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प्रश्न
If f(x) `= sqrt(4 + "x" - 2)/"x", "x" ne 0` be continuous at x = 0, then f(0) = ______.
विकल्प
`1/2`
`1/4`
2
`3/2`
MCQ
रिक्त स्थान भरें
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उत्तर
If f(x) `= sqrt(4 + "x" - 2)/"x", "x" ne 0` be continuous at x = 0, then f(0) = `underlinebb(1/4)`.
Explanation:
f(0) = `lim_(x → 0) f(x)= lim_(x → 0) (sqrt(4 + x) − 2)/x`
= `lim_(x → 0)(sqrt(4 + x) − 2)/x xx (sqrt(4 + x) + 2)/(sqrt(4 + x) + 2)`
= `lim_(x → 0) (sqrt(4 + x) − 4)/(x (sqrt(4 + x) + 2)) = lim_(x → 0) x/(x(sqrt(4 + x) + 2))`
= `lim_(x → 0) 1/ (sqrt(4 + x) + 2)`
= `1/(2 + 2)`
= `1/4`
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