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  • - [Voiceover] The graph of function f is given below.

  • It has a vertical tangent at the point three comma zero.

  • Three comma zero has a vertical tangent, let me draw that.

  • It has a vertical tangent right over there,

  • and a horizontal tangent at the point

  • zero comma negative three.

  • Zero comma negative three,

  • so it has a horizontal tangent right over there,

  • and also has a horizontal tangent at six comma three.

  • Six comma three, let me draw

  • the horizontal tangent, just like that.

  • Select all the x-values for which f is not differentiable.

  • Select all that apply.

  • F prime, f prime, I'll write it in short hand.

  • We say no f prime under

  • it's going to happen under three conditions.

  • The first condition you could say

  • well we have a vertical tangent.

  • Vertical tangent.

  • Why is a vertical tangent a place where

  • it's hard to define our derivative?

  • Well, remember, our derivative is

  • we're really trying to find our rate of change of y

  • with respect to x,

  • but when you have a vertical tangent,

  • you change your x a very small amount,

  • you have an infinite change in y,

  • either in the positive or the negative direction.

  • That's one situation where you have no derivative.

  • They tell us where we have a vertical tangent in here,

  • where x is equal to three.

  • We have no ...

  • F is not differentiable at x equals three

  • because of the vertical tangent.

  • You might say what about horizontal tangents?

  • No, horizontal tangents are completely fine.

  • Horizontal tangents are places where the derivative

  • is equal to zero.

  • F prime of six is equal to zero.

  • F prime of zero is equal to zero.

  • What are other scenarios?

  • Well another scenario where you're not gonna have

  • a defined derivative is where the graph is not continuous.

  • Not continuous.

  • We see right over here at x equals negative three,

  • our graph is not continuous.

  • X equals negative three it's not continuous.

  • Those are thee only places where f is not differentiable

  • that they're giving us options on.

  • We don't know what the graph is doing

  • to the left or the right.

  • These there I guess would be interesting cases.

  • They haven't given us those choices here.

  • We already said, at x equals 0, the derivative is zero.

  • It's defined.

  • It's differentiable there.

  • At x equals six, the derivative is zero.

  • We have a flat tangent.

  • Once again it's defined there as well.

  • Let's do another one of these.

  • Actually, I didn't include, I think that

  • this takes care of this problem,

  • but there's a third scenario

  • in which we have, I'll call it a sharp turn.

  • A sharp turn.

  • This isn't the most mathy definition right over here,

  • but it's easy to recognize.

  • A sharp turn is something like that,

  • or like, well no, that doesn't look too sharp,

  • or like this.

  • The reason why where you have these sharp bends

  • or sharp turns as opposed to something

  • that looks more smooth like that.

  • The reason why we're not differentiable there is

  • as we approach this point,

  • as we approach this point from either side,

  • we have different slopes.

  • Notice our slope is positive right over here,

  • as x increases, y is increasing,

  • While the slope is negative here.

  • As you're trying to find the limit of our slope

  • as we approach this point,

  • it's not going to exist because it's different

  • on the left hand side and the right hand side.

  • That's why the sharp turns, I don't see any sharp turns here

  • so it doesn't apply to this example.

  • Let's do one more examples.

  • Actually this one does have some sharp turns.

  • This could be interesting.

  • The graph of function f is given to the left right here.

  • It has a vertical asymptote at x equals negative three,

  • we see that,

  • and horizontal asymptotes at y equals zero.

  • This end of the curve as x approaches negative infinity

  • it looks like y is approaching zero.

  • It has another horizontal asymptote at y equals four.

  • As x approaches infinity, it looks like

  • our graph is trending down to y is equal to four.

  • Select the x values for which f is not differentiable.

  • First of all, we could think about vertical tangents.

  • Doesn't seem to have any vertical tangents.

  • Then we could think about where we are not continuous.

  • Well, we're definitely not continuous

  • where we have this vertical asymptote right over here.

  • We're not continuous at x equals negative three.

  • We're also not continuous at x is equal to one.

  • Then the last situation where

  • we are not going to be differentiable

  • is where we have a sharp turn,

  • or you could kind of view it as a sharp point, on our graph.

  • I see a sharp point right over there.

  • Notice as we approach from the left hand side,

  • the slope looks like a constant, I don't know,

  • it's like a positive three halves,

  • while as we go to the right side of that

  • it looks like our slope turns negative.

  • If you were to try to find the limit of the slope

  • as we approach from either side,

  • which is essentially what you're trying to do

  • when you try to find the derivative,

  • well it's not going to be defined

  • because it's different from either side.

  • F is also not differentiable at the x value

  • that gives us that little sharp point right over there.

  • If you were to graph the derivative,

  • which we will do in future videos,

  • you will see that the derivative is not

  • continuous at that point.

  • Let me mark that off.

  • Then we can check x equals zero.

  • X equals zero's completely cool.

  • We're at a point that our tangent line

  • is definitely not vertical.

  • We're definitely continuous there.

  • We definitely do not have a sharp point or edge.

  • We're completely cool at x equals zero.

- [Voiceover] The graph of function f is given below.

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B1 中級 美國腔

04-2 一點可微性:圖形(Differentiability at a point: graphical | Derivatives introduction | AP Calculus AB | Khan Academy)

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    yukang920108 發佈於 2022 年 07 月 12 日
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