Let n be the speed of the train. Then the planes speed would be 2n. So, you have:
240/n=(240/2n) +1
Then, solve for n
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It takes an express train 1hr longer to travel 240km than it does for a small plane to travel the same distance. If the plane travels twice as fast as the train, how fast does the plane travel?
This is an ex., they lay out online but I'm confused about how they've laid out the equation.
I would've said:
(1/1)+(240/v)=(240/2v)
They've laid it out with the 1 hr on the other side. If the planes values are on one side & the trains equivalent value (+1hr time) are on the other side why would the 1 be on the side of the plane?
I hope my question makes sense, thanks as always :) <3
5 answers
but why is the +1 on the planes side of the equation when it was the train that took an hr longer?
Thanks again :)
Thanks again :)
Here is the way I used to explain this concept to my students when I was teaching a "long time ago".
You did agree that
the time for the train was greater than the time of the plane by 1, or
240/n > 240/2n by 1
right now the left side is greater than the right side by 1
How do i make them equal ?
by adding 1 to the smaller side, that is
240/n = 240/2n + 1
You did agree that
the time for the train was greater than the time of the plane by 1, or
240/n > 240/2n by 1
right now the left side is greater than the right side by 1
How do i make them equal ?
by adding 1 to the smaller side, that is
240/n = 240/2n + 1
That makes total sense, thank you very much :)
Plane takes T hours.
Train takes T+1 hours.
Velocity of train = V km/h.
Velocity of plane = 2V km/h.
Plane: 2V*T = 240 km.
Train: V*T = 240 km.
Therefore, 2V*T = V*(T+1).
T = 1 h.
T+1 = 1 + 1 = 2 h.
2V*T = 240.
2V * 1 = 240,
2V = 240 km/h = Velocity of the plane.
Train takes T+1 hours.
Velocity of train = V km/h.
Velocity of plane = 2V km/h.
Plane: 2V*T = 240 km.
Train: V*T = 240 km.
Therefore, 2V*T = V*(T+1).
T = 1 h.
T+1 = 1 + 1 = 2 h.
2V*T = 240.
2V * 1 = 240,
2V = 240 km/h = Velocity of the plane.
1 answer