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...HOMEWORK 9
(DUE WEDNESDAY, 8/29)
Section 5.5: 1, 2, 9, 11, 12 Section 5.6: 2, 4, 6 Section 5.7: 1(bce), 12, 11, 13
Problem 1. Let = (1 2 4)(3 5). Let = (3 1 5)(4 6). Prove that and are conjugate by nding a such that = Problem 2. Let , S10 ...
...Math 8 Practice Final
1
1. 2.
True/False
The set Z7 has 7 elements. If x and y are coprime integers, then there exist integers a and b such that ax + by = 1. 3. 4. 5. 6. 7. 8. 9. 3|10 3|0 If a|c and b|c then ab|c Any permutation can be written as a...
...HOMEWORK 7
(DUE MONDAY, 8/13)
Section 6.4: 1, 2, 3, 4, 11(a), 12 Section 6.5: 1, 3, 4 Section 6.6: 1, 5
Problems 1 through 4 are meant to be done (mod 21). Problem 1. Find the set U21 of relatively prime residues mod 21. How many are there? I sugge...
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Oklahoma >> MATH >> 2423 (Fall, 2008)
Review problems for Test II MATH 2423 November 7, 2005 1. Find the formula for the inverse function f (x) = 2x2 8x, x 2. 2. Find (f 1 ) (a), if f (x) = x5 x3 + 2x and a = 2. 3. Express as a single logarithm ln x + a ln y b ln z. 4. Solve the equa...
Oklahoma >> MATH >> 2423 (Fall, 2008)
Review for Final MATH 2423 Fall 2005 1. Find the area of the region bounded by the curves a) y = 20 x2 , y = x2 12 b) y = 1 x2 , y = 1 x c) x + y = 0, x = y 2 + 3y 2. Find the volume obtained by rotating the region bounded by the given curves ab...
Oklahoma >> MATH >> 2433 (Fall, 2008)
Review problems for Test I MATH 2433-005, Spring 2005 1. Find an equation of the tangent to the curve x = 2 sin 2t, y = 2 sin t at the point ( 3, 1). dy d 2. Find dx and dxy for the curve x = t + ln t, y = t ln t. For which 2 values of t is the cu...
Oklahoma >> MATH >> 2433 (Fall, 2008)
Review problems for Test II MATH 2433-005, Spring 2005 1. Find the radius and the interval of convergence of the power series a) b) (1)n n=1 n (x n 6 n n=1 n x + 4)n 2. Express the function as a power series a) b) c) 1 12x 1 (12x)2 x2 (12x)2 3. ...
Oklahoma >> MATH >> 2433 (Fall, 2008)
Review Problems for the Final MATH 2433, Spring 2005 1. Test the series for convergence or divergence a) b) c) d) 3n +4n n=0 5n 1 n=1 n5/2 cos(3n) n=0 1+(1.5)n nn n=1 (1) n+1 2. Find the radius of convergence and the interval of convergence of...
Oklahoma >> MATH >> 5353 (Fall, 2008)
Homework 3 MATH 5353 October 25, 2004 1. Let G be a group such that the intersection of all its subgroups which are dierent from e is a subgroup dierent from e. Prove that every element in G has a nite order. 2. If H is a subgroup of G and a G, le...
Oklahoma >> MATH >> 5353 (Fall, 2008)
Test II MATH 5353 November 29, 2004 1. If H is a nite index subgroup in a group G, prove that there is a subgroup N of G contained in H and of nite index in G such that aN a1 = N for all a G. 2. If N is a normal subgroup of a group G, N is nite, H i...
Oklahoma >> MATH >> 2443 (Fall, 2008)
Review Problems for Test 1 MATH 2443-006, Spring 04 1. Let f (x, y) = 36 4x2 9y 2 a) Describe and sketch the domain of f . b) Since P (1/2, 1) is in the domain, there is a level curve for f at C which passes through P . Find the value C. 2. Find...
Oklahoma >> MATH >> 2423 (Fall, 2008)
Review Problems for Test I math 2423-001 1. Estimate the area under the graph f (x) = x3 + 2 from x = 1 to x = 2 using three rectangles and right endpoints. 2. Find the limit a) limn b) limn n i=1 n i=1 10 10i n sin( n ); 18i 6 n (7 + n ). 3. Find ...
Oklahoma >> MATH >> 2423 (Fall, 2008)
MATH2423-001 Project II: Drug Dosage 1 Problem Statement The concentration in the blood resulting from a single dose of a drug normally decreases with time as the drug is eliminated from the body. In order to determine the exact pattern that the d...
Oklahoma >> MATH >> 2423 (Fall, 2008)
Review Problems for the Final math 2423-001 1. Find the limit a) limn b) limn c) d) e) n 3 i=1 n 1+ 3i n; n i3 i=1 n4 ; sin x 1 limx e x ; limx0 x+tan x ; xtan x limx0 (sin x)tan x . 2. Find the area of the region bounded by the curves a) y = co...
Oklahoma >> MATH >> 2433 (Fall, 2008)
Review for Midterm I MATH 2433-003, Honors 1. A cycloid is given by parametric equations x = r( sin ), y = r(1 cos ) (r is a xed number) a) Find the tangent to the curve at = /3. b) Find the length of one arc of the cycloid. c) Find the area of th...
Oklahoma >> MATH >> 2433 (Fall, 2008)
Review for Midterm II MATH 2433-003, Honors 1. Test for convergence a) b) c) d) n1 ln n n=1 (1) n cos(n/3) n=0 n! n! n=1 nn n n2 n=1 ( n+1 ) 2. Find the radius of convergence and the interval of convergence of the power series a) b) (3x2)n n=1...
Oklahoma >> MATH >> 2433 (Fall, 2008)
Project I: Moving a planar robot arm MATH 2433-003, Lucy Lifschitz September 15, 2003 1 The Problem Many industrial processes are carried out by computer-controlled robots. The design and control of robots is the subject of a discipline called rob...
Oklahoma >> MATH >> 2433 (Fall, 2008)
Review for the Final MATH 2433-003, Honors 1. Find the radius and the interval of convergence of n=1 (3x 2)n n3n 2. Show that if the limit limn |cn | = c, then the radius of convergence of the power series cn xn is R = 1 . c 3. Use series to app...
Oklahoma >> MATH >> 5363 (Fall, 2008)
1. Let A1 and A2 be rings, and A = A1 A2 is their direct sum. Show that every ideal I of A has the form I = {(a, b)|a I1 , b I2 }, where I1 is an ideal in A1 and I2 is an ideal in A2 . 2. Let A be a PID, M left A-module, p A a prime element. Let ...
Oklahoma >> MATH >> 5363 (Fall, 2008)
1. Find the splitting eld of x3 1 over Q. Express your answer in the form Q(a). 2. a) Describe the elements of Q(). b) Let F = Q( 3 ). Find a basis of F () over F . 3. Show that Q( 2) is not ring isomorphic to Q( 3). 4. Find all the ring automorp...
Oklahoma >> MATH >> 5363 (Fall, 2008)
Group Theory Problems MATH 5363, Spring 2005 1. Prove that if G/Z(G) is cyclic, then G is abelian. 2. If |G| = pn , p-prime, then Z(G) =< e >. 3. If |G| = pn with p > n, p prime and H is a subgroup of order p, then H is normal in G. 4. Let G be a gr...
Oklahoma >> MATH >> 5363 (Fall, 2008)
Algebra Qualier Syllabus May 2005 1 Group Theory Vinberg, Chapters 1, 4, 10; Hungerford, Chapter I 1. Basic denition and properties 2. Subgroups 3. Cosets, congruences 4. Normal subgroups 5. Quotient groups 6. Homomorphisms 7. Homomorphism and iso...
Oklahoma >> MATH >> 1823 (Fall, 2008)
Review Problems for Test I Honors Calculus I 1) Let f (x) = 1/x, g(x) = x3 and h(x) = x2 + 2. Find f g h. 2) Express H(x) = sin4 ( x) in the form f g h. 1. limt2 2. limh0 3. limx2 4. limx0 t2 +t6 ; t2 4 (1+h)4 1 ; h |x2| x2 ; 3) Determine wheth...
Oklahoma >> MATH >> 1823 (Fall, 2008)
Review Problems for Test II Honors Calculus I, Fall 2002 1) Find the derivatives of the following functions: 1. y = x+sin x cos x ; tan 1 sec ; 2. g() = 3. h(t) = tan(sin t + cos t); 4. f (t) = 3 1 + tan t 2) Find all the points on the graph of f...
Oklahoma >> MATH >> 1823 (Fall, 2008)
Review for the Final MATH 1823-001, Fall 2002 1. Calculate the limits: a) limx2 3 x 3 2 x2 ; b) limx c) limx0 d) limx1 e) lim0 x7 +6x3 +11 ; 3x7 x6 +x5 tan 5x tan 3x ; sin(x1) ; x2 +x2 cos 1 sin . 2. Find an equation of the tangent line to th...
Oklahoma >> IR >> 2002 (Fall, 2008)
UNIVERSITY ORGANIZATIONAL CHARTS JANUARY, 2002 ORGANIZATIONAL CHART University Administrative Organizational Chart January 2002 Board of Regents Executive Secretary of the Board of Regents Director of Internal Auditing Vice President for Executi...
Oklahoma >> IR >> 2003 (Fall, 2008)
UNIVERSITY ORGANIZATIONAL CHARTS January 2003 ORGANIZATIONAL CHART University Administrative Organizational Chart January 2003 Board of Regents Executive Secretary of the Board of Regents Vice President for Administrative and Executive Affairs ...
Oklahoma >> CS >> 04 (Fall, 2008)
General Announcements Most lab machines should be functional now Grading: attendance + participation Make sure you demonstrate each task to one of the mentors so that you can be checked off Office hours posted on my web page PulsePool volunteer...
Oklahoma >> CS >> 04 (Fall, 2008)
Todays Plan Binary numbers Why did PORTB=2 turn on the red LED? Functions Morse Code Adam Brown visit Hexidecimal numbers Function Example #include \"oulib.h\" void flash_led(int duration) { PORTB = 1; / delay_ms(duration); / PORTB = 0; / dela...
Oklahoma >> CS >> 04 (Fall, 2008)
Today Coding: Generating tones Generating Morse Code Responding to button presses There is a need for innovation, for creativity, for divergent thinking which pulls in ideas from many sources and connects them in different ways. The new computing...
Oklahoma >> CS >> 02 (Fall, 2008)
Freshman Engineering Orientation ENGR 1420/006 Interactive Art Laboratory Andrew H. Fagg Symbiotic Computing Laboratory School of Computer Science Teaching Assistant: Di Wang Mentors: Nathan Alexander Ricky Hopkins Sandeep Wagle Current installation...
Oklahoma >> CS >> 06 (Fall, 2008)
Last Time Bit masking Turn on an LED: PORTB = PORTB | 2; Turn off the LED: PORTB = PORTB Note: state of other LEDs is unchanged! Andrew H. Fagg: Interactive Art Laboratory 16 Today Bioncore: a set of functions that automatically perform many...
Oklahoma >> CS >> 05 (Fall, 2008)
Today Manipulating bits and bytes Binary Number System The decimal number system uses digit values 0 9 In the binary number system, we only have 0 and 1 Often, we think of these values as: False (0) True (1) Binary Operators Just as with the ...
Oklahoma >> CHASE >> 3 (Fall, 2008)
Guanosine 3 ,5 -bispyrophosphate coordinates global gene expression during glucose-lactose diauxie in Escherichia coli Matthew F. Traxler, Dong-Eun Chang*, and Tyrrell Conway Advanced Center for Genome Technology, University of Oklahoma, Norman, OK 7...
Oklahoma >> CS >> 2008 (Fall, 2008)
Project Highlights Award No: 0453545 Project Title: REU Site: Integrated Machine Learning Systems Investigators: Andrew H. Fagg, Dean F. Hougen, Amy McGovern, Terran Lane, Rafael Fierro Institution: University of Oklahoma Website: http:/www-symbiot...
Oklahoma >> CS >> 2007 (Fall, 2008)
Project Highlights Award No: 0453545 Project Title: REU Site: Embedded Machine Learning Systems Investigators: Andrew H. Fagg, Dean F. Hougen, Amy McGovern, Terran Lane Institution: University of Oklahoma Website: http:/www-symbiotic.cs.ou.edu/reu ...
Oklahoma >> CS >> 2007 (Fall, 2008)
Project Highlights Award No: 0453545 Project Title: REU Site: Embedded Machine Learning Systems Investigators: Andrew H. Fagg, Dean F. Hougen, Amy McGovern, Terran Lane Institution: University of Oklahoma Website: http:/www-symbiotic.cs.ou.edu/reu ...
Oklahoma >> MATH >> 08 (Fall, 2008)
Math 4323 MWF 9:30am PHSC 122 Webpage: http:/www.math.ou.edu/kujawa Jonathan Kujawa 325-2390 PHSC 1119 kujawa@math.ou.edu Oce Hours: TBA. If you need help outside of oce hours, Im always happy to schedule a meeting. Course Information: Book: A Firs...
Oklahoma >> MATH >> 08 (Fall, 2008)
August 4, 2008 Jonathan Kujawa Please ll out this short survey/contract and leave it with me during your rst week visit to my oce. I will not accept it during class! Please ll out your name and (assuming you agree with the statement) sign below. Th...
Oklahoma >> MATH >> 08 (Fall, 2008)
Handout 1: KujawaMath 4323 August 26, 2008 Name: Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. Below is a photo of a snowake taken by Wilson Bentley around ...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 1: KujawaMath 4323 Due: Wednesday, September 10, 2008 Last revised: September 3, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text: ...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 2: KujawaMath 4323 Due: Wednesday, September 17, 2008 Last revised: September 15, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text:...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 3: KujawaMath 4323 Due: Wednesday, September 24, 2008 Last revised: September 16, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text:...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 4: KujawaMath 4323 Due: Wednesday, October 1, 2008 Last revised: September 26, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text: S...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 5: KujawaMath 4323 Due: Wednesday, October 15, 2008 Last revised: October 9, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. Note: If you are as...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 6: KujawaMath 4323 Due: Wednesday, October 22, 2008 Last revised: October 14, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text: Se...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 7: KujawaMath 4323 Last revised: October 27, 2008 Due: Friday, October 31, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text: Sectio...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 8: KujawaMath 4323 Last revised: November 5, 2008 Due: Friday, October 31, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. Additional Problems: L...
Oklahoma >> MATH >> 08 (Fall, 2008)
Quiz 2 Review: KujawaMath 4323 Last revised: October 31, 2008 Due: Friday, October 31, 2008 Quiz 2 on Friday, November 7th will ask questions about the denitions and meaning of the following terms, phrases, and the notation which goes along with th...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 9: KujawaMath 4323 Due: Wednesday, November 12, 2008 Last revised: November 10, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text: ...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 10: KujawaMath 4323 Due: Wednesday, November 26, 2008 Last revised: November 19, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text: ...
Oklahoma >> MATH >> 08 (Fall, 2008)
Homework 11: KujawaMath 4323 Due: Wednesday, December 10, 2008 Last revised: December 1, 2008 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text: ...
Oklahoma >> CS >> 15 (Fall, 2008)
1.7497464247479899e-01 6.2249935799863820e-02 5.3862066092203020e01 3.0625492677832944e-01 6.3026009996003607e-01 4.3527446245366430e-01 7.2438193442541388e-01 5.7572055691653024e-01 7.4699971154723488e-01 6.3838538670362022e-01 2.0535696174974882e-0...
Oklahoma >> CS >> 2006 (Fall, 2008)
The Old FPD Model Used a very high nonlinear damping gain Required a significant (and unrealistic) degree of co-contraction to achieve stable movements Stiction region often occupied 15-20% of the muscle length range Unable to reproduce Nichols &...
Oklahoma >> CS >> 2008 (Fall, 2008)
Research Experiences for Undergraduates: Integrated Machine Learning Systems www-symbiotic.cs.ou.edu/reu Sponsored by: NSF and Oklahoma EPSCoR Machine Learning Given some data set, construct a model that can be used to interpret or to react to new ...
Oklahoma >> CS >> 2008 (Fall, 2008)
How can we apply the scientific method to CS and Machine Learning? Given problem X: I implement algorithm A Am I done? Questions that we need to answer How do we know that it works? How do we know that it works well? Even deeper questions Wher...
Oklahoma >> CS >> 2008 (Fall, 2008)
Leash Controlled Mobile Robotics Peter Golbus UNM June, 2008 Practical Use of Robots Standard Models Tele-operated Each robot needs a full-time operator Band-width intensive Dropped / corrupted packets Autonomous easily confused Our model Leash Co...
Oklahoma >> CS >> 2008 (Fall, 2008)
So you want to be a grad student? What do I want? Think hard about whether/why you want to go to grad school Know what youre getting Can open a set of doors, but may close others Have to want what it will enable you to do Also have to want th...
Oklahoma >> CS >> 2008 (Fall, 2008)
Leash Controlled Mobile Robotics Peter Golbus UNM July, 2008 ML application ML application Next Wiki Literature Review Controller diagrams The End -FIN- ...
Oklahoma >> CS >> 2008 (Fall, 2008)
Polarimetric Radar Data Andy Spencer Amy McGovern Mike Richman Kim Elmore 1 Radar - Basics We Get: Reflectivity (Z) 2 Radar - Doppler We Get: Radial Velocity (V) 2 Spectrum Width ( ) 3 Radar - Polarimetric We Get: Differential Reflectivity (ZD...
Oklahoma >> CS >> 2008 (Fall, 2008)
Experiment Design Once we have designed (and implemented) an algorithm, a critical next step is to understand how that algorithm performs Does the algorithm perform the task? Does the algorithm perform the task well? Strongest case: when we compar...
Oklahoma >> CS >> 2008 (Fall, 2008)
Hydrometeor Classification using Polarimetric Radar and Spatiotemporal Relational Probability Trees Andy Spencer Amy McGovern Kim Elmore Mike Richman 1 Overview 2 RUC Data Data available as GEMAPK grid files Provides: temperature relativ...
Oklahoma >> CS >> 2008 (Fall, 2008)
Status Report: Interactive Art SamBleckley RachelShadoan Advisors AndrewH.Fagg AdamBrown The Goal Empoweringorgonometolearntointeractwith humansinacompellingway Problem:Definingcompelling Amountofphysicalinteraction(pickingup, touching) ...
Oklahoma >> CS >> 2008 (Fall, 2008)
Interactive Art Why interactive art? It\'s nifty. Art Exploring the space between media Truth or illusion, George. Unique challenges Collaboration - journey towards unlikely destinations Engineering, Computer science Mad Science. Bwahah...
Oklahoma >> CS >> 2008 (Fall, 2008)
Should I buy a lottery ticket? A brief introduction to probability Colored Balls Colored Balls What is p(red)? Axioms of Probability 0 <= p(x) <=1 Probability can never be negative Probability can never be more than 1 p(true) = 1 p(false) = 0...
Oklahoma >> CS >> 2008 (Fall, 2008)
Extracting Odor from Piriform (Olfactory) Cortical Activity Derek Tingle Dr. Andrew Fagg Dr. Robert Rennaker Why Neural Decoding? Prosthetics BMI Understand neural representation of odors Process Six possible odors: Benzyl acetate, Propyl buty...
Oklahoma >> CS >> 2008 (Fall, 2008)
Extracting Odors Using a Free-Paced Classifier Derek Tingle Dr. Andrew Fagg Dr. Robert Rennaker Previous Approach Used monolithic classifier 4 seconds Onset to 2 seconds after offset 100 ms bins Onset Offset Previous Results Rat 1 7 11 13 14...
Oklahoma >> MATH >> 09 (Fall, 2008)
Math 4333 MWF 8:30am PHSC 809 Webpage: http:/www.math.ou.edu/kujawa Jonathan Kujawa 325-2390 PHSC 1119 kujawa@math.ou.edu Oce Hours: TBA. If you need help outside of oce hours, Im always happy to schedule a meeting. Course Information: Book: A Firs...
Oklahoma >> MATH >> 09 (Fall, 2008)
January 20, 2009 Jonathan Kujawa Please ll out this short survey/contract and leave it with me during your rst week visit to my oce. I will not accept it during class! Please ll out your name and (assuming you agree with the statement) sign below. ...
Oklahoma >> MATH >> 09 (Fall, 2008)
Homework 1: KujawaMath 4333 Due: Wednesday, January 28, 2009 Last revised: January 22, 2009 Please write a neat, clear, thoughtful, and hopefully correct solution to each of the following problems. Please show all relevent work. From the text: Se...
Oklahoma >> CS >> 10 (Fall, 2008)
7.0903658e-01 8.1168396e-01 7.2285211e-01 8.1035052e-01 8.3872977e-01 7.6220877e-01 8.4633058e-01 7.8352002e-01 7.9468763e-01 6.3263812e-01 8.1503599e-01 5.5929760e-01 5.7620948e-01 8.0134406e-01 7.8626392e-01 8.5471865e-01 8.1314384e-01 7.3696457e-0...
Oklahoma >> CS >> 2007 (Fall, 2008)
(2 pts) Name: CS [45]973: Embedded Systems: Final Exam May 11, 2006 This examination booklet has 18 pages. Do not forget to write your name at the top of the page and to sign your name below. The exam is closed book, closed notes, and closed ele...
Oklahoma >> CS >> 2008 (Fall, 2008)
(2 pts) Name: CS [45]163: Embedded Systems: Final Exam May 6, 2008 This examination booklet has 16 pages. Do not forget to write your name at the top of the page and to sign your name below. The exam is closed book, closed notes, and closed elec...
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