Consider triangle ABC and its circumcircle c. For a point A* moving on c, construct triangle A*BC and the bisectors AF and A*G of the two triangles. Consider then the circles inscribed and escribed in angles A and A*. Their centers form a rectangle EFGH.
The proof is direct consequence of the property proved in Bisector.html . I is the intersection point of the two bisectors and coincides with the middle of the arc BC. The six points B, F, G, C, H and E are equidistant from I. Notice that the angle(FIG) is equal to angle B of the triangle. Hence, varying C on (c) the rectangle EFGH changes its dimensions but remains similar to itself.
Considering the other pairs of triangles, like (BCA, BCA*) in the cyclic quadrangle BCA*A one can construct an interesting figure containing a cross. Look at the file BisectorCross.html for a further discussion on this.
![[alogo]](alogo.png){kind=small}
Bisector rectangle ![[0_0]](BisectorRectangle_files/BisectorRectangle_0_0_0.png)
![[0_1]](BisectorRectangle_files/BisectorRectangle_0_0_1.png)
![[0_2]](BisectorRectangle_files/BisectorRectangle_0_0_2.png)
![[1_0]](BisectorRectangle_files/BisectorRectangle_0_1_0.png)
![[1_1]](BisectorRectangle_files/BisectorRectangle_0_1_1.png)
![[1_2]](BisectorRectangle_files/BisectorRectangle_0_1_2.png)