Answer:
a) [tex]V_{2/1}=0.8m/s[/tex]
b) The second runner will win
c) d = 10.54m
Explanation:
For part (a):
[tex]V_{2/1} = V_{2} - V_{1} = 0.8m/s[/tex]
For part (b) we will calculate the amount of time that takes both runners to cross the finish line:
[tex]t_{1} = \frac{X_{1}}{V_{1}}=\frac{250}{3.45}=72.46s[/tex]
[tex]t_{2} = \frac{X_{2}}{V_{2}}=\frac{250+45}{4.25}=69.41s[/tex]
Since it takes less time to the second runner to cross the finish line, we can say the she won the race.
For part (c), we know how much time it takes the second runner to win, so we just need the position of the first runner in that moment:
X1 = V1*t2 = 239.46m Since the finish line was 250m away:
d = 250m - 239.46m = 10.54m
Answer:
At the time t = 0, the distance is 45m
the front runer has a velocity of 3.45 m/s, the second one has a velocity of 4.25 m/s
then the position of both runes, puting the zero of the position where the runer 1 is:
p1(t) = (3.45m/s)*t
p2(t)= (4.25m/s)*t - 45m
a) relative velocity: this is the differenceof both velocities: v2 - v1 = 4.25m/s - 3.45m/s = 0.8m/s
this means that the first runner sees the second one with a positive velocity.
b) if the first runner is 250m away from the finish line, then:
the first runner needs:
p1(t) = 250m = (3.45m/s)*t
t = (250/3.45) s = 72.5 seconds
for the runner 2
p2(t) = 250m = (4.25m/s)*t - 45m
250m + 45m = 295m = (4.25m/s)*t
(295/4.25) s = t = 69.4 seconds
So the runner 2 needs less time, this means that he will reach the finish line first
c) we know that at t= 69.4 seconds, the second runner is in the finish line, we can imput that thime in the position of the runner 1:
p1(69.4s) = (3.45m/s)*69.4s = 239.5m
and at this time, the runner 2 is already at the finish line that was 250m away from the first runner, so the distance is:
250m - 239.5m = 10.5m
