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
Summing Geometric Series by Holding a Tournament, Vincent P. Schielack, 23:3, 1992, 210-211, C
Six Ways to Sum a Series, Dan Kalman, 24:5, 1993, 402-421, 9.5
The Series n^m times x^n and a Pascal-like Triangle, David Neal, 25:2, 1994, 99-101
Sum of Squares via the Centroid, Sydney H. Kung, 25:2, 1994, 111, C
Approaches to the Formula for the nth Fibonacci Number, Russell Jay Hendel, 25:2, 1994, 139-142, C, 0.2, 4.5, 9.3, 9.5
FFF #76. Telescoping Series, Eleanor A. Maddock, 25:4, 1994, 309, F
FFF. Pi is approximately ln 4, Frank Burk, 25:4, 1994, 311, F
Sum of Alternating Series (proof by picture), Guanshen Ren, 26:3, 1995, 213, 0.9
Divergence of a Series (by picture), Sidney H. Kung, 26:4, 1995, 301, C
Sums of General Geometric Series (by picture), John Mason, 26:5, 1995, 381, C
FFF #106. The Derivative of the Sum Is the Sum of the Derivatives, Ed Barbeau, 27:4, 1996, 282, F
Bargaining Theory, or Zeno's Used Cars, James C. Kirby, 27:4, 1996, 285-286, C, 6.3
FFF #111. The Bouncing Ball, Daniel J. Scully, 27:5, 1996, 372-373, F
Some Sums of Some Significance, Martha E. Dasef and Steven M. Kautz, 28:1, 1997, 52-55, C
Divergence of the Harmonic Series by Rearrangement, Michael W. Ecker, 28:3, 1997, 209-210, C
Neither a Worst Convergent Series nor a Best Divergent Series Exists, J. Marshall Ash, 28:4, 1997, 296-297, C
Using Simpson's Rule to Approximate Sums of Infinite Series, Rick Kreminski, 28:5, 1997, 368-376
Can You Sum This Familiar Series? (Proof Without Words), Dennis Gittinger, 28:5, 1997, 393, C