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Difficulty:
25%
(medium)
Question Stats:
77% (01:44) correct
23%
(02:05)
wrong
based on 1785
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Twelve identical machines, running continuously at the same constant rate, take 8 days to complete a shipment. How many additional machines, each running at the same constant rate, would be needed to reduce the time required to complete a shipment by two days?
A. 2
B. 3
C. 4
D. 6
E. 9
A. 2
B. 3
C. 4
D. 6
E. 9
31 May 2010, 15:55
Kudos
Bookmarks
One way is to think "faster by what ratio?" or "the same job in what fraction of the time?"
We want to reduce the time by 2 days from the original 8 days: 6 days to complete.
6 days is 3/4 of the original 8 days. Since R = W/T, if R is constant, T of 3/4 as much implies W of 4/3 as much. In other words, if each machine doesn't speed up individually, you have to have 4/3 as many machines doing the work.
4/3 of the original number of machines (12) is 16 machines, or 4 additional machines.
Another way is to pick some smart numbers to make the problem more "real."
We have 12 machines working 8 days to make complete one "shipment." Let's say the shipment is 96 widgets (that's just 12*8). So the 12 machines make 12 widgets a day, which means each machine makes 1 widget a day (easiest number to work with!).
To complete the 96 widgets in 6 days, then, you'd need 16 widgets each day, or 16 machines working. 4 additional machines.
We want to reduce the time by 2 days from the original 8 days: 6 days to complete.
6 days is 3/4 of the original 8 days. Since R = W/T, if R is constant, T of 3/4 as much implies W of 4/3 as much. In other words, if each machine doesn't speed up individually, you have to have 4/3 as many machines doing the work.
4/3 of the original number of machines (12) is 16 machines, or 4 additional machines.
Another way is to pick some smart numbers to make the problem more "real."
We have 12 machines working 8 days to make complete one "shipment." Let's say the shipment is 96 widgets (that's just 12*8). So the 12 machines make 12 widgets a day, which means each machine makes 1 widget a day (easiest number to work with!).
To complete the 96 widgets in 6 days, then, you'd need 16 widgets each day, or 16 machines working. 4 additional machines.
19 Nov 2013, 15:36
Kudos
Bookmarks
Took me forever to answer this and still got it wrong.
Need to practice more.
If you need too, check this other posts:
abel-can-complete-a-work-in-10-days-ben-in-12-days-and-carl-86272.html
a-qualified-worker-digs-a-well-in-5-hours-he-invites-2-appr-36207.html
three-workers-have-a-productivity-ratio-of-1-to-2-to-3-all-133633.html
pumps-a-b-and-c-operate-at-their-respective-constant-rates-91124.html
each-of-10-machines-works-at-the-same-constant-rate-doing-a-95739.html
it-takes-6-days-for-3-women-and-2-men-working-together-to-82718.html
at-their-respective-rates-pump-a-b-and-c-can-fulfill-an-77440.html
Bunuel answered all of them and this helped me to understand this kind of question a little better.
Need to practice more.
If you need too, check this other posts:
abel-can-complete-a-work-in-10-days-ben-in-12-days-and-carl-86272.html
a-qualified-worker-digs-a-well-in-5-hours-he-invites-2-appr-36207.html
three-workers-have-a-productivity-ratio-of-1-to-2-to-3-all-133633.html
pumps-a-b-and-c-operate-at-their-respective-constant-rates-91124.html
each-of-10-machines-works-at-the-same-constant-rate-doing-a-95739.html
it-takes-6-days-for-3-women-and-2-men-working-together-to-82718.html
at-their-respective-rates-pump-a-b-and-c-can-fulfill-an-77440.html
Bunuel answered all of them and this helped me to understand this kind of question a little better.
