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Problem 38.
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In the drawing below,
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the figure formed by the squares with sides
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that are labeled x, y, and z is a right triangle.
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So the figure, so it's a right triangle.
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And then they ask us,
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which equation is true for all values of x, y, and z?
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So really, they're just trying to see
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if you remember the Pythagorean Theorem.
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And that just tells us that if we have a right triangle,
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that the sum of the squares of the two smaller sides,
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so x squared plus y squared,
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is going to be equal to the square of the longest side,
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or the side that's opposite the right angle.
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Or we also call that the hypotenuse.
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So that's equal to z squared.
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That's what the Pythagorean Theorem tells us.
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And so if we look down here,
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only one of those match what I just wrote down,
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are kind of my restatement of the Pythagorean Theorem.
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x squared plus y squared is equal to z squared.
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And that's this one right there, choice B.
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Next problem.
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Problem 39.
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A clothing company created the following diagram for a vest.
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So I guess this is somehow a vest.
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Maybe it's half of the vest,
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because I don't see how I could put that on me.
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To show the other side of the vest--
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OK, right, so this was half of the vest--
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the company will reflect the drawing across the y-axis.
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What will be the coordinates of C after the reflection?
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So when they say reflection, they mean,
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literally, just take the image of this
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and you flip it over onto the right-hand side.
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So I could draw it out, and draw it in blue.
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So if I take the reflection,
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this line right here is at negative 1.
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It's 1 to the left of the y-axis.
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So when I take its reflection, I would draw it right here,
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1 to the right of the y-axis.
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This line down here,
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it goes from 1 to the left all the way to 4 to the left.
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On this side, it's going to go from 1 to
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the right all the way to 4 to the right.
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I could keep doing it.
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This segment right here, FE, when I flip it,
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will become this segment right here.
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This segment, DE, right here,
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will become this segment.
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It'll just look something like this when I go onto that side
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And then C, right here, is 2 to the left of the y-axis.
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So C over here will be 2 to the right of the y-axis.
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So it's going to look something like this.
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So the vest is going to look something like this.
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And then of course, it just dips down like that.
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So that's the right-hand side of the vest.
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But they want to know what are the coordinates of C?
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So this is C, and this is the C after the reflection.
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Maybe I could call it C prime.
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And so its coordinates are-- its x-coordinate is 2.
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And we're 2 to the right;
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before, we were 2 to the left, at minus 2.
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And its y-coordinate is going to be the same,
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it's going to be 7.
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2, 7.
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So that is choice A.
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I'll do it in the next video.
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Well, there's only two problems in this video.
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So let me go to the next page.
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Number 40.
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What is the area, in square units,
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of trapezoid QRST shown below?
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So we need to figure out the area of this.
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And they actually even give us a formula.
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They gave us the formula for this trapezoid.
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So they're calling it 1/2 times the height,
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times base 1 plus base 2.
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So essentially, just to give you an intuition of
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where this comes from, you're essentially saying,
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what's the average width of this trapezoid?
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So you take 1/2 times the sum of this guy and that guy,
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and that gives you the average width.
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And then you multiply that times the height.
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So just applying this formula,
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it is 1/2 times my height-- my height is 8--
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times base 1, let's call this base 1, 20.
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Plus base 2.
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Base 2 is this 6 right there.
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So I have 1/2 times 8, which is 4, times 26.
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And 4 times 26 is equal to 104 square units.
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So that's that right there.
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So they're really just testing
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whether you can apply this formula.
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Whether you can recognize what's the height
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and what are the two bases.
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Problem 41.
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One millimeter is.
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Well, here they're just seeing if you remember your units.
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Let me write it this way.
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Deci is equal to 1/10.
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Centi is equal to 1/100.
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And then milli is equal to 1/1000.
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So one millimeter is 1/1000 of a meter.
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They're just making sure you remember your metric prefixes.
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Problem 42.
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In the diagram below, hexagon LMNPQR is
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congruent to hexagon STUVWX.
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Congruent just means all the sides are equal
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and all the measures of their angles are also equal.
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So they say, which side is the same length as MN?
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So this is MN right there, and we want to know
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what side is the same length as that.
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So let me make sure that they're not trying to confuse us.
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So they start here, they say LMNPQR,
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and then they say STUVWX.
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So they're not confusing us.
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These points do correspond.
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S corresponds to L, M corresponds to T,
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and so forth and so on.
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So this segment is going to be congruent to
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that segment right there.
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Segment TU.
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So MN is the same length as TU.
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That is choice B.
