Problem H
Brocard Point of a Triangle
The Brocard point of a triangle $ABC$ is a point $P$ in the triangle chosen so that: $\angle PAB = \angle PBC = \angle PCA$ (see figure below).
The common angle is called the Brocard angle. The largest Brocard angle is $\pi /6$ which is the Brocard angle for an equilateral triangle (the Brocard point is the centroid of the triangle).
Write a program to compute the coordinates of the Brocard point of a triangle given the coordinates of the vertices.
Input
The first line of input contains a single integer $P$, ($1 \le P \le 600$), which is the number of data sets that follow. Each data set should be processed identically and independently.
Each data set consists of a single line of input. It contains the data set number, $K$, followed by the six space separated coordinate values $A_ x, A_ y, B_ x, B_ y, C_ x, C_ y$ of the vertices of the triangle, which are in the range ($-20 \le A_ x, A_ y, B_ x, B_ y, C_ x, C_ y \le 20$). The vertices will always be specified so going from $A$ to $B$ to $C$ and back to $A$ circles the triangle counter-clockwise. Input coordinates are floating point values with up to 4 digits after the period.
Output
For each data set there is a single line of output. The single output line consists of the data set number, $K$, followed by a single space followed by the $x$ coordinate of the Brocard point, followed by a single space followed by the $y$ coordinate of the Brocard point. The coordinates are considered correct if their individual absolute or relative error does not exceed $10^{-5}$.
Sample Input 1 | Sample Output 1 |
---|---|
3 1 0 -1.3 3.4 0.5 1.1 2.3 2 0 0 3 0 0 4 3 3.1 0.2 4.3 0.4 0 0.8 |
1 1.404561 0.828896 2 1.560468 0.749025 3 3.876994 0.401673 |