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In a ΔABC, P and Q are the points on sides AB and AC respectively, such that PQ ∥ BC. If AP = 2.4 cm, AQ = 2 cm, QC = 3 cm and BC = 6 cm. Find AB and PQ.

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Question drawn from very renowned book RD sharma of class 10th, Chapter no. 4
Chapter name:- Triangles
Exercise :- 4.2
This is very important question of triangle.

In this question we have been given that In a ΔABC, P and Q are the points on sides AB and AC,

Also it is given PQ ∥ BC.

And if AP = 2.4 cm, AQ = 2 cm, QC = 3 cm and BC = 6 cm.

Now we have to Find AB and PQ.

learning CBSE maths in efficient way

RD sharma, DHANPAT RAI publication
Class 10th, triangle

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1 Answer

  1. Given: 

    In ΔABC,

    Length of side AP = 2.4 cm, AQ = 2 cm, QC = 3 cm, and BC = 6 cm.

    Also, PQ ∥ BC.

    To find: Length of side AB and PQ

    Now,

    Since it’s given that PQ ∥ BC

    So by using Thales Theorem, we get

    AP/PB = AQ/ QC

    2.4/PB = 2/3

    2 x PB = 2.4 × 3

    PB = (2.4 × 3)/2 cm

    ⇒ PB = 3.6 cm

    Therefore, Length of PB is 3.6 cm

    Now finding, AB = AP + PB

    AB = 2.4 + 3.6

    ⇒ AB = 6 cm

    Therefore, Length of AB is 6 cm

    Now, considering ΔAPQ and ΔABC

    We have,

    ∠A = ∠A               (Common angle)

    ∠APQ = ∠ABC     (Corresponding angles are equal and PQ||BC and AB being a transversal)

    Thus, ΔAPQ and ΔABC are similar to each other by AA criteria.

    Now, we know that corresponding parts of similar triangles are propositional.

    Therefore,

    ⇒ AP/AB = PQ/ BC

    ⇒ PQ = (AP/AB) x BC

    = (2.4/6) x 6 = 2.4

    ∴ PQ = 2.4 cm.

    Therefore, Length of PQ is 2.4 cm and AB is 6cm

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