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- [Voiceover] What I want to
do in this video is see if
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we can evaluate the definite
integral from negative three to
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three of the square root
of nine minus x squared dx.
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I encourage you to pause this
video and try it on your own.
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I'll give you a hint,
you can do this purely
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by looking at the graph of this function.
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All right, I'm assuming
you've had a go at it.
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So let's just think about,
I just told you that you
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could do this by using
the graph of the function.
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Let's graph this function.
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Let's get a y-axis here.
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This is my y-axis.
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This is my x-axis.
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You might be saying, "Oh
well, what is the graph
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"of this thing?", it
might not jump out at you.
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It's been a little while
(mumble) of a hint since you've
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done conic sections, maybe
in your Algebra class.
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Let's just remind ourselves.
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If this function, if we said y is equal to
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some function of x, which
we see is the square root
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of nine minus x squared.
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Then we could say, "Well,
that means that y squared must
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"must be equal to this thing squared."
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Which is nine minus x squared.
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Then we could say, "Y squared
plus x squared is equal
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"to nine." and you might
recognize this as a circle
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centered at origin with radius
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equal to three, the square root of nine.
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So radius is equal to three,
centered at the origin.
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Now, they graph of this is
not going to be a circle.
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This is a function.
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It would be a circle and it would not be
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a function anymore if
you said the positive and
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negative square roots of here.
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When we took the squares
of both sides we got
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the bottom back I guess you could say.
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But up here, we're only talking
about the principal root.
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When you're talking
about the principal root
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you're really talking about the top.
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This is the top of a circle centered at
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the origin with radius three.
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So this is top of circle
cause it's the positive
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square root, so let's draw that.
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It's gonna have a radius of
three, centered at the origin.
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This is gonna be negative three,
this is going to be three.
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This is going to be three right over here.
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So this function is
going to look like this.
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It's actually only defined
between negative three and three.
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The absolute value of x
is greater than three,
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then you're going to get
a negative value in here.
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Then you can't take the principal root,
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as if we're defining it over
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a positive or non-negative
values I should say.
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So this is the graph.
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What is the definite integral
from negative three to three.
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Well it's just the area under the curve
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and above the x-axis, it's the stuff that
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I am shading in in green.
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Well, what's that?
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We don't need Calculus to figure that out.
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You can do this with just
traditional geometry.
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The area of the entire circle,
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if there were an entire circle,
would just be pi r squared.
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So it would be pi times three squared,
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which is equal to nine pi.
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Now this is only half
of the entire circle.
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So we're gonna divide that by two.
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The area is nine pi over two.
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So this thing is nine pi over two.
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