2015 AP Calculus AB 6c | AP Calculus AB solved exams | AP Calculus AB | Khan Academy
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0:00 - 0:03- [Voiceover] Part C, evaluate
the second derivative of y -
0:03 - 0:05with respect to x squared
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0:05 - 0:09at the point on the curve
where x equals negative one -
0:09 - 0:12and y is equal to one.
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0:12 - 0:15Alright, so let's just go to the beginning
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0:15 - 0:16where they tell us
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0:16 - 0:19that dy dx is equal to
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0:19 - 0:21y over three y squared
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0:21 - 0:23minus x.
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0:23 - 0:25So let me write that down.
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0:25 - 0:27So dy
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0:28 - 0:32dy dx is equal to
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0:32 - 0:35y over three y squared
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0:35 - 0:36minus x.
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0:36 - 0:39Three y squared minus x.
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0:39 - 0:41And now what I wanna do is essentially,
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0:41 - 0:44take the derivative of both sides again.
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0:44 - 0:47Now, there's a bunch of ways
that we could try to tackle it, -
0:47 - 0:48but the way it's written right now,
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0:48 - 0:50if I take the derivative
of the right-hand side, -
0:50 - 0:53I'm gonna have to apply the quotient rule,
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0:53 - 0:55which is really just comes
from the product rule, -
0:55 - 0:57but it gets pretty hairy.
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0:57 - 1:00So, let's see if I can
simplify my task a little bit. -
1:00 - 1:02I'm going to have to do
implicit differentiation -
1:02 - 1:03one way or the other,
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1:03 - 1:04so what if I multiply both sides
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1:04 - 1:06of this times three y squared minus x?
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1:06 - 1:11Then I get three y squared minus x
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1:11 - 1:14times dy dx
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1:14 - 1:16is equal to,
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1:16 - 1:19is equal to y.
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1:19 - 1:22And so now, taking the
derivative of both sides of this -
1:22 - 1:25is going to be a little
bit more straightforward. -
1:25 - 1:27In fact, if I want,
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1:27 - 1:28I could,
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1:28 - 1:30well actually, let me
just do it like this. -
1:30 - 1:31And so, let's,
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1:31 - 1:34let's apply our derivative
operator to both sides. -
1:34 - 1:36Let's give ourselves some space.
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1:36 - 1:39So I'm gonna apply my derivative
operator to both sides. -
1:39 - 1:42We take the derivative
of the left-hand side -
1:42 - 1:44with respect to x,
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1:44 - 1:46and the derivative of the right-hand side
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1:46 - 1:48with respect to x.
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1:48 - 1:51And so, here I'll apply the product rule.
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1:51 - 1:54First, I'll take the
derivative of this expression -
1:54 - 1:55and then multiply that times dy dx,
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1:55 - 1:57and then I'll take the
derivative of this expression -
1:57 - 1:58and multiply it times this.
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1:58 - 2:01So, the derivative of
three y squared minus x -
2:01 - 2:03with respect to x,
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2:03 - 2:05well, that is going to be,
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2:05 - 2:07so if I take the derivative
of three y squared -
2:07 - 2:09with respect to y,
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2:09 - 2:11it's going to be six y,
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2:11 - 2:13and then I have to take
the derivative of y -
2:13 - 2:14with respect to x,
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2:14 - 2:16so times dy dx.
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2:16 - 2:17As we say,
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2:17 - 2:19and this is completely unfamiliar to you
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2:19 - 2:21and I encourage you to
watch the several videos -
2:21 - 2:23on Khan Academy on
implicit differentiation, -
2:23 - 2:26which is really just an
extension of the chain rule. -
2:26 - 2:28I took the derivative of three y squared
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2:28 - 2:29with respect to y,
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2:29 - 2:31and took the derivative of y
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2:31 - 2:32with respect to x.
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2:32 - 2:34Now, if I take the
derivative of negative x -
2:34 - 2:35with respect to x,
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2:35 - 2:36that's going to be negative one.
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2:37 - 2:38Fair enough.
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2:38 - 2:40And so, I took the derivative of this,
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2:40 - 2:41I'm gonna multiply it times that.
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2:41 - 2:44So times dy dx
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2:44 - 2:45and then to that,
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2:45 - 2:48I'm going to add the derivative of this
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2:48 - 2:49with respect to x.
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2:49 - 2:51Well, that's just going to
be the second derivative -
2:51 - 2:53of y with respect to x
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2:53 - 2:54times this.
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2:54 - 2:56And all I do is apply the product rule.
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2:56 - 2:59Three y squared minus x.
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2:59 - 3:01Once again, I'll say it a third time,
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3:01 - 3:03derivative of this times this
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3:03 - 3:05plus the derivative of this
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3:05 - 3:07times that.
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3:07 - 3:07Alright.
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3:07 - 3:08That's going to be equal to,
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3:08 - 3:10on the right-hand side,
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3:10 - 3:12derivative of y with respect to x
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3:12 - 3:15is just dy dx.
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3:15 - 3:16Now, if I want to,
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3:16 - 3:20I could solve for the
second derivative of y -
3:20 - 3:21with respect to x,
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3:21 - 3:22but what could be even better than that
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3:22 - 3:26is if I substitute
everything else with numbers -
3:26 - 3:27because then it's just going to be a nice,
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3:27 - 3:31easy numerical equation to solve.
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3:31 - 3:32So, we know that,
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3:32 - 3:33what we wanna figure out,
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3:33 - 3:34our second derivative,
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3:34 - 3:36when y is equal to one.
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3:36 - 3:38So y is equal to one.
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3:38 - 3:40So that's going to be equal to one
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3:40 - 3:43and this is going to be equal to one.
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3:43 - 3:46X is equal to negative one.
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3:46 - 3:48So, let me underline that.
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3:48 - 3:50X is equal to negative one.
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3:50 - 3:52So x is negative one.
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3:52 - 3:54Are there any other xs here?
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3:54 - 3:56And what's dy dx?
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3:56 - 3:57Well, dy dx,
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3:58 - 4:00dy dx
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4:00 - 4:02is going to be equal to
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4:02 - 4:06one over three times one,
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4:06 - 4:08which is three,
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4:08 - 4:12minus negative one.
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4:12 - 4:13So, this is equal to one fourth.
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4:13 - 4:16In fact, that's I think where
we evaluated in the beginning. -
4:16 - 4:18Yep, at the point negative one comma one.
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4:18 - 4:21At the point negative one comma one.
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4:21 - 4:24So that's dy dx is one fourth.
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4:24 - 4:27So this is one fourth,
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4:27 - 4:29this is one fourth,
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4:29 - 4:31and this is one fourth.
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4:31 - 4:34And now, we can solve for the second
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4:34 - 4:36can solve for the second derivative.
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4:36 - 4:38Just gonna make sure I don't
make any careless mistakes. -
4:38 - 4:42So if six times one times one fourth
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4:42 - 4:45is going to be one point five,
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4:45 - 4:46or six,
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4:46 - 4:48well, six times one times
one fourth is six fourths, -
4:48 - 4:50minus one is going to be,
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4:50 - 4:52so six fourths minus four
fourths is two fourths, -
4:52 - 4:54so this is going to be one half
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4:54 - 4:56times one fourth,
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4:56 - 4:58times one fourth,
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4:58 - 4:59that's this over here,
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4:59 - 5:02plus the second derivative of y
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5:02 - 5:04with respect to x,
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5:04 - 5:07and here I have one minus negative one,
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5:07 - 5:08so it's one plus one,
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5:08 - 5:09so times two.
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5:09 - 5:11So maybe I'll write it this way.
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5:11 - 5:14Plus two times
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5:14 - 5:16the second derivative of y
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5:16 - 5:17with respect to x
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5:17 - 5:21is equal to one fourth.
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5:21 - 5:23And so let's see,
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5:23 - 5:25I have one eighth
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5:25 - 5:29plus two times the second derivative
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5:29 - 5:32is equal to one fourth.
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5:32 - 5:33And let's see,
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5:33 - 5:36I could subtract one
eighth from both sides. -
5:36 - 5:38So let's subtract one eighth.
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5:38 - 5:40Subtract one eighth.
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5:40 - 5:40These cancel.
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5:40 - 5:43I get two times the second derivative of y
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5:43 - 5:44with respect to x
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5:44 - 5:45is equal to,
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5:45 - 5:47one fourth is the same
thing as two eighths, -
5:47 - 5:49so two eighths minus one
eighth is one eighth. -
5:49 - 5:51And then I can divide both sides by two,
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5:51 - 5:53and we get a little bit
of a drum roll here, -
5:53 - 5:54we divide both sides by two,
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5:54 - 5:57or you could say multiple
both sides times one half, -
5:58 - 6:00and you are going to get,
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6:00 - 6:02you are going to get
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6:02 - 6:05the second derivative of y
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6:05 - 6:06with respect to x
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6:06 - 6:08when x is negative one
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6:08 - 6:10and y is equal to one,
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6:10 - 6:13is one over 16.
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6:13 - 6:15And we're done.
- Title:
- 2015 AP Calculus AB 6c | AP Calculus AB solved exams | AP Calculus AB | Khan Academy
- Description:
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Finding second derivative through implicit differentiation.
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Fran Ontanaya edited English subtitles for 2015 AP Calculus AB 6c | AP Calculus AB solved exams | AP Calculus AB | Khan Academy | |
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Fran Ontanaya edited English subtitles for 2015 AP Calculus AB 6c | AP Calculus AB solved exams | AP Calculus AB | Khan Academy |