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  • - [Instructor] What we wanna do in this video

  • is figure out what the limit, as x approaches zero,

  • of one minus cosine of x over x is equal to.

  • And we're going to assume we know one thing ahead of time.

  • We're going to assume we know that the limit,

  • as x approaches zero, of sine of x over x,

  • that this is equal to one.

  • Now, I'm not gonna reprove this in this video,

  • but we have a whole other video

  • dedicated to proving this famous limit,

  • and we do it using the squeeze, or the sandwich theorem.

  • So, let's see if we can work this out.

  • So the first thing we're going to do

  • is algebraically manipulate this expression.

  • What I'm going to do is I'm going to multiply

  • both the numerator and the denominator

  • by one plus cosine of x.

  • So, times...

  • The denominator I have to do the same thing,

  • one plus cosine of x.

  • I'm not changing the value of the expression,

  • this is just multiplying it by one.

  • What does that do for us?

  • Well I can rewrite the whole thing as

  • the limit, as x approaches zero,

  • so one minus cosine of x times one plus cosine of x,

  • well that is just going to be...

  • Put this in another color.

  • That is going to be one squared, which is just one,

  • minus cosine squared of x.

  • Cosine squared of x, difference of squares.

  • And then in the denominator, I am going to have

  • these, which is just x times 1 plus cosine of x.

  • Now what is one minus cosine squared of x?

  • Well, this comes straight out of the

  • Pythagorean identity, trig identity.

  • This is the same thing as the sine squared of x.

  • So, sine squared of x.

  • And so, I can rewrite all of this as being equal to

  • the limit, as x approaches zero,

  • and let me rewrite this as...

  • Instead of sine squared of x,

  • that's the same thing as sine of x times sine of x.

  • Let me write it that way.

  • Sine x times sine x.

  • So, I'll take the first sine of x,

  • so I'll take this one right over here,

  • and put it over this x.

  • So, sine of x over x

  • times the second sine of x, this one,

  • over one plus cosine of x

  • times sine of x over one plus cosine of x.

  • All I've done is I've leveraged a trigonometric identity,

  • and I've done a little bit of algebraic manipulation.

  • Well here, the limit of the product

  • of these two expressions, is going to be the same thing

  • as the product of the limits.

  • So I can rewrite this as being equal to

  • the limit, as x approaches zero, of sine of x over x

  • times the limit, as x approaches zero,

  • of sine of x over one plus cosine of x.

  • Now, we said, going into this video,

  • that we're going to assume that we know what this is.

  • We've proven it in other videos.

  • What is the limit, as x approaches zero,

  • of sine of x over x?

  • Well, that is equal to one.

  • So, this whole limit is just going to be dependent

  • on whatever this is equal to.

  • Well, this is pretty straight forward, here.

  • As x approaches zero, the numerator's approaching zero,

  • sine of zero is zero.

  • The denominator is approaching...

  • Cosine of zero is one,

  • so the denominator is approaching two.

  • So this is approaching zero over two, or just zero.

  • That's approaching zero.

  • One times zero, well this is just going to be equal to zero.

  • And we're done.

  • Using that fact, and a little bit of trig identities,

  • and a little bit of algebraic manipulation,

  • we were able to show that our original limit,

  • the limit, as x approaches zero,

  • of one minus cosine of x over x is equal to zero.

  • And I encourage you to graph it.

  • You will see that that makes sense

  • from a graphical point of view, as well.

- [Instructor] What we wanna do in this video

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Limit of (1-cos(x))/x as x approaches 0 | Derivative rules | AP Calculus AB | Khan Academy

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    yukang920108 に公開 2022 年 07 月 05 日
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