# MATH 448/548 and CPT SCI 430/530

# Numerical Analysis

Course Syllabus (pdf)
- Instructor: Robert Dillon
- Office: Neill 324
- Phone: (509)335-5110
- E-mail:
dillon at math.wsu.edu
- Office Hours: WED 9-11, and by appointment
## Maple and Matlab

## Matlab programs

- bisection.m

## Midterms

- first midterm: October 19
- second midterm: November 30
- old midterm 2
- old midterm 2
## Final: Friday, December 15, 1:00-3:00

- Location of final: CUE 316
## Assignments

- HW 1 (DUE Sep 7)
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- 10th ed
- (1.1) 8, 9, 14, 22 (1.2) 2, 8, 24
- Should have been: (1.1) 10, 11, 16, 25 (1.2) 4, 10, 28

- 9th ed
- (1.1) 8, 9, 14, 22 (1.2) 2, 6def, 24

- HW 2 (DUE Sep 22)

- 10th ed

- (2.1) 2, program:Algorithm 2.1 ---> problem 6, 17
- (2.2) 1, 2a, 8, 10, 12
- (2.3) 6ad, 8ad (secant only), 14ac, 16

- 8th and 9th ed

- (2.1) 2, program:Algorithm 2.1 ---> problem 6, 15
- (2.2) 1, 2a, 6, 8, 10
- (2.3) 6ad, 8ad (secant only), 18ac, 20

- HW 3 (DUE October 5)
- 10th ed
- (2.4) 8, 11 (10.2) 1a, 2b (3.1) 3,13ac (3.3) 1, 3
- (3.4) 3b, 6a (3.5) 5b, 7b, 12
- 9th ed
- (2.4) 8, 11 (10.2) 1a, 2b (3.1) 3,13ac (3.3) 1, 3
- (3.4) 3b, 6a (3.5) 5b, 7b, 13
- 8th ed
- (2.4) 8, 11 (10.2) 1a, 2b (3.1) 3,19ac (3.2) 1, 3
- (3.3) 3b, 6a (3.4) 5b, 7b, 13

- HW 4 (Due Oct 26 )
- 10th ed
- (4.1) 3b, 26 (4.3) 7d, 24, 26 (4.4) 3b,14 (4.6) 3bd

- 8th and 9th eds
- (4.1) 3b, 24 (4.3) 7d, 20, 24 (4.4) 3b,14 (4.6) 2bd

- HW 5 (Due November 9 )
- 10th ed
- (4.7) 3bd, 5bd
- (5.1) 3ab (5.2) 1a, 3a, 10a (5.3) 9a, 9bi

- 9th eds
- (4.7) 2bd, 3bd
- (5.1) 3ab (5.2) 1a, 3a, 10a (5.3) 9a, 9bi

- HW 6 (Due December 7)
`
- (5.4) 2b, 10b
- (5.5)
- Develop an algorithm for an adaptive Runge-Kutta method based on

the first order Euler method and the second order Midpoint method.

Use this to solve the IVP shown in (5.5) 1b with TOL = 0.1.

- (5.6) 2B (ed 9) 3B(ed 10) USE ONLY TWO-STEP AND THREE-STEP METHODS
AND T FROM 1 TO 2;

6a (ed 9) 9a (ed 10) for T between 0 and 2.

- (5.10) 5