5.4.1 Sequences A General Formula for the Nth term of a Sequence, Etta Mae Whitton, 2:2, 1971, 96-98, 6.3 Fibonacci Numbers and Pineapple Phyllotaxy, Judithlynne Carson, 9:3, 1978, 132-136, 9.2 Two Unusual Sequences, Ronald E. Kutz, 12:5, 1981, 316-319 Isomorphisms on Magic Squares, Ali R. Amir-Moez, 14:1, 1983, 48-51, 0.2, 9.2, 9.3 A Simple Calculator Algorithm, Lyle Cook and James McWilliam, 14:1, 1983, 52-54 Application of a Generalized Fibonacci Sequence, Curtis Cooper, 15:2, 1984, 145-146, C, 7.2 The Electronic Spreadsheet and Mathematical Algorithms, Deane E. Arganbright, 15:2, 1984, 148-157, 4.1, 7.3, 9.6 Another Look at x^(1/x ), Norman Schaumberger, 15:3, 1984, 249-250, C, 5.1.2 Pascal's Triangle, Difference Tables and Arithmetic Sequences of Order N, Calvin Long, 15:4, 1984, 290-298, 6.3, 3.2, 9.2 The Factorial Triangle and Polynomial Sequences, Steven Schwartzman, 15:5, 1984, 424-426, C, 0.2, 6.3 Arithmetic Progressions and the Consumer, John D. Baildon, 16:5, 1985, 395-397, C, 0.8 The Pascal Polytope: An Extension of Pascal's Triangle to N Dimensions, John F. Putz, 17:2, 1986, 144-155, 3.2, 6.3, 9.2 The Root-Finding Route to Chaos, Richard Parris, 22:1, 1991, 48-55, 6.3, 9.5 Using the Finite Difference Calculus to Sum Powers of Integers, Lee Zia, 22:4, 1991, 294-300, 5.2.1, 5.4.2 Summation by Parts, Gregory Fredricks and Roger B. Nelsen, 23:1, 1992, 39-42, C, 5.1.2, 5.4.2, 9.3 A Sequence Related to the Harmonic Series, E. Ray Bobo, 26:4, 1995, 308-310, C Another Way to Graph a Sequence, David Olson, 27:3, 1996, 208-209, C Proofs Without Words: GalileoŐs Ratios Revisited, Alfinio Flores, 36:3, 2005, 198, C, 9.5 Sequence converging to Pi, Andrew Cusumano, 37:2, 2006, 120, C A Geometric Look at Sequences that Converge to EulerŐs Constant, Duane W. DeTemple, 37:2, 2006, 128-131, C