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Let `f(x) = (2 - sqrt(x + 4))/(sin 2x), x ≠ 0`. In order that f(x) is continuous at x = 0, f(0) is to be defined as ______.
рдкрд░реНрдпрд╛рдп
`(-1)/8`
`1/2`
1
`1/8`
MCQ
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Let `f(x) = (2 - sqrt(x + 4))/(sin 2x), x ≠ 0`. In order that f(x) is continuous at x = 0, f(0) is to be defined as `bbunderline((-1)/8)`.
Explanation:
`f(0) = lim_(x → 0) f(x)`
= `lim_(x → 0) (2 - sqrt(x + 4))/(sin 2x)` [0/0 form]
= `lim_(x → 0) (-1/(2sqrt(x + 4)))/(2 cos 2x)` [Using L’ Hospital rule]
= `lim_(x → 0) (-1)/(sqrt(x + 4) cos 2x)`
= `(-1)/(4 xx sqrt4 xx 1)`
= `(-1)/8`
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