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In this video, let's learn how to find the area of a rhombus.

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All right, I have a rhombus ABCDE over here.

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And BTR, the diagonals.

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And we know that diagonals bisect each other at right angles.

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All right.

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So let the meeting point we all and you know that age is equal to O.C. and Albie's Collodi.

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And this angle over here, that's angle B or C is equal to 90 degrees.

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All right.

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Now, area of Rhombus ABCDE will be equal to area of Triangle ABC plus area of Triangle ADC.

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Right now we know that area of a triangle is half base into height.

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So I can see that area of triangle.

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ABC is AC into orbit divided by two.

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Right.

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Similarly, area of triangle ABC is AC in the already divided by two.

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So this over here becomes half AC and will be.

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Let's have AC into Audy now.

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Let's take out AC by two out because it's common but this becomes half to orbit plus Audy which is the

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same as half ac into because Olby plus Audy is the same as Beedie.

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So therefore if the diagonals of Rhombus abcde out of the one and detA, then the area of Rhombus ABCDE

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is equal to half into Daewon into B2.