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  • - [Instructor] In a previous video, we explored the graphs

  • of Y equals one over X squared and one over X.

  • In a previous video we've looked at these graphs.

  • This is Y is equal to one over X squared.

  • This is Y is equal to one over X.

  • And we explored what's the limit

  • as X approaches zero in either of those scenarios.

  • And in this left scenario we saw

  • as X becomes less and less negative,

  • as it approaches zero from the left hand side,

  • the value of one over X squared is unbounded

  • in the positive direction.

  • And the same thing happens as we approach X from the right,

  • as we become less and less positive

  • but we are still positive,

  • the value of one over X squared becomes

  • unbounded in the positive direction.

  • So in that video, we just said, "Hey,

  • "one could say that this limit is unbounded."

  • But what we're going to do in this video is

  • introduce new notation.

  • Instead of just saying it's unbounded,

  • we could say, "Hey, from both the left and the right

  • it looks like we're going to positive infinity".

  • So we can introduce this notation of saying,

  • "Hey, this is going to infinity",

  • which you will sometimes see used.

  • Some people would call this unbounded,

  • some people say it does not exist

  • because it's not approaching some finite value,

  • while some people will use this notation

  • of the limit going to infinity.

  • But what about this scenario?

  • Can we use our new notation here?

  • Well, when we approach zero from the left,

  • it looks like we're unbounded in the negative direction,

  • and when we approach zero from the right,

  • we are unbounded in the positive direction.

  • So, here you still could not say

  • that the limit is approaching infinity

  • because from the right it's approaching infinity,

  • but from the left it's approaching negative infinity.

  • So you would still say that this does not exist.

  • You could do one sided limits here,

  • which if you're not familiar with,

  • I encourage you to review it on Khan Academy.

  • If you said the limit of one over X

  • as X approaches zero from the left hand side,

  • from values less than zero,

  • well then you would look at this right over here and say,

  • "Well, look, it looks like we're going

  • unbounded in the negative direction".

  • So you would say this is equal to negative infinity.

  • And of course if you said the limit as X approaches zero

  • from the right of one over X, well here

  • you're unbounded in the positive direction

  • so that's going to be equal to positive infinity.

  • Let's do an example problem from Khan Academy

  • based on this idea and this notation.

  • So here it says, consider graphs A, B, and C.

  • The dashed lines represent asymptotes.

  • Which of the graphs agree with this statement,

  • that the limit as X approaches 1 of H of X

  • is equal to infinity?

  • Pause this video and see if you can figure it out.

  • Alright, let's go through each of these.

  • So we want to think about what happens at X equals one.

  • So that's right over here on graph A.

  • So as we approach X equals one,

  • so let me write this, so the limit,

  • let me do this for the different graphs.

  • So, for graph A, the limit as x approaches one

  • from the left, that looks like

  • it's unbounded in the positive direction.

  • That equals infinity and the limit

  • as X approaches one from the right,

  • well that looks like it's going to negative infinity.

  • That equals negative infinity.

  • And since these are going in two different directions,

  • you wouldn't be able to say that

  • the limit as X approaches one

  • from both directions is equal to infinity.

  • So I would rule this one out.

  • Now let's look at choice B.

  • What's the limit as X approaches one from the left?

  • And of course these are of H of X.

  • Gotta write that down.

  • So, of H of X right over here.

  • Well, as we approach from the left,

  • looks like we're going to positive infinity.

  • And it looks like the limit of H of X

  • as we approach one from the right is

  • also going to positive infinity.

  • And so, since we're approaching you could say

  • the same direction of infinity, you could say this for B.

  • So B meets the constraints, but

  • let's just check C to make sure.

  • Well, you can see very clearly X equals one,

  • that as we approach it from the left,

  • we go to negative infinity,

  • and as we approach from the right,

  • we got to positive infinity.

  • So this, once again, would not be approaching

  • the same infinity.

  • So you would rule this one out, as well.

- [Instructor] In a previous video, we explored the graphs

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B1 中級

Introduction to infinite limits | Limits and continuity | AP Calculus AB | Khan Academy

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    yukang920108 に公開 2022 年 07 月 05 日
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