N. S. Astapov, I. S. Astapov, “Comparative analysis of solutions to $3^{rd}$ and $4^{th}$ order algebraic equations”, Sib. J. Pure and Appl. Math., 2016, Volume 16, Issue 1,Pages 14

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Comparative analysis of solutions to $3^{rd}$ and $4^{th}$ order algebraic equations

N. S. Astapov^ab, I. S. Astapov^c

^a Lavrentyev Institute of Hydrodynamics of Siberian Branch of the Russian Academy of Sciences, Novosibirsk
^b Novosibirsk State University
^c Lomonosov Moscow State University, Institute of Mechanics

Abstract: Three methods of solving a cubic equation are analyzed: del Ferro–Tartaglia’s, Vieta’s, and F. Klein’s. Much attention is given to the irreducible case. Three methods of solving a quartic equation are compared: Ferrari–Cardano’s, Descartes’, and Euler’s. A new derivation of Euler’s formulas for the roots of a quartic algebraic equation is given. Some new methods of symbolic computation of roots of cubic and quartic equations are proposed.

Keywords: cubic, quartic equation, Cardano’s formula, discriminant, resolvent.

UDC: 512.62, 519.6

Received: 06.08.2014

DOI: 10.17377/PAM.2016.16.102