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Question

In Figure, PS is the bisector of QPR of PQR. Prove that QSPQ=SRPR


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Solution

Step 1: Make the necessary constructions to the given triangle

It is given that PS is the bisector of QPR of PQR.

i.e., QPS=SPR ...(i)

Now, draw a line RX such that RX||SP.

And, produce the line QP such that it intersects RX at point T.

Step 2: Determine the pair of equal angles

Since RX||SP and RP is a transversal.

So, SPR=PRT ...(ii)

And, since RX||SP and QT is a transversal.

So, QPS=PTR ...(iii)

Now, using the equation (i) and (ii), we have,

QPS=PRT ...(iv)

Again, using the equation (iii) and (iv), we have,

PRT=PTR

Step 3: Use the property of isosceles triangles

As we know that the sides opposite to the equal angles of a triangle are also equal.

So, in PTR,

PRT=PTR

PT=PR ...(v)

Step 4: Use the basic proportionality theorem of triangles,

Now, using the basic proportionality theorem in QTR, it can be stated that,

QSQP=SRPT

Using the equation (v) in the above, it can be stated that,

QSPQ=SRPR QP=PQ

Which is the required answer.

Hence, it is proved that QSPQ=SRPR.


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