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Let's do this question in the figure Abey's parallel to Siri and abs equal to AC is equal to beedi or

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is the midpoint of could find the ratio of the area of the shaded region to the unshielded region.

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All right, what's the video.

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Give it a try and then let's do it together.

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All right.

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We're back.

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I hope you have given it a try.

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Now remember over here in the figure, it's given that this angle over here is a 90 degree angle.

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All right.

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And it's also given that always the midpoint of Siri to see or is equal to Audy and it's given that

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a B is equal to Acey is equal to beauty.

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So these three sides are equal.

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And it's mentioned that about parallel to Siri.

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All right.

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So over here, you can see that from the information given A, B, B, C is an isosceles tropism.

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Right.

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All right.

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Now we have seen how we can divide an isolationist Topsham where the nonpareil side is equal to the

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smaller parallel side in the three equal areas.

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Right.

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So let's join A and B to the midpoint of KDDI, which is over here.

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So you get three equal parts, right?

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So the area of ASIO and elbow and body is the same.

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All right.

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Now let's drop A perpendicular from E to side or B, and that will get extended till D, right.

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And let's do the same from all to side.

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Easy.

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It will look like this.

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Now we have divided this figure into one, two, three, four, five, six, six equal areas.

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Right now, you can see that as per the given figure, one out of these six areas is shaded and the

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remaining five parts are not shaded, but we have to find the ratio of the area of the shaded region

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to the unjaded region.

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And hence the answer to that is one divided by five.

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And that gives you your answer, right.

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Remember, this part over here is one by six, the area of the tropism, this shaded part or here.