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Question
ABCD is a cyclic quadrilateral whose diagonals intersect at a point E. If ∠DBC=70∘,∠BAC=30∘ and AB = BC, find ∠ECD.
ABCD is a cyclic quadrilateral whose diagonals intersect at a point E. If ∠DBC=70∘,∠BAC=30∘ and AB = BC, find ∠ECD.
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Solution
The correct option is A 50∘
For chord CD,
∠CBD=∠CAD [Angle by a chord in the same segment are equal]
∴∠CAD=∠CBD=70∘
∠BAD=∠BAC+∠CAD=30∘+70∘=100∘
∠BCD+∠BAD=180∘ [Sum of opposite angles of a cyclic quadrilateral is 180∘)
∠BCD+100∘=180∘
∠BCD=80∘
In ΔABC,
AB = BC (Given)
⇒∠BCA=∠CAB (Angles opposite to equal sides of a triangle are equal)
∴∠BCA=30∘
We have, ∠BCD=80∘
∠BCA+∠ACD=80∘
30∘+∠ACD=80∘
⇒∠ACD=50∘
∴∠ECD=∠ACD=50∘
50∘
For chord CD,
∠CBD=∠CAD [Angle by a chord in the same segment are equal]
∴∠CAD=∠CBD=70∘
∠BAD=∠BAC+∠CAD=30∘+70∘=100∘
∠BCD+∠BAD=180∘ [Sum of opposite angles of a cyclic quadrilateral is 180∘)
∠BCD+100∘=180∘
∠BCD=80∘
In ΔABC,
AB = BC (Given)
⇒∠BCA=∠CAB (Angles opposite to equal sides of a triangle are equal)
∴∠BCA=30∘
We have, ∠BCD=80∘
∠BCA+∠ACD=80∘
30∘+∠ACD=80∘
⇒∠ACD=50∘
∴∠ECD=∠ACD=50∘
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