF)
or
self-correct (TTh) Solution 34  Problem Set 35 (1.) Use series to solve y'' = k^2y.
(2.a) Find the first three non-zero terms of a power series solution to y' = xy +y +1
(2.b) Suppose y(0) = 0. Use your answer to (a) to approximate y(0.1).
(We'll do #18, 19 on Differential Equations Handout A version II in class.)
Read the supplement 30.4 (pp.959-961) and / or Stewart 8.10
self-correct Solution 35   -->