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  • What we're gonna do in this video

  • is focus on key misunderstandings that folks often have,

  • and we actually got these misunderstandings

  • from the folks who write the AP exams,

  • from the actual College Board.

  • So let's say that we are trying to take

  • the derivative of the expression.

  • So let's say we're taking the derivative

  • of the expression,

  • the natural log of sine of x.

  • So the first key misconception or misunderstanding

  • that many people have

  • is when you're dealing

  • with transcendental functions like this,

  • and transcendental functions is just a fancy word

  • for these functions like trigonometric functions,

  • logarithmic functions,

  • that don't use standard algebraic operations.

  • But when you see transcendental functions like this

  • or compositions of them,

  • many people confuse this with the product of functions.

  • So at first when they look at this,

  • they might see this as being the same

  • as the derivative with respect to x

  • of natural log of x,

  • natural log of x, times sine of x.

  • And you can see just the way that it's written,

  • they look very similar,

  • but this is the product of two functions.

  • If you said natural log of x is f of x,

  • and sine of x is g of x,

  • this is the product of sine and g of x,

  • sorry this is the product of f of x and g of x,

  • and here you would use the product rule.

  • So to actually compute this,

  • you would use the product, the product rule.

  • But this is a composition.

  • Here you have f of g of x,

  • not f of x times g of x.

  • So here you have

  • that is our g of x, it equals sine of x,

  • and then our f of g of x

  • is the natural log of sine of x.

  • So this is f of g of x,

  • f of g of x just like that.

  • If someone asks you just what f of x was,

  • well that would be natural log of x,

  • but f of g of x is natural log of our g of x,

  • which is natural log of sine of x.

  • So that's the key first thing,

  • always make sure whether you're gonna use,

  • especially with these transcendental functions,

  • that hey if this is a composition you've gotta use

  • the chain rule, not the product rule.

  • It's not the product.

  • Now sometimes you have a combination,

  • you have a product of compositions,

  • and then things get a little bit more involved.

  • But pay close attention to make sure

  • that you're not dealing with a composition.

  • Now the next misconception students have

  • is even if they recognize,

  • okay I've gotta use the chain rule,

  • sometimes it doesn't go fully to completion.

  • So let's continue using this example.

  • The chain rule here says,

  • look we have to take the derivative of the outer function

  • with respect to the inner function.

  • So if I were to say,

  • in this case, f of x is natural log of x,

  • f of g of x is this expression here.

  • So if I wanna do this first part,

  • f prime of g of x,

  • f prime of g of x,

  • well the derivative of the natural log of x

  • is one over x.

  • So the natural log, derivative of natural log of x

  • is one over x,

  • but we don't want the derivative where the input is x.

  • We want the derivative when the input is g of x.

  • So instead of it being one over x,

  • it's gonna be one over g of x.

  • One over g of x,

  • and we know that g of x is equal to sine of x.

  • That's equal to sine of x.

  • Now one key misunderstanding that the folks

  • of the College Board told us about

  • is many students stop right there.

  • They just do this first part,

  • and then they forget to multiply this second part.

  • So here we are not done.

  • We need to take this and multiply it times g prime of x.

  • And let me write this down.

  • g prime of x, what would that be?

  • Well the derivative of sine of x with respect to x,

  • well that's just going to be cosine of x,

  • cosine of x.

  • So in this example right over here,

  • the derivative is going to be,

  • let's see if I can squeeze it in over here,

  • it's going to be one over sine of x which is this part,

  • times cosine of x.

  • So let me write it down.

  • It is going to be one over sine of x,

  • we'll do that in that other color,

  • one over sine of x,

  • and then times cosine of x.

  • So once again,

  • just to make sure that you don't fall into

  • one of these misconceptions.

  • Let me box this off so it's a little bit,

  • it's a little bit cleaner.

  • So to just make sure that you don't fall

  • into one of these misconceptions here,

  • recognize the composition,

  • that this is not the product of natural log of x

  • and sine of x.

  • It's natural log of sine of x.

  • And then when you're actually applying the chain rule,

  • derivative of the outside with respect to the inside,

  • so the derivative of natural log of x is one over x,

  • so that applied when the input is g of x

  • is one over sine of x.

  • And then multiply that times the derivative

  • of the inner function.

  • So don't forget to do this right over here.

  • Now another misconception that students have,

  • is instead of doing what we just did,

  • instead of applying the chain rule like this,

  • they take the derivative of the outer function

  • with respect to the derivative of the inner function.

  • So for example,

  • they would compute this,

  • f prime of g prime of x,

  • f prime of g prime of x.

  • Which in this case, f prime of x is one over x,

  • but if the input is g prime of x,

  • g prime of x is cosine of x.

  • So many students end up doing this

  • where they take the derivative of the outside,

  • and they apply the input into that,

  • they use the derivative of the inside function.

  • This is not right.

  • Be very careful that you're not doing that.

  • You do the derivative of the outside function

  • with respect to the inside function,

  • not taking it's derivative,

  • and then multiply, don't forget to multiply,

  • times the derivative of the inside function here.

  • So hopefully that helps a little bit.

  • If all of this looks completely foreign to you,

  • I encourage you to watch the whole series

  • of chain rule introductory videos

  • and worked examples we have.

  • This is just a topping on top of that

  • to make sure that you don't fall into these misconceptions

  • of applying the product rule

  • when you really need to be applying the chain rule

  • or forgetting to do part of the chain rule,

  • multiplying by g prime of x,

  • or evaluating f prime of g prime of x.

  • So hopefully that helps.

What we're gonna do in this video

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Common chain rule misunderstandings | Derivative rules | AP Calculus AB | Khan Academy

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    yukang920108 に公開 2022 年 09 月 09 日
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