SOLUTION: A bus travels between towns A and B. It travels half the distance between A and B at 40 mph, and the rest of the distance at 50 mph. On the return trip, the bus travels for the fir

Question 1174878: A bus travels between towns A and B. It travels half the distance between A and B at 40 mph, and the rest of the distance at 50 mph. On the return trip, the bus travels for the first 2 hours at 35 mph, and the rest of the time at 40 mph. What is the distance between A and B, if the trip from B to A is an hour longer than the trip from A to B?
Found 2 solutions by math_tutor2020, MathTherapy:
Answer by math_tutor2020(3817) (Show Source): You can put this solution on YOUR website!

Draw segment AB.
Let C be the midpoint of segment AB
This means AC = CB
C is at the halfway point between the two endpoints A and B.

Let's say that the distance from A to C is x miles. This would mean from C to B is also the same distance x.
Furthermore, AB = 2*AC = 2x
x is some positive real number.

The bus travels from A to C at a speed of 40 mph going x miles. This means it travels for x/40 hours. I'm using the idea that
distance = rate*time
to solve for time to get
time = distance/rate

The bus goes from C to B going 50 mph
time = distance/rate = x/50

When going from A to B, the total time taken is:
x/40+x/50 = 5x/200+4x/200 = 9x/200 hours

We're told that "The trip from B to A is an hour longer than the trip from A to B"
So whatever 9x/200 is equal to, we add on 1 hour to get the expression
9x/200 + 1 = 9x/200 + 200/200 = (9x+200)/200

The time it takes to go from B to A is (9x+200)/200 hours.
We'll use this expression later.

--------------------------------------------------------------

As the bus is traveling on the return trip, it travels for 2 hours going 35 mph.
This means the bus travels a distance of
distance = rate*time
distance = 35*2
distance = 70
After these 70 miles are up, let's say the bus arrives at point D.
This point D may or may not be at the same location as point C.

We have defined point D such that segment BD = 70 miles.
This makes AD = 2x-70

You start with the total distance 2x, and subtract off what you've done so far.

Because the bus travels from D to A at 40 mph, we can say,
distance = rate*time
2x-70 = 40*time
time = (2x-70)/40
This represents the amount spent on the remaining part of the trip
It represents the number of hours that elapse when going from D to A.

Add this to the 2 hours spent, when we traveled BD = 70 miles, and we get
(2x-70)/40 + 2 = (2x-70)/40 + 80/40 = (2x-70+80)/40 = (2x+10)/40 = 2(x+5)/40 = (x+5)/20

The bus spends (x+5)/20 hours going from B to A.

--------------------------------------------------------------

Recall earlier, at the end of the first section, we found that the time spent going from B to A was (9x+200)/200 hours.
At the end of the second section we also found the time spent going from B to A was (x+5)/20 hours.

Equate the two time values and solve for x

(x+5)/20 = (9x+200)/200
200(x+5) = 20(9x+200)
200x+1000 = 180x+4000
200x-180x = 4000-1000
20x = 3000
x = 3000/20
x = 150

The distance from A to C is 150 miles. So is the distance from C to B.
So AB = AC+CB = 150+150 = 300 miles

--------------------------------------------------------------

Let's check our answer:

If you travel AC = 150 miles at 40 mph, then you spend 150/40 = 3.75 hours doing so.
If you travel CB = 150 miles at 50 mph, then you spend 150/50 = 3 hours doing so.
The total time going from A to B is 3.75+3 = 6.75 hours.

If you take 1 hour longer going from B to A, then you travel for 6.75+1 = 7.75 hours
2 of those hours is spent traveling that 70 miles mentioned earlier (from point B to point D), so we have 7.75-2 = 5.75 hours left to travel the remaining distance of 300-70 = 230 miles.

The last leg of the trip, from D to A, has us going 40 mph for 5.75 hours
distance = rate*time
distance = 40*5.75
distance = 230
This matches with the 230 we found in the previous paragraph, so this confirms our answer.

--------------------------------------------------------------

Answer: Distance from A to B = 300 miles

Answer by MathTherapy(10552) (Show Source): You can put this solution on YOUR website!

A bus travels between towns A and B. It travels half the distance between A and B at 40 mph, and the rest of the distance at 50 mph. On the return trip, the bus travels for the first 2 hours at 35 mph, and the rest of the time at 40 mph. What is the distance between A and B, if the trip from B to A is an hour longer than the trip from A to B?

Let distance from A to B be D One-half distance from A to B: ½D, or Time taken to travel ½ distance, from A to B: Time taken to travel remainder of distance, from A to B: Time taken to travel from A to B: On return trip, it travels for 2 hours at 35 mph, for a distance of 2(35) = 70 miles Therefore, remaining journey on 2nd leg = D - 70 If return trip takes 1 more hour that outbound, then time taken to complete return trip = With 1st leg of return trip taking 2 hours, 2nd leg takes At 40 mph, a time of , and distance of D - 70, we get: 9D - 10D = - 300 ------- Multiplying by LCD, 10 - D = - 300 Distance from A to B, or

RELATED QUESTIONS
A car travels from the place A to the place B at 40 km/hr. If after 2 hours it travels... (answered by Edwin McCravy)
A train running between two towns arrives at it's destination 10 mins late when it... (answered by josgarithmetic)
Two busea A and B leave the same bus depot, A towards the north and B towards the East. (answered by rothauserc)
A car travels from A to B. First half of the distance it moves with a speed 60 mph, and... (answered by nerdybill)
Pensacola is 792 miles away from key west . Bus A leaves at 6am and travels at 42 mph .... (answered by mananth)
A train has a regularly scheduled run between between two towns. If the train travels at... (answered by MathTherapy)
A train has a regularly scheduled run between two towns. If the train travels at 40 mph,... (answered by MathTherapy)
A biker travels down hill at 12 mph, on level at 8 mph and uphill at only 6 mph. The... (answered by mananth)
Joe and Frank want to meet each other half way between their cities. The distance between (answered by Theo,ikleyn,math_tutor2020)