saurabhhjjain wrote:
Q : Working alone at their respective constant rates, Audrey can complete a certain job in 4 hours, while Ferris can do the same job in 3 hours. Audrey and Ferris worked together on the job and completed it in 2 hours, but while Audrey worked this entire time, Ferris worked for some of the time and took 3 breaks of equal length. How many minutes long was each of Ferris's break?
(A) 5
(B) 10
(C) 15
(D) 20
(E) 25
Audrey can complete a certain job in 4 hours, while Ferris can do the same job in 3 hours.So, Audrey's RATE =
1/4 of the job per hour
And Ferris' RATE =
1/3 of the job per hour
Audrey and Ferris worked together on the job and completed it in 2 hours, but while Audrey worked this entire time, Ferris worked for some of the time and took 3 breaks of equal length.Since Audrey works for the entire 2 hours, let's determine how much work she does.
At a rate of
1/4 of the job per hour, Audrey can complete
1/2 of the job in TWO hours.
This means
Ferris must have completed the other 1/2 of the jobTime = output/rateSo, Ferris' work time = (
1/2)/(
1/3) = 3/2 hours =
90 MINUTES So, at his normal rate of work, Ferris can complete his half of the job in
90 MINUTES, which means
he rested for the other 30 minutes.
How many minutes long was each of Ferris's break?Ferris took 3 breaks of equal length
If he rested for a TOTAL of
30 minutes, each break was 10 minutes long.
Answer: B
Cheers,
Brent
_________________
Brent Hanneson - founder of Greenlight Test Prep