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How to Solve a Cubic Equation, Part 5: Back to Numerics
May/June 2007 (vol. 27 no. 3)
pp. 78-89
James F. Blinn, Microsoft Research
Jim Blinn continues his discussion on cubic equations.

1. D. Hilbert, Theory of Algebraic Invariants, Cambridge Univ. Press, 1993.
2. J. Blinn, "How to Solve a Quadratic Equation, Part 2," IEEE CG&A, vol. 26, no. 2, 2006, p. 82)
3. M. La Porte, "Une Formulation Numériquement Stable Donnant les Racines Réelles de l'Équation du 3'eme Degré," IFP Report, no. 21516, Oct. 1973.
4. J. Vignes, "New Methods for Evaluating the Validity of the Results of Mathematical Computations," Mathematics and Computers in Simulation XX, North-Holland Publishing, 1978, pp. 227–249.

Index Terms:
Blinn, cubic equations
James F. Blinn, "How to Solve a Cubic Equation, Part 5: Back to Numerics," IEEE Computer Graphics and Applications, vol. 27, no. 3, pp. 78-89, May-June 2007, doi:10.1109/MCG.2007.60
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