If two equal chords of a circle intersect within the circle, prove that the line joining the point of intersection to the center makes equal angles with the chords.

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Solution

Given: Two equal chords which are intersecting at point in the circle
Construction :
Draw two equal chords $A B$ and $C D$ in a circle which intersect at point $E$
Draw a diameter $P Q$ such that it passes through the point $E$
Draw two perpendiculars are drawn as $O M ⊥ A B$ and $O N ⊥ D$ . Now, join $O E$ .
To Prove
$∠ B E Q = ∠ C E Q$
Proof:
$O M = O N$ [Since the equal chords are always equidistant from the center]
$O E = O E$ [common side]
$∠ O M E = ∠ O N E = 90 °$ [These are the perpendiculars]
So, by the RHS congruency criterion, $Δ O E M ≅ Δ O E N .$
So, by the CPCT rule, $∠ M E O = ∠ N E O$
$∴ ∠ B E Q = ∠ C E Q$
Hence it is proven that the line joining the point of intersection of two equal chords to the center makes equal angles with the chords.

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