Respuesta :
Answer:
The rate at which bus 1 is going is 55 mph
The rate at which bus 1 is going is 35 mph
Explanation:
As per the question:
Suppose, the distance traveled by Bus 1 be 'd' at the rate R after a time, t = 3h
Thus
Suppose, the distance traveled by Bus 1 be 'd'' at the rate, R'20 mph slower than the rate of Bus 1 after the same time.
R' = R - 20
The distance is given as the product of rate and time:
d = Rt (1)
Now, the total distance given is 270 miles:
d + d' = 270
Now, using eqn (1):
Rt + R't = 270
3(R + R - 20) = 270
6R = 270 + 60
R = 55 mph
R' = R - 20 = 55 - 20 = 35 mph
Answer:
speed of the two vehicle are 55 mph and 35 mph
Explanation:
given,
speed of friends vehicle = x mph
speed of your vehicle = (x - 20) mph
when both travel in opposite direction
distance between the two buses = 270 miles
distance = speed × time
270 = 3(x) + 3(x-20)
90 = 2 x -20
x = 55 mph
now, speed of other vehicle is (55-20) = 35 mph
hence, speed of the two vehicle are 55 mph and 35 mph
