It two equal chords of a circle intersect within the circle. Prove that the line joining the point of intersection to the centre makes equal angles with the chords.

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Solution

Let us consider a circle with centre $O$ and $A B$ and $C D$ be the chords which intersect at $M$
According to the question, $A B = C D$ .
We need to prove $∠ O M E = ∠ O M F$
Drop perpendiculars $O E$ and $O F$ on $A B$ and $C D$ respectively and join $O M$ .
In triangles $O E M$ and $O F M$ ,
$O E = O F$ (equal chords of a circle are equidistant from the centre)
$O M = O M$ (common side)
$∠ O E M = ∠ O F M$ (both equal to $90^{o}$ )
By RHS criterion of congruence,
$△ O E M ≅ △ O F M$
$\Rightarrow ∠ O M E = ∠ O M F$ (by C.P.C.T.)

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