- #1
dustinm
- 7
- 0
Question: Guess the oblique asymptote of the graph f(x) for x→∞. Write down the limit you have to compute to prove that your guess is correct.
f(x)= [itex]\sqrt{(x^{4}+1)/(x^{2}-1)}[/itex]
so the limit would be: lim x→∞ [itex]\sqrt{(x^{4}+1)/(x^{2}-1)}[/itex]
I sketched out a graph but I just have no clue how to compute for the oblique asymptote. The professor explained that you have to use the polynomials in long division but I don't fully understand how to yet.
f(x)= [itex]\sqrt{(x^{4}+1)/(x^{2}-1)}[/itex]
so the limit would be: lim x→∞ [itex]\sqrt{(x^{4}+1)/(x^{2}-1)}[/itex]
I sketched out a graph but I just have no clue how to compute for the oblique asymptote. The professor explained that you have to use the polynomials in long division but I don't fully understand how to yet.