How Far From the Fountain Do the Joggers Meet?

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Two joggers are approaching a fountain from opposite directions, with Jogger A starting 3 miles west and Jogger B 2 miles east, moving at 4 mph and 3 mph respectively. The total distance between them is 5 miles, and their combined speed is 7 mph, leading to a meeting time of 5/7 hours. Calculating their distances traveled, Jogger A covers approximately 2.86 miles and Jogger B about 2.14 miles before they meet. Ultimately, they meet 0.14 miles west of the fountain, confirming the calculations are correct.
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Homework Statement


Two joggers are approaching a water fountain from opposite directions. Jogger A begins 3.0 miles west of the water fountain, with a constant velocity of 4.0 mph due east. Jogger B begins 2.0 miles east of the water fountain, with a constant velocity of 3.0 mph due west. How far are the joggers from the water fountain when they meet one another?


Homework Equations


t=d/v

The Attempt at a Solution



xa=3 miles west @ 4mph
xb=2 miles @ 3 mph

t=5/7

I need some guidance as to what I should do now.
 
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hi a.k! :wink:
a.k said:
t=d/v

The Attempt at a Solution



xa=3 miles west @ 4mph
xb=2 miles @ 3 mph

t=5/7

fine so far! :smile:

you've found that, with a relative speed of 7 mph, and a distance of 5 miles, the time taken to reduce the distance to 0 is 5/7 hour

sooo … starting at either end (it makes no difference), at what point will they meet? :wink:
 
I still don't understand.
 
do you mean you didn't understand this bit? :confused:
tiny-tim said:
you've found that, with a relative speed of 7 mph, and a distance of 5 miles, the time taken to reduce the distance to 0 is 5/7 hour
 
Unfortunately so.

I am curious if this is correct:

5/7*4mph and 5/7*3mph

20/7 and 15/7

2.86 and 2.14 miles

2.86-2.14= 0.14 miles west of the fountain

I think I got this by a fluke by using d=tv then subtracted the mileage.
 
a.k said:
5/7*4mph and 5/7*3mph

20/7 and 15/7

2.86 and 2.14 miles

2.86-2.14= 0.14 miles west of the fountain.

yes this is correct

21/7 miles minus 20/7 miles = 1/7 miles west

14/7 miles minus 15/7 miles = minus 1/7 miles east = 1/7 miles west

either way you get 1/7 miles west :smile:

i don't understand what you're not getting about this :confused:
 
I don't know either tiny tim.

I am happy I was able to figure it out though.
 
a.k said:
you've found that, with a relative speed of 7 mph, and a distance of 5 miles, the time taken to reduce the distance to 0 is 5/7 hour

I still don't understand.

Basically, your total distance is 2 + 3 miles = 5 miles, and speed is 4 - (-3) = 7 mph. You have distance, speed and time. Surely you know the equation that makes it all work.

Anyways, your most recent work looks fine.
 

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