Question 8
XY is a line parallel to side BC of a triangle ABC. If BE || AC and CF || AB meet XY at E and F respectively,
show that $a r (Δ A B E) = a r (Δ A C F)$ .

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Solution

It is given that,
$X Y | | B C \Rightarrow E Y | | B C$
$B E | | A C \Rightarrow B E | | C Y$
Therefore, EBCY is a parallelogram.

Also,
$X Y | | B C \Rightarrow X F | | B C$
$F C | | A B \Rightarrow F C | | X B$
Therefore, BCFX is a parallelogram.

Parallelograms EBCY and BCFX are on the same base BC and between the same parallels BC and EF.
$\Rightarrow$ ar (EBCY) = ar (BCFX) ...(1)

Consider parallelogram EBCY and $Δ A E B$ .
These lie on the same base BE and are between the same parallels BE and AC.
$\Rightarrow a r (A B E) = \frac{1}{2} a r (E B C Y) . . (2)$

Also, parallelogram BCFX and $Δ A C F$ are on the same base CF and between the same parallelsCF and AB.
$\Rightarrow a r (Δ A C F) = \frac{1}{2} a r (B C F X) . . (3)$

From equations (1), (2), and (3), we obtain ar $(Δ A B E) = a r (Δ A C F)$

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show that

a r (Δ A B E) = a r (Δ A C F)

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Q. Question 8
XY is a line parallel to side BC of a triangle ABC. If BE || AC and CF || AB meet XY at E and F respectively,
show that

a r (Δ A B E) = a r (Δ A C F)

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