Tractrix
A plane transcendental curve whose equation in rectangular Cartesian coordinates has the form
$$ x = \pm a \mathop{\rm ln} \ \frac{a + \sqrt {a ^ {2} - y ^ {2} } }{y } \mp \sqrt {a ^ {2} - y ^ {2} } . $$
The tractrix is symmetric about the origin (see Fig.), the $ x $- axis being an asymptote. The point $ ( 0, a) $ is a cusp with vertical tangent. The length of the arc measured from the point $ x = 0 $ is:
$$ l = a \mathop{\rm ln} { \frac{a}{y} } . $$
The radius of curvature is:
$$ r = a \mathop{\rm cot} { \frac{x}{y} } . $$
The area bounded by the tractrix and its asymptote is:
$$ S = { \frac{\pi a ^ {2} }{2} } . $$
Figure: t093570a
The rotation of the tractrix around the $ x $- axis generates a pseudo-sphere. The length of the tangent, that is, of the segment between the point of tangency $ M $ and the $ x $- axis, is constant. This property enables one to regard the tractrix as the trajectory of the end of a line segment of length $ a $, when the other end moves along the $ x $- axis. The notion of a tractrix generalizes to the case when the end of the segment does not move along a straight line, but along some given curve; the curve obtained in this way is called the trajectory of the given curve.
References
[1] | A.A. Savelov, "Planar curves" , Moscow (1960) (In Russian) |
Comments
References
[a1] | M. Berger, B. Gostiaux, "Differential geometry: manifolds, curves, and surfaces" , Springer (1988) (Translated from French) |
[a2] | F. Gomes Teixeira, "Traité des courbes" , 1–3 , Chelsea, reprint (1971) |
[a3] | M. Greenberg, "Euclidean and non-Euclidean geometries" , Freeman (1974) |
[a4] | M. Spivak, "A comprehensive introduction to differential geometry" , 1979 , Publish or Perish pp. 1–5 |
[a5] | K. Fladt, "Analytische Geometrie spezieller ebener Kurven" , Akad. Verlagsgesell. (1962) |
[a6] | J.D. Lawrence, "A catalog of special plane curves" , Dover, reprint (1972) |
Tractrix. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Tractrix&oldid=49006