geom circle

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maihuna: Legendary Member; Posts: 1578; Joined: Sun Dec 28, 2008 1:49 am; Thanked: 82 times; Followed by:9 members; GMAT Score:720

geom circle

by maihuna » Sun Jan 16, 2011 3:58 am

In the diagram, points A, B, and C are on the diameter of the circle with center B. Additionally, all arcs
pictured are semicircles. Suppose angle YXA = 105 degrees. What is the ratio of the area of the shaded
region above the line YB to the area of the shaded region below the line YB? (Note: Diagram is not drawn to
scale and angles drawn are not accurate.)

(A) Â¾ (B) 5/6 (C) 1 (D) 7/5 (E) 9/7

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Source: Beat The GMAT — Problem Solving | Sun Jan 16, 2011 3:58 am

jaxis: Master | Next Rank: 500 Posts; Posts: 101; Joined: Sun Sep 26, 2010 9:33 am; Thanked: 5 times

by jaxis » Sun Jan 16, 2011 4:39 am

[spoiler]Ans:D - 7/5[/spoiler]

Angle ABY = 360 - Angle (YXA+ XAB+XYB) --- (1)

Since both tringle XAB and triangle YXB are isoceles.

We have:
Angle BXA=Angle BAX
Angle BXY =Angle BYX

Now, BXY + BXA = Angle YXA = 105 (given) = BYX+BAX

Substituting this in (1)..we get Angle ABY = 360-(105+105) = 150

------------------------------------------------------------------------------------------

Let the radius of the Big circle be .2R
Area of the BIG circle = âˆ� (2R)Â² = 4âˆ�RÂ²
Area of BIG semicircle = 2âˆ�RÂ²
Are of the Sector AYB = (150/180) * 2âˆ�RÂ² = (5/3) âˆ�RÂ²
Area of sector YCB = (30/180)* 2âˆ�RÂ² = (1/3) âˆ�RÂ²
------------------------------------------------------------------------------------------
Raius of the semicircles inside the BIG circle= R
Area of the semicircle = (âˆ�RÂ²)/2
-------------------------------------------------------------------------------------------
Area of shaded portion above YB = (5/3) âˆ�RÂ² - (âˆ�RÂ²)/2
Are of shaded region below YB =(1/3) âˆ�RÂ² + (âˆ�RÂ²)/2

Ratio = ((5/3)-(1/2))/((1/3)+(1/2)) =[spoiler] 7/5.[/spoiler]

Thanks,
Jaxis.

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Rahul@gurome: GMAT Instructor; Posts: 1179; Joined: Sun Apr 11, 2010 9:07 pm; Location: Milpitas, CA; Thanked: 447 times; Followed by:88 members

by Rahul@gurome » Sun Jan 16, 2011 5:21 am

Refer to the image above.

So in quadrilateral XYAB we have,
=> (x + y + x + y + angle B) = 360Â°
=> angle B = 360Â° - 2(x+y) = 150Â°

Suppose radius of the circle = r

angle YBA = 150Â°
angle YBC = 180Â° - 150Â° = 30Â°

Area of the sector YBC = Ï€rÂ²*30/360 = Ï€rÂ²/12 ----------------------(1)

Area of the sector YBA = Ï€rÂ²*150/360 = 5Ï€rÂ²/12 --------------------(2)

Area of the small semicircle (diameter x) = Ï€(r/2)Â²/2 = Ï€rÂ²/8 -------(3)

Area of the shaded region above red line = (2)-(3) = 7Ï€rÂ²/24 -----(4)

Area of the shaded regions below red line = (1)+(3) = 5Ï€rÂ²/24 -----(5)

Required ratio (4)/(5) = 7/5

The correct answer is D.

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maihuna: Legendary Member; Posts: 1578; Joined: Sun Dec 28, 2008 1:49 am; Thanked: 82 times; Followed by:9 members; GMAT Score:720

by maihuna » Sun Jan 16, 2011 8:42 am

i think angle a B can be very easily calculated, compared to cumbersome tchniques above, using circle formulae of angle is twice at center than at any other point, since B is minor angle it will be : 360-(105*2)

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