मात्रात्मक योग्यता प्रश्न 1848

प्रश्न: मान लीजिए C एक सीधी रेखा AB पर एक बिंदु है। AC और AB व्यासों वाले वृत्त खींचे गए हैं। मान लीजिए P, AB व्यास वाले वृत्त की परिधि पर कोई बिंदु है। यदि AP दूसरे वृत्त पर Q पर मिलता है, तो

विकल्प:

A) $ QC||PB $

B) QC कभी भी PB के समानांतर नहीं होता

C) $ QC=\frac{1}{2}PB $

D) $ QC||PB $ और $ QC=\frac{1}{2}PB $

Show Answer

उत्तर:

सही उत्तर: A

समाधान:

  • $ \Delta AQC $ और $ \Delta APB $ में, $ \angle AQC=\angle APB $ [अर्धवृत्त में बने कोण] $ \angle QAC=\angle PAB $ [सामान्य]

$ \therefore $ $ \angle ACQ=\angle ABP $

$ \Rightarrow $ $ \Delta AQC\sim \Delta APB $

$ \therefore $ $ \frac{AQ}{AP}=\frac{AC}{AB} $ $ \Rightarrow $ $ QC||PB $

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