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A square is inscribed in an equilateral triangle that is inscribed in a circle.
A square is inscribed in an equilateral triangle that is inscribed in a circle. The square and circle are shaded.
Which represents the area of the shaded region?
area of the circle – area of the square – area of the triangle
area of the triangle – area of the square + area of the circle
area of the triangle + area of the square + area of the circle
area of the circle – area of the triangle + area of the square
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GPT-5 mini
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Answer: area of the circle – area of the triangle + area of the square.
Reason: The shaded region is the part of the circle outside the triangle plus the square inside the triangle. So shaded area = (area of circle − area of triangle) + area of square.
Reason: The shaded region is the part of the circle outside the triangle plus the square inside the triangle. So shaded area = (area of circle − area of triangle) + area of square.
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