soln (Question: 108529.0 )

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aditya

· started a discussion

· 1 Months ago

soln (Question: 108529.0 )

question never mention ie c is mid point of side AB , so option a is correct

d is possible in one condtion if c is mid point of diameter ab then

triangle ACQ SIMILAR OF ABP AND 1/4 th of ABP in area

Question:

Assume C is a point on a straight line AB and two circles of diameter AC and AB are drawn on this line. P is a point on circumference of the circle of diameter AB. If AP meets second circle at Q, then which of the following is correct?

Options:

A) QC || PB

B) QC will never be parallel to PB

C) QC = \(\cfrac{1}{2}\)PB

D) QC || PB and QC = \(\cfrac{1}{2}\)PB

Solution:

Ans: (a)

From figure,

\(\angle \)APB = \(\angle \)AQC and \(\angle \)PAB = \(\angle \)QAC

DPAB ~ DQAC

\(\therefore\) \(\angle \)PBA = \(\angle \)QCA

Hence, QC | | PB.

Vyomdeep

· commented

· 1 Months ago

Its a previous yr questn where C was the mid pt, but a slight twist in this question and they all are going crazy.

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soln (Question: 108529.0 )

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