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A
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Difficulty:
45%
(medium)
Question Stats:
72% (02:29) correct
28%
(02:52)
wrong
based on 453
sessions
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Attachment:
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A. 12
B. 18
C. 24
D. 36
E. 72
26 Feb 2013, 02:09
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In the figure above, showing circle with center O and points A, B, and C on the circle, given that minor arc (AB) is one-third of the total circumference and length (AB)=\(12\sqrt{3}\) , what is the radius of the circle?
A. 12
B. 18
C. 24
D. 36
E. 72
Good question. It tests three must know properties for the GMAT:
1. A right triangle inscribed in a circle must have its hypotenuse as the diameter of the circle. The reverse is also true: if the diameter of the circle is also the triangle’s side, then that triangle is a right triangle.
According to the above, we have that ABC is a right triangle, with a right angle at B.
2. The Central Angle Theorem states that the measure of inscribed angle is always half the measure of the central angle.
According to the above, central angle AOB is twice inscribed angle ACB (notice that both subtend the same arc AB). Hence since AOB=120 degrees (third of 360 degrees), then ACB=60 degrees. So, we have that triangle ABC is 30°-60°-90° right triangle.
3. In a right triangle where the angles are 30°, 60°, and 90° the sides are always in the ratio \(1 : \sqrt{3}: 2\).
Notice that the smallest side (1) is opposite the smallest angle (30°), and the longest side (2) is opposite the largest angle (90°).
Thus, \(AB:AC=\sqrt{3}: 2\) --> \(\frac{12\sqrt{3}}{AC}=\frac{\sqrt{3}}{2}\) --> AC=diameter=24 --> radius=12.
Answer: A.
For more on triangles check: math-triangles-87197.html
For more on circles check: math-circles-87957.html
Hope it helps.
General Discussion
25 Feb 2013, 04:17
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emmak
\(\angle AOB = 120^{\circ}\)
So,
\(\angle\) ACB = \(60^{\circ}\)
So, the \(\triangle\) ABC is a 30, 60, 90 triangle and the sides are in the ratio 1 : \(\sqrt{3}\) : 2
or 12 : 12\(\sqrt{3}\) : 24
So, AC = 24 and hence AO = 12
Answer is A
