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In the figure above, ABCD is a square, and the two diagonal lines divi [#permalink]
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Let's use our imagination more than calculation for this one.

Since AB = 3, total area of square ABCD = 9. This area is equally divided into three sections. So, area of each section must be 3.

Now focus on the two isosceles right angled triangles with area 3. Taken together, these triangles will form a square with area of 6 while the side of this assumed square must be \(\sqrt{6}\).

Since we find that the side of these triangle along any side of square ABCD must be \(\sqrt{6}\), the remaining measure of side must be \(3 - \sqrt{6}\).

Notice that the middle section has a rectangle with two isosceles right angled triangles at corners of square ABCD. The side of this triangle along the side of square is \(3 - \sqrt{6}\). By applying the Pythagoras ratios for such triangles \(1 : 1 : \sqrt{2}\), we find that w must be \((3 - \sqrt{6}) * \sqrt{2}\).

Hence, A is the correct answer.

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Re: In the figure above, ABCD is a square, and the two diagonal lines divi [#permalink]
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Re: In the figure above, ABCD is a square, and the two diagonal lines divi [#permalink]
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