5.4.3	Taylor polynomials and power series

Uniqueness of Power Series Representations, Garfield C. Schmidt, 12:1, 1981,
54-56, C, 9.5
Power Series for Practical Purposes, Ralph Boas, 13:3, 1982, 191-195, 9.5
Extending the Series for ln 2, Norman Schaumberger, 18:3, 1987, 223-225, C
More on the Series for ln 2, Leonard Gillman, 19:3, 1988, 252-253, C
Spreadsheets, Power Series, Generating Functions, and Integers, Donald R. Snow,
20:2, 1989, 143-152, 6.3
Power Series and Exponential Generating Functions, G. Ervynck and P. Igodt,
20:5, 1989, 411-415, C, 9.5
Taylor Polynomials, David P. Kraines and Vivian Y. Kraines and David A. Smith,
20:5, 1989, 435-436, C, 1.2
FFF #20. A Power Series Representation of 1=0, Ed Barbeau, 21:3, 1990, 217, F
FFF #28. More fun with Series, log 2 = 1/2 log 2, Ed Barbeau, 21:5, 1990,
395-396, F (also 23:1, 1992, 38 and 24:3, 1993, 231)
Who Needs the Sine Anyway?, Carlos C. Huerta, 23:1, 1992, 43-44, C
Approximating Series, Raymond J. Collins, 23:2, 1992, 153-157, C
Taylor Polynomial Approximations in Polar Coordinates, Sheldon P. Gordon, 24:4,
1993, 325-330, 5.6.1
Maclaurin Expansion of Arctan x via L'Hopital's Rule, Russell Euler, 24:4,
1993, 347-350, C, 5.1.1
Isaac Newton: Credit Where Credit Won't Do, Robert Weinstock, 25:3, 1994, 179-192, 0.5, 2.2, 5.1.3, 5.6.1
In Defense of Newton: His Biographer Replies, Richard S. Westfall, 25:3, 1994, 201-205, 2.2
FFF #83. Power Series Thinning, David Rose, 26:1, 1995, 35, F (also 26:5, 1995, 384)
Newton's Method for Resolving Affected Equations, Chris Christensen, 27:5, 1996, 330-340, 0.7, 5.1.2
On Dividing Coconuts: A Linear Diophantine Problem, Sahib Singh and Dip Bhattacharya, 28:3, 1997, 203-204, C, 9.3
A Note on Taylor's Series for sin(ax+b) and cos(ax+b), Russell Euler, 28:4, 1997, 297-298, C
Taylor Polynomials for Rational Functions, Mike O'Leary, 29:3, 1998, 226-228, C
Novel Maclaurin Series-Based Approximation to e, John Knox and Harlan Brothers, 30:4, 1999, 269-275