To determine the final velocity and distance covered by the vehicle, we can use the kinematic equations of motion.
- The first equation relates final velocity (v), initial velocity (u), acceleration (a), and time (t):
v = u + at.
Given that the initial velocity (u) is zero, we can simplify the equation:
v = at.
- The second equation relates displacement (s), initial velocity (u), acceleration (a), and time (t):
s = ut + (1/2)at^2.
Since the initial velocity (u) is zero, the equation simplifies further:
s = (1/2)at^2.
Given the values of acceleration (a = 0.8 m/s²) and time (t = 10 s), we can now calculate the final velocity (v) and distance covered (s).
Using equation 1:
v = at = 0.8 m/s² * 10 s = 8 m/s.
The final velocity of the vehicle is 8 m/s.
Using equation 2:
s = (1/2)at^2 = (1/2) * 0.8 m/s² * (10 s)^2 = 0.8 m/s² * 100 s² = 80 m.
The distance covered by the vehicle within that time is 80 meters.