Recall that two circles are congruent if they have the same radii. Prove that equal chords of congruent circles subtend equal angles at their centers.

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Solution

Circle property:
Let we are having two circles having centers $O$ and $O'$ and having an equal radius $(r)$
Let we are having chords $AB and CD$ of equal length.
$A B = C D$ i.e. two equal chords.
From $Δ A O B a n d Δ C O D$ ,
$O A = O' C$ ( Radii of congruent circles )
$O B = O' D$ (Radii of congruent circles)
$A B = C D$ (Given)
So, by $SSS$ congruency,
$Δ A O B ≅ Δ C O D$
∴ By CPCT we get
$∠ A O B = ∠ C O D .$
Hence it is proved that equal chords of congruent circles subtend equal angles at their centers.

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