1 Answer

Mustafa Ozturk · Answer 1 · 2019-06-28T21:54:38+0000

If the degree of numerator and denominator are equal, then limit will be leading coefficient of numerator divided by the leading coefficient of denominator.

So then the limit would be 3/1 = 3.

Alternatively,

$\displaystyle \lim_(x\to\infty)(3x^2+6)/(x^2-4)=\displaystyle \lim_(x\to\infty)(3x^2+6)/(x^2-4)\cdot(1/x^2)/(1/x^2)=\lim_(x\to\infty)\frac{3+\frac6{x^2}}{1-\frac4{x^2}} = (3+0)/(1-0)=\boxed{3}$

Hope this helps.

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