SOLUTION: A train traveling at 40 miles per hour leaves for a certain town. One hour later, a bus traveling at 50 miles per hours leaves for the same town and arrives at the same time as th
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Question 33543: A train traveling at 40 miles per hour leaves for a certain town. One hour later, a bus traveling at 50 miles per hours leaves for the same town and arrives at the same time as the train. If both the train and the bus traveled in a straight line, how far is the town from where they started?
Please help me I think the answer is 200 but I don't know how to set the problem up Found 2 solutions by Cintchr, Earlsdon:Answer by Cintchr(481) (Show Source):
You can put this solution on YOUR website!
In this case, the distance for both is the same, so for our convenience the train's variables are in caps.
r=50
t= T-1 (it started an hour later)
R=40
T= this is what we will solve for
Solve for T
Subtract 50T
divide by -10
So if the Train takes 5 hours, the bus takes 4.
CHECK
and this IS the distance.
This is a duplicate of problem 33542
You can put this solution on YOUR website! You can use the distance formula: where: d = distance travelled, r = rate of travel (speed), and t = time of travel.
For the train:
1)
For the bus:
2)
The distance is the same in each case, so d1 = d2, therefore, we can set:
But the train travels one hour longer than the bus, so t1 = t2+1
Making this substitution, we get: Simplify and solve for t2. Subtract 40(t20 from both sides of the equation. Divide both sides by 10. Now substitute this into equation 2) and solve for d2: miles.
The town is 200 miles from the starting point.
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