Poncelet-Steiner theorem

In geometry, the Poncelet-Steiner theorem on ruler-and-compass constructions states that whatever can be constructed by straightedge with compass, can be constructed by straightedge alone, if you are given a single circle and the location of its centre. This result is the best possible: a straightedge alone, without being given a circle, is not sufficient. (A straightedge alone cannot construct square roots.)

The result was conjectured by Jean Victor Poncelet in 1822, and proven by Jakob Steiner in 1833.

External link

Jacob Steiner's theorem (It is impossible to find the center of a given circle with the straightedge alone)

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