Question 4
If from an external point B of a circle with centre O, two tangents BC and BD are drawn such that $∠$ DBC = $120^{\circ}$ , prove that BC+BD=BO i.e BO = 2BC.

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Solution

Two tangents BD and BC are drawn from an external point B.

To Prove: BO = 2BC
Given: $∠$ DBC = $120^{\circ}$
Join OC, OD and BO.
Since, BC and BD are tangents.
OC $⊥$ BC and OD $⊥$ BD
We know, OB is an angle bisector of $∠$ DBC.
$∴ ∠ O B C = ∠ D B O = 60^{\circ}$
In right angle $∠ O B C, c o s 60^{\circ} = \frac{B C}{O B}$
$\Rightarrow \frac{1}{2} = \frac{B C}{O B}$
$\Rightarrow$ OB = 2BC
Also, BC = BD.
[Tangent drawn from internal point to circle are equal]
$∴$ OB =BC+BC
$\Rightarrow$ OB = BC + BD

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