a train 120 m long, travelling at 90 km/hr overtakes another train travelling in the same direction at 72 km/hr and passes it completely in 50 seconds.Find (1) the length of the second train in metres (2) the time they would have travelled at these speeds in the opposite direction.
2006-07-19 06:33:46 · 6 answers · asked by mohnish n 1 in Science & Mathematics ➔ Mathematics
back end of fast train travels along slow train for a distance of (120 + x meter) with a speed of 90 - 72 = 18 kmph for 50 seconds
thus (120 + x)/50 = 18000/3600 => x = 50*18000/3600 - 120 meter. = 130 meter.
opposite direction speed is 90 + 72 = 162.
when speed is 18 kmph we had 50 seconds thus with 162 kmph we will have 50/ (162/18) seconds = 5 5/9 second
2006-07-19 07:01:39 · answer #1 · answered by gjmb1960 7 · 0⤊ 0⤋
90 km/hr is 25 mps (90,000 meters / 3600 seconds).
This means that your train would pass a staionary point in 4.8 seconds.
The second train is traveling at 20 mps (72,000 meters / 3600 seconds).
The differential is all that matters at this point. The difference between the two is 5 meters per second, so eliminate all the fancy stuff by subtracting the differential velocity. Now the question becomes "if a 120 m train passes a stationary train at 5 mps in 50 seconds, how long is the stationary train?"
Since a 120 meter train would pass a single point at 5 mps in 24 seconds, you then subtract the 24 seconds and you now start timing "how long it takes the end of your train to reach the front of the stationary train".
You know that will be 26 seconds, so 26 seconds x 5 mps is 130 meters.
So your train will take 24 seconds to completely pass the end of the other train, and 26 more seconds for the end of your train to pass the front of the other train. There is your 50 seconds, and the total length must be 250 meters.
Alternative method: 50 seconds times 5 mps differential velocity yields 250 meters. 250 - 120 (length of your train) yields 130 (length of other train).
Given this answer to the first part, you can easily figure out the second part.
2006-07-19 06:51:41 · answer #2 · answered by aichip_mark2 3 · 0⤊ 0⤋
(1): v1 = 90 km/h = 25 m/s. v2 = 72 km/h = 20 m/s. So the relative speed of the first train is v = v1 - v2, v = 25 - 20, v = 5 m/s.
If L1 is the length of the first train and L2 is the length of the second train then:
L1 + L2 = vt, 120 + L2 = 5x50, 120 + L2 = 250, L2 = 250 - 120, L2 = 130 m.
(2): Now the relative speed is v' = v1 + v2, v' = 25 + 20, v' = 45 m/s. t' = (L1 + L2)/v', t' = (120 + 130)/45, t' = 250/45, t' = 50/9 s or t' = 5,55 s.
2006-07-19 07:02:36 · answer #3 · answered by Dimos F 4 · 0⤊ 0⤋
You did not furnish the parent, yet i imagine i visit attend to without it. the adaptation in speeds is 90kph-75kph=15kph. at 15 kph it take the motorized vehicle a million.3km/15 km/h*60mim/hr=5.2 min or 5 min 12 sec to achieve the fromt of the prepare. 5.2 min/60min/hr*90km/hr=7.8 km solutions: 5.2 min & 7.8 Km.
2016-10-14 23:16:52 · answer #4 · answered by ? 4 · 0⤊ 0⤋
130 m
2.78 sec
2006-07-19 06:49:30 · answer #5 · answered by Patrick H 2 · 0⤊ 0⤋
250m......and with respect to first train 5s and second train around 3s
2006-07-19 06:50:37 · answer #6 · answered by coolgvs 1 · 0⤊ 0⤋