Answer:
0.664 m/s
Explanation:
Conversion to metric unit:
6.1 g = 0.0061 kg
13 cm = 0.13 m
6.6 cm = 0.066 m
As the spring is released from its compression stage, its elastics energy is converted into the pellet's kinetic energy, which is also affected by the work of friction force:
[tex]E_e = E_k + W_f[/tex]
[tex]kx^2/2 = mv^2/2 + Fs[/tex]
where k = 8.5 N/m is the spring constant, x = 0.066m is the compression length, m = 0.0061 kg is the pellet mass, v is the velocity of the pellet as it leaves the barrel, F = 0.039 N is the constant frictional force, s = 0.13 m is the distance that the friction force applies on the pellet.
[tex]8.5*0.066^2/2 = 0.0061*v^2/2 + 0.039*0.13[/tex]
[tex]0.0185 = 0.00305v^2 + 0.00507[/tex]
[tex]v^2 = 0.44[/tex]
[tex]v = \sqrt{0.44} = 0.664 m/s[/tex]
