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705-805 (Hard)|   Geometry|      
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Bunuel
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In the figure shown above, O represents the center of a circular 60 11 Aug 2021, 06:30
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45% (02:01) correct 55% (01:48) wrong based on 126 sessions

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In the figure shown above, O represents the center of a circular 60-minute timer. If the minute-hand moves through the shaded region shown, does the shaded region represent more than 10 minutes on the timer?

(1) The minute-hand has a length of 10.

(2) The area of the sector is greater than 16π

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In the figure shown above, O represents the center of a circular 60 11 Aug 2021, 08:17
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In the figure shown above, O represents the center of a circular 60 15 Aug 2021, 06:47
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Fixed. Thank you!
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In the figure shown above, O represents the center of a circular 60 15 Aug 2021, 07:21
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For the minute hand to have moved at least 10 min, the shaded portion would have to be at least 2/12 or 1/6 of the total area of the circle.

Statement (1)
Radium = 10cm. Clearly insufficient, no info about the shaded region.

Statement (2)
Area of the sector given but nothing about how it compares to the total area of the circle. Insufficient.

(1) & (2)
Area of timer = \(100π\)
For the shaded region to represent more than 10 min, area of the sector must be at least \(\frac{100π}{6}\) or \(16.67π\)
Even if the shaded region area is greater than \(16π\), it could be either \(16.2π\) (less than 10 min) or \(17π\) (more than 10 min).

No unique answer hence insufficient (E).
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In the figure shown above, O represents the center of a circular 60 15 Aug 2021, 11:09
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question asks if angle covered by minute has is greater than 60 deg?
area of sector=(x/360)*pi r^2
1)r=10 units
INSUFFICIENT.

2)area >16pi
(x/360)r^2>16
dont know about r.
INSUFFICIENT.

On combining,
x>57.6 degree

if x=59 NO
if x=61 YES

INSUFFICIENT

E it is.
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In the figure shown above, O represents the center of a circular 60 15 Aug 2021, 23:46
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Each 5 minutes of a 360 degree Circular Clock represents an Arc on the circumference = 30 degrees

10 minutes ——-> represents a 60 degree Arc


For the Shaded Sector Area to be greater than > 10 minutes

The Sector Area must be greater than > (60 / 360) * (Area of Circular Clock)

as a percentage, the question be rephrased as:

Is: (Shaded Sector Area) > (16.66%) of (Area) ?

s1: the length of the minute hand gives us the length of the radius, but we have no way to determine the Central Angle that defines the shaded Sector Area

Not sufficient


S2: shaded sector area > 16(pi)

However, we do not know how big the circular clock is.

We do not know if 16(pi) represents more or less than 16.66% of the Circular Area

Not sufficient


(1) + (2)

Given the Radius = 10 ———-> Area of Circular Face = 100(pi)

Now we can determine the sector area’s relative portion of the entire circle


Statement 2 says: Sector area > 16(pi)

As a percentage of the entire circular figure:

16(pi) / 100(pi) = 16/100 = 16% of Area

Thus we know that:

S2: Shaded Sector Area > (16%) of (Area)

Q: is shaded Sector Area > (16.66%) of (Area)?

Could be yes or no

E

Neither/nor

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In the figure shown above, O represents the center of a circular 60 15 Apr 2023, 13:01
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