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  • - [Voiceover] So we have here f of x

  • being equal to the natural log of the square root of x.

  • And what we wanna do in this video

  • is find the derivative of f.

  • And the key here is to recognize that f can actually

  • be viewed as a composition of two functions.

  • And we can diagram that out, what's going on here?

  • Well if you input an x into our function f,

  • what's the first thing that you do?

  • Well, you take the square root of it.

  • So if we start off with some x, you input it,

  • the first thing that you do, you take the square root of it.

  • You are going to take the square root of the input

  • to produce the square root of x,

  • and then what do you do?

  • You take the square root and then

  • you take the natural log of that.

  • So then you take the natural log of that,

  • so you could view that as inputting it

  • into another function that takes the natural log

  • of whatever is inputted in.

  • I'm making these little squares to

  • show what you do with the input.

  • And then what do you produce?

  • Well you produce the natural log of the square root of x.

  • Natural log of the square root of x.

  • Which is equal to f of x.

  • So you could view f of x as this entire set,

  • or this entire, I guess you could say,

  • this combination of functions right over there.

  • That is f of x, which is essentially,

  • a composition of two functions.

  • You're inputting into one function

  • then taking that output and inputting it into another.

  • So you could have a function u here,

  • which takes the square root of whatever its input is,

  • so u of x is equal to the square root of x.

  • And then you take that output,

  • and input it into another function that we could call v,

  • and what does v do?

  • Well it take the natural log of whatever the input is.

  • In this case, in the case of f, or in the case of how

  • I just diagrammed it, v is taking the natural log,

  • the input happens to be square root of x,

  • so it outputs the natural log of the square root of x.

  • If we wanted to write v with x as an input,

  • we would just say well that's the natural log,

  • that is just the natural log of x.

  • And as you can see here, f of x,

  • and I color-coded ahead of time,

  • is equal to, f of x is equal to,

  • the natural log of the square root of x.

  • So that is v of the square root of x, or v of u of x.

  • So it is a composition which tells you that,

  • okay, if I'm trying to find the derivative here,

  • the chain rule is going to be very, very, very, very useful.

  • And the chain rule tells us that f prime of x

  • is going to be equal to the derivative of,

  • you can view it as the outside function,

  • with respect to this inside function,

  • so it's going to be v prime of u of x,

  • v prime of u of x,

  • times the derivative of this inside function

  • with respect to x.

  • So that's just u prime, u prime of x.

  • So how do we evaluate these things?

  • Well, we know how to take the derivative of u of x

  • and v of x, u prime of x here, is going to be equal to,

  • well remember, square root of x is just the same thing

  • as x to 1/2 power, so we can use the power rule,

  • bring the 1/2 out from so it becomes 1/2 x to the,

  • and then take off one out of that exponent,

  • so that's 1/2 minus one is negative 1/2 power.

  • And what is v of x, sorry, what is v prime of x?

  • Well the derivative of the natural log of x

  • is one over x, we show that in other videos.

  • And so we now know what u prime of x is,

  • we know what v prime of x is, but what is v prime of u of x?

  • Well v prime of u of x, wherever we see the x,

  • we replace it, let me write that a little bit neater,

  • we replace that with a u of x, so v prime of u of x

  • is going to be equal to,

  • is going to be equal to one over u of x,

  • one over u of x, which is equal to,

  • which is equal to one over,

  • u of x is just the square root of x.

  • One over the square root of x.

  • This thing right over here, we have figured out,

  • is one over the square root of x,

  • and this thing, u prime of x, we figured out,

  • is 1/2 times x to the negative 1/2,

  • and x to the negative 1/2, I could rewrite that as 1/2

  • times one over x to the 1/2, which is the same thing

  • as 1/2 times one over the square root of x,

  • or I could write that as one over 2 square roots of x.

  • So what is this thing going to be?

  • Well this is going to be equal to, in green,

  • v prime of u of x is one over the square root of x,

  • times, times, u prime of x is one over two times

  • the square root of x, now what is this going to be equal to?

  • Well, this is going to be equal to,

  • this is just algebra at this point,

  • one over, we have our two and square root of x

  • times square root of x is just x.

  • So it just simplifies to one over two x.

  • So hopefully this made sense,

  • and I intentionally diagrammed it out

  • so that you start to get that muscle in your brain going

  • of recognizing the composite functions,

  • and then making a little bit more sense of

  • some of these expressions of the chain rule

  • that you might see in your calculus class,

  • or in your calculus textbook.

  • But as you get more practice, you'll be able to do it,

  • essentially, without having to write out all of this.

  • You'll say okay, look, I have a composition.

  • This is the natural log of the square root of x,

  • this is v of u of x.

  • So what I wanna do is I wanna take the derivative

  • of this outside function with respect

  • to this inside function.

  • So the derivative of natural log of something,

  • with respect to that something, is one over that something.

  • So it is one over that something,

  • the derivative natural log of something

  • with respect to that something is one over that something,

  • so that's what we just did here.

  • One way to think about it, what would natural log of x be?

  • Well that'd be one over x, but it's not natural log of x.

  • It's one over square root of x,

  • so it's going to be one over the square root of x,

  • so you take the derivative of the outside function

  • with respect to the inside one,

  • and then you multiply that times just the derivative

  • of the inside function with respect to x.

  • And we are done.

- [Voiceover] So we have here f of x

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Worked example: Derivative of ln(Ãx) using the chain rule | AP Calculus AB | Khan Academy

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    yukang920108 に公開 2022 年 09 月 09 日
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