How do you find $lim 1/root3(x)$ as $x->0^+$ ?

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Answer 1 · 2018-01-03T09:01:39

$oo$

There is not much you can do here to manipulate $1/(root(3)(x)$ , so observing:

$:.$

as $x->0^+$ , $root(3)(x)->0$ ( denominator is positve )

$:.$

$lim_(x->0^+)(1/root(3)(x))=oo$

How do you find lim 1/root3(x)lim 1/root3(x) as x->0^+x->0^+?