Aristarchus's inequality
ID: aristarchus-s-inequality
Aristarchus's inequality is a principle related to the geometry of circles, particularly in the context of convex polygons and their tangents. The inequality asserts that for any convex polygon inscribed in a circle, the sum of the lengths of the tangents drawn from any point inside the circle to the sides of the polygon is bounded by a certain value that depends on the polygon and the radius of the circle.
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