lim(x rarr0)(|x|)/(x)=...

lim_(x rarr0)(|x|)/(x)=

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Evaluate "lim_(x rarr0)(x-|x|)/(x)

lim_(x rarr 0) (|x|)/(x) is equal to :

Prove that : lim_(x rarr 0) (|x|)/(x) does not exist.

lim_(x rarr0)[(x)/([x])]=

lim_(x rarr 0) (|x|)/x is :

Prove that : lim_(x rarr 0)(x)/(|x|) does not exist.

lim_(x rarr0)(x)/(|x|+x^(2)) equals

Prove that : lim_(x rarr 0^+)(x)/(|x|)=1 .

Prove that : lim_(x rarr 0^-)(x)/(|x|)= -1 .

Evaluate: lim_(x rarr0)x^(x)

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