Math, asked by ajaygupta13, 9 months ago

Theorem: If a line parallel to a side of a triangle intersects the remaining sides in
two distinct points, then the line divides the sides in the same
proportion.​

Answers

Answered by Anonymous
1

Step-by-step explanation:

Given: The theorem: if a line is drawn parallel to one side of a triangle to intersect the other two sides in distinct points , then the other two sides are divided in the same ratio.

To find: Prove the theorem (Basic Proportionality Theorem)

Solution:

First we need to do some constructions.

In triangle PQR, let l be a line parallel to QR, let the intersected points by l be M on PQ and N on PR, and now join QN and MR.

Now After looking to the figure, we get:

area( tri MPN ) / area ( tri NQM ) = PM / MQ ..............(i)

As both triangles have the height same (MN) and a common vertex (M).

Similarly :

area( tri MPN ) / area ( tri NRM ) = PN / NR .................(ii)

Now:

area( tri NQM ) = area ( tri NRM ) .........(iii)

(triangle lies in parallel lines and have same base)

Now from equation i, ii and iii, we have:

area( tri MPN )/ area ( tri NQM ) = area( tri MPN ) = area ( tri NRM )

So similarly:

PM / MQ = PN / NR

Hence proved.

Answer:

So in the above solution we proved the theorem of Basic Proportionality Theorem Or Thales Theorem.

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