4.5 Eigenvalues and eigenvectors Linear Algebra: A Potent Tool, Anneli Lax, 7:2, 1976, 3-15 On Polynomial Matrix Equations, Harley Flanders, 17:5, 1986, 388-391, 4.1 Constructing a Map from a Table of Intercity Distances, Richard J. Pulskamp, 19:2, 1988, 154-163, 3.1, 9.10 FFF #24. The Cayley-Hamilton Theorem, Ed Barbeau, 21:4, 1990, 303, F (also 22:3, 1991, 222-223 and 22:5, 1991, 405-406) Rotations in Space and Orthogonal Matrices, David P. Kraines, 22:3, 1991, 245-247, C, 4.1, 4.3 Eigenvectors and Jordan Bases Using Symbolic Programs, Robert J. Hill and Robert D. Bechtel, 23:1, 1992, 59-63, C Systems of Linear Differential Equations by Laplace Transform, H. Guggenheimer, 23:3, 1992, 196-202, 6.2 Gems of Exposition in Elementary Linear Algebra, David Carlson and Charles R. Johnson and David Lay and A. Duane Porter, 23:4, 1992, 299-303, 1.2, 4.1, 4.7 A Random Ladder Game: Permutations, Eigenvalues, and Convergence of Markov Chains, Lester H. Lange and James W. Miller, 23:5, 1992, 373-385, 4.1, 9.10 The Linear Algebra Curriculum Study Group Recommendations for the First Course in Linear Algebra, David Carlson and Charles R. Johnson and David C. Lay and A. Duane Porter, 24:1, 193, 41-46, 1.2, 4.1, 4.2, 4.3 Iterative Methods in Introductory Linear Algebra, Donald R. LaTorre, 24:1, 1993, 79-88, 4.1, 9.6 Using Computer Algebra Systems to Teach Linear Algebra (software review), Maurino P. Bautista, 24:5, 1993, 462-471, 4.1, 4.8 Approaches to the Formula for the nth Fibonacci Number, Russell Jay Hendel, 25:2, 1994, 139-142, C, 0.2, 5.4.2, 9.3, 9.5 Computing Jordan Canonical Forms, Patrick Costello, 25:3, 1994, 231-234, C, 4.7, 4.8 A Simple Estimate of the Condition Number of a Linear System, Heinrich W. Guggenheimer, Alan S. Edelman, and Charles R. Johnson, 26:1, 1995, 2-5, 4.6 The Matrix Exponential Function and Systems of Differential Equations Using Derive@, Robert J. Hill and Mark S. Mazur, 26:2, 1995, 146-151, 6.2 Eigenpictures: Picturing the Eigenvector Problem, Steven Schonefeld, 26:4, 1995, 316-319, C Complex Eigenvalues and Rotations: Are Your Students Going in Circles?, James Duemmel, 27:5, 1996, 378-381, C Eigenpictures and Singular Values of a Matrix, Peter Zizler and Holly Fraser, 28:1, 1997, 59-62, C, 5.7.3 Take a Walk on the Boardwalk, Stephen D. Abbott and Matt Richey, 28:3, 1997, 162-171, 9.10 Clock Hands Pictures for 2x2 Real Matrices, Charles R. Johnson and Brenda K. Kroschel, 29:2, 1998, 148-150, C FFF. How Large Is the Set of Degenerate Real Symmetric Matrices?, Peter D. Lax, 29:3, 1998, 219-220, F The Eigenvalues of an Infinite Matrix, Bobette Thorsen, 31:2, 2000, 107-110 Eigenvalues of Matrices of Low Rank, Stewart Venit and Richard Katz, 31:3, 2000, 208-210, C Collapsed Matrices with (Almost) the Same Eigenstuff, Donald E. Hooley, 31:4, 2000, 297-299, C Discovering Roots: Ancient, Medieval, and Serendipitous, Bryan Dorner, 36:1, 2005, 35-43, 0.2, 2.1, 9.3 Tennis with Markov, Roman Wong and Megan Zigarovich, 38:1, 2007, 53-55, C, 7.2, 9.9, 9.10