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Quadrilateral ABCD they're telling us it is a rhombus
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To prove that the area of this rhombus is equal to one half times x AC x BD,
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essentially proving that the area of a rhombus is one half
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times the product of the lengths of its diagonals
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Let' s see what we can do over here
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There's a bunch of things we know about rhombi
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All rhombi are parallelograms and there's tons of things that
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we know about parallelograms
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First of all, if it's a rhombus, we know that
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all of the sides are congruent
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That side length is equal to that side length, is equal to
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that side length, is equal to that side length
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Because it's a parallelogram, we know that
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the diagonals bisect each other
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Let's call this point over here E
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We know that BE is going to be equal to ED and
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we know that AE is equal to EC
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We also know because this is a rhombus and we proved this
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in the last video: that the diagonals,
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not only do they bisect each other, but they're also perpendicular
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So we know that this is a right angle
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This is a right angle
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That is a right angle and then this is a right angle
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The easiest way to think about it is, if we can show that
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this triangle ADC is congruent to triangle ABC and
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if we can figure out the area of one of them, we can just double it
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The first part is pretty straightforward
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We know that triangle ADC is going to be congruent to triangle ABC
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and we know that by side-side-side congruency
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This side is congruent to that side
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This side is congruent to that side and
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they both share AC right over here
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So, this is by side-side-side
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Because of that, we know that the area of ABCD is just going to be
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equal to 2 times the area of, we can pick either one of these, ABC
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Let me write it this way
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The area of ABCD is equal to the area of ADC plus the area of ABC
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but since they're congruent, these 2 are going to be the same thing
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so it's just going to be 2 times the area of ABC
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Now what is the area of ABC
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The area of a triangle is just one half of base times height
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The area of ABC is just equal to times the base of that triangle
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times its height
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What is the length of the base
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The length of the base is AC
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I'll color code it
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The base is AC and then what is the height here
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We know that this diagonal line over here is a perpendicular bisector
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so the height is just the distance from BE
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So, it's AC times BE, that is the height
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This is an altitude
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It intersects this base at a 90 degree angle
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Or we can say BE is the same thing as times BD
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This is equal to times AC, that's our base
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Our height is BE, which is times BD
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So that's the area of just ABC, that broader,
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larger triangle right up there
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That half of the rhombus
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We just said that the area of the whole thing is 2 times that
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If we go back, if we use both this information and
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this information right over here
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We have the area of ABCD is going to be equal to
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2 times the area of ABC, this thing right over here
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It is 2 times the area of ABC, right over there
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So times is , times AC times BD
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Then you see where this is going
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2 times is , times AC times BD
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Fairly straightforward, there's a neat result
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Actually, I haven't done this in a video
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I'll do it in the next video
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There are other ways of finding the areas of parallelograms
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Generally, it's essentially, base times height
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But for rhombus, we could do that because it is a parallelogram,
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but we also have this other neat little result
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that we proved in this video
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And if we know that lengths of the diagonals,
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the area of the rhombus is times the products of the lengths
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of the diagonals, which is kind of a neat result
