How do you find the limit of $\frac{8 x - 14}{\sqrt{13 x + 49 x^{2}}}$ $(8x-14)/(sqrt(13x+49x^2))$ as x approaches $\infty$ $oo$ ?

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How do you find the limit of $\frac{8 x - 14}{\sqrt{13 x + 49 x^{2}}}$ $(8x-14)/(sqrt(13x+49x^2))$ as x approaches $\infty$ $oo$ ?

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Answer 1 · 2016-06-19T18:23:34

Do a little factoring and canceling to get $lim_(x->oo)(8x-14)/(sqrt(13x+49x^2))=8/7$ .

Explanation:

At limits of infinity, the general strategy is to take advantage of the fact that $lim_(x->oo)1/x=0$ . Normally that means factoring out an $x$ , which is what we'll be doing here.

Begin by factoring an $x$ out of the numerator and an $x^2$ out of the denominator:
$(x(8-14/x))/(sqrt(x^2(13/x+49)))$
$=(x(8-14/x))/(sqrt(x^2)sqrt(13/x+49))$

The issue is now with $sqrt(x^2)$ . It is equivalent to $abs(x)$ , which is a piecewise function:
$abs(x)={(x, "for",x > 0),(-x,"for",x < 0):}$

Since this is a limit at positive infinity ( $x>0$ ), we will replace $sqrt(x^2)$ with $x$ :
$=(x(8-14/x))/(xsqrt(13/x+49))$

Now we can cancel the $x$ s:
$=(8-14/x)/(sqrt(13/x+49))$

And finally see what happens as $x$ goes to $oo$ :
$=(8-14/oo)/(sqrt(13/oo+49))$

Because $lim_(x->oo)1/x=0$ , this is equal to:
$(8-0)/(sqrt(0+49))$
$=8/sqrt(49)$
$=8/7$

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How do you find the limit of $\frac{8 x - 14}{\sqrt{13 x + 49 x^{2}}}$ $(8x-14)/(sqrt(13x+49x^2))$ as x approaches $\infty$ $oo$ ?

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How do you find the limit of (8x-14)/(sqrt(13x+49x^2))8x−14√13x+49x2(8x-14)/(sqrt(13x+49x^2)) as x approaches oo∞oo?

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How do you find the limit of $\frac{8 x - 14}{\sqrt{13 x + 49 x^{2}}}$ $(8x-14)/(sqrt(13x+49x^2))$ as x approaches $\infty$ $oo$ ?