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  • - [Instructor] So we have the graph

  • of y is equal to g of x right over here.

  • And I wanna think about what is the limit

  • as x approaches five

  • of g of x?

  • Well we've done this multiple times.

  • Let's think about what g of x approaches

  • as x approaches five from the left.

  • g of x is approaching negative six.

  • As x approaches five from the right,

  • g of x looks like it's approaching negative six.

  • So a reasonable estimate based on looking at this graph

  • is that as x approaches five,

  • g of x is approaching negative six.

  • And it's worth noting

  • that that's not what g of five is.

  • g of five is a different value.

  • But the whole point of this video

  • is to appreciate all that a limit does.

  • A limit only describes the behavior of a function

  • as it approaches a point.

  • It doesn't tell us exactly what's happening at that point,

  • what g of five is,

  • and it doesn't tell us much

  • about the rest of the function,

  • about the rest of the graph.

  • For example, I could construct many different functions

  • for which the limit as x approaches five

  • is equal to negative six,

  • and they would look very different from g of x.

  • For example, I could say the limit of

  • f of x

  • as x approaches five

  • is equal to negative six,

  • and I can construct an f of x that does this

  • that looks very different than g of x.

  • In fact if you're up for it,

  • pause this video and see if you can so the same,

  • if you have some graph paper, or even just sketch it.

  • Well the key thing is that the behavior of the function

  • as x approaches five from both sides,

  • from the left and the right,

  • it has to be approaching negative six.

  • So for example,

  • a function that looks like this,

  • so let me draw f of x,

  • an f of x that looks like this,

  • and is even defined right over there,

  • and then does something like this.

  • That would work.

  • As we approach from the left,

  • we're approaching negative six.

  • As we approach from the right,

  • we approaching negative six.

  • You could have a function

  • like this, let's say the limit,

  • let's call it h of x,

  • as x approaches five

  • is equal to negative six.

  • You could have a function like this,

  • maybe it's defined up to there,

  • then it's you have a circle there,

  • and then it keeps going.

  • Maybe it's not defined at all for any of these values,

  • and then maybe down here

  • it is defined for all x values greater than or equal to four

  • and it just goes right through negative six.

  • So notice,

  • all of these,

  • all of these functions as x approaches five,

  • they all have the limit defined

  • and it's equal to negative six,

  • but these functions all look very very very different.

  • Now another thing to appreciate is

  • for a given function,

  • and let me delete these.

  • Oftentimes we're asked to find the limits

  • as x approaches some type of an interesting value.

  • So for example,

  • x approaches five,

  • five is interesting right over here

  • because we have this point discontinuity.

  • But you could take the limit

  • on an infinite number of points

  • for this function right over here.

  • You could say the limit

  • of g of x

  • as x approaches,

  • not x equals, as x approaches,

  • one, what would that be?

  • Pause the video and try to figure it out.

  • Well let's see,

  • as x approaches one from the left-hand side,

  • it looks like we are approaching this value here.

  • And as x approaches one from the right-hand side,

  • it looks like we are approaching that value there.

  • So that would be equal to g of one.

  • That is equal to g of one

  • based on that would be a reasonable,

  • that's a reasonable conclusion to make

  • looking at this graph.

  • And if we were to estimate that g of one is,

  • looks like it's approximately negative 5.1

  • or 5.2, negative 5.1.

  • We could find the limit

  • of g of x

  • as x approaches pi.

  • So pi is right around there.

  • As x approaches pi from the left,

  • we're approaching that value

  • which just looks actually pretty close

  • to the one we just thought about.

  • As we approach from the right,

  • we're approaching that value.

  • And once again in this case,

  • this is gonna be equal to g of pi.

  • We don't have any interesting discontinuities there

  • or anything like that.

  • So there's two big takeaways here.

  • You can construct many different functions

  • that would have the same limit at a point,

  • and for a given function,

  • you can take the limit at many different points,

  • in fact an infinite number of different points.

  • And it's important to point that out,

  • no pun intended,

  • because oftentimes we get used to seeing limits

  • only at points where something

  • strange seems to be happening.

- [Instructor] So we have the graph

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A2 初級

Connecting limits and graphical behavior | Limits and continuity | AP Calculus AB | Khan Academy

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    yukang920108 に公開 2022 年 06 月 30 日
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