Shapiro, Bruce E. - Biological Network Modeling Center, California Institute of Technology

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• Math 326 -Exam 1 -14 Sept 2010 1. Rewrite the following statements formally.
• WARM UP EXERCISE The ozone level (in parts per billion) on a
• Math 326 Lecture Notes Bruce E. Shapiro
• \alpha \theta o o \tau \beta \vartheta \pi \upsilon
• Math 326 -Exam 1 -14 Sept 2010 Rules of the Exam
• Introduction to Functions Section 2.1
• 2005 BE Shapiro [Math 351 Spring 2005 Revised 3/3/05] Page 6. 1 6. Method of Successive Approximations
• Annals of Mathematics A Set of Postulates for Plane Geometry, Based on Scale and Protractor
• 2005 BE Shapiro [Math 351 Spring 2005 Revised 7-May-2005] Page 11.1 11. Series solutions at ordinary points
• Math 326 -Exam 2 -12 Oct 2010 Rules of the Exam
• Math 103L: Exercise on Functions (Section 2.1) These problems are a sample of the kinds of problems that may appear on the
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Math 103L: Continuity (Section 10.2 and 10.4) These problems are a sample of the kinds of problems that may appear on the
• EUCLID'S ELEMENTS OF GEOMETRY The Greek text of J.L. Heiberg (18831885)
• 2005 BE Shapiro [Math 351 Spring 2005 Revised 16 Feb 2005] Page 3.1 3. Slopes and Flows
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• The Computable Differential Equation
• Limits of rational functions at x Example: f(x) =
• A SOFTWARE ARCHITECTURE FOR DEVELOPMENTAL MODELING IN PLANTS: THE COMPUTABLE PLANT PROJECT
• Geometry Mathematics Content Standards Mathematics
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Multivariate Calculus in 25 Easy Lectures
• Developmental Simulations with Cellerator Bruce E. Shapiro* and Eric D. Mjolsness
• Warm-up: Price Demand equation Several companies make a 37 inch, Plasma HDTV. Right now, if
• Lecture Notes in Differential Equations
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• Math 462 -Syllabus1 "Advanced Linear Algebra"
• Group Project Due 7 May 2009
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
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• MATHSBML AND SYSTEMS BIOLOGY SIMULATIONS BRUCE E. SHAPIRO(1)
• Depolarization Interstitial
• Journal of Computational Neuroscience 10, 99120, 2001 c 2001 Kluwer Academic Publishers. Manufactured in The Netherlands.
• UNIVERSITY OF CALIFORNIA Los Angeles
• Introducing LATEX Bruce E Shapiro
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• LATEX2 for authors c Copyright 19952005, LATEX3 Project Team.
• Foundations of Geometry1 Math 370 -Spring 2009
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• Metric Postulates for Plane Geometry Author(s): Saunders MacLane
• Exploring Advanced Euclidean with Geometer's Sketchpad
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• Lecture Notes in Differential Equations
• Using Computer Algebra for Developmental Modeling: Introduction to Signal Transduction, Cellerator, and the Computable Plant
• Euclidean Constructions This section outlines the basic Euclidean con-
• Foundations of Geometry Math 370 -Spring 2009 -Section 14974
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• Project on the Origins of Geometry http://beshapiro.com/math370/origins-project.html
• 2005 BE Shapiro [Math 351 Spring 2005 Revised 6 Feb 2005] Page 1.1 1. Differential Equations
• 2005 BE Shapiro [Math 351 Spring 2005 Revised 25 Mar 2005] Page 2.1 2. Uniqueness
• 2005 BE Shapiro [Math 351 Spring 2005 Corrected 25 March 2005] Page 4.1 4. Methods for Solving First Order Equations
• 2005 BE Shapiro [Math 351 Spring 2005 Revised 24 April 2005] Page 7.1 7. Approximate and Numerical Solutions
• 2005 BE Shapiro [Math 351 Spring 2005 Revised 5 May 2005] Page 8.1 8. Linear Equations with Constant Coefficients
• 2005 BE Shapiro [Math 351 Spring 2005 Revised 18 May 2005] Page 12.1 12. Series Solutions at Regular Singularities
• 2005 BE Shapiro Page 14.1 14. Critical Points of Autonomous Linear Systems
• 2005 BE Shapiro Page A.1 A. Summary of Methods and Results
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Math 326 -Exam 3 -18 Nov 2010 Rules of the Exam
• 1. (15 points, 3 points each) Let A = {4, 5, 6}, B = {3, 4}, C = {7, 8, 9}. Find (a) A C = {4, 5, 6, 7, 8, 9}
• Math 103L: Exercise on Linear Equations (Section 1.1) These problems are a sample of the kinds of problems that may appear on the
• Math 103L: Graphing (Section 2.2) These problems are a sample of the kinds of problems that may appear on the
• Math 103L: Quadratics and general polynomials (Section 2.3) These problems are a sample of the kinds of problems that may appear on the
• Math 103L: Section 12.6. Exercise on Cost, Revenue, Profit and maximal profit. 1. A company manufactures and sells x things per week. The weekly price demand and
• Math 103L: Section 11.7. Exercise on elasticity, cost, revenue, profit, and maximal profit. The first few problems are the main exercise. The last 3 are just for practice.
• Math 103L: Solving Systems of Equations (Sections 4.1-3) Solve using substitution or elimination.
• Math 103L: Matrix Operations (Section 4.4) These problems are a sample of the kinds of problems that may appear on the final
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• WARM UP EXERCISE Please take derivatives of the
• WARM UP EXERCSE A cable company has found that the total number
• 4.2 Systems of Linear equations and Augmented Matrices
• 4.3 Gauss Jordan Elimination Any linear system must have exactly one solution, no solution,
• 4.4 Matrices: Basic Operations Addition and subtraction of matrices
• 10.4 The Derivative The student will learn about
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• 42 GRADES EIGHT THROUGH TWELVE--GEOMETRY The geometry skills and concepts developed in this discipline are useful to all
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• 2005 BE Shapiro [Math 351 Spring 2005 revised 4 May 2005] Page 10.1 10. Linear Equations with Variable Coefficients
• Discrete Mathematics with Applications, 3rd Edition Susanna S. Epp
• Errata in Version 10.2 Last revised March 20, 2011
• Graphical Method for Force Analysis: Macromolecular Mechanics With Atomic Force Microscopy
• Math 326 -Exam 2 Solutions -12 Oct 2010 1. (a) (2 points) State precisely but concisely what it means when a|b.
• 2005 BE Shapiro Page 9.1 9. Higher Order Equations with Constant Coefficients
• 4.5 Inverse of a Square In this section, we will learn how to find an
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• Math 150B Spring 2011 Independent Study on Differential Equation
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• 2005 BE Shapiro [Math 351 Spring 2005 Revised 4 May 2005] Page 13.1 13. Linear Systems
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• "Advanced Linear Algebra" Math 462 -Fall 2009 -Section 15224
• High School Instructional Material Survey Thursday, October 30, 2008
• 2005 BE Shapiro [Math 351 Spring 2005 revised 3/25/05] Page 5.1 5. First Order Linear Equations
• Math 150A Exam 2 Answers Your Name Here Section 15608 2 October 2009
• Worksheet 6 For each function, (a) Find all aysmptotes; (b) Identify the critical points; (c) Identify possible inflection
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• "Advanced Linear Algebra" Math 462 -Fall 2009 -Section 15224
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• Note: This lesson uses pre-created tools. You don't have to do that, although you can if you want to. It is not necessary to incorporate technology into every lesson, and for some lessons it might not be appropriate.
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• 2002 Jet Propulsion Laboratory, California Institute of Technology. All rights reserved. Do not copy or distribution without written permission
• Copyright 2002 by the California Commission on Teacher Credentialing Permission is granted to make copies of this document for noncommercial use by educators.
• WARM UP EXERCSE A company makes "Notebook"
• Introducing LATEX Bruce E Shapiro
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• Lecture Notes in Differential Equations
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• Lagrange Interpolation Suppose we know the values of some function f(x) at n + 1 distinct grid points
• Error Analysis for Iterative Definition 12.1 (Order of Convergence). We say that a sequence pn converges
• Linear Systems In this section we will study the solution of a linear system of n equations with n
• Hermite Interpolation One of the problems with polynomial interpolation is that although it fits the points
• Theorems About Derivatives Definition 4.1 (Derivative). The derivative is given by either of the following two
• Fixed and Floating Point The two most common representations of numbers in computers are
• Roots and Bisection The first numerical problem we will face is root finding: given a function f(x), find a
• Synthetic Division and Horner's Definition 14.1 (Polynomial). Let a0, . . . , an be arbitrary constants. Then any
• Numerical Differentiation Recall the definition of a derivative
• Muller's Method Muller's method is s based on the idea that if a straight line is good, then a parabola
• Newton Interpolation Newton's method for interpolation is derived by seeking a polynomial of the form
• Numerical Integration The simplest method for numerical integration is a direct implementation of Riemann
• Number Representation Number representations in computers are limited because they only store a finite
• Fixed Point Iteration Anyone who has every played with their calculator by typing in a number and then
• Polynomial Least Squares Fit B.E.Shapiro
• Richardson Extrapolation Richardson extrapolation gives a method to "accelerate" the convergence of a se-
• Secant Method The main problem with Newtons method is that we need to know both the function
• Limits and Continuity In the next sections we will make a brief review of some mathematical preliminaries
• Math 150 -Fall 2009 -Section 15608 http://beshapiro.com/math150A
• The Aitken-Steffensen Methods Definition 13.1. Let pn be a sequence. Then the first forward difference is
• Cubic Splines As before we are trying to find an interpolating function for a function that we know
• Newton's Method Suppose we already have an estimate p0 for the root of f(x). If we project the tangent
• We will frequently use iterative processes in our study of numerical analysis. In such a process, one computes a sequence of values, usually in a loop or other similar control
• As software designers we will need to understand the sources of error in a numerical calculation if we want to avoid disasters such as the one we discussed in lesson 1. To
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