A point O is taken inside an equilateral four sided figure ABCD such that its distances from the angular points D and B are equal. Show that AO and OC are in one and the same straight line. [3 MARKS]

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Solution

Process : 2 Marks
Proof : 1 Mark

Given: A point O inside an equilateral quadrilateral four sided figure ABCD such that BO = OD

To prove : AO and OC are in one and the same straight line.

Proof: In $Δ$ s AOD and AOB, we have
AD = AB [Given]
AO = AO [Common side]
OD = OB [Given]
SO,
$Δ$ AOD $≅$ $Δ$ AOB. [SSS criterion of congruence]
$\Rightarrow$ $∠$ 1 = $∠$ 2.... (i) [C.P.C.T.C]

Similarly, $Δ$ DOC $≅$ $Δ$ BOC
$\Rightarrow$ $∠$ 3 = $∠$ 4....(ii) [C.P.C.T.C]

But $∠$ 1 + $∠$ 2+ $∠$ 3+ $∠$ 4 = $360^{\circ}$
$\Rightarrow 2 ∠$ 2+2 $∠$ 3= $360^{\circ}$ [Using (i) and (ii)]

$\Rightarrow$ $∠$ 2+ $∠$ 3 = $180^{\circ}$
$\Rightarrow$ $∠$ 2+ $∠$ 3 = $180^{\circ}$

$\Rightarrow$ $∠$ 2 and $∠$ 3 form a linear pair
$\Rightarrow$ AO and OC are in the same straight line
$\Rightarrow$ AC is a straight line.

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