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Both runners and walkers are participating in a marathon on exactly the same course. The walkers start at 6:45 AM, and

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Both runners and walkers are participating in a marathon on exactly the same course. The walkers start at 6:45 AM, and

by BTGmoderatorDC » Sun Mar 22, 2020 5:16 pm

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Both runners and walkers are participating in a marathon on exactly the same course. The walkers start at 6:45 AM, and the runners begin at 8:00 AM. Bill is entered as a walker and is going to walk at a constant rate of 4 miles per hour. The fastest runner is going to be running at a constant rate of 9 miles per hour. How far will Bill have walked before he is passed by the fastest runner?

a) 4 miles
b) 5 miles
c) 8 miles
d) 9 miles
e) 10.5 miles


OA D

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Re: Both runners and walkers are participating in a marathon on exactly the same course. The walkers start at 6:45 AM, a

by swerve » Mon Mar 23, 2020 6:16 am
BTGmoderatorDC wrote:
Sun Mar 22, 2020 5:16 pm
 Both runners and walkers are participating in a marathon on exactly the same course. The walkers start at 6:45 AM, and the runners begin at 8:00 AM. Bill is entered as a walker and is going to walk at a constant rate of 4 miles per hour. The fastest runner is going to be running at a constant rate of 9 miles per hour. How far will Bill have walked before he is passed by the fastest runner?

a) 4 miles
b) 5 miles
c) 8 miles
d) 9 miles
e) 10.5 miles


OA D

Source: Veritas Prep
Bill's speed \(= 4\) mi/hr Runner's speed \(= 9\) mi/hr

Relative speed \(= 9 - 4 = 5\) mi/hr

Distance covered by Bill before Runner started running \(= 1.25 \cdot 4 = 5\)

Time taken by the runner to overtake Bill \(= 5/5 = 1\) hr

Distance covered by Bill in \(1\) hr \(= 4 \cdot 1 = 4\) mi

Total Distance covered by Bill \(= 5 + 4 = 9\) mi

Therefore, D
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Re: Both runners and walkers are participating in a marathon on exactly the same course. The walkers start at 6:45 AM, a

by Scott@TargetTestPrep » Wed Mar 25, 2020 8:50 am
BTGmoderatorDC wrote:
Sun Mar 22, 2020 5:16 pm
 Both runners and walkers are participating in a marathon on exactly the same course. The walkers start at 6:45 AM, and the runners begin at 8:00 AM. Bill is entered as a walker and is going to walk at a constant rate of 4 miles per hour. The fastest runner is going to be running at a constant rate of 9 miles per hour. How far will Bill have walked before he is passed by the fastest runner?

a) 4 miles
b) 5 miles
c) 8 miles
d) 9 miles
e) 10.5 miles


OA D

Source: Veritas Prep
We can classify this problem as a “catch-up” rate problem, in which we use the formula:

distance of Bill = distance of fastest runner

We are given that Bill starts at 6:45 AM and walks at a constant rate of 4 mph and that the fastest runner starts at 8 AM and runs at a constant rate of 9 mph.

Since Bill started an hour and 15 minutes before the fastest runner, we can let Bill’s time = t + 5/4 hours and the fastest runner’s time = t. Since distance = rate x time, we can calculate each person’s distance in terms of t.

Bill’s distance = 4 x (t + 5/4) = 4t + 5

fastest runner’s distance = 9t

We can equate the two distances and determine t.

4t + 5 = 9t

5 = 5t

t = 1 hour

Now we can determine how far Bill had walked by the time he was passed by the fastest runner.

Bill’s distance = 4(1) + 5 = 9 miles.

Answer: D

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