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104.04 The complementary cubic

Published online by Cambridge University Press:  02 March 2020

R. W. D. Nickalls
R. W. D. Nickalls*
Affiliation:
10 Queens Parade, CheltenhamGL50 3BB e-mail: dick@nickalls.org
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Information
The Mathematical Gazette , Volume 104 , Issue 559 , March 2020 , pp. 155 - 158
Copyright
© Mathematical Association 2020

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References

Henriquez, G., The graphical interpretation of the complex roots, Amer. Math. Monthly 42 (1935) pp. 383384.10.2307/2301359CrossRefGoogle Scholar
Dunnett, R., Newton-Raphson and the cubic, Math. Gaz. 78 (November 1994) pp. 347348.10.2307/3620218CrossRefGoogle Scholar
Jobbings, A., Chords, tangents and cubics, Math. Gaz. 79 (July 1995) pp. 348350.CrossRefGoogle Scholar
Francis, F. H., Complex roots from a graph, Math. Gaz. 54 (May 1970) pp. 145147.10.2307/3612100CrossRefGoogle Scholar
Gehman, H. M., Complex roots of a polynomial equation, Amer. Math. Monthly 48 (1941) pp. 237239.CrossRefGoogle Scholar
Cundy, H. M., Geometry, tangents, and cubics, Math. Gaz. 79 (July 1995) p. 347.CrossRefGoogle Scholar
Nickalls, R. W. D., A new approach to solving the cubic: Cardan’s solution revealed, Math. Gaz. 77 (November 1993) pp. 354359.10.2307/3619777CrossRefGoogle Scholar