Respuesta :
Answer:
The pickup truck and hatchback will meet again at 440.896 m
Explanation:
Let us assume that both vehicles are at origin at the start means initial position is zero i.e. [tex]s_{o}[/tex] = 0. Both the vehicles will cross each other at same time so we will make equations for both and will solve for time.
Truck:
[tex]v_{i}[/tex] = 33.2 m/s, a = 0 (since the velocity is constant), [tex]s_{o}[/tex] = 0
Using [tex]s =s_{o}+v_{i}t+1/2at^{2}[/tex]
s = 33.2t .......... eq (1)
Hatchback:
[tex]a=5m/s^{2}[/tex], [tex]v_{i}[/tex] = 0 m/s (since initial velocity is zero), [tex]s_{o}[/tex] = 0
Using [tex]s =s_{o}+v_{i}t+1/2at^{2}[/tex]
putting in the data we will get
[tex]s=(1/2)(5)t^{2}[/tex]
now putting 's' value from eq (1)
[tex]2.5t^{2}-33.2t=0[/tex]
which will give,
t = 13.28 s
so both vehicles will meet up gain after 13.28 sec.
putting t = 13.28 in eq (1) will give
s = 440.896 m
So, both vehicles will meet up again at 440.896 m.
Answer:
- 440.9 m
Explanation:
initial speed of the pickup truck (Up) = 33.2 m/s
acceleration of the pickup truck (ap) = 0
initial speed of the hatchback = 0
acceleration of the hatchback (ah) = 5 m/s^{2}
how far away (s) do the cars meet up again?
from the equations of motion distance covered (s) = ut + [tex]0.5at^{2}[/tex]
distance covered by the pickup = ut + [tex]0.5at^{2}[/tex]
where
- u = initial speed of the pickup = 33.2 m/s
- t = time it takes
- a= acceleration of the pickup = 0
- the distance covered by the pickup (s) now becomes = 33.2t +[tex]0.5.(0).t^{2}[/tex] = 33.2t ...equation 1
distance covered by the hatchback = ut + [tex]0.5at^{2}[/tex]
where
- u = initial speed of the hatchback = 0 m/s
- t = time it takes
- a= acceleration of the hatchback = 5 m/s^{2}
- the distance covered by the hatchback (s) now becomes = (0)t + [tex]0.5x5t^{2}[/tex]
= [tex]2.5t^{2}[/tex]......equation 2
when the cars meet, they both would have covered the same distance, therefore
- distance covered by the pickup = distance covered by the hatchback
- equation 1 = equation 2
- 33.2t = [tex]2.5t^{2}[/tex]
- 33.2 = 2.5t
- t = 13.28 s
now that we have the time it takes for both cars to meet, we can put the value of the time into equation 1 or equation 2 to get the distance at which they meet
from equation 1
- distance (s) = 33.2t = 33.2 x 13.28= 440.9 m
from equation 2
- distance (s) = [tex]2.5t^{2}[/tex] = [tex]2.5x12.8^{2}[/tex] = 440.9 m
