Due: 10:30 a.m. on Thuesday, Sept. 28, 2010.
(10 pts) 1. Do Problem 2.3.5 (a), (c), (e).
(10 pts) 2. Do Problem 3.1.7. Refer to Problem 3.1.4.
(12 pts) 3. Do Problem 3.2.23(a)
(12 pts) 4. Do Problem 3.4.13
Part II: T
Multi-Resolution Analysis for the Haar Wavelet
Department of Mathematical Sciences
University of Texas at El Paso
El Paso TX 79968-0514
Last edits: October 10, 2012
The space L2([0, 1) and its scalar product
We will denote by L2 ([0, 1) th
Very nice. 30 pts.
Due Monday, October 13, 2014
Problem 1 (10 points)
In Notebook 032 you have seen how to convert a color image to its YCbCr components. Recreate the
original color image from its Y-, Cb- and Cr- components. (Check your result
Computing Fourier series with Mathematica
Copyright (c) Kevin Long, Texas Tech University, 2009
This notebook shows how to use Mathematica to automate the computation of partial sums of a Fourier series.
We restrict ourselves to the case where the functio
Due: 10:30 a.m. on Tuesday, Nov. 2, 2010
1. Do Problem 6.1.22
2. Do Problem 6.2.24
3. Do Problem 6.3.1
4. Do Problem 6.4.5
5. Do Problem 6.4.25
6. Do Computer Problem 4.7.2
Part III: The goal is to see how g
Due: 10:30 a.m. on Thursday, Dec. 2, 2010
1. (a) Using Taylor series expansions, derive the error term for the formula
[f (x) 2f (x + h) + f (x + 2h)].
(b) Let L (h) = h2 [f (x) 2f (x + h) + f (x + 2h)]. Derive
Due: 10:30 a.m. on Thursday, September 9, 2010
Note: Show all important steps to solve a given problem to receive full credits. If you are
asked to write a MATLAB program, please provide your code, output as well as explanat
Final Exam Information
Time and Place: Thursday, Dec. 9 from 10 am to 12:45 pm in the regular class room
What to bring: bright mind, a scientic calculator
List of Topics:
1. Chapter 7
(a) Numerical dierentiation: backward, forward, cen
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