SATHEE: Quantitative Aptitude Ques 266

मात्रात्मक योग्यता प्रश्न 266

प्रश्न: निर्देश: दिए गए प्रश्नों में, दो समीकरण I और II दिए गए हैं। दोनों समीकरणों को हल कीजिए और उपयुक्त उत्तर चिह्नित कीजिए।

I. $ 12x^{2}-x-1=0 $
II. $ 20y^{2}-41y+20=0 $

विकल्प:

A) $ x>y $

B) $ x\ge y $

C) $ x<y $

D) x और y के बीच संबंध निर्धारित नहीं किया जा सकता

E) $ x\le y $

Show Answer

उत्तर:

सही उत्तर: C

हल:

I. $ 12x^{2}-x-1=0 $ $ D=\sqrt{b^{2}-4ac}=\sqrt{1-4\times 12\times (-1)} $ $ =\sqrt{1+48}=\sqrt{49}=7 $ $ x _1=\frac{-,b+D}{2a}=\frac{1+7}{24}=\frac{8}{24}=\frac{1}{3} $ $ x _2=\frac{-,b-D}{2a} $

$ \Rightarrow $ $ x^{2}=\frac{1-7}{24}=\frac{-,6}{24}=\frac{-1}{4} $

$ \Rightarrow $ $ x=\frac{1}{3}, $ $ -\frac{1}{4} $ II. $ 20y^{2}-41y+20 $ $ y _1=\frac{41+\sqrt{1681-1600}}{40} $

$ \Rightarrow $ $ y _1=\frac{41+9}{40}=\frac{50}{40}=\frac{5}{4} $ और $ y _2=\frac{41-\sqrt{1681-1600}}{40} $

$ \Rightarrow $ $ y _2=\frac{32}{40}=\frac{4}{5} $
$ \Rightarrow $ $ y=\frac{5}{4}, $ $ \frac{4}{5} $

$ \therefore $ $ x<y $

मात्रात्मक योग्यता प्रश्न 265

मात्रात्मक योग्यता प्रश्न 267

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