There are four completely different definitions of the so-called Apollonius circles:

Given one side of a triangle and the ratio of the lengths of the other two sides, the locus of the third polygon vertex is the Apollonius circle (of the first type) whose center is on the extension of the given side. For a given triangle, there are three circles of Apollonius. Denote the three Apollonius circles (of the first type) of a triangle by , , and , and their centers , , and . The center is the intersection of the side with the tangent to the circumcircle at . is also the pole of the symmedian point with respect to circumcircle. The centers , , and are collinear on the polar of with regard to its circumcircle, called the Lemoine axis. The circle of Apollonius is also the locus of a point whose pedal triangle is isosceles such that .

The eight Apollonius circles of the second type are illustrated above.

Let and be points on the side line of a triangle met by the interior and exterior angle bisectors of angles . Then the circle with diameter is called the -Apollonian circle. Similarly, construct the - and -Apollonian circles (Johnson 1929, pp. 294-299). The Apollonian circles pass through the vertices , , and , and through the two isodynamic points and (Kimberling 1998, p. 68). The -Apollonius circle has center with trilinears

and radius

where is the circumradius of the reference triangle.

Because the Apollonius circles intersect pairwise in the isodynamic points, they share a common radical line

which is the central line corresponding to Kimberling center , the isogonal conjugate of the Kiepert parabola focus .

The vertices of the D-triangle lie on the respective Apollonius circles.

The circle which touches all three excircles of a triangle and encompasses them is often known as "the" Apollonius circle (Kimberling 1998, p. 102). It has circle function

which corresponds to Kimberling center . Its center has triangle center function

which is Kimberling center . Its radius is