0.7 Elementary theory of equations Maximize x(a-x), L. H. Lange, 5:1, 1974, 22-24, 0.2, 5.1.4 Square Functions, Helmer Junghans, 5:2, 1974, 15-18, 0.6 Investigations of Linear and Reciprocal Functions by the Line-to-Line Technique, David R. Duncan and Bonnie H. Litwiller, 6:2, 1975, 2-7, 0.2 A Precalculus Unit on Area Under Curves, Samuel Goldberg, 6:4, 1975, 29-35, 5.4.2 Several Hyperbolic Encounters, L. H. Lange, 7:1, 1976, 2-6 Identities, Inequalities and Equations: A Computer-Graphical Approach, Thomas M. Green, 7:1, 1976, 33-37 Finding Super Accurate Integers, Pasquale Scopelliti and Herbert Peebles, 7:3, 1976, 52-54, 0.2, 9.6 Can This Polynomial Be Factored?, Harold L. Dorwart, 8:2, 1977, 67-72, 9.4 Polygonal Roots, Barnabas B. Hughes, 10:5, 1979, 313-318, 0.2 Luddhar's Method of Solving a Cubic Equation with a Rational Root, R. S. Luthar, 11:2, 1980, 107-110, 0.2 Continued Fractions and Iterative Processes, Jean H. Bevis and Jan L. Boal, 13:2, 1982, 122-127, 9.5 Approximation of Square Roots, Leon Wejntrob, 14:5, 1983, 427-430, 0.2, 9.6 Complex Roots Made Visible, Alec Norton and Benjamin Lotto, 15:3, 1984, 248-249, C, 0.2 Nested Polynomials and Efficient Exponential Algorithms for Calculators, Dan Kalman and Warren Page, 16:1, 1985, 57-60, C, 0.2, 9.6 Graphing the Complex Roots of a Quadratic Equation, Floyd Vest, 16:4, 1985, 257-261, C, 0.2, 9.5 Transitions, Jeanne L. Agnew and James R. Choike, 18:2, 1987, 124-133, 5.1.3, 5.6.1, 9.10 Newton's nth Root Method Without Derivatives, David A. Smith, 18:5, 1987, 403-406, C, 0.4 Powers and Roots by Recursion, Joseph F. Aieta, 18:5, 1987, 411-416, 0.2, 6.3 Parameter-generated Loci of Critical Points of Polynomials, F. Alexander Norman, 19Z:3, 1988, 223-229, 5.1.5, 9.5 Graphing the Complex Zeros of Polynomials Using Modulus Surfaces, Cliff Long and Thomas Hern, 20:2, 1989, 98-105, 9.5, 5.1.5 Finding Rational Roots of Polynomials, Don Redmond, 20:2, 1989, 139-141, C, 9.3 A Zero-Row Reduction Algorithm for Obtaining the gcd of Polynomials, Sidney H. Kung and Yap S. Chua, 21:2, 1990, 138-141, 4.1, 9.4 Algorithms for Evaluation of Polynomials, J. J. Price, 21:5, 1990, 404-405, C Reading Bombelli's x-purgated Algebra, Abraham Arcavi and Maxim Bruckheimer, 22:3, 1991, 212-219, 2.2 Euler and the Fundamental Theorem of Algebra, William Dunham, 22:4, 1991, 282-293, 2.2 Infinitely Many Different Quartic Polynomial Curves, Nitsa Movshovitz-Hader and Alla Shmukler, 23:3, 1992, 186-195, 0.2 Commutativity of Polynomials, Shmuel Avital and Edward Barbeau, 23:5, 1992, 386-395, 0.2, 6.3 Individualized Computer Investigations for Calculus, Sheldon P. Gordon, 23:5, 1992, 426-428, C, 5.1.4, 5.1.5 FFF #65. Solving a Cubic, Ed Barbeau, 24:4, 1993, 344, F, 0.2 Roots of Cubics via Determinants, Robert Y. Suen, 25:2, 1994, 115-117, 4.2 FFF #84. A Method for Solving a Cubic Equation, Ed Barbeau, 26:1, 1995, 35-36, F, 0.2 A Genuine Application of Synthetic Division, Descartes' Rule of Signs, and All That Stuff, Dwight D. Freund, 26:2, 1995, 106-110, 0.8 The Hyperbolic Number Plane, Garret Sobczyk, 26:4, 1995, 268-280, 9.5 Critical Points of Polynomial Families, Elias Y. Deeba, Dennis M. Rodriquez, and Ibrahim Wazir, 27:4, 1996, 291-295, C, 5.1.5 Newton's Method for Resolving Affected Equations, Chris Christensen, 27:5, 1996, 330-340, 5.1.2, 5.4.3 Bounding the Roots of Polynomials, Holly P. Hirst and Wade T. Macey, 28:4, 1997, 292-295, C, 5.1.5 Visualizing the Complex Roots of Quadratics (Proof Without Words), Shaun Pieper, 28:5, 1997, 359, C, 0.2 Who Cares if X^2 + 1 = 0 Has a Solution?, Viet Ngo and Saleem Watson, 29:2, 1998, 141-144, C, 5.2.5, 5.4.2, 6.2 A Simple Solution of the Cubic, Dan Kalman and James White, 29:5, 1998, 415-418, C Do Most Cubic Graphs Have Two Turning Points?, Robert Fakler, 30:5, 1999, 367-369, 5.2.6, 7.2 Meta-Problems in Mathematics, Al Cuoco, 31:5, 2000, 373-378, 5.1.2, 9.3 Tangents without Calculus, Jorge Aarao, 31:5, 2000, 406-407, C, 0.2, 5.1.3 The Roots of a Quadratic, Leonard Gillman, 33:3, 2002, 237-238, C, 0.2 The Band Around a (non)Convex Set, Jack Stewart and Annalisa Crannell, 34:5, 2003, 377-379, 0.2, 9.4 A Rational Root Theorem for Imaginary Roots, Sharon Barrs, James Braselton, and Lorraine Braselton, 34:5, 2003, 380-382, 0.2, 9.4 Quirky Quadratics, Christopher S. Withers and Saralees Nadarajah, 38:3, 2007, 178, C, 0.2 FibonacciÕs Forgotten Number, Ezra Brown and Jason C. Brunson, 39:2, 2008, 112-120, 2.1, 9.6 Sam LoydÕs Courier Problem with Diophantus, Pythagoras, and Martin Gardner, Owen OÕShea, 39:5, 2008, 387-391, C, 0.2, 9.2