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Question
Question 3
If two circles intersect at two points, then prove that their centres lie on the perpendicular bisector of the common chord.
If two circles intersect at two points, then prove that their centres lie on the perpendicular bisector of the common chord.
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Solution
Consider two circles centered at point O and O’, intersecting each other at point A and B respectively.
Join AB, AB is the chord of the circle centered at O and it is also the chord of the circle centered at O’.
Let OO' intersect AB at M.
In ΔOAO' and ΔOBO', we have
OA = OB
O'A = O'B
OO' = OO' (common)
ΔOAO' ≅ ΔOBO'(SSS congruency)
∠AOO' = ∠BOO'
∠AOM = ∠BOM -----(i)
Now, in ΔAOM and ΔBOM we have
OA = OB (radii of same circle)
∠AOM = ∠BOM
OM = OM (common)
△AOM ≅ △BOM (SAS congruency)
AM = BM and ∠AMO = ∠BMO
But
∠AMO + ∠BMO = 180∘
2∠AMO = 180∘
∠AMO = 90∘
Hence, OO' is perpendicular bisector.
Join AB, AB is the chord of the circle centered at O and it is also the chord of the circle centered at O’.
Let OO' intersect AB at M.
In ΔOAO' and ΔOBO', we have
OA = OB
O'A = O'B
OO' = OO' (common)
ΔOAO' ≅ ΔOBO'(SSS congruency)
∠AOO' = ∠BOO'
∠AOM = ∠BOM -----(i)
Now, in ΔAOM and ΔBOM we have
OA = OB (radii of same circle)
∠AOM = ∠BOM
OM = OM (common)
△AOM ≅ △BOM (SAS congruency)
AM = BM and ∠AMO = ∠BMO
But
∠AMO + ∠BMO = 180∘
2∠AMO = 180∘
∠AMO = 90∘
Hence, OO' is perpendicular bisector.
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