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Difficulty:
65%
(hard)
Question Stats:
67% (02:53) correct
33%
(03:05)
wrong
based on 496
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Working together, Jose and Jane can complete an assigned task in 20 days. However, if Jose worked alone and complete half the work and then Jane takes over the task and completes the second half of the task, the task will be completed in 45 days. How long will Jose take to complete the task if he worked alone? Assume that Jane is more efficient than Jose
A. 25 days
B. 30 days
C. 60 days
D. 65 days
E. 36 days
A. 25 days
B. 30 days
C. 60 days
D. 65 days
E. 36 days
16 Nov 2011, 02:36
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Let A represent the number of days it would take Jose to complete the task if he worked alone (i.e. 1/A is Jose's work rate).
Let B represent the number of days it would take Jane to complete the task if he worked alone (i.e. 1/B is Jane's work rate).
Working together, Jose and Jane can complete an assigned task in 20 days.
20 (1/A + 1/B) = 1 (1)
However, if Jose worked alone and complete half the work and then Jane takes over the task and completes the second half of the task, the task will be completed in 45 days.
A/2 + B/2 = 45
A + B = 90
B = 90 - A (2)
Sub in (2) into (1):
\(20 (\frac{1}{A} + \frac{1}{{90-A}}) = 1\)
\(\frac{{(90-A)+A}}{{A(90-A)}} = \frac{1}{20}\)
\(\frac{{90}}{{90A-A^2}} = \frac{1}{20}\)
\(90A - A^2 = 1800\)
\(A^2 - 90A + 1800 = 0\)
\((A - 60)(A - 30) = 0\)
So Jose's completion time on his own can be either 30 or 60 days. However, since the problem states that he is more inefficient than Jane, we can eliminate 30. Therefore, the answer is C: 60.
Let B represent the number of days it would take Jane to complete the task if he worked alone (i.e. 1/B is Jane's work rate).
Working together, Jose and Jane can complete an assigned task in 20 days.
20 (1/A + 1/B) = 1 (1)
However, if Jose worked alone and complete half the work and then Jane takes over the task and completes the second half of the task, the task will be completed in 45 days.
A/2 + B/2 = 45
A + B = 90
B = 90 - A (2)
Sub in (2) into (1):
\(20 (\frac{1}{A} + \frac{1}{{90-A}}) = 1\)
\(\frac{{(90-A)+A}}{{A(90-A)}} = \frac{1}{20}\)
\(\frac{{90}}{{90A-A^2}} = \frac{1}{20}\)
\(90A - A^2 = 1800\)
\(A^2 - 90A + 1800 = 0\)
\((A - 60)(A - 30) = 0\)
So Jose's completion time on his own can be either 30 or 60 days. However, since the problem states that he is more inefficient than Jane, we can eliminate 30. Therefore, the answer is C: 60.
09 Apr 2007, 20:46
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ggarr
No answer choices?
Let Jose finish work in x days and Jane in y days. So to finish half task jose will take x/2 days and Jane will take y/2 days.
By given info we have x/2 + y/2 = 45 or (x + y) = 90 ---(1)---
Also when both work together we have 1/x + 1/y = 1/20
or (x+y)/xy = 1/20
0r xy = 20 * (x + y) = 1800
Since jane is efficient this means x > y
we know (x - y)^2 = (x + y)^2 - 4xy
or (x - y)^2 = 8100 - 7200 = 900
or x - y = 30
Since x + y = 45 on solving we get x = 75/2 = 37.5 and y is 7.5
