Closing Theorems for Circle Chains
Abstract
We consider closed chains of circles C1,C2,…,Cn,Cn+1=C1 such that two neighbouring circles Ci,Ci+1 intersect or touch each other with Ai being a common point. We formulate conditions such that a polygon with vertices Xi on Ci, and Ai on the (extended) side XiXi+1, is closed for every position of the starting point X1 on C1. Similar results apply to open chains of circles. It turns out that the intersection of the sides XiXi+1 and XjXj+1 of the polygon lies on a circle Cij through Ai and Aj with the property that Cij, Cjk and Cki pass through a common point. The six circles theorem of Miquel and Steiner's quadrilateral Theorem appear as special cases of the general results.
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