Assignments:
 Do all the examples in the first Maple tutorial entitled
Basics.
April 3
 Do not use the shortcut menu buttons in the left
panel of Maple. Rather, manually type the commands as
they appear in the Maple examples.
 You should work all assigned Maple examples immediately after
they are posted to help you prepare for the programming assignments.
 There may be Maple related questions on exams
(see the course policy).
Kettering has made Maple amply available on many PCs throughout the AB.
Read Sections 0.1, 0.4, and 0.6.
April 3
(Because you should always read sections as we cover the material,
normally I do not post reading assignments.)
To expedite my taking attendance each day, please note the desk you
sit in on Thursday of Week 1. I will have you sit at that desk the
remainder of the term.
 Do this problem on truncation
error. (pdf document)
April 6
 Section 0.7 – Polynomial
Nested Form /
Truncation Error.
April 6
Since the use of Maple is required in this course, you should be
finished with Assignment 1 by now.
Recall that you should be forming your
teams of 4 for working the Programming Assignments.
(No more than 4 per team.) Your team may include students from either
of my two sections.
Read Section 1.1 on the Bisection Method (Interval Halving).
 Do all the examples in the second Maple tutorial entitled
Solutions of Equations.
April 10
You should complete Assignment 1 before doing this one.
Remember that these assignments will acquaint (or reacquaint)
you with Maple and prepare you for the programming assignments.
 Section 1.1 – Bisection Method.
April 10
 Write the Maple code for the
Bisection Method.
April 11
NOTE: Do this immediately, and play with the code by changing the
starting interval, the tolerance, even the function. You will use this
code as the template for writing the codes for other methods and for our
first programming assignment.
(April 13, 1743 was Thomas Jefferson's birthday. He and John Adams died
within mere hours of one another on July 4, 1826 — the 50th anniversary
of the adoption of the Declaration of Independence.)
 Formatted Printing.
After writing the Maple code for the bisection method, read and work through
all the examples in the 8th Maple tutorial entitled
Formatted Printing and Plot
Options.
April 13
Then change your Maple code for the bisection method so that it uses
formatted printing and prints
each xm in decimal form showing 8 decimal
places, f(xm) in scientific notation showing 6 decimal places, and the
interval length in scientific notation showing 4 decimal places.
From now on we will use the
printf command for printing.
 Section 1.2(a) – False Position.
April 13
 Section 1.3 – Newton's Method.
April 14
 Section 1.5 – Fixed Point Method.
April 17
 Section 1.5(b) – Fixed Point Method
with Aitken Acceleration.
April 19
EXAM 1 CONTENT ENDS HERE. . .
Here is the Crib Sheet
that I will provide you during the exam.
It may include anything from Assignment 1 through 11.
See more exam information here >>.
EXAM 2 CONTENT BEGINS HERE. . .

Program Assignment 1.
Due Mon., May 8 at 1:20.
(posted April 25)
Read this
document before beginning this assignment.
 You should have Assignments 6 & 7 successfully completed before you
attempt this.
 You should also study the pseudocode for Newton's method
(Assignment 9) and use formatted printing as explained in
Assignment 7.
 Here are some of the results
you should obtain in Part I.
Do NOT proceed to Part II until Part I works correctly.
 Section 3.2 – NewtonGregory Interpolating
Polynomials.
April 26
Here are some of the results
you should obtain in Part I of Program Assignment 1.
Do NOT proceed to Part II until Part I works correctly.
You should rework Exam 1 immediately to learn from your errors.
 Determine the Optimal Interpolation
Degree.
May 1
 Do this example that shows how to use Maple to generate an
interpolating polynomial through
points.
May 2
 Sections 5.2 & 5.3 – Proper Integrals:
Trapezoidal Rule and Simpson's Rules.
May 3
Note: This is a running assignment — do the problems on
this sheet as we cover the material.
 Write the Maple code for the trapezoidal rule.
May 4
NOTE: Do this immediately, and play with the code by changing the
number of subintervals, the limits of integration, even the integrand
f(x).
You will use this code as the template (model) for writing the codes for
other methods and for the second programming assignment.
 Section 5.3: Simpson's – 1/3 Rule.
May 4
Recall that Assignment 16 is a running assignment.
 Do all the examples in the third
Maple Tutorial entitled
Derivatives and Integrals.
May 5
 Section 5.3: Simpson's – 3/8 Rule.
May 5
Summary of
NewtonCotes integration formulas
EXAMPLES:

Program Assignment 2.
Due Friday, May 19 (Week 7) at 11:20 a.m..
(Posted Tuesday morning, May 9.)
Read this
document before beginning this assignment.
 You should have Assignments 17 – 19 successfully completed before you
attempt this.
 Do NOT proceed to Part II until Part I works correctly.
 Section 5.6 – Gauss Quadrature.
May 10
 Section 5.1 – Numerical Differentiation.
May 16
You should rework Exam 2 immediately after it is returned.
(Recall that a score below 64% is failing. See the course policy.)
On Tuesday I posted updated estimates of your midterm course grade on BannerWeb.
Start reading Chapter 6.
 Chapter 6 – Numerical Solutions of ODEs.
May 22
This is a running assignment.
Skipped Winter 2016, Summer 2015
 Chapter 6 (a) – Implicit Euler Method.
May 22
Facie (noun) \'fā • cē, 'fay
• see\
pl. facies \'fā • cēz, 'fay •
seez\ :
 an image of one's face taken by oneself or by another person using a
digital camera or phone,
especially for posting on social networking
sites or smartphones for personal identification.
 a photo ID showing only the face.
First Known Use of FACIE – 16:34 UTC,
October 12, 2014 by Kevin G. TeBeest, Michigan USA
Formerly: "profile photo" (archaic)
Usage: Professor TeBeest sent a photo of himself playing his
drums
to his brother who wanted a photo ID for his smartphone.
The brother whined saying, "Send me a photo of your ugly face you stupid. .
.!"
So Professor TeBeest sent his brother a facie.
Etymology: French façade
("a false, superficial, or artificial appearance or effect,"
Merriam–Webster); Italian facciata, a derivative of
faccia ("front"), from Latin facies ("face");
Geographical Use: worldwide
Not to be confused with selfie, which is a photo taken by oneself of
one's own body or part of the body, usually due to vanity.
The photo on a driving license is an example of a facie, although
it is not a selfie.
