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Question
Question 7
O is a point in the interior of a square ABCD such that OAB is an equilateral triangle. Show that ΔOCD is an isosceles triangle.
O is a point in the interior of a square ABCD such that OAB is an equilateral triangle. Show that ΔOCD is an isosceles triangle.
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Solution
O is a point in the interior of a square ABCD such that ΔOAB is an equilateral triangle.
Construction Join OC and OD.
AOB is an equilateral triangle.
∴∠OAB=∠OBA=60∘ ...(i)
Also, ∠DAB=∠CBA=90∘...(ii) [each angle of a square is 90∘]
[∵ ABCD is a square]
On subtracting Eq. (i) from Eq. (ii) we get
∠DAB−∠OAB=∠CBA−∠OBA=90∘−60∘i.e., ∠DAO=∠CBO=30∘
In ΔAOD and ΔBOC,
AO = BO [given]
[all the side of an equilateral triangle are equal]
∠DAO=∠CBO [proved above]
and AD = BC [sides of a square are equal]
∴ΔAOD≅ΔBOC [by SAS congruence rule]
Hence, OD = OC [by CPCT]
In ΔCOD,
OC = OD
Hence, ΔCOD is an isosceles triangle.
Construction Join OC and OD.
AOB is an equilateral triangle.
∴∠OAB=∠OBA=60∘ ...(i)
Also, ∠DAB=∠CBA=90∘...(ii) [each angle of a square is 90∘]
[∵ ABCD is a square]
On subtracting Eq. (i) from Eq. (ii) we get
∠DAB−∠OAB=∠CBA−∠OBA=90∘−60∘i.e., ∠DAO=∠CBO=30∘
In ΔAOD and ΔBOC,
AO = BO [given]
[all the side of an equilateral triangle are equal]
∠DAO=∠CBO [proved above]
and AD = BC [sides of a square are equal]
∴ΔAOD≅ΔBOC [by SAS congruence rule]
Hence, OD = OC [by CPCT]
In ΔCOD,
OC = OD
Hence, ΔCOD is an isosceles triangle.
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