Difference between revisions of "Isogonal trajectory"
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A plane curve intersecting the curves of a given one-parameter family in the plane at one and the same angle. If | A plane curve intersecting the curves of a given one-parameter family in the plane at one and the same angle. If | ||
− | + | $$F(x,y,y')=0\label{1}\tag{1}$$ | |
− | is the differential equation of the given family of curves, then an isogonal trajectory of this family intersecting it at an angle | + | is the differential equation of the given family of curves, then an isogonal trajectory of this family intersecting it at an angle $\alpha$, where $0<\alpha<\pi$, $\alpha\neq\pi/2$, satisfies one of the following two equations: |
− | + | $$F\left(x,z,\frac{z'-\tan\alpha}{1+z'\tan\alpha}\right)=0,\quad F\left(x,z\frac{z'+\tan\alpha}{1-z'\tan\alpha}\right)=0.$$ | |
In particular, the equation | In particular, the equation | ||
− | + | $$F\left(x,z,-\frac{1}{z'}\right)=0\label{2}\tag{2}$$ | |
− | is satisfied by an orthogonal trajectory, that is, a plane curve that forms a right angle at each of its points with any curve of the family | + | is satisfied by an orthogonal trajectory, that is, a plane curve that forms a right angle at each of its points with any curve of the family \eqref{1} passing through it. The orthogonal trajectories for the given system \eqref{1} form a one-parameter family of plane curves — the [[General integral|general integral]] of equation \eqref{1}. For example, if the family of lines of force of a plane electrostatic field is considered, then the family of orthogonal trajectories are the equipotential lines. |
====References==== | ====References==== |
Latest revision as of 17:35, 14 February 2020
A plane curve intersecting the curves of a given one-parameter family in the plane at one and the same angle. If
$$F(x,y,y')=0\label{1}\tag{1}$$
is the differential equation of the given family of curves, then an isogonal trajectory of this family intersecting it at an angle $\alpha$, where $0<\alpha<\pi$, $\alpha\neq\pi/2$, satisfies one of the following two equations:
$$F\left(x,z,\frac{z'-\tan\alpha}{1+z'\tan\alpha}\right)=0,\quad F\left(x,z\frac{z'+\tan\alpha}{1-z'\tan\alpha}\right)=0.$$
In particular, the equation
$$F\left(x,z,-\frac{1}{z'}\right)=0\label{2}\tag{2}$$
is satisfied by an orthogonal trajectory, that is, a plane curve that forms a right angle at each of its points with any curve of the family \eqref{1} passing through it. The orthogonal trajectories for the given system \eqref{1} form a one-parameter family of plane curves — the general integral of equation \eqref{1}. For example, if the family of lines of force of a plane electrostatic field is considered, then the family of orthogonal trajectories are the equipotential lines.
References
[1] | W.W. [V.V. Stepanov] Stepanow, "Lehrbuch der Differentialgleichungen" , Deutsch. Verlag Wissenschaft. (1956) (Translated from Russian) |
Comments
References
[a1] | H.S.M. Coxeter, "Introduction to geometry" , Wiley (1961) |
[a2] | D. Hilbert, S.E. Cohn-Vossen, "Geometry and the imagination" , Chelsea (1952) (Translated from German) |
Isogonal trajectory. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Isogonal_trajectory&oldid=18698