Yesterday i was doing the question from class 9th ncert book of math of Areas of Parallelograms and Triangles chapter of exercise 9.3 What is the easiest way for solving it because i was not able to do this question please help me for solving this question 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 ar(ΔABE) = ar(ΔACF)
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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 ar(ΔABE) = ar(ΔACF) Q.8
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Given,
XY || BC, BE || AC and CF || AB
To show,
ar(ΔABE) = ar(ΔAC)
Proof:
BCYE is a || gm as ΔABE and ||gm BCYE are on the same base BE and between the same parallel lines BE and AC.
∴,ar(ABE) = ½ ar(BCYE) … (1)
Now,
CF || AB and XY || BC
⇒ CF || AB and XF || BC
⇒ BCFX is a || gm
As ΔACF and || gm BCFX are on the same base CF and in-between the same parallel AB and FC .
∴,ar (ΔACF)= ½ ar (BCFX) … (2)
But,
||gm BCFX and || gm BCYE are on the same base BC and between the same parallels BC and EF.
∴,ar (BCFX) = ar(BCYE) … (3)
From (1) , (2) and (3) , we get
ar (ΔABE) = ar(ΔACF)
⇒ ar(BEYC) = ar(BXFC)
As the parallelograms are on the same base BC and in-between the same parallels EF and BC–(iii)
Also,
△AEB and ||gm BEYC are on the same base BE and in-between the same parallels BE and AC.
⇒ ar(△AEB) = ½ ar(BEYC) — (iv)
Similarly,
△ACF and || gm BXFC on the same base CF and between the same parallels CF and AB.
⇒ ar(△ ACF) = ½ ar(BXFC) — (v)
From (iii), (iv) and (v),
ar(△ABE) = ar(△ACF)