All points whose relative distances to two circles are same
This article is about the radical axis used in geometry. For the animation studio, see Radical Axis (studio).
In Euclidean geometry, the radical axis of two non-concentric circles is the set of points whose power with respect to the circles are equal. For this reason the radical axis is also called the power line or power bisector of the two circles. In detail:
For two circles c1, c2 with centers M1, M2 and radii r1, r2 the powers of a point P with respect to the circles are
Point P belongs to the radical axis, if
If the circles have two points in common, the radical axis is the common secant line of the circles.
If point P is outside the circles, P has equal tangential distance to both the circles.
If the radii are equal, the radical axis is the line segment bisector of M1, M2.
In any case the radical axis is a line perpendicular to
On notations
The notation radical axis was used by the French mathematician M. Chasles as axe radical.[1] J.V. Poncelet used chorde ideale.[2] J. Plücker introduced the term Chordale.[3] J. Steiner called the radical axis line of equal powers (German: Linie der gleichen Potenzen) which led to power line (Potenzgerade).[4]
^Michel Chasles, C. H. Schnuse: Die Grundlehren der neuern Geometrie, erster Theil, Verlag Leibrock, Braunschweig, 1856, p. 312
^Ph. Fischer: Lehrbuch der analytische Geometrie, Darmstadt 1851, Verlag Ernst Kern, p. 67
^H. Schwarz: Die Elemente der analytischen Geometrie der Ebene, Verlag H. W. Schmidt, Halle, 1858, p. 218
^Jakob Steiner: Einige geometrische Betrachtungen. In: Journal für die reine und angewandte Mathematik, Band 1, 1826, p. 165