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Lakshmana Kumar · Answer 1 · 2023-10-18T01:21:36+0000

Remember the following formula that relates the initial and final velocites of an object moving along a distance d at a constant acceleration a:

Since the bullet starts at rest, then the intial velocity is 0:

$\Rightarrow v^2_f=2ad$

Isolate a from the equation:

$\Rightarrow a=\frac{v^2_f_{}}{2d}$

Substitute v_f=70x10^2 m/s and d=20cm:

$\begin{gathered} a=\frac{(7.0*10^2(m)/(s))^2}{2(20\operatorname{cm})} \\ =((7.0*10^2(m)/(s))^2)/(2(20*10^(-2)m)) \\ =1.225*10^6\cdot(m)/(s^2) \end{gathered}$

The net force is equal to the mass of the object times its acceleration, according to the Newton's Second Law of Motion:

Substitute the value of the acceleration that was found previously, and m=12g:

$\begin{gathered} F=(12g)(1.225*10^6(m)/(s^2)) \\ =(12*10^(-3)kg)(1.225*10^6(m)/(s^2)) \\ =14,700N \end{gathered}$

Therefore, the value of the acceleration force, was:

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