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- [Voiceover] Let f be
a function such that
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f of negative one is equal to three,
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f prime of negative one is equal to five.
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Let g be the function g of x is
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equal to two x to the third power.
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Let capital F be a function defined as,
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so capital F is defined
as lowercase f of x
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divided by lowercase g
of x, and they want us
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to evaluate the derivative of capital F
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at x equals negative one.
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So the way that we can do that is,
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let's just take the
derivative of capital F,
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and then evaluate it at x equals one.
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And the way they've set up capital F,
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this function definition, we can see that
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it is a quotient of two functions.
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So if we want to take it's derivative,
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you might say, well, maybe the
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quotient rule is important here.
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And I'll always give you my aside.
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The quotient rule, I'm
gonna state it right now,
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it could be useful to know it,
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but in case you ever forget it,
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you can derive it pretty quickly
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from the product rule, and if you know it,
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the chain rule combined, you can
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get the quotient rule pretty quick.
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But let me just state the
quotient rule right now.
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So if you have some function defined as
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some function in the numerator
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divided by some function
in the denominator,
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we can say its derivative, and this is
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really just a restatement
of the quotient rule,
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its derivative is going to
be the derivative of the
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function of the numerator, so d, dx,
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f of x, times the function
in the denominator,
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so times g of x, minus the
function in the numerator,
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minus f of x, not taking its derivative,
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times the derivative in the
function of the denominator,
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d, dx, g of x, all of that over,
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so all of this is going to be over
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the function in the denominator squared.
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So this g of x squared,
g of x, g of x squared.
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And you can use different
types of notation here.
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You could say, instead
of writing this with
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a derivative operator,
you could say this is
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the same thing as g
prime of x, and likewise,
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you could say, well that is
the same thing as f prime of x.
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And so now we just want
to evaluate this thing,
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and you might say, wait, how
do I evaluate this thing?
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Well, let's just try it.
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Let's just say we want to evaluate F prime
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when x is equal to negative one.
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So we can write F prime of
negative one is equal to,
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well everywhere we see an x,
let's put a negative one here.
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It's going to be f prime of negative one,
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lowercase f prime, that's
a little confusing,
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lowercase f prime of negative
one times g of negative one,
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g of negative one minus f of negative one
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times g prime of negative one.
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All of that over, we'll
do that in the same color,
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so take my color seriously.
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Alright, all of that over
g of negative one squared.
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Now can we figure out what
F prime of negative one
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f of negative one, g of negative one,
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and g prime of negative
one, what they are?
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Well some of them, they tell us outright.
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They tell us f and f
prime at negative one,
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and for g, we can
actually solve for those.
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So, let's see, if this is, let's
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first evaluate g of negative one.
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G of negative one is going to be two
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times negative one to the third power.
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Well negative one to the third
power is just negative one,
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times two, so this is negative two,
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and g prime of x, I'll
do it here, g prime of x.
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Let's use the power rule,
bring that three out front,
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three times two is six, x,
decrement that exponent,
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three minus one is two, and
so g prime of negative one
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is equal to six times
negative one squared.
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Well negative one squared is just one,
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so this is going to be equal to six.
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So we actually know what
all of these values are now.
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We know, so first we wanna figure out
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f prime of negative one.
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Well they tell us that right over here.
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F prime of negative one is equal to five.
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So that is five.
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G of negative one, well we
figured that right here.
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G of negative one is negative two.
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So this is negative two.
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F of negative one, so f of negative one,
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they tell us that right over there.
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That is equal to three.
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And then g prime of negative one,
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just circle it in this green color,
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g prime of negative
one, we figured it out.
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It is equal to six.
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So this is equal to six.
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And then finally, g of
negative one right over here.
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We already figured that out.
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That was equal to negative two.
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So this is all going to simplify to...
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So you have five times negative two,
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which is negative 10,
minus three times six,
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which is 18, all of that
over negative two squared.
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Well negative two squared is
just going to be positive four.
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So this is going to be equal to
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negative 28 over positive four,
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which is equal to negative seven.
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And there you have it.
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It looks intimidating at first,
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but just say, okay, look.
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I can use the quotient
rule right over here,
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and then once I apply the quotient rule,
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I can actually just directly figure out
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what g of negative one,
g prime of negative one,
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and they gave us f of negative one,
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f prime of negative one, so
hopefully you find that helpful.
