Question 15
O is the point of intersection of the diagonals AC and BD of a trapezium ABCD with ABIIDC. Through O, a line segment PQ is drawn parallel to AB meeting AD in P and BC in Q. Prove that PO = QO.

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Solution

Given, ABCD is a trapezium, the diagonals AC and BD intersect at O.
Also, PQ ||AB||DC.
To prove : PO = QO.

Proof :

$I n Δ A B D a n d Δ P O D$

$P O | | A B [∵ P Q | | A B]$

$∠ D = ∠ D [c o m m o n a n g l e]$
$∠ A B D = ∠ P O D [c o r r e s p o n d i n g a n g l e s]$
$∴ Δ A B D \sim Δ P O D [b y A A A s i m i l a r i t y c r i t e r i o n]$

$T h e n, \frac{O P}{A B} = \frac{P D}{A D} \dots (i)$

$I n Δ A B C a n d Δ O Q C$ ,

$O Q | | A B [∵ P Q | | A B]$

$∠ C = ∠ C [c o m m o n a n g l e]$
$∠ B A C = ∠ Q O C [c o r r e s p o n d i n g a n g l e s]$
$∴ Δ A B C \sim Δ O Q C [b y A A A s i m i l a r i t y c r i t e r i o n]$
$T h e n, \frac{O Q}{A B} = \frac{Q C}{B C} \dots (i i)$

$N o w, i n Δ A D C$ ,
$O P | | D C [∵ P Q D C]$
$∴ \frac{A P}{P D} = \frac{O A}{O C} [b y b a s i c p r o p o r t i o n a l l y t h e o r e m] . . . (i i i)$

$I n Δ A B C$ ,
$O Q | | A B [∵ P Q | | A B]$
$∴ \frac{B Q}{Q C} = \frac{O A}{O C}$
[by basic proportionally theorem] ...(iv)

From Eq.(iii) and (iv),
Adding 1 on both sides, we get,
$\frac{A P}{P D} + 1 = \frac{B Q}{Q C} + 1$
$\Rightarrow \frac{A P + P D}{P D} = \frac{B Q + Q C}{Q C}$
$\Rightarrow \frac{A D}{P D} = \frac{B C}{Q C}$
$\Rightarrow \frac{P D}{A D} = \frac{Q C}{B C}$
$\Rightarrow \frac{O P}{A B} = \frac{O Q}{A B} [f r o m E q s . (i) a n d (i i)]$
$\Rightarrow O P = O Q$

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