Asked by Stuck
How do I solve lim((3x^3 - 5x +2)/(4x^2 + 3)) as x approaches infinity?
I divided everything by the largest power of x, but I ended up getting a denominator of 0. Do I have to factor this?
(answer is infinity)
I divided everything by the largest power of x, but I ended up getting a denominator of 0. Do I have to factor this?
(answer is infinity)
Answers
Answered by
Reiny
You did fine.
When you get c/0, where c is non-zero,
then the limit will approach infinity
It might be easier to see if you divide everything by only x^2.
then lim((3x^3 - 5x +2)/(4x^2 + 3))
= lim (3x - 5/x + 2/x^2)/(4 + 3/x^2)
so as x approaches infinity you are left with 3x/4.
Now as x ---> ∞ the numerator 3x ---> ∞
and thus 3x/4 ----> infinity.
When you get c/0, where c is non-zero,
then the limit will approach infinity
It might be easier to see if you divide everything by only x^2.
then lim((3x^3 - 5x +2)/(4x^2 + 3))
= lim (3x - 5/x + 2/x^2)/(4 + 3/x^2)
so as x approaches infinity you are left with 3x/4.
Now as x ---> ∞ the numerator 3x ---> ∞
and thus 3x/4 ----> infinity.
Answered by
Stuck
Oh ok, thank you! My teacher taught us to divide by the largest power of x, so I didn't think of doing it like that.
But I don't quite get how c/0 is infinity. Isn't anything over 0 undefined?
But I don't quite get how c/0 is infinity. Isn't anything over 0 undefined?
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