As the limit of x goes to 3 from the left find the limit of (x/ sqrt x^2 -9)

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asked Jun 1, 2018 227k views

3 votes

As the limit of x goes to 3 from the left find the limit of (x/ sqrt x^2 -9)

Mathematics
college

Aleksey Shevchenko asked

by Aleksey Shevchenko

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1 Answer

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$\displaystyle\lim_(x\to3^-)\frac x{√(x^2-9)}=\lim_(x\to3^-)\frac x{√(x^2)\sqrt{1-\frac9{x^2}}}=\lim_(x\to3^-)\frac x{|x|\sqrt{1-\frac9{x^2}}}$

Since
x>0

, you have
|x|=x

and the limand reduces to

$\displaystyle\lim_(x\to3^-)\frac1{\sqrt{1-\frac9{x^2}}}$

For
x>3

, you have
$\sqrt{1-\frac9{x^2}}>0$ since
$\frac9{x^2}$ will always be smaller than 1, which means
$\frac1{\sqrt{1-\frac9{x^2}}}\to+\infty$

Charleyc answered Jun 6, 2018

by Charleyc

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