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Question
Question 8
ABCD is cyclic quadrilateral such that AB is a diameter of the circle circumscribing it and ∠ADC=140∘, then ∠BAC is equal to
(A) 80∘
(B) 50∘
(C) 40∘
(D) 30∘
ABCD is cyclic quadrilateral such that AB is a diameter of the circle circumscribing it and ∠ADC=140∘, then ∠BAC is equal to
(A) 80∘
(B) 50∘
(C) 40∘
(D) 30∘
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Solution
(B) 50∘
Given ABCD is a cyclic quadrilateral and ∠ADC=140∘
We know that, sum of the opposite angles in a cyclic quadrilateral is 180∘
∠ADC+∠ABC=180∘
⇒ 140∘+∠ABC=180∘
⇒ ∠ABC=180∘−140∘
∴ ∠ABC=40∘
Since ∠ACB is an angle which lies in a semi – circle,
∠ACB=90∘
In ΔABC, ∠BAC+∠ACB+∠ABC=180∘ [by angle sum property of a triangle]
⇒ ∠BAC+90∘+40∘=180∘
⇒ ∠BAC=180∘−130∘=50∘
Given ABCD is a cyclic quadrilateral and ∠ADC=140∘
We know that, sum of the opposite angles in a cyclic quadrilateral is 180∘
∠ADC+∠ABC=180∘
⇒ 140∘+∠ABC=180∘
⇒ ∠ABC=180∘−140∘
∴ ∠ABC=40∘
Since ∠ACB is an angle which lies in a semi – circle,
∠ACB=90∘
In ΔABC, ∠BAC+∠ACB+∠ABC=180∘ [by angle sum property of a triangle]
⇒ ∠BAC+90∘+40∘=180∘
⇒ ∠BAC=180∘−130∘=50∘
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