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21 Feb 2012, 03:01
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Difficulty:
95%
(hard)
Question Stats:
35% (01:48) correct
65%
(01:33)
wrong
based on 858
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The figure above shows a streetlight that consists of a glass sphere, with center O, placed on top of a vertical pole that is 4 meters high. What is the height QR of the streetlight?
(1) The radius of the pole is 6 centimeters.
(2) The radius OQ of the sphere is 24 centimeters.
(1) The radius of the pole is 6 centimeters.
(2) The radius OQ of the sphere is 24 centimeters.
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IMG_0413.jpg [ 1.8 MiB | Viewed 18380 times ]
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See that attached picture. We need both radius of the glass sphere and the pole in order to calculate the total height of the combined structure.
ANSWER: C
ANSWER: C
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Screen Shot 2014-11-03 at 8.14.08 PM.png [ 180.16 KiB | Viewed 16063 times ]
12 Sep 2017, 00:33
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Ans is C
1) Radius of pole = 6
We dont know the radius of light => unknown for calculating height above pole
A,D eliminated
2) Radius of light known but radius of pole unknown => unknown for calculating how much light is inside of pole ie the lower part of sphere
B eliminated
Combine
radius light =24
radius pole = 6
then how much centre of light above pole can be found by pythogoras theorm
Ht of centre above pole = √ ( 24^2-6^2 = h
Ht of light RQ = 400+h+24
sufficient
C is the Answer
1) Radius of pole = 6
We dont know the radius of light => unknown for calculating height above pole
A,D eliminated
2) Radius of light known but radius of pole unknown => unknown for calculating how much light is inside of pole ie the lower part of sphere
B eliminated
Combine
radius light =24
radius pole = 6
then how much centre of light above pole can be found by pythogoras theorm
Ht of centre above pole = √ ( 24^2-6^2 = h
Ht of light RQ = 400+h+24
sufficient
C is the Answer
Attachments
IMG_7013.JPG [ 1.45 MiB | Viewed 13012 times ]
