In triangle ABC,D is mid point of AB.P is any point on BC. Join DP. Q is any point on AB. Join CQ. If DP is parallel to CQ. Then prove that ar(BPQ)=1/4ar(ABC)

Open in App

Solution

Question is wrong ......ar(BPQ)=1/2ar(ABC)

In ABC, D is the mid-point ofAB and P is any point on BC. If CQ || PD me...

In triangle ABC, D is the mid-point of AB and P is any point on BC. If CQ || PD meets AB in Q then prove that ar (BPQ) =1/2ar (ABC)

Construction :- Join DC

To prove :- Since D is the mid-point of AB. so, in triangle ABC, CD is the median.

ar(triangle BCD = ¹/₂ ar (triangle ABC) ..... (1)

Since, triangle PDQ and triangle PDC are on the same base PD and between the same parallels lines PD QC.

therefore, ar(triangle PDQ) = ar(triangle PDC) ................ (2)

From (1) and (2)

ar(triangle BCD) = ¹/₂ ar(triangle ABC)

= ar(triangle BPD) + ar(triangle PDC) = ¹/² ar(triangle ABC)

= ar(triangle BPD) + ar(triangle PDQ) = ¹/₂ ar(triangle ABC) { area of triangle PDC = PDQ}

= ar(triangleBPQ) = ¹/2 ar(triangle ABC)

Hence Proved ar(triangleBPQ) = ¹/2 ar(triangle ABC)

Suggest Corrections

Similar questions

△ A B C, D

A B

P

B C

C Q | | P D

A B

Q

(△ B P Q) = \frac{1}{2}

(△ A B C)

Δ

a r (Δ B P Q) = \frac{1}{2} a r (Δ A B C)

Δ

a r (Δ B P Q) = \frac{1}{2} a r (Δ A B C)

Δ A B C, D

∥ P D

(Δ B P Q) = \frac{1}{2} a r (Δ A B C)

Join BYJU'S Learning Program