Math, asked by pratikshaaghav65, 5 months ago

in PQR ,PRQ = 90° ,line RS perpendicular to line PQ and P-S-Q the prove that PR² /QR²= PS/QS

Answers

Answered by tchoudhary35458

Answer:

Given: ΔPQR is right angled triangle where Q is right angle

QS ⊥ PR

QM bisect the ∠PQR

To prove: \frac{PM^2}{MR^2}=\frac{PS}{SR}

2 =

In ΔPQR,

QM bisector of ∠PQR

\implies\frac{PM}{MR}=\frac{PQ}{QR}⟹

(Property of angle bisector of a triangle)

\implies\frac{PM^2}{MR^2}=\frac{PQ^2}{QR^2}⟹

..............(1)

Again in ΔPQR

QS ⊥ PR ⇒ ΔPQR is similar to ΔPSQ is similar to ΔRSQ

in ΔPSQ and ΔPQR

[tex\frac{PQ}{PR}=\frac{PS}{PQ}[/tex] (both triangles are similar)

PQ^2=PR\times PSPQ

=PR×PS .........(2)

Similarly form ΔPSQ and ΔPQR

QR^2=PR\times SRQR

=PR×SR ..............(3)

From (1) , (2) & (3)

\frac{PM^2}{MR^2}=\frac{PR\times PS}{PR\times SR}

PR×SR

PR×PS

\frac{PM^2}{MR^2}=\frac{PS}{SR}

Hence Proved

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