एक वृत्त के चाप द्वारा अंतरित कोण

We know that the end points of a chord other than the diameter of a circle divides it into two arcs, namely the major arc and the minor arc. In this article, we will discuss the theorem related to the angle subtended by an arc of a circle and its proof with complete explanation.

Angle Subtended by an Arc of a Circle – Theorem and Proof

Theorem:

The angle subtended by an arc at the centre is double the angle subtended by it at any point on the remaining part of the circle.

Proof:

Consider a circle with centre ${\displaystyle O}$. Here the arc ${\displaystyle PQ}$ of the circle subtends angle ${\displaystyle \angle POQ}$ at Centre ${\displaystyle O}$ and ${\displaystyle \angle PAQ}$ at a point ${\displaystyle A}$ on the remaining part of the circle.

To prove: ${\displaystyle \angle POQ=2\angle PAQ}$

To prove this, join ${\displaystyle AO}$ and extend it to point ${\displaystyle B}$.

There are two general cases while proving this theorem.

Case 1:

Fig. 1

Consider a triangle ${\displaystyle APO}$

Here, ${\displaystyle OA=OP}$ (Radii)

Since, the angles opposite to the equal sides are equal,

${\displaystyle \angle OPA=\angle OAP....(1)}$

Also, by using the exterior angle property (exterior angle is the sum of interior opposite angles),

We can write,

${\displaystyle \angle BOP=\angle OAP+\angle OPA}$

By using ${\displaystyle (1)}$

${\displaystyle \angle BOP=\angle OAP+\angle OAP}$

${\displaystyle \angle BOP=2\angle OAP....(2)}$

Similarly, consider another triangle ${\displaystyle AQO}$,

${\displaystyle OA=OQ}$ (Radii)

As the angles opposite to the equal sides are equal,

${\displaystyle \angle OQA=\angle OAQ....(3)}$

Similarly, by using the exterior angle property, we get${\displaystyle \angle BOQ=\angle OAQ+\angle OQA}$

${\displaystyle \angle BOQ=\angle OAQ+\angle OAQ}$ (using ${\displaystyle (3)}$)

${\displaystyle \angle BOQ=2\angle OAQ....(4)}$

Adding ${\displaystyle (2)}$and ${\displaystyle (4)}$ we get,

${\displaystyle \angle BOP+\angle BOQ=2\angle OAP+2\angle OAQ}$

${\displaystyle \angle POQ=2(\angle OAP+\angle OAQ)}$

${\displaystyle \angle POQ=2\angle PAQ}$

Hence, case (1) is proved.

Case 2:

Fig. 2

To prove ${\displaystyle \angle POQ=2\angle PAQ}$ for this case, we can follow the steps as same as for case ${\displaystyle (1)}$. But while adding ${\displaystyle (2)}$ and${\displaystyle (4)}$, we have to follow the below steps.

${\displaystyle \angle BOP+\angle BOQ=2\angle OAP+2\angle OAQ}$

Reflex angle ${\displaystyle \angle POQ=2(\angle OAP+\angle OAQ)}$ (Since, ${\displaystyle PQ}$ is a Major arc)

Reflex angle ${\displaystyle \angle POQ=2\angle PAQ}$.

Hence, proved.