It would take one machine \(4\) hours to complete a large production order and another machine \(3\) hours to complete the same order. How many hours would it take both machines, working simultaneously at their respective constant rates, to complete the order?
(A) \(\dfrac7{12}\)
(B) \(1\frac12\)
(C) \(1\frac57\)
(D) \(3\frac12\)
(E) \(7\)
Answer: C
Source: Official Guide
It would take one machine \(4\) hours to complete a large production order and another machine \(3\) hours to complete
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Another approach is to assign the ENTIRE job a certain number of units.Vincen wrote: ↑Wed Oct 06, 2021 6:39 amIt would take one machine \(4\) hours to complete a large production order and another machine \(3\) hours to complete the same order. How many hours would it take both machines, working simultaneously at their respective constant rates, to complete the order?
(A) \(\dfrac7{12}\)
(B) \(1\frac12\)
(C) \(1\frac57\)
(D) \(3\frac12\)
(E) \(7\)
Answer: C
Source: Official Guide
The least common multiple of 4 and 3 is 12.
So, let's say the ENTIRE production order consists of 12 widgets.
It would take one machine 4 hours to complete a large production...
Rate = output/time
So, this machine's rate = 12/4 = 3 widgets per hour
...and another machine 3 hours to complete the same order.
Rate = units/time
So, this machine's rate = 12/3 = 4 widgets per hour
So, their COMBINED rate = 3 + 4 = 7 widgets per hour.
Working simultaneously at their respective constant rates, to complete the order?
Time = output/rate
= 12/7 hours
Answer: C