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  • Let's do a few more examples of finding the limit of functions

  • as x approaches infinity or negative infinity.

  • So here I have this crazy function.

  • 9x to the seventh minus 17x to the sixth,

  • plus 15 square roots of x.

  • All of that over 3x to the seventh plus 1,000x

  • to the fifth, minus log base 2 of x.

  • So what's going to happen as x approaches infinity?

  • And the key here, like we've seen in other examples,

  • is just to realize which terms will dominate.

  • So for example, in the numerator,

  • out of these three terms, the 9x to the seventh

  • is going to grow much faster than any of these other terms.

  • So this is the dominating term in the numerator.

  • And in the denominator, 3x to the seventh

  • is going to grow much faster than an x to the fifth term,

  • and definitely much faster than a log base 2 term.

  • So at infinity, as we get closer and closer to infinity,

  • this function is going to be roughly equal to 9x

  • to the seventh over 3x to the seventh.

  • And so we can say, especially since,

  • as we get larger and larger as we get closer and closer

  • to infinity, these two things are

  • going to get closer and closer each other.

  • We could say this limit is going to be

  • the same thing as this limit.

  • Which is going to be equal to the limit

  • as x approaches infinity.

  • Well, we can just cancel out the x to the seventh.

  • So it's going to be 9/3, or just 3.

  • Which is just going to be 3.

  • So that is our limit, as x approaches infinity,

  • in all of this craziness.

  • Now let's do the same with this function over here.

  • Once again, crazy function.

  • We're going to negative infinity.

  • But the same principles apply.

  • Which terms dominate as the absolute value of x

  • get larger and larger and larger?

  • As x gets larger in magnitude.

  • Well, in the numerator, it's the 3x to the third term.

  • In the denominator it's the 6x to the fourth term.

  • So this is going to be the same thing as the limit of 3x

  • to the third over 6x to the fourth, as x approaches

  • negative infinity.

  • And if we simplified this, this is

  • going to be equal to the limit as x approaches

  • negative infinity of 1 over 2x.

  • And what's this going to be?

  • Well, if the denominator, even though it's

  • becoming a larger and larger and larger negative number,

  • it becomes 1 over a very, very large negative number.

  • Which is going to get us pretty darn close to 0.

  • Just as 1 over x, as x approaches negative infinity,

  • gets us close to 0.

  • So this right over here, the horizontal asymptote

  • in this case, is y is equal to 0.

  • And I encourage you to graph it, or try it out with numbers

  • to verify that for yourself.

  • The key realization here is to simplify the problem

  • by just thinking about which terms

  • are going to dominate the rest.

  • Now let's think about this one.

  • What is the limit of this crazy function

  • as x approaches infinity?

  • Well, once again, what are the dominating terms?

  • In the numerator, it's 4x to the fourth, and in the denominator

  • it's 250x to the third.

  • These are the highest degree terms.

  • So this is going to be the same thing as the limit,

  • as x approaches infinity, of 4x to the fourth over 250x

  • to the third.

  • Which is going to be the same thing as the limit of-- let's

  • see, 4, well I could just-- this is

  • going to be the same thing as-- well we could divide two hundred

  • and, well, I'll just leave it like this.

  • It's going to be the limit of 4 over 250.

  • x to the fourth divided by x to the third is just x.

  • Times x, as x approaches infinity.

  • Or we could even say this is going to be 4/250 times

  • the limit, as x approaches infinity of x.

  • Now what's this?

  • What's the limit of x as x approaches infinity?

  • Well, it's just going to keep growing forever.

  • So this is just going to be, this right over here

  • is just going to be infinity.

  • Infinity times some number right over here

  • is going to be infinity.

  • So the limit as x approaches infinity of all of this,

  • it's actually unbounded.

  • It's infinity.

  • And a kind of obvious way of seeing that, right,

  • from the get go, is to realize that the numerator has

  • a fourth degree term.

  • While the highest degree term in the denominator

  • is only a third degree term.

  • So the numerator is going to grow far faster

  • than the denominator.

  • So if the numerator is growing far faster

  • than the denominator, you're going

  • to approach infinity in this case.

  • If the numerator is growing slower than the denominator,

  • if the denominator is growing far faster than the numerator,

  • like this case, you are then approaching 0.

  • So hopefully you find that a little bit useful.

Let's do a few more examples of finding the limit of functions

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14-4 商無窮大的限制(第 2 部分)(Limits at infinity of quotients (Part 2) | Limits and continuity | AP Calculus AB | Khan Academy)

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    yukang920108 發佈於 2022 年 07 月 05 日
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