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  • - [Instructor] What we're going to do in this video

  • is get some practice taking derivatives with the power rule.

  • So let's say we take the derivative

  • with respect to x of one over x.

  • What is that going to be equal to?

  • Pause this video and try to figure it out.

  • So at first, you might say,

  • "How does the power rule apply here?"

  • The power rule, just to remind ourselves,

  • it tells us that if we're taking

  • the derivative of x to the n with respect to x,

  • so if we're taking the derivative of that,

  • that that's going to be equal to,

  • we take the exponent, bring it out front,

  • and we've proven it in other videos,

  • but this is gonna be n times x to the,

  • and then we decrement the exponent.

  • So, n minus one.

  • But this does not look like that,

  • and the key is to appreciate that one over x

  • is the same thing as x to the negative one.

  • So, this is going to be the derivative

  • with respect to x of x to the negative one.

  • And now, this looks a lot more

  • like what you might be used to,

  • where this is going to be equal to,

  • you take our exponent, bring it out front,

  • so it's negative one,

  • times x to the negative one minus one,

  • negative one minus one.

  • And so, this is going to be equal

  • to negative x to the negative two,

  • and we're done.

  • Let's do another example.

  • Let's say that we're told that f of x

  • is equal to the cube root of x

  • and we wanna figure out what f prime of x is equal to.

  • Pause the video and see if you can figure it out again.

  • Well, once again, you might say,

  • "Hey, how do I take the derivative of something like this,

  • "especially if my goal or if I'm thinking that maybe

  • "the power rule might be useful?"

  • And the idea is to rewrite this as an exponent,

  • if you can rewrite the cube root as x to the 1/3 power.

  • And so, the derivative, you take the 1/3,

  • bring it out front, so it's 1/3

  • x to the 1/3 minus one power.

  • And so, this is going to be 1/3

  • times x to the 1/3 minus one

  • is negative 2/3,

  • negative 2/3 power, and we are done.

  • And hopefully through these examples,

  • you're seeing that the power rule is incredibly powerful.

  • You can tackle a far broader range of derivatives

  • than you might have initially thought.

  • Let's do another example,

  • and I'll make this one really nice and hairy.

  • Let's say we wanna figure out the derivative

  • with respect to x of the cube root

  • of x squared.

  • What is this going to be?

  • And actually,

  • let's just not figure out what the derivative is,

  • let's figure out the derivative at x equals eight.

  • Pause this video again and see if you can figure that out.

  • Well, what we're gonna do

  • is first just figure out what this is

  • and then we're going evaluate it at x equals eight.

  • And the key thing to appreciate is this is the same thing,

  • and we're just gonna do what we did up here

  • as the derivative with respect to x.

  • Instead of saying the cube root of x squared,

  • we can say this is x squared to the 1/3 power,

  • which is the same thing as the derivative

  • with respect to x of,

  • well, x squared, if I raise something to an exponent

  • and then raise that to an exponent,

  • I can just take the product of the exponents.

  • And so, this is gonna be x to the two times 1/3 power

  • or to the 2/3 power.

  • And now, this is just going to be equal to,

  • I'll do it right over here, bring the 2/3 out front,

  • 2/3 times x to the, what's 2/3 minus one?

  • Well, that's 2/3 minus 3/3

  • or it would be negative 1/3 power.

  • Now, we wanna know what happens at x equals eight,

  • so let's just evaluate that.

  • That's going to be 2/3 times x is equal to eight

  • to the negative 1/3 power.

  • Well, what's eight to the 1/3 power?

  • Eight to the 1/3 power is going to be equal to two,

  • and so, eight to the negative 1/3 power is 1/2.

  • Actually, let me just do that step-by-step.

  • So, this is going to be equal to 2/3 times,

  • we could do it this way, one over eight to the 1/3 power.

  • And so, this is just one over two,

  • 2/3 times 1/2,

  • well, that's just going to be equal to 1/3, and we're done.

- [Instructor] What we're going to do in this video

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Power rule (with rewriting the expression) | AP Calculus AB | Khan Academy

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    yukang920108 に公開 2022 年 07 月 12 日
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