Question

Angle Q is greater than angle R. PA is an angle bisector. So, proof that :-
angle APM=1/2(angle Q-angle R)

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Answer 1

Answer:

Given: angle Q is greater than angle R and PA is the bisector of angle QPR and PM perpendicular QR

To Prove: angle APM = 1/2 (Q - R)

Proof: In triangle PQM

=> PMQ + MPQ + Q = 180 [Angle sum property of a triangle]

=> 90 + MPQ + Q = 180 (PMQ = 90)

=> Q = 90 - MPQ

=> 90 - MPQ = Q _____(1)

In triangle PMR

=> PMR + PRM + R = 180

=> 90 + MPR + R = 180

=> R = 90 - MPR

=> 90 - MPR = R _____(2)

Subtracting (1) and (2), we get

=> (90 - MPQ) - (90 - MPR) = Q - R

=> MPR - MPQ = Q - R

=> (RPA +APM) - (QPA - APM) = Q - R

=> QPA + APM -QPA + APM = Q - R [ As PA is bisector of QPR so, RPA=QPA]

=> 2 APM = Q - R

=> APM = 1/2 (Q - R)

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Answer 2

Answer:

Step-by-step explanation:

okay see attachment