rahulvsd wrote:Hi Please help me out with this problem, it will be nice if I can get some general tips for solving advanced distance-rate problems like the one below:
Mr David usually starts at 9:00 AM and reaches his office just in time, driving at regular speed. Last wednesday, he started at 9:30 AM and drove 25% faster than his regular speed. Did he reach the office in time?
1) Last monday, he started to his office 20 minutes early, drove 20% slower than his regular speed, and reaches his office just in time.
2) Last tuesday, he started to his office 10 minutes early and reached the office 10 minutes early driving at his regular speed.
OA: A
Another approach.
Plug in easy numbers to determine how the changes in speed affect the time.
Let distance = 400 miles.
Let r = 20 miles per hour.
t = 400/20 = 20 hours.
25% faster:
r = 25 miles per hour.
t = d/r = 400/25 = 16 hours.
When the speed increases by 25%, the time decreases by 20% (from 20 hours to 16 hours).
Applying this logic to the DS question above:
Traveling 25% faster, David needs 20% less time.
He leaves 30 minutes late.
If 30 minutes is not more than 20% of his typical driving time, David will arrive at work on time.
Thus, to arrive on time:
30 ≤ .2t
t ≥ 150.
Question rephrased: Is t ≥ 150 minutes?
Statement 1: Last monday, he started to his office 20 minutes early, drove 20% slower than his regular speed, and reached his office just in time.
Using our example of 400 miles at a typical speed of 20 miles per hour and a typical time of 20 hours:
20% slower = 16 miles per hour.
t = 400/16 = 25 hours.
When the speed decreases by 20%, the time increases by 25% (from 20 to 25 hours).
Thus, statement 1 implies that 20 minutes is 25% of David's typical driving time:
20 = .25t
t = 80 minutes.
Sufficient.
Statement 2: Last Tuesday, he started to his office 10 minutes early and reached the office 10 minutes early driving at his regular speed.
No way to determine the typical driving time.
Insufficient.
The correct answer is
A.
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