MCQ
The domain of the function $y = \frac{1}{{\sqrt {|x|\; - x} }}$ is
- ✓$( - \infty ,\;0)$
- B$( - \infty ,\;0]$
- C$( - \infty ,\; - 1)$
- D$( - \infty ,\;\infty )$
$|x|\,\, > x$ but $|x|\,\, = x$ for $x $ positive and $|x|\,\, > x$ for $ x $ negative.
So, domain will be $( - \,\infty ,\,\,0)$.
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$\left( {\beta \gamma + \frac{1}{\alpha }} \right),\,\left( {\gamma \alpha + \frac{1}{\beta }} \right),\,\left( {\alpha \beta + \frac{1}{\gamma }} \right)$
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Marks obtained |
No. of students |
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$0-10$ |
$2$ |
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$10-20$ |
$18$ |
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$20-30$ |
$30$ |
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$45$ |
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$40-50$ |
$35$ |
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$50-60$ |
$20$ |
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$6$ |
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$3$ |