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Question
In the given figure, O is the centre of the circle. Chord AB is parallel to chord CD and CB is a diameter. Prove that arc AC = arc BD. [4 MARKS]
In the given figure, O is the centre of the circle. Chord AB is parallel to chord CD and CB is a diameter. Prove that arc AC = arc BD. [4 MARKS]
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Solution
Concept: 2 Marks
Application: 2 Marks
Given: Chord AB∥ Chord CD and COB is a diameter.
To prove: Arc AC = Arc BD.
Proof:
∠AOC=2∠ABC [Angle subtended by the chord at the centre is double the angle at any point on the circumference.]
⟹∠ABC=12∠AOC ...(i)
∠BOD=2∠BCD [Angle subtended by the chord at the centre is double the angle at any point on the circumference.]
⟹∠BCD=12∠BOD ...(ii)
∠ABC=∠BCD [Alternate ∠s, as AB∥CD]
⟹12∠AOC=12∠BOD [From (i) and (ii)]
⟹∠AOC=∠BOD
⟹ Arc AC = arc BD in a circle, the arcs subtending equal ∠s at the centre are equal
Hence, Proved.
Concept: 2 Marks
Application: 2 Marks
Given: Chord AB∥ Chord CD and COB is a diameter.
To prove: Arc AC = Arc BD.
Proof:
∠AOC=2∠ABC [Angle subtended by the chord at the centre is double the angle at any point on the circumference.]
⟹∠ABC=12∠AOC ...(i)
∠BOD=2∠BCD [Angle subtended by the chord at the centre is double the angle at any point on the circumference.]
⟹∠BCD=12∠BOD ...(ii)
∠ABC=∠BCD [Alternate ∠s, as AB∥CD]
⟹12∠AOC=12∠BOD [From (i) and (ii)]
⟹∠AOC=∠BOD
⟹ Arc AC = arc BD in a circle, the arcs subtending equal ∠s at the centre are equal
Hence, Proved.
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