AAPL wrote:e-GMAT
R and S can complete a certain job in 6 and 4 days respectively, while they work individually. What will be the least number of days they will take to complete the same job, if they work on alternate days?
A. 2.2 days
B. 2.67 days
C. 4.4 days
D. 4.67 days
E. 5 days
OA is D.
Let's
assign a "nice" value to the job, a value that works well with the given values (6 days and 4 days ).
So, let's say the ENTIRE job is to make
24 widgets
R can complete a certain job in 6 days
In other words, R can make
24 widgets in 6 days
So, R can make 4 widgets per day
S can complete a certain job in 4 days
In other words, S can make
24 widgets in 4 days
So, S can make 6 widgets per day
What will be the least number of days they will take to complete the same job, if they work on alternate days?
To MINIMIZE the time, the fastest worker (worker S) should go first.
DAY 1: Worker S makes 6 widgets (running total of widgets made at the end of day 1 = 6)
DAY 2: Worker R makes 4 widgets (running total of widgets made at the end of day 2 = 10)
DAY 3: Worker S makes 6 widgets (running total of widgets made at the end of day 3 = 16)
ASIDE: at this point, we can see that it will take more than 3 days to complete the job (ELIMINATE answer choices A and B)
DAY 4: Worker R makes 4 widgets (running total of widgets made at the end of day 4 = 20)
At this point, R and S have made 20 of the
24 needed widgets
So, on day 5, worker S need only make 4 widgets.
We already know that S can make 6 widgets per day, so it will take LESS THAN ONE day to make the remaining 4 widgets (ELIMINATE answer choice E)
We can also conclude that, in 1/2 a day, S can make only 3 widgets. So, it will take MORE THAN 1/2 a day to make the remaining 4 widgets. (ELIMINATE answer choice C)
Answer: D
Cheers,
Brent
