Answer:
1. W = 900 J
2. a = -450000 m/s²
Explanation:
2.
First, we calculate the deceleration of the bullet by using 3rd equation of motion:
[tex]2as = V_{f}^{2} - V_{i}^{2}\\[/tex]
where,
a = deceleration = ?
s = distance traveled = 0.1 m
Vf = Final Speed = 0 m/s (it eventually stops)
Vi = Initial Speed = 300 m/s
Therefore,
[tex]2a(0.1\ m) = (0\ m/s)^{2} - (300\ m/s)^{2}\\a = \frac{-90000\ m^{2}/s^{2}}{0.2\ m}\\\\[/tex]
a = -450000 m/s² (negative sign shows deceleration)
1.
Now, we calculate the force using Newton's Second Law:
[tex]F = ma\\F = (0.02\ kg)(-450000\ m/s^{2})\\F = - 9000\ N[/tex]
Negative sign shows decelerating force.
For work done:
[tex]Work\ Done = W = Fs\\W = (9000 N)(0.1\ m)[/tex]
W = 900 J
