Question

Class9
circles


In the given figure, lines l || m and a || b . If F and G AB are mid-point of sides and AC respectively and ar( ABED ) = 100 cm^2 , then ar(Δ AGF ) equals ____
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Answer 1

Answer:

Solution

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Given: l∣∣m

Line segment AB,CD and EF are concurrent at P.

Points A,E and C are on line l.

Points D,F and B are on line m.

Refer image,

To prove:

BF

AE

=

BD

AC

=

FD

CE

Proof: In ΔAEP and ΔBFP,

l∣∣m (Given)

∠1=∠2 []Alternate interior angles]

∠3=∠4 [same reason]

∴ΔAEP∼ΔBFP, [By AA similarity criterion]

BF

AE

=

BP

AP

=

FP

EP

(I)

In ΔCEP and ΔDFP,

l∣∣m [Given]

[ALternate interior angles] {

∠7=∠8

∠5=∠6

In ΔCEP and ΔDFP, [By AA similarity criterion]

∴

DF

CE

=

DP

CP

=

FP

EP

(II)

In ΔACP and ΔBDP,

l∣∣m [Given]

[Alternate interior angles] {

∠1=∠2

∠5=∠6

ΔACP and ΔBDP, [By AA similarity criterion]

BD

AC

=

BP

AP

=

DP

CP

(III)

PB

AP

=

BD

AC

=

DP

CP

=

DF

CE

=

FP

EP

=

BF

AE

[From (I),(II) and (III)]]

BD

AC

=

BF

AE

=

DF

CE

Hence proved,