What is $lim_(xrarroo) 1/x$ ?

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Answer 1 · 2017-03-27T05:26:11

By direct substitution:
$lim_(x->oo)1/x=0$

Logically, imagine the value of the denominator of a fraction increasing. For example: $1/10>1/11>1/12>1/(10,000)$ .

This shows that (if the numerator is a constant like above) as the denominator of a fraction increases, the value of the fraction approaches $0$ .

Answer 2 · 2017-03-27T05:30:07

$lim x->oo 1/x = 0$

You need to realize that limit is a $y$ -value.

Divide the numerator and denominator by the largest $x$ -term
$lim x-> oo (1/x)/(x/x) = lim x-> oo (1/x)/1 = 0$

From the graph $f(x) = 1/x$ you can see that when $x$ is large, $y-> 0$ : graph{1/x [-4.295, 15.705, -5, 5]}

What is lim_(xrarroo) 1/x lim_(xrarroo) 1/x ?