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प्रश्न
`lim_("x" -> 0) ("x cos x" - "log" (1 + "x"))/"x"^2` is equal to ____________.
विकल्प
1
0
`1/2`
None of these
MCQ
रिक्त स्थान भरें
उत्तर
`lim_("x" -> 0) ("x cos x" - "log" (1 + "x"))/"x"^2` is equal to `underline(1/2)`.
Explanation:
`= lim_("x" -> 0) ("x cos x" - "log" (1 + "x"))/"x"^2`
`= lim_("x" -> 0) ("cosx - x sin x" 1/(1 + "x"))/(2 "x")`
`= lim_("x" -> 0) ("-sinx" - ("x cos x + sin x") + 1/(1 + "x")^2)/2`
`= 1/2` (using L’Hospital Rule)
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