Given a circle with O as the centre. Find the value of x.
40°
ΔAOB is an isosceles triangle (OA = OB; Radii),
⇒∠OAB=∠OBA=50∘.
In ΔAOB,
∠OAB+∠OBA+∠AOB=180∘
Hence, ∠AOB=80∘
The angle subtended by an arc of the circle at its centre is double the angle subtended by it at any point on the remaining part of the circle.
Therefore, ∠ACB=12∠AOB=40∘.