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28 Jul 2014, 05:38
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mahendru1992
In the diagram to the right, equilateral triangle ADE is drawn inside square BCDE. A circle is then inscribed inside triangle ADE. What is the ratio of the area of the circle to the area of the square?
(A) \(\frac{\pi}{12}\)
(B) \(\frac{\pi}{8}\)
(C) \(\frac{\pi}{6}\)
(D) \(\frac{\pi}{4}\)
(E) \(\frac{\pi}{2}\)
Say the length of a side of the square, which also equal to a side of the equilateral triangle is 1.
The are of the square = 1^2 = 1.
The radius of the circle inscribed in an equilateral triangle is \(r=a*\frac{\sqrt{3}}{6}\), where a is the length of the side of the triangle. So, in our case \(r=\frac{\sqrt{3}}{6}\).
The area of the circle = \(\pi{r^2}=\pi{(\frac{\sqrt{3}}{6})^2}=\frac{\pi}{12}\).
The ratio of the areas of square and circle = \(\frac{1}{(\frac{\pi}{12})}=\frac{12}{\pi}\).
Answer: A.
Alternatively, one can estimate that the ratio is approximately 1/4. Only A fits, other options are not even close.
29 Jul 2014, 00:49
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mahendru1992
Bunuel
mahendru1992
In the diagram to the right, equilateral triangle ADE is drawn inside square BCDE. A circle is then inscribed inside triangle ADE. What is the ratio of the area of the circle to the area of the square?
(A) \(\frac{\pi}{12}\)
(B) \(\frac{\pi}{8}\)
(C) \(\frac{\pi}{6}\)
(D) \(\frac{\pi}{4}\)
(E) \(\frac{\pi}{2}\)
Say the length of a side of the square, which also equal to a side of the equilateral triangle is 1.
The are of the square = 1^2 = 1.
The radius of the circle inscribed in an equilateral triangle is \(r=a*\frac{\sqrt{3}}{6}\), where a is the length of the side of the triangle. So, in our case \(r=\frac{\sqrt{3}}{6}\).
The area of the circle = \(\pi{r^2}=\pi{(\frac{\sqrt{3}}{6})^2}=\frac{\pi}{12}\).
The ratio of the areas of square and circle = \(\frac{1}{(\frac{\pi}{12})}=\frac{12}{\pi}\).
Answer: A.
Alternatively, one can estimate that the ratio is approximately 1/4. Only A fits, other options are not even close.
How did you come to the conclusion that \(r=a*\frac{\sqrt{3}}{6}\)?
It's a well known property. Check Triangles chapter of Math Book: math-triangles-87197.html
08 Aug 2014, 02:23
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I came across the same problem. I have a question regarding the explanation that is given in the book for how to solve it without estimating.
They say that if we draw a line from the center of the circle O to D it bisects the angle of the triangle and creates another 30:60:90 triangle.
Why does the line OD bisect the angle? Is there some kind of rule when a line bisects an angle?
Thankful for any suggestions.
They say that if we draw a line from the center of the circle O to D it bisects the angle of the triangle and creates another 30:60:90 triangle.
Why does the line OD bisect the angle? Is there some kind of rule when a line bisects an angle?
Thankful for any suggestions.
