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Let's do this question if the diagonals of a rhombus get doubled, then the area of the rhombus becomes

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Dasch, its original area.

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All right, pause the video, give it a try and then let's do it together.

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All right.

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We are back.

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Let's do it together.

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We know that area of a rhombus in terms of its diagonals can be expressed as often do the one into the

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data where the one and the two are the two diagonals.

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Right.

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All right.

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Now, over here, it's mentioned that the diagonals get double.

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Right.

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So this one will become to the one and these two will be going to the two.

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So let's write the new area.

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It will be half to the one in two to three two.

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That is equal to four times.

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Have the two and even the two is the initial area.

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So that's a clue for in a sense, the area becomes four times its original area.