Please prove?

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Please prove?

In the figure below ABCE is a paralleogram. F and G are an points on CE and EB respectively such that FG is parallel to CB. Prove that area of $DeltaACF=DeltaABG$

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Answer 1 · 2018-05-21T04:56:47

see explanation.

Explanation:

enter image source here
let $|ABC|$ denote area of $ABC$ ,
let $BG=w, GE=x, CF=y, FE=z$ ,
given $FG$ // $CB$ ,
$=> w/(w+x)=y/(y+z)$
$|ABG|/|ABE|=w/(w+x)$
$|ACF|/|ACE|=y/(y+z)$
As $|ABE|=|ACE|=1/2*|ABEC|$
$=> |ABG|:|ACF|=w/(w+x):y/(y+z)=1:1$
$=> |ACF|=|ABG|$

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Please prove?

In the figure below ABCE is a paralleogram. F and G are an points on CE and EB respectively such that FG is parallel to CB. Prove that area of $DeltaACF=DeltaABG$

1 Answer

Explanation:

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Impact of this question

Science

Math

Humanities

... and beyond

Please prove?

In the figure below ABCE is a paralleogram. F and G are an points on CE and EB respectively such that FG is parallel to CB. Prove that area of DeltaACF=DeltaABGDeltaACF=DeltaABG

1 Answer

Explanation:

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Impact of this question

In the figure below ABCE is a paralleogram. F and G are an points on CE and EB respectively such that FG is parallel to CB. Prove that area of $DeltaACF=DeltaABG$