The problem should read as follows:
A woman is planning a trip that involves 3 connecting trains that depart from Stations X, Y, and Z, respectively. The first train leaves Station X every hour, beginning at 6 a.m., and arrives at Station Y 1(3/4) hours later. The second train leaves Station Y every half hour, beginning at 9 a.m., and arrives at Station Z 2(1/3) hours later. The third train leaves Station Z every 45 minutes, beginning at 8 a.m. What is the least total amount of time the woman must spend waiting between trains if all trains depart and arrive on schedule, and if she arrives at Station Z no later than 3:30 p.m.?
15 minutes
25 minutes
1 hour 15 minutes
1 hour 40 minutes
4 hours 30 minutes
The woman must arrive at Station Z by 3:30pm.
Let DT = departure time and AT = arrival time.
Write out the schedule and WORK BACKWARDS from DT = 3:30pm for the third train.
Train 1:
AT: 06:45, 07:45, 08:45, 09:45, 10:45, 11:45,
12:45, 01:45, 02:45...
Train 2:
DT: 09:00, 09:30, 10:00, 10:30, 11:00, 11:30, 12:00, 12:30,
01:00.
AT: 11:20, 11:50, 12:20, 12:50, 01:20, 01:50, 02:20, 02:50,
03:20.
Train 3:
DT: 08:00, 08:45, 09:30, 10:15, 11:00, 11:45, 12:30, 01:15, 02:00, 02:45,
03:30.
The times in red yield a wait-time of 15 minutes between trains 1 and 2 (from 12:45 to 01:00) and a wait-time of 10 minutes between trains 2 and 3 (from 03:20 to 03:30), for a total wait-time of 25 minutes.
The correct answer is
B.
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