Connected Calculus This is an applied calculus tutorial. Some prior calculus knowledge might be helpful. http://www.math.montana.edu/frankw/ccp/calculus/topic.htm
Mathematics Reference Math Tables, Facts And Formulas A mathematics reference collection of K through 14 math tables, facts, definitions, formulas and explanations from general math through college calculus. http://www.hoxie.org/math/title.htm
Calculus History The main ideas of calculus developed over a very long period of time. Read about some of the mathematicians who contributed to this field of mathematics. http://www-groups.dcs.st-and.ac.uk/~history/HistTopics/The_rise_of_calculus.html
Extractions: Version for printing The main ideas which underpin the calculus developed over a very long period of time indeed. The first steps were taken by Greek mathematicians. To the Greeks numbers were ratios of integers so the number line had "holes" in it. They got round this difficulty by using lengths, areas and volumes in addition to numbers for, to the Greeks, not all lengths were numbers. Zeno of Elea , about 450 BC, gave a number of problems which were based on the infinite. For example he argued that motion is impossible:- If a body moves from A to B then before it reaches B it passes through the mid-point, say B of AB. Now to move to B it must first reach the mid-point B of AB . Continue this argument to see that A must move through an infinite number of distances and so cannot move. Leucippus Democritus and Antiphon all made contributions to the Greek method of exhaustion which was put on a scientific basis by Eudoxus about 370 BC. The method of exhaustion is so called because
Multivariable Calculus Lecture notes by Carlos C. Rodriguez, State University of New York at Albany. http://omega.albany.edu:8008/calculus3
History Of Calculus Guide To History of calculus. Topic essays and biographies keyed to the chapters and content of the 10th edition of Thomas's calculus. http://occ.awlonline.com/bookbind/pubbooks/thomas_awl/chapter1/medialib/custom3/
Alan Bain These notes by Alan Bain provide a complete elementary introduction to stochastic integration with respect to continuous semimartingales. http://www.statslab.cam.ac.uk/~afrb2/
Extractions: I now work as a Quantitative Analyst for an Investment Bank in London. I studied the application of probability theory techniques to problems arising from communications networks, in particular the Internet. My thesis work focussed on using fluid limits to model the behaviour of various congestion control schemes similar to TCP (Transmission Control Protocol). In the Internet, congestion control mechanisms such as TCP are required in order to provide useful services. Propagation delays in the network affect any congestion control scheme, by causing a delay between an action and the controller's reaction, which can lead to undesirable instabilities. This problem is fundamental since, despite the steady increase in speed of networking technologies, the delays imposed by the finite speed of light provide a lower bound on the delays. We should like to understand the dynamical behaviour of the congestion control, for example to determine whether it is stable or not. Working with a model of a network carrying packet traffic, we consider the limit of a sequence of such networks, suitably rescaled, as the bandwidth tends to infinity.
Personal Marco Pedicini Institute for Applied calculus, Rome Theoretical computer science, linear logic, geometry of interaction, optimal reductions. http://www.iac.rm.cnr.it/~marco/html
Indexingles.html Summer School on the theory of Partial Differential Equations, calculus of Variations and applications to Engineering and Materials Sciences. Lisbon, Portugal; 1317 September 2004. http://www.ptmat.fc.ul.pt/~hso2004/indexingles.html
Extractions: 3 Aug 13:36 Jon Cohen BV on display 3 Aug 15:31 Alwen Tiu BV on display 3 Aug 16:20 Jon Cohen BV on display 4 Aug 08:19 Jon Cohen BV on display 4 Aug 18:45 Alessio Guglielmi BV on display 5 Aug 01:13 Rajeev.Gore BV on display 5 Aug 06:00 Jon Cohen BV on display 4 Aug 15:38 Alwen Tiu BV on display 26 Jul 15:08 Francois Lamarche SD05: it's over! 26 Jul 14:34 Alessio Guglielmi Red and blue (again) 27 Jul 01:10 Rajeev.Gore Red and blue (again) 27 Jul 10:10 Alessio Guglielmi Red and blue (again) 28 Jul 01:42 Rajeev.Gore Red and blue (again) 28 Jul 11:19 Alessio Guglielmi Red and blue (again) 29 Jul 02:15 Rajeev.Gore Red and blue (again) 29 Jul 16:38 Alessio Guglielmi Red and blue (again) 28 Jul 12:58 Alessio Guglielmi Red and blue (again) 27 Jul 03:19 Jon Cohen Red and blue (again) 28 Jul 16:54 David J. Pym Red and blue (again) 28 Jul 18:12 David J. Pym Red and blue (again) 28 Jul 19:09 Alessio Guglielmi Red and blue (again) 28 Jul 19:20 David J. Pym Red and blue (again) 28 Jul 20:16 Alessio Guglielmi Red and blue (again) 28 Jul 20:28 David J. Pym Red and blue (again) 28 Jul 21:43 Alessio Guglielmi Red and blue (again) 28 Jul 22:06 David J. Pym
FREE Mathematics How-to Library - Math Homework Help Math Tutor Software Offers help with algebra, geometry, calculus, fractions, money, and trigonometry problems. Includes worked examples and files for download with more information and exercises. http://www.teacherschoice.com.au/mathematics_how-to_library.htm
Extractions: Teachers' Choice Software home page Stuck on your homework ? No problem! Get help FAST with your mathematics and physics questions. We provide personalized , professional tutoring in high school mathematics and physics. We can help you now ! Select a category from the table below, or scroll this page to view the topic headings.
Marta Sanz-Solé's Home Page Universitat de Barcelona. Random fields; Malliavin calculus; Anticipative calculus; Small perturbations of dynamical sytems; Stochastic partial differential equations. Publications, lecture notes. http://orfeu.mat.ub.es/~sanz/
Bob Knows His Calculus Contains pictures, fan fiction, biographies, a voting booth, and news. http://www.angelfire.com/ca3/jensync
Visual Calculus Short descriptions and examples for limits, derivatives, and integrals. Various plugins are needed to view some of the pages. http://archives.math.utk.edu/visual.calculus/
School Principals Guide To Student Math Improvement A free tutorial that explains difficult algebra, trigonometry and calculus concepts to beginning middle/high school students in a simplified way that they can understand and use. http://members.tripod.com/learnmath/
Extractions: As a School Principal you are looked upon for leadership to show and direct teachers how to be accountable for high academic standards. Today, any School Principal attempting to meet this difficult goal faces new questions and challenges. To help answer those questions the Educational Research Institute is pleased to bring you a breakthrough Professional Development Mathematics and Science Support Training Program part of the Math 2002' teacher training program, that, for the first time, gives teachers and administrators, an understandable, bare facts, overview of the math knowledge necessary to determine where to take your students to raise the schools academic levels. The use of this breakthrough program is intended to save your school considerable time and money.
Extractions: Viewing sketches on this page requires The Geometer's Sketchpad. For information about purchasing the software, downloading demo versions, and setting up Sketchpad as a helper application for your Web browser, see the Forum's Dynamic Geometry Software page. Given a function f and a point P on f, find an equation of the tangent to the graph at P. Why would you want to do this, and how would you go about solving this problem? These five sketches take you step-by-step through the solution of the tangent line problem: Sketch 4 ... Help
Extractions: Differential Calculus The following items are a collection of mathematical explorations developed for Georgia Tech's Math 1507. They are all formatted with Maple V. Release 4. These worksheets are ready to use, without much prior knowledge of Maple. As you read through them, you simply have to press ENTER to perform the calculations, and if you don't know Maple already you will easily begin learning how it works. After reading through a given worksheet, you can generate your own models and alternative scenarios by cutting and pasting Maple code. In each worksheet a model is introduced with a description of the content and of the level of presentation. These may be down-loaded onto your computer as text files, opened with Maple, and saved as active worksheets. Alternately, you may configure your Web browser to launch Maple as you choose a file. An Introduction to Maple : A modest worksheet to get started, by showing how to define and plot functions. Drawing Graphs : One of the primary uses of the computer will be to give visualization. This worksheet gives syntax for drawing graphs. The
Présentation De Laurent Regnier University of Marseilles Linear logic, lambda calculus and abstract machine interpretations. http://iml.univ-mrs.fr/~regnier/
[math/9906155] Lectures On Pseudo-differential Operators These lecture notes cover a first year graduate course that was given on pseudodifferential operators. The calculus on manifolds is developed and applied to prove propagation of singularities and the Hodge decomposition theorem. http://arxiv.org/abs/math.AP/9906155
Extractions: This lecture notes cover a Part III (first year graduate) course that was given at Cambridge University over several years on pseudo-differential operators. The calculus on manifolds is developed and applied to prove propagation of singularities and the Hodge decomposition theorem. Problems are included. References and citations for this submission:
