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WILL GIVE BRAINLIEST
Given that two arcs of a circle are congruent, their measures are equal by the definition of congruence. Central angle
measures are equal to their intercepted arcs, so by the transitive property, the two central angle measures are equal. By
definition, the two angles are also congruent. Since all radii are congruent, the two triangles are congruent by SAS. Finally,
the intercepted chords are congruent by CPCTC.
Drag the statements to the positions that match the summary of Jeremy's proof.

WILL GIVE BRAINLIEST Given that two arcs of a circle are congruent their measures are equal by the definition of congruence Central angle measures are equal to class=

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PallasAthena23
arc AC =~ arc BD
m arc AC = m arc BD
mTriangle AOC =~ triangle BOD

(I apologize, my phone has no way to type the proper symbols, but I sincerely hope this helps)

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