SOLUTION: Trains at each end of the 50.0 km long Eurotunnel under the English Channel start at the same time into the tunnel. Find their speeds if the train from france travels 8.0km/h fast
Algebra ->
Customizable Word Problem Solvers
-> Travel
-> SOLUTION: Trains at each end of the 50.0 km long Eurotunnel under the English Channel start at the same time into the tunnel. Find their speeds if the train from france travels 8.0km/h fast
Log On
Question 68402This question is from textbook Basic technical mathematics with calculus
: Trains at each end of the 50.0 km long Eurotunnel under the English Channel start at the same time into the tunnel. Find their speeds if the train from france travels 8.0km/h faster than the train from England and they pass in 17.0 min. This question is from textbook Basic technical mathematics with calculus
You can put this solution on YOUR website!
Let x=English train's speed
Then x+8=French train's speed
Distance(d)=rate(r) times time(t) or d=rt
17 min=17/60 hr
Distance English train travels in 17 min =x(17/60) km
Distance French train travels in 17 min =(x+8)(17/60) km
Now when the sum of these distances equals 50 km, then the trains will be together. So our equation to solve is
x(17/60)+(x+8)(17/60)=50 multiply through by 60 to clear fractions
17x+17(x+8)=3000 clear parens
17x+17x+136=3000 subtract 136 from both sides
34x=3000-136
34x=2864
x=84.235 km/hr--------------------------------speed of English train
x+8=84.235+8=92.235 km/hr-----------------------speed of French train
ck
distance English train travels in 17 min =84.235(17/60)=23.867 km
distance French train travels in 17 min =92.235(17/60)=26.133km
Now if we subtract either of these distances from 50 km we should get the other distance. 50-26.133=23.867 and 50-23.867=26.133
Hope this helps---ptaylor
