O is the center and AB is a minor arc of the circle. If the angle subtended by AB at the center is ∠AOB = 110∘, then angle subtended by the arc at any point on the circle ∠APB is
As P is any point on the circle, we can take that as shown in the figure.
Now we can easily see that in ΔPOB, OP=OB, since both are radii of the circle.
So, ∠OPB = ∠OBP
As external angle is equal to sum of interior opposite angles,
We can write ∠COB = ∠OPB + ∠OBP
= 2 ∠OPB
So, ∠COB = 2 ∠CPB
Similarly, in ΔPOA, OP=OA since both are radii of the circle.
So, ∠OPA = ∠OAP
As the external angle is equal to the sum of interior opposite angles.
We can write ∠COA = ∠OPA + ∠OAP
= 2 ∠OPA
So ∠COA = 2 ∠CPA
Hence, ∠COA+∠COB = 2(∠CPA + ∠CPB)
Or, ∠ AOB = 2∠APB
Substituting we can get ∠APB = 55∘.