Trisectrix

In geometry, a trisectrix is a curve which can be used to trisect an arbitrary angle with ruler and compass and this curve as an additional tool. Such a method falls outside those allowed by compass and straightedge constructions, so they do not contradict the well known theorem which states that an arbitrary angle cannot be trisected with that type of construction. There is a variety of such curves and the methods used to construct an angle trisector differ according to the curve. Examples include:

Limaçon trisectrix (some sources refer to this curve as simply the trisectrix.)^[1]^[2]
Trisectrix of Maclaurin^[3]
Tschirnhausen cubic (a.k.a. Catalan's trisectrix and L'Hôpital's cubic)^[4]
Cubic parabola (the graph of the cube function)^[2]
Hyperbola with eccentricity 2^[5]^[2]
Parabola^[2]
Cycloid of Ceva^[2]

A related concept is a sectrix, which is a curve which can be used to divide an arbitrary angle by any integer.^[6] Examples include:

References

^ Chisholm, Hugh, ed. (1911), "Trisectrix", Encyclopædia Britannica, vol. 27 (11th ed.), Cambridge University Press
^ ^a ^b ^c ^d ^e ^f Yates, Robert C. (January 1941), "The trisection problem, chapter II: Solutions by means of curves", National Mathematics Magazine, 15 (4): 191–202, JSTOR 3028133
^ Dudley, Underwood (1994), The Trisectors, Cambridge University Press, p. 12, ISBN 0883855143; excerpt, p. 12, at Google Books
^ Farouki, Rida T. (2008), Pythagorean-Hodograph Curves: Algebra and Geometry Inseparable, Geometry and Computing, vol. 1, Springer, pp. 398–399, doi:10.1007/978-3-540-73398-0, ISBN 978-3-540-73397-3, MR 2365013
^ Wright, J. M. F. (1836), "257. To trisect any angle by the hyperbola", An Algebraic System of Conic Sections, and Other Curves, London: Black and Armstrong, p. 206
^ Ferréol, Robert (2017), "Sectrix curve", Encyclopédie des formes mathématiques remarquables, retrieved 2025-10-20
^ Merzbach, Uta B.; Boyer, Carl B. (2011), A History of Mathematics (Third ed.), John Wiley & Sons, pp. 113–114, ISBN 978-0470525487
^ Harper, Suzanne; Driskell, Shannon (July 2006), "An investigation of historical geometric constructions", Convergence, Mathematical Association of America
^ Sheng, Hung Tao (1969), "A method of trisection of an angle and $X$ -section of an angle", Mathematics Magazine, 42: 73–80, doi:10.1080/0025570X.1969.11975925, JSTOR 2689193, MR 0240707

External links

Weisstein, Eric W., "Trisectrix", MathWorld

[1] Chisholm, Hugh, ed. (1911), "Trisectrix", Encyclopædia Britannica, vol. 27 (11th ed.), Cambridge University Press

[yates-2] ^ ^a ^b ^c ^d ^e ^f Yates, Robert C. (January 1941), "The trisection problem, chapter II: Solutions by means of curves", National Mathematics Magazine, 15 (4): 191–202, JSTOR 3028133

[3] Dudley, Underwood (1994), The Trisectors, Cambridge University Press, p. 12, ISBN 0883855143; excerpt, p. 12, at Google Books

[4] Farouki, Rida T. (2008), Pythagorean-Hodograph Curves: Algebra and Geometry Inseparable, Geometry and Computing, vol. 1, Springer, pp. 398–399, doi:10.1007/978-3-540-73398-0, ISBN 978-3-540-73397-3, MR 2365013

[5] Wright, J. M. F. (1836), "257. To trisect any angle by the hyperbola", An Algebraic System of Conic Sections, and Other Curves, London: Black and Armstrong, p. 206

[6] Ferréol, Robert (2017), "Sectrix curve", Encyclopédie des formes mathématiques remarquables, retrieved 2025-10-20

[7] Merzbach, Uta B.; Boyer, Carl B. (2011), A History of Mathematics (Third ed.), John Wiley & Sons, pp. 113–114, ISBN 978-0470525487

[8] Harper, Suzanne; Driskell, Shannon (July 2006), "An investigation of historical geometric constructions", Convergence, Mathematical Association of America

[9] Sheng, Hung Tao (1969), "A method of trisection of an angle and $X$ -section of an angle", Mathematics Magazine, 42: 73–80, doi:10.1080/0025570X.1969.11975925, JSTOR 2689193, MR 0240707

[1]

[2]

[3]

[4]

[5]

[6]

[7]

[8]

[9]

See also

References

External links