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09 Oct 2009, 23:25
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D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
55%
(hard)
Question Stats:
72% (02:39) correct
28%
(02:45)
wrong
based on 2105
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Each of the 30 boxes in a certain shipment weighs either 10 pounds or 20 pounds, and average (arithmetic mean) weight of the boxes in the shipment is 18 pounds. If the average weight of the boxes in the shipment is to be reduced to 14 pounds by removing some of the 20-pound boxes, how many 20-pound boxes must be removed?
A. 4
B. 6
C. 10
D. 20
E. 24
A. 4
B. 6
C. 10
D. 20
E. 24
OA D IMO B
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21 Aug 2011, 10:59
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total current weight = 30*18 = 540
let's assume that x number of 20lbs boxes will be removed
\(\frac{540-20x}{30-x} = 14\)
x = 20 ............. D
let's assume that x number of 20lbs boxes will be removed
\(\frac{540-20x}{30-x} = 14\)
x = 20 ............. D
10 Oct 2009, 00:07
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reply2spg
This is a weighted average question: \(Weighted \ average=\frac{weight_1*value_1+weight_2*value_2}{value_1+value_2}\).
Let \(x\) be number of 10-pound boxes --> \(\frac{10x + 20*(30-x)}{30}=18\) --> \(x=6\);
We have \(6\) 10-pound boxes and \(24\) 20-pound boxes.
Let \(y\) be number of 20-pound boxes that should be removed so that average to become 14 pounds --> \(\frac{10*6+20*(24-y)}{30-y}=14\) --> \(y=20\).
Answer: D.
