How do you find $lim sqrt(t^2+2)/(4t+2)$ as $t->-oo$ ?

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How do you find $lim sqrt(t^2+2)/(4t+2)$ as $t->-oo$ ?

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Answer 1 · 2016-12-25T09:45:57

Please see below.

Explanation:

For $t != 0$ , we have $sqrt(t^2+2) = sqrt(t^2)sqrt(1+2/t^2)$ and $4t+2 = t(4+2/t)$ .

Furthermore, $sqrt(t^2) = abst$ . In evaluating limit as $t rarr -oo$ , we need only consider negative values for $t$ . For $t < 0$ , we get $sqrt(t^2) = -t$

And $lim_(trarr-oo)c/t^n = 0$ for any number $c$ and any positive number $n$ .

So,

$lim_(trarr-oo)sqrt(t^2+2)/(4t+2) = lim_(trarr-oo)(sqrt(t^2) sqrt(1+2/t^2))/(t(4+2/t))$

$= lim_(trarr-oo)(-tsqrt(1+2/t^2))/(t(4+2/t))$

$= lim_(trarr-oo)(-sqrt(1+2/t^2))/(4+2/t)$

$= (-sqrt(1+0))/(4+0)$

$= (-1)/4$

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How do you find $lim sqrt(t^2+2)/(4t+2)$ as $t->-oo$ ?

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