Source — Euclid's Elements, encoded as an rrxiv paper

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III.27 Proposition III.27

In equal circles angles standing on equal circumferences are equal to one another, whether they stand at the centres or at the circumferences.

Proof

Converse of III.26. Equal arcs subtend equal chords (apply the superposition argument in reverse), and equal chords in equal circles give equal central angles (I.8: SSS on the radius-chord- radius triangles). Inscribed angles inherit via III.20.

lines 74–74 in main.tex