Question

P and Q are respectively the mid- point of sides AB and BC of a triangle ABC and R is the mid- point of AP,show that. (1). ar( PRQ)=1/2ar(ARC). (2). ar(RQC)=3/8ar(ABC). (3). ar(PBQ)=ar(ARC).

Answer 1

Let ABC is a triangle. P and Q are the mid points of AB and BC respectively and R is the mid-point of AP. 

Join PQ, QR, AQ, PC, RC as shown in the figure.

Now we know that median of a triangle divides it into two triangle of equal areas. 

In triangle CAP, Cr is the mid point. 

So Area(ΔCRA) = (1/2)* Area(ΔCAP) .......1

Again in triangle CAB, CP is the mid point. 

So Area(ΔCAP) = (1/2)* Area(ΔCPB) ............2

from eqaution 1 and 2, we get

Area(ΔCAP) = (1/2)*Area(ΔCPB) ..............3

Again in triangle PBC, PQ is the mid point. 

So (1/2)*Area(ΔCPB) = Area(ΔPBQ) ............4

From equation 3 and 4, we get

Area(ΔARC) = Area(ΔPBQ) ...............5

Now QP, And QR are the medians of triangle QAB and QAP respectively

So Area(ΔQAP) = Area(ΔQBP) ............6

and Area(ΔQAP) = 2*Area(ΔQRP) ............7

from equation 6 and 7, we get

Area(ΔPRQ) = (1/2)*Area(ΔPBQ) ............8

from equation 5 and 8, we get

Area(ΔPRQ) = (1/2)*Area(ΔARC) 

Now CR is the median of triangle CAP

So Area(ΔARC) = (1/2)*Area(ΔCAP)

                     = (1/2)*(1/2)*Area(ΔABC)

                     = (1/4)*Area(ΔABC)

Again RQ is the median of triangle RBC

So Area(ΔRQC) = (1/2)*Area(ΔRBC)

                      = (1/2)*Area(ΔABC) - (1/2)*Area(ΔARC)

                      =(1/2)*Area(ΔABC) - (1/2)*(1/2)*(1/2)*Area(ΔABC)

                      =(1/2)*Area(ΔABC) - (1/8)*Area(ΔABC)

                      = (3/8)*Area(ΔABC)

So Area(ΔRQC) = = (3/8)*Area(ΔABC)