5.1.5	Graphs of functions

The Quadratic Polynomial and Its Zeroes, C. A. Long, 3:1, 1972, 23-29, 0.7, 9.5
Graphing a Cubic Using Calculus and a Computer, Roland E. Larsen, 6:1, 1975, 32-40, 0.7
Darboux's Theorem and Points of Inflection, Michael Olinick and Bruce B. Peterson, 7:3, 1976, 5-9
A Flexible Model for Peak, Ridge, and Pass, Cliff Long, 7:3, 1976, 16-17
Discovering a Calculus Theorem, John Taylor Varner III, 8:5, 1977, 304, C
Income Tax Averaging and Convexity, Michael Henry and G. E. Trapp, Jr., 15:3, 1984, 253-255, C, 0.8, 5.7.1, 9.5
Geometrically Asymptotic Curves, Dan Kalman, 16:3, 1985, 199-206, 9.5
Routine Problems, Sherman Stein, 16:5, 1985, 383-385, 0.2, 1.2
Does "hold water" Hold Water?, Ralph P. Boas, 17:4, 1986, 341, C
Computer Algebra Systems in Undergraduate Mathematics, Don Small and John Hosack and Kenneth Lane, 17:5, 1986, 423-433, 1.2, 5.1.4, 5.2.2, 5.4.2
A Guide to Computer Algebra Systems, John M. Hosack, 17:5, 1986, 434-441, 0.2, 4.1, 5.1.2, 5.2.3, 5.2.4, 5.2.5
Problem Solving Using Microcomputers, Franklin Demana and Bert Waits, 18:3, 1987, 236-241
Pitfalls in Graphical Computation, or Why a Single Graph Isn't Enough, Franklin Demana and Bert K. Waits, 19:2, 1988, 177-183, 0.6
Parameter-generated Loci of Critical Points of Polynomials, F. Alexander Norman, 19:3, 1988, 223-229, 0.7, 9.5
Teaching with CAL: A Mathematics Teaching and Learning Environment, James E. White, 19:5, 1988, 424-443, 1.2
Graphing the Complex Zeros of Polynomials Using Modulus Surfaces, Clff Long and Thomas Hern, 20:2, 1989, 98-105, 0.7, 9.5
The Curious Fate of an Applied Problem, Alan H. Schoenfeld, 20:2, 1989, 115-123, 8.3, 9.5
Graphing with the HP-28S, John Selden and Annie Selden, 20:5, 1989, 423-432, 1.2
Calculus Quiz, David P. Kraines and Vivian Y. Kraines and David A. Smith, 20:5, 1989, 437-438, C, 1.2
(Sin x)^2: A Sheep in Wolf's Clothing, Mark E. Saul, 21:1, 1990, 43-44, C, 0.6
Quick Function Evaluation, Daniel S. Yates, 21:1, 1990, 51, C, 0.2
The Function sin x / x, William B. Gearhart and Harris S. Shultz, 21:2, 1990, 90-99, 2.2, 5.1.2
A Thousand Points of Light, Gilbert Strang, 21:5, 1990, 406-409
Single Equations Can Draw Pictures, Keith M. Kendig, 22:2, 1991, 134-139, C, 0.4, 0.5, 5.6.1, 5.6.2
FFF #41. The Hazards of Applying Limits without a License, Ed Barbeau, 22:3, 1991, 221, F (also 25:1, 1994, 36-37)
Positivity from Evaluation of a Single Point, Henry Mark Smith, 22:3, 1991, 230-231, C, 0.2
Using Computer Graphics to Help Analyze Complicated Functions, Paul B. Massell, 22:4, 1991, 327-331, 5.1.4
Graphs of Rational Functions for Computer Assisted Calculus, Stan Byrd and Terry Walters, 22:4, 1991, 332-334, C
Individualized Computer Investigations for Calculus, Sheldon P. Gordon, 23:5, 1992, 426, C, 0.7, 5.1.4
Does a Parabola Have an Asymptote?, David Bange and Linda Host, 24:4, 1993, 331-342, 5.1.1, 5.6.1
Computer-Aided Delusions, Richard L. Hall, 24:4, 1993, 366-369
FFF #75. The Wilting Lines, Randall K. Campbell-Wright, 25:3, 1994, 223, F (also 26:4, 1995, 304 )
Using the Sign Function to Analyze Graphs, Richard J. Pulskamp and William J. Larkin III, 25:4, 1994, 327-328, C
Can We Use the First Derivative to Determine Inflection Points?, Duane Kouba, 26:1, 1995, 31-34
Critical Points of Polynomial Families, Elias Y. Deeba, Dennis M. Rodriquez, and Ibrahim Wazir, 27:4, 1996, 291-295, C, 0.7
Dynamic Function Visualization, Mark Bridger, 27:5, 1996, 361-369, 5.8, 9.5
Bounding the Roots of Polynomials, Holly P. Hirst and Wade T. Macey, 28:4, 1997, 292-295, C, 0.7
Undersampled Sine Waves, J. C. Derderian and Enriqueta Rodriguez-Carrington, 29:3, 1998, 213-218, 0.6
FFF #181. Finding Asymptotes, Carl Libis, 32:5, 2001, 366, F, 0.2
FFF #230. The function y = x^(6/7) has a node at the origin, Robert J. MacG. Dawson, 35:5, 2004, 383-384, F
Trigonometric Identities on a Graphing Calculator, Joan Weiss, 35:5, 2004, 393-396, C, 0.6
Spraying a Wall with a Garden Hose, James Alexander, 36:2, 2005, 149-152, C, 9.10
From Chebyshev to Bernstein: A Tour of Polynomials Small and Large, Matthew Boelkins, Jennifer Miller, and Benjamin Vugteveen, 37:3, 2006, 194-204, 9.5
Saddle Points and Inflection Points, Felix Martinez de la Rosa, 38:5, 2007, 380-383, C, 5.2.1