Prove that the angle subtended by an arc of a circle at the centre is double the angle subtended by it at any point on the remaining part of the circle. [4 MARKS]
Prove that the angle subtended by an arc of a circle at the centre is double the angle subtended by it at any point on the remaining part of the circle. [4 MARKS]
Concept: 2 Marks
Application: 2 Marks
Given : A circle with centre O and an arc AB subtends ∠AOB at the centre and ∠ACB at any point C
on the remaining part of the circle.
To prove : ∠AOB=2∠ACB.
Construction :Join CO and produce it to some point D.
In ΔAOC, we have
OA = OC [Radii of the same circle.]
∠OAC=∠OCA ..... (1) [Angles opposite to equal sides of a Δ are equal.]
∠AOD=∠OAC+∠OCA [Exterior angle property]
∠AOD=2∠OCA ......(2) (from (1))
Similarly, In figure (i), we have
∠BOD=2∠OCB ...(3)
Adding (2) and (3)
∠AOD+∠BOD=2∠OCA+2∠OCB
2(∠OCA+∠OCB)=2∠ACB
∴∠AOB=2∠ACB
In Figure (ii), we have :
∠BOD−∠AOD=2∠OCB−2∠OCA Subtracting (2) from (3)
=2(∠OCB−∠OCA)
=2∠ACB
∠AOB=2∠ACB.
Hence, ∠AOB=2∠ACB.
In Figure (iii), we have :
∠AOD+∠BOD=2∠OCA+2∠OCB Adding (2) and (3)
=2(∠OCA+∠OCB)
=2∠ACB
Reflex ∠AOB=2∠ACB.
Concept: 2 Marks
Application: 2 Marks
Given : A circle with centre O and an arc AB subtends ∠AOB at the centre and ∠ACB at any point C
on the remaining part of the circle.
To prove : ∠AOB=2∠ACB.
Construction :Join CO and produce it to some point D.
In ΔAOC, we have
OA = OC [Radii of the same circle.]
∠OAC=∠OCA ..... (1) [Angles opposite to equal sides of a Δ are equal.]
∠AOD=∠OAC+∠OCA [Exterior angle property]
∠AOD=2∠OCA ......(2) (from (1))
Similarly, In figure (i), we have
∠BOD=2∠OCB ...(3)
Adding (2) and (3)
∠AOD+∠BOD=2∠OCA+2∠OCB
2(∠OCA+∠OCB)=2∠ACB
∴∠AOB=2∠ACB
In Figure (ii), we have :
∠BOD−∠AOD=2∠OCB−2∠OCA Subtracting (2) from (3)
=2(∠OCB−∠OCA)
=2∠ACB
∠AOB=2∠ACB.
Hence, ∠AOB=2∠ACB.
In Figure (iii), we have :
∠AOD+∠BOD=2∠OCA+2∠OCB Adding (2) and (3)
=2(∠OCA+∠OCB)
=2∠ACB
Reflex ∠AOB=2∠ACB.
