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Dynamic Hedging Strategies, by Simon Benninga of Tel-Aviv University and Zvi Wiener of Hebrew University. pp. 12-16 Using Mathematica to Understand the Computer Proof of the Robbins Conjecture, by Branden Fitelson of University of Wisconsin-Madison. pp. 17-26. A Mathematica Introduction to Simple Linear Regression, by Evan Fisher of Lafayette College. pp. 27-30.
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How and Why? Mathematica Techniques by Allan Hayes. pp. 32-36. MathSource Reviews. Snooker on a Lemniscate. Edited by Matthew M. Thomas of Washington University of St. Louis. pp. 37-42. Mathematica Pearls. Problems and Solutions. Edited by Don Piele of the University of Wisconsin. pp. 43-45. Programming Tips. An April Fool's Hoax, by Stan Wagon of Macalester University. pp. 46-52. Book Reviews. Mathematica in Theoretical Physics and Matematika es Mathematica, by Jose A. Rial of the Wave Propagation Laboratory at the University of North Carolina and Gyorgy Kiralyfalvi of the Center for Computational Mechanics at Washington University in St. Louis. pp. 53-55. |
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Term Structure of Interest Rates, by Simon Benninga of Tel-Aviv University and Zvi Wiener of Hebrew University. pp. 13-21. Inverse Iteration Algorithms for Julia Sets, by Mark McClure of University of North Carolina at Asheville. pp. 22-28. Linear Transformations for Beginners, by Roberto E. Caligaris, Georgina B. Rodríguez, and Marta G. Caligaris. All authors are affiliated with Grupo Informática Educativa Facultad Regional San Nicolás Universidad Tecnológica Nacional. pp. 29-33.
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Students & Mathematica. Using the Laplace Transform To Compute the Matrix Exponential. by William Harris and Hubertus von Bremen of University of Southern California, edited by Leon M. Hall. pp. 35-36. How and Why? Mathematica Techniques. by Allan Hayes. pp. 37-41. MathSource Reviews. Explosive Molecular Graphics. Edited by Matthew M. Thomas of Washington University of St. Louis. pp. 42-47. Mathematica Pearls. Problems and Solutions. Edited by Don Piele of the University of Wisconsin. pp. 48-49. Programming Tips. Bending Plot to Your Needs, by Stan Wagon of Macalester University. pp. 50-53. |
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Binomial Term Structure Models, by Simon Benninga of Tel-Aviv University and Zvi Wiener of Hebrew University. pp. 11-19. Theory with Representation Triangles and Cubes, by Alexander Tabarrok of Ball State University. pp. 20-28.
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How and Why? Mathematica Techniques by Allan Hayes. pp. 35-41. MathSource Reviews. The Black-Scholes Equation for European Call Options, Edited by Matthew M. Thomas of Washington University of St. Louis. pp. 42-46. Mathematica Pearls. Problems and Solutions. Edited by Don Piele of the University of Wisconsin. pp. 47-50. Mathematica in Action. The Traveling Salesman and the Turtle, by Stan Wagon of Macalester University. pp. 51-56. |
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If Lie Had Known About Mathematica, by Gerd Baumann. pp. 15-28. One Mile Wide and One Inch Deep: Giving the Secondary Mathematics Curriculum More Depth with Mathematica, by Kurt Peckman of Wolfram Research, Inc.. pp. 29-38. Value-at-Risk (VaR), by Simon Benninga of Tel-Aviv University and Zvi Wiener of Hebrew University. pp. 39-45. Exploring Artlandia, by Igor Bakshee of Wolfram Research, Inc. and Artlandia. pp. 46-55. |
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How and Why? Mathematica Techniques by Allan Hayes pp. 61-66. Solving the Laplace Equation Edited by Matthew M. Thomas of Washington University of St. Louis. pp. 67-71. Mathematica Pearls. Problems and Solutions. Edited by Don Piele of the University of Wisconsin. pp. 72-76. Mathematica in Action. Check your Answers... But How? by Rob Knapp of Wolfram Research, Inc. and Stan Wagon of Macalester University. pp. 76-85. |
