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Basic Proportionality Theorem

The diagonals...

Question

The diagonals of a quadrilateral $A B C D$ intersect each other at the point $O$ such that $\frac{A O}{B O} = \frac{C O}{D O}$ . Show that $A B C D$ is a trapezium.

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Solution

Step 1. Explaining the diagram.
Let $A B C D$ be quadrilateral where $A C$ and $B D$ intersects each other at $O$ such that, $\frac{A O}{B O} = \frac{C O}{D O}$
Step 2. Showing $A B C D$ is trapezium
Construction-From the point $O$ , draw a line $E O$ touching $A D$ at $E$ in such a way that, $E O ∥ D C ∥ A B$
$I n Δ D A B, E O | | A B$
By using Basic Proportionality Theorem
$\frac{D E}{E A} = \frac{D O}{O B} . . . . . . . . . . . . . . . . . . . . . . . . (i)$
Also, given,
$\frac{A O}{B O} = \frac{C O}{D O}$
$\Rightarrow \frac{A O}{C O} = \frac{B O}{D O} [a p p l y i n g a l t e r n e n d o] \Rightarrow \frac{C O}{A O} = \frac{D O}{O B} [[a p p l y i n g i n v e r t e n d o] \Rightarrow \frac{D O}{O B} = \frac{C O}{A O} . . . . . . . . . . . . . . . . . . . . . . . . . . (i i)$
From equation $(i) a n d (i i),$
We have
$\frac{D E}{E A} = \frac{C O}{A O}$
Therefore, By applying converse of Basic Proportionality Theorem,
$E O | | D C$
Also $E O | | A B \Rightarrow A B | | D C .$
Hence, quadrilateral $A B C D$ is a trapezium with $A B | | C D .$

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