Engineering Mathematics - Homework 5 | MATH 3321, Assignments of Mathematics

Material Type: Assignment; Professor: Morgan; Class: Engineering Mathematics; Subject: (Mathematics); University: University of Houston; Term: Unknown 1989;

Typology: Assignments

Pre 2010

Uploaded on 08/19/2009

koofers-user-b13-1
koofers-user-b13-1 🇺🇸

9 documents

1 / 1

Toggle sidebar

This page cannot be seen from the preview

Don't miss anything!

bg1
Math3321Homework5
1. Solve'2,(0)2yyy=− = .
2. Solve'3,(0)1yyy==
.
3. Solve'2,(1)2yyy=− = .
4. Solve'3,(1)2yyy=−=.
5. Solve'22,(0)2yyy=− + = .
6. Solve'2cos(),(0)2yyty=− + = .
7. Solve'3sin(),(0)2yyty=− + = .
8. Solve'2cos(),(1)2yyty=− + = .
9. Problem4insection2.2
10. Problem6insection2.2
11. Problem9insection2.2
12. Problem15insection2.2
13. Problem16insection2.2
14. Problem2insection2.3.2
15. Problem3insection2.3.2
16. Problem4insection2.3.2
17. Problem2insection2.3.3
18. Problem3insection2.3.3
19. Problem2insection2.3.4
20. Problem3insection2.3.4
21. Problem2insection2.3.5
22. Problem3insection2.3.5
23. Problem2insection2.4
24. Problem4insection2.4
25. Problem1insection2.5
26. Problem5insection2.5
27. Findandclassifythesteadystatesof 2
'
y
yy
=
−+ .
28. Findandclassifythesteadystatesof 3
'
y
yy
=
−+ .
29. Findandclassifythesteadystatesof 'sin()
y
y
=
.
30. Findandclassifythesteadystatesof '10cos()
y
yy
=
(youmightneedtousearootfinder).

Partial preview of the text

Download Engineering Mathematics - Homework 5 | MATH 3321 and more Assignments Mathematics in PDF only on Docsity!

29. Find and classify the steady states of y ' = sin( y ).

  • Math 3321 Homework
      1. Solve y ' = −2 , y y (0) =
      1. Solve y ' = 3 , y y (0) =
      1. Solve y ' = −2 , y y (1) =
      1. Solve y ' = 3 , y y ( 1)− =
      1. Solve y ' = − 2 y + 2, y (0) =
      1. Solve y ' = − 2 y + cos( ), t y (0) =
      1. Solve y ' = − 3 y + sin( ), t y (0) =
      1. Solve y ' = − 2 y + cos( ), t y (1) =
      1. Problem 4 in section 2.
      1. Problem 6 in section 2.
      1. Problem 9 in section 2.
      1. Problem 15 in section 2.
      1. Problem 16 in section 2.
      1. Problem 2 in section 2.3.
      1. Problem 3 in section 2.3.
      1. Problem 4 in section 2.3.
      1. Problem 2 in section 2.3.
      1. Problem 3 in section 2.3.
      1. Problem 2 in section 2.3.
      1. Problem 3 in section 2.3.
      1. Problem 2 in section 2.3.
      1. Problem 3 in section 2.3.
      1. Problem 2 in section 2.
      1. Problem 4 in section 2.
      1. Problem 1 in section 2.
      1. Problem 5 in section 2.
      1. Find and classify the steady states of y '= − y + y
      1. Find and classify the steady states of y '= − y + y