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In this video, let's discuss how we can divide and isosceles tropism in two parts having the same area

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and we are dealing with a special type of isosceles tropism.

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It's one in which the non violent side equals in length, the smaller paternal side.

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All right.

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Over here, I have three figures of hexagons, and this one has been divided into six equal parts and

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these two have been divided into 12 equal parts.

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All right.

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Now, if I just take the upper part over here, that is this part, then I get an isolationist tropism

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where the nonpareil side equals the smaller parallel side.

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What do I mean with that?

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If this is of length, this side, then this side also is of length it.

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Now, over here I have divided this isosceles trapezius into three equal area parts.

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Well, let's see it over here.

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If I take just the top part, it looks like this and I have divided this isosceles trapezius into six

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equal parts.

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And the same holds true here as well.

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If I just take the top part, I get this figure over here and this divides this tropism into six equal

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parts.