The circles of Apollonius are any of several sets of circles associated with Apollonius of Perga, a renowned Greek geometer. Most of these circles are found in planar Euclidean geometry, but analogs have been defined on other surfaces; for example, counterparts on the surface of a sphere can be defined through stereographic projection.
The main uses of this term are fivefold:
A circle is usually defined as the set of points P at a given distance r (the circle's radius) from a given point (the circle's center). However, there are other, equivalent definitions of a circle. Apollonius discovered that a circle could be defined as the set of points P that have a given ratio of distances k = to two given points (labeled A and B in Figure 1). These two points are sometimes called the foci.
Let d, d be non-equal positive real numbers.Let C be the internal division point of AB in the ratio d : d and D the external division point of AB in the same ratio, d : d.
\overrightarrow{PC
Then,
\begin{align} &PA:PB=d1:d2.\\ \Leftrightarrow{}&d2|\overrightarrow{PA
Therefore, the point P is on the circle which has the diameter CD.
First consider the point
C
A
B
\alpha=\angleAPC
\beta=\angleCPB
Next take the other point
D
AB
Q
AP
PD
\angleQPB
\gamma=\angleBPD
\delta=\angleQPD
\beta+\gamma=90\circ
P
CD
The Apollonius pursuit problem is one of finding whether a ship leaving from one point A at speed vA will intercept another ship leaving a different point B at speed vB. The minimum time in interception of the two ships is calculated by means of straight-line paths. If the ships' speeds are held constant, their speed ratio is defined by μ. If both ships collide or meet at a future point, I, then the distances of each are related by the equation:[1]
a=\mub
Squaring both sides, we obtain:
a2=b2\mu2
a2=x2+y2
b2=(d-x)2+y2
x2+y2=[(d-x)2+y2]\mu2
Expanding:
x2+y2=[d2+x2-2dx+y2]\mu2
Further expansion:
x2+y2=x2\mu2+y2\mu2+d2\mu2-2dx\mu2
Bringing to the left-hand side:
x2-x2\mu2+y2-y2\mu2-d2\mu2+2dx\mu2=0
Factoring:
x2(1-\mu2)+y2(1-\mu2)-d2\mu2+2dx\mu2=0
Dividing by
1-\mu2
x2+y2-
| d2\mu2 | |
| 1-\mu2 |
+
| 2dx\mu2 | |
| 1-\mu2 |
=0
Completing the square:
\left(x+
| d\mu2 | |
| 1-\mu2 |
\right)2-
| d2\mu4 | |
| (1-\mu2)2 |
-
| d2\mu2 | |
| 1-\mu2 |
+y2=0
Bring non-squared terms to the right-hand side:
\begin{align} \left(x+
| d\mu2 | |
| 1-\mu2 |
\right)2+y2&=
| d2\mu4 | |
| (1-\mu2)2 |
+
| d2\mu2 | |
| 1-\mu2 |
\\ &=
| d2\mu4 | |
| (1-\mu2)2 |
+
| d2\mu2 | |
| 1-\mu2 |
| (1-\mu2) | |
| (1-\mu2) |
\\ &=
| d2\mu4+d2\mu2-d2\mu4 | |
| (1-\mu2)2 |
\\ &=
| d2\mu2 | |
| (1-\mu2)2 |
\end{align}
Then:
\left(x+
| d\mu2 | |
| 1-\mu2 |
\right)2+y2=\left(
| d\mu | |
| 1-\mu2 |
\right)2
Therefore, the point must lie on a circle as defined by Apollonius, with their starting points as the foci.
See main article: Apollonian circles.
The circles defined by the Apollonian pursuit problem for the same two points A and B, but with varying ratios of the two speeds, are disjoint from each other and form a continuous family that cover the entire plane; this family of circles is known as a hyperbolic pencil. Another family of circles, the circles that pass through both A and B, are also called a pencil, or more specifically an elliptic pencil. These two pencils of Apollonian circles intersect each other at right angles and form the basis of the bipolar coordinate system. Within each pencil, any two circles have the same radical axis; the two radical axes of the two pencils are perpendicular, and the centers of the circles from one pencil lie on the radical axis of the other pencil.
See main article: Problem of Apollonius.
In Euclidean plane geometry, Apollonius's problem is to construct circles that are tangent to three given circles in a plane.
Three given circles generically have eight different circles that are tangent to them and each solution circle encloses or excludes the three given circles in a different way: in each solution, a different subset of the three circles is enclosed.
See main article: Apollonian gasket.
By solving Apollonius' problem repeatedly to find the inscribed circle, the interstices between mutually tangential circles can be filled arbitrarily finely, forming an Apollonian gasket, also known as a Leibniz packing or an Apollonian packing.[2] This gasket is a fractal, being self-similar and having a dimension d that is not known exactly but is roughly 1.3,[3] which is higher than that of a regular (or rectifiable) curve (d = 1) but less than that of a plane (d = 2). The Apollonian gasket was first described by Gottfried Leibniz in the 17th century, and is a curved precursor of the 20th-century Sierpiński triangle.[4] The Apollonian gasket also has deep connections to other fields of mathematics; for example, it is the limit set of Kleinian groups;[5] see also Circle packing theorem.
The circles of Apollonius may also denote three special circles
l{C}1,l{C}2,l{C}3
| A1A2A3 |
l{C}1
| A1 |
| A2 |
| A3 |
l{C}2
| A2 |
| A1 |
| A3 |
l{C}3
All three circles intersect the circumcircle of the triangle orthogonally. All three circles pass through two points, which are known as the isodynamic points
S
S\prime
The centers of these three circles fall on a single line (the Lemoine line). This line is perpendicular to the radical axis, which is the line determined by the isodynamic points.