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09 Jun 2015, 02:56
Kudos
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B
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% (02:46) correct
28%
(02:54)
wrong
based on 1160
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A painting crew painted 80 houses. They painted the first y houses at a rate of x houses per week. Then more painters arrived and everyone worked together to paint the remaining houses at a rate of 1.25x houses per week. How many weeks did it take to paint all 80 houses, in terms of x and y?
A. (320 - y)/(5x)
B. (y +320)/(5x)
C. 5(80 - y)/(4x)
D. (y + 400)/(4x)
E. (4y + 320)/(5x)
Kudos for a correct solution.
A. (320 - y)/(5x)
B. (y +320)/(5x)
C. 5(80 - y)/(4x)
D. (y + 400)/(4x)
E. (4y + 320)/(5x)
Kudos for a correct solution.
09 Jun 2015, 03:20
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Bunuel
total weeks= \(\frac{y}{x}\) +\(\frac{(80-y)}{1.25x}\) ...
=\(\frac{(y +320)}{(5x)}\)
ans B
10 Jun 2015, 01:32
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Another way to do this quickly is to plug in sets of easy numbers, such as \(Y=20, x=4\) -> the first 20 take 5 weeks, and the second 60 at 5 houses per week take 12 so it totally takes 17 weeks.
In the answer choices, the denominator is either \(5x=20\) or \(4x=16\) so we want the numerator to be either 340 or 272
A: \(\frac{320-20}{20}=\frac{300}{20}\) not 17.
B: \(\frac{20+320}{20}=\frac{340}{20}\) is 17.
C: \(\frac{5*(80-20)}{16}=\frac{200}{16}\) not 17.
D: \(\frac{400+20}{16}=\frac{420}{16}\) not 17.
E: \(\frac{80-320}{20}=\frac{400}{20}\) not 17.
So the answer is B.
In the answer choices, the denominator is either \(5x=20\) or \(4x=16\) so we want the numerator to be either 340 or 272
A: \(\frac{320-20}{20}=\frac{300}{20}\) not 17.
B: \(\frac{20+320}{20}=\frac{340}{20}\) is 17.
C: \(\frac{5*(80-20)}{16}=\frac{200}{16}\) not 17.
D: \(\frac{400+20}{16}=\frac{420}{16}\) not 17.
E: \(\frac{80-320}{20}=\frac{400}{20}\) not 17.
So the answer is B.
