To determine the distance traveled by a vehicle under braking, we can use the kinematic equation:
v2=u2+2asv^2 = u^2 + 2asv2=u2+2as
where:
- vvv is the final velocity (0 m/s since the vehicle comes to a stop)
- uuu is the initial velocity (25 m/s)
- aaa is the acceleration (retardation, which is -0.5 m/s2^22 since it opposes the motion)
- sss is the distance traveled
Rearranging the equation, we have:
s=v2−u22as = frac{{v^2 - u^2}}{{2a}}s=2av2−u2
Substituting the given values:
s=02−(252)2×(−0.5)s = frac{{0^2 - (25^2)}}{{2 imes (-0.5)}}s=2×(−0.5)02−(252)
Simplifying further:
s=−625−1=625s = frac{{ -625}}{{ -1}} = 625s=−<span class="mord m