9.10 Mathematical modelling and simulation A Program for Keno, Karl J. Smith, 3:2, 1972, 16-20, 7.1 Dividing Inheritances, Howard E. Reinhardt, 4:2, 1973, 30-33 A Geometric Approach to Linear Programming in the Two-Year College, Pat Semmes, 5:1, 1974, 37-40, 0.2 Some Applications of Modeling in Mathematics for Two-Year Colleges, Robert S. Fisk, 6:4, 1975, 10-13 What is an Application of Mathematics?, Clifford Sloyer, 7:3, 1976, 19-26, 5.1.4 Some Effects of Rationing, James A. Burns, 8:4, 1977, 203-206 A Coin Game, Thomas P. Dence, 8:4, 1977, 244-246, 5.4.2, 9.9 An Environmental Problem, Roland H. Lamberson, 8:4, 1977, 252-253 Biorythms: A Computer Program, James G. Troutman, 9:2, 1978, 101-103 Foresight-Insight-Hindsight, James C. Frauenthal and Thomas L. Saaty, 10:4, 1979, 245-254 Binomial Baseball, Eugene M. Levin, 12:4, 1981, 260-266, 7.2 Minimally Favorable Games, Michael W. Chamberlain, 14:2, 1983, 159-164, 7.2 The Mathematics of Tucker: A Sampler, Albert W. Tucker, 14:3, 1983, 228-232, 4.1, 9.9 A Monte Carlo Simulation Related to the St. Petersburg Paradox, Allan J. Ceasar, 15:4, 1984, 339-342, 5.4.2, 7.2 Differential Equations and the Battle of Trafalgar, 16:2, 1985, 98-102, 6.1, 6.2 Harvesting a Grizzly Bear Population, Michael Caulfield and John Kent and Daniel McCaffery, 17:1, 1986, 34-46, 4.1, 4.6 The Problem of Managing a Strategic Reserve, David Cole and Loren Haarsma and Jack Snoeyink, 17:1, 1986, 48-60, 5.1.4, 6.1 How to Balance a Yardstick on an Apple, Herbert R. Bailey, 17:3, 1986, 220-225, 6.5 Facility Location Problems, Fred Buckley, 18:1, 1987, 24-32, 3.1 Positioning of Emergency Facilities in an Obstructed Traffic Grid, Jeff Cronk and Duff Howell and Keith Saints, 18:1, 1987, 34-43, 7.2 Transitions, Jeanne L. Agnew and James R. Choike, 18:2, 1987, 124-133, 0.7, 5.1.3, 5.6.1 The Probability that the "Sum of the Rounds" Equals the "Round of the Sum", Roger B. Nelsen and James E. Schultz, 18:5, 1987, 390-396, 7.2, 7.3 Constructing a Map from a Table of Intercity Distances, Richard J. Pulskamp, 19:2, 1988, 154-163, 3.1, 4.5 Theory, Simulation and Reality, Peter Flusser, 19:3, 1988, 210-222, 7.2, 7.3 Ties at Rotation, Howard Lewis Penn, 19:3, 1988, 230-239, 3.2 Pseudorandom Number Generators and a Four-Bit Computer System, James C. Reber, 20:1, 1989, 54-55, C, 6.3, 9.3 Spiders, Computers, and Markov Chains, Jim R. Ridenhour, 21:4, 1990, 323-326, 8.1 Discrete Dynamical Modeling, James T. Sandefur, 22:1, 1991, 13-22, 6.3 The Orbit Diagram and the Mandelbrot Set, Robert L. Devaney, 22:1, 1991, 23-38, 6.3 Theory vs. Computation in Some Very Simple Dynamical Systems, Larry Blaine, 22:1, 1991, 42-44, C, 6.3 Using Simulation to Study Linear Regression, LeRoy A. Franklin, 23:4, 1992, 290-295, 7.3 A Random Ladder Game: Permutations, Eigenvalues, and Convergence of Markov Chains, Lester H. Lange and James W. Miller, 23:5, 1992, 373-385, 4.1, 4.5 Does What Goes Up Take the Same Time to Come Down?, P. Glaister, 24:2, 1993, 155-158, C, 5.2.3 Inverse Problems and Torricelli's Law, C. W. Groetsch, 24:3, 1993, 210-217, 9.5 The Best Shape for a Tin Can, P. L. Roe, 24:3, 1993, 233-236, C, 5.1.4 Fitting a Logistic Curve to Data, Fabio Cavallini, 24:3, 1993, 247-253, 9.6 Determining Sample Sizes for Monte Carlo Integration, David Neal, 24:3, 1993, 254-262, C, 5.2.2, 7.3 Quenching a Thirst with Differential Equations, Martin Ehrismann, 25:5, 1994, 413-418, 6.4 A Progression of Projectiles: Examples from Sports, Roland Minton, 25:5, 1994, 436-442, C, 6.2, 6.4 A Balloon Experiment in the Classroom, Thomas Gruszka, 25:5, 1994, 442-444, C, 6.1, 6.4 Experiments with Probes in the Differential Equations Classroom, David O. Lomen, 25:5, 1994, 453-457, 6.2, 6.4 Projectile Motion with Arbitrary Resistance, Tilak de Alwis, 26:5, 1995, 361-367, 6.2 The Meeting of the Plows: A Simulation, Jerome L. Lewis, 26:5, 1995, 395-400 A Home Heating Model for Calculus Students, Prashant S. Sansgiry and Constance C. Edwards, 27:5, 1996, 394-397, C, 6.2 Take a Walk on the Boardwalk, Stephen D. Abbott and Matt Richey, 28:3, 1997, 162-171, 4.5 The Average Distance Between Points in Geometric Figures, Steven R. Dunbar, 28:3, 1997, 187-197, 7.2 Discovering Differential Equations in Optics, William Mueller and Richard Thompson, 28:3, 1997, 217-223, 6.1 The Long Arm of Calculus, Ethan Berkove and Rich Marchand, 29:5, 1998, 376-386, 5.7.1 The Probability of Passing a Multiple-Choice Test, Milton P. Eisner, 29:5, 1998, 421-426, 7.2 Spirals and Conchospirals in the Flight of Insects, Khristo N. Boyadzhiev, 30:1, 1999, 23-31, 5.6.1 Minimizing Aroma Loss, Robert Barrington Leigh and Richard Travis Ng, 30:5, 1999, 356-358, 3.2 Optimal Card-Collecting Strategies for Magic: The Gathering, Robert A. Bosch, 31:1, 2000, 15-21 Modeling the Gaitpath of a Running Animal, John Lorch, 31:2, 2000, 93-97 PunxsutawneyÕs Phenomenal Phorecaster, Michael A. Aaron, Brewster B. Boyd, Jr., Melanie J. Curtis, and Paul M. Sommers, 32:1, 2001, 26-29 Perfecting the Analog of a Deck of Cards or Why Evolution CanÕt Be Left to Chance, J. G. Simmonds, 33:1, 2002, 17-20, 7.2 On Running in the Rain, Herb Bailey, 33:2, 2002, 88-92 Why cars in the next lane seem to go faster, Sung Soo Kim, 33:3, 2002, 228-229, C Can a Bicycle Create a Unicycle Track?, David L. Finn, 33:4, 2002, 283-292, 5.6.1 FFF. Lively Cities, Jacques Laforgue, 33:4, 2002, 311-312, F, 6.5 Taking the Sting out of Wasp Nests: A Dialogue on Modeling in Mathematical Biology, Jennifer C. Klein and Thomas Q. Sibley, 34:3, 2003, 207-215, 3.2 A Modified Discrete SIR Model, Jennifer M. Switkes, 34:5, 2003, 399-402, C First Order Differential Equations and the Atmosphere, Gerhard Strohmer, 35:2, 2004, 93-96, 6.1 Rocket Math, Daniel Plath, Cliff Stoll, and Stan Wagon, 35:4, 2004, 262-273, 4.7 Recirculation Models, Homogenized Milk, and Biotech Applications, Mark Bailey, Mike Hilgert, and Herb Bailey, 35:4, 2004, 283-288, 6.3 Algebra in Respiratory Care, David F. Snyder, 35:4, 2004, 300-302, C, 0.2 Projectile Motion with Resistance and the Lambert W Function, Edward W. Packel and David S. Yuen, 35:5, 2004, 337-350, 5.3.4, 6.2 Musical Analysis and Synthesis in Matlab, Mark R. Petersen, 35:5, 2004, 396-401, C, 6.6 Breaking the Holiday Inn Priority Club CAPTCHA, Edward Aboufadel, Julia Olsen, and Jesse Windle, 36:2, 2005, 101-108, 4.7, 8.3 Another Broken Symmetry, C. W. Groetsch, 36:2, 2005, 109-113, 6.2 Taking a Whipper-The Fall-Factor Concept in Rock Climbing, Dan Curtis, 36:2, 2005, 135-140, 6.2 Spraying a Wall with a Garden Hose, James Alexander, 36:2, 2005, 149-152, C, 5.1.5 Snapshots of a Rotating Water Stream, Steven L. Siegel, 36:2, 2005, 152-154, C, 5.6.1 Do Dogs Know Related Rates Rather than Optimization?, Pierre Perruchet and Jorge Gallego, 37:1, 2006, 16-18, 5.1.4 Straw in a Box, Richard Jerrard, Joel Schneider, Ralph Smallberg, and John Wetzel, 37:2, 2006, 93-102, 0.4 Synchronizing Fireflies, Ying Zhou, Walter Gall, and Karen Mayumi Nabb, 37:3, 2006, 187-193, 6.4 The Tippy Trough, Donald Francis Young, 37:3, 2006, 205-213, 5.1.4 Group Testing: Four Student Solutions to a Classic Optimization Problem, Daniel J. Teague, 37:4, 2006, 261-268 Playing Ball in a Space Station, Andrew Simoson, 37:5, 2006, 334-343, 5.6.1 Tennis with Markov, Roman Wong and Megan Zigarovich, 38:1, 2007, 53-55, C, 4.5, 7.2, 9.9 Tennis (and Volleyball) Without Geometric Series, Bruce Jay Collings, 38:1, 2007, 55-57, C, 7.2 Follow-up on Disease Detection, Witold Jarnicki, Michael Schweitzer, and Stan Wagon, 38:2, 2007, 134, C Epidemic Models for SARS and Measles, Edward Rozema, 38:4, 2007, 246-259, 5.3.4, 6.1 Pursuit Curves for the Man in the Moone, Andrew J. Simoson, 38:5, 2007, 330-338, 2.2, 6.4 (see also A Smoother Flight to the Moon, Stan Wagon, 39:1, 2008, 48) Do Dogs Know Bifurcations?, Roland Minton and Timothy J. Pennings, 38:5, 2007, 356-361, 5.1.4 The Depletion Ratio, C. W. Groetsch, 39:1, 2008, 43-48, 5.1.1, 5.2.1 Dinner Tables and Concentric Circles: A Harmony of Mathematics, Music, and Physics, Jack Douthett and Richard J. Krantz, 39:3, 2008, 203-211, 3.2, 9.1 Variations of the Sliding Ladder Problem, Stelios Kapranidis and Reginald Koo, 39:5, 2008, 374-379