To solve this problem, we can assume that the motion is
linear so that we can use the equations:
<span>Xf = Xi + v0 t + 0.5 a t^2 --->
1</span>
<span>vf = v0 + a t --->
2</span>
where Xi = initial distance = 0, v0 = initial velocity, Xf
= final distance = 26.5 m, a = acceleration = - 1.80 m/s^2, t = time = 3.81 s,
vf = final velocity
Substituting the given values into equation 1 to find for
v0:
26.5 = v0 (3.81) + 0.5 (-1.80 m/s^2) (3.81)^2
3.81 v0 = 39.56449
v0 = 10.38 m/s
Using equation 2 to find for vf:
vf = 10.38 + (-1.80) (3.81)
<span>vf = 3.53 m/s</span>