केंद्र से जीवा पर लंब: Difference between revisions

In Mathematics, a chord is a line segment that joins two points on the circumference of a circle. We know that the longest chord of a circle is a diameter that passes through the centre of a circle. In this article, the theorem related to the perpendicular from the centre to a circle and its proof, and the converse of this theorem in detail.

Perpendicular from the Centre to a Chord – Theorem and Proof

Theorem:

The perpendicular from the centre of a circle to a chord bisects the chord.

Proof:

Fig. 1

Consider a circle with centre ${\displaystyle O}$ shown in Fig. 1

${\displaystyle AB}$ is a chord such that the line ${\displaystyle OX}$ is perpendicular to the chord ${\displaystyle AB}$. (${\displaystyle OX\perp AB}$)

We need to prove: ${\displaystyle AX=BX}$

Consider two triangles ${\displaystyle OAX}$ and ${\displaystyle OBX}$

${\displaystyle \angle OXA=\angle OXB=90^{\circ }}$

${\displaystyle OX=OX}$ (Common side)

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

By using the RHS rule, we can prove that the triangle ${\displaystyle OAX}$ is congruent to ${\displaystyle OBX}$.

Therefore,

${\displaystyle \triangle OAX\cong \triangle OBX}$

Hence, we can say that ${\displaystyle AX=BX}$ ( Using CPCT)

Thus, the perpendicular from the centre of a circle to a chord bisects the chord, is proved.

The Converse of this Theorem:

The line drawn through the centre of a circle to bisect a chord is perpendicular to the chord

Proof:

Consider the Fig. 1

Assume that ${\displaystyle AB}$ is the chord of a circle with centre ${\displaystyle O}$.

The centre ${\displaystyle O}$ is joined to the midpoint ${\displaystyle X}$ of the chord ${\displaystyle AB}$.

Now, we need to prove ${\displaystyle OX\perp AB}$

Join ${\displaystyle OA}$ and ${\displaystyle OB}$ and the two triangles formed are ${\displaystyle OAX}$ and ${\displaystyle OBX}$.

Here,

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

${\displaystyle OX=OX}$ (Common side)

${\displaystyle AX=BX}$ (As, ${\displaystyle X}$ is the midpoint of AB)

Therefore, we can say that ${\displaystyle \triangle OAX\cong \triangle OBX}$.

Thus, by using the RHS rule, we get

${\displaystyle \angle OXA=\angle OXB=90^{\circ }}$

This proves that the line drawn through the centre of a circle to bisect a chord is perpendicular to the chord.Hence, the converse of this theorem is proved.