Answer to Question #212364 in Classical Mechanics for bishal

The given information is

• The initial velocity is "V_{(o)}=300\\;\\text{m}\/\\text{s}"
• The initial distance traveled is "d_{(i)}=500\\;\\text{mm}"
• The final distance traveled is "d_{(f)}=250\\;\\text{mm}"

Converting the distances to meters.

Equivalence millimeters to meters. "1\\;\\text{m}=1000\\;\\text{mm}"

Multiplying by the conversion factor.

"d_{(i)}=500\\;\\text{mm}\\times \\dfrac{1\\;\\text{m}}{1000\\;\\text{mm}}=0.5\\;\\text{m}\\\\\nd_{(f)}=250\\;\\text{mm}\\times \\dfrac{1\\;\\text{m}}{1000\\;\\text{mm}}=0.25\\;\\text{m}\\\\"

The acceleration that the bullet undergoes in the first impact is

"a=\\dfrac{V_{(f)}^{2}-V_{(i)}^{2}}{2\\;d_{(i)}}"

In which.

"V_{(i)}" is the initial velocity.

"V_{(f)}" is the final velocity.

"d_{(i)}" is the distance

Evaluating numerically.

"a=\\dfrac{V_{(f)}^{2}-V_{(i)}^{2}}{2\\;d_{(i)}}\\\\\na=\\dfrac{(0\\;\\text{m}\/\\text{s})^{2}-(300\\;\\text{m}\/\\text{s}^{2}}{2\\times 0.5\\;\\text{m}}\\\\\na=-90,000\\;\\text{m}\/\\text{s}^{2}"

Now, for the second shot, the final velocity is given by

"V_{(f)}^{2}=V_{(i)}^{2}+2\\;a\\;d_{(f)}"

\\

Where.

In which.

"V_{(i)}" is the initial velocity.

"V_{(f)}" is the final velocity.

"d_{(f)}" is the distance

Evaluating numerically.

"V_{(f)}^{2}=V_{(i)}^{2}+2\\;a\\;d_{(f)}\\\\\nV_{(f)}=\\sqrt{V_{(i)}^{2}+2\\;a\\;d_{(f)}}\\\\\nV_{(f)}=\\sqrt{(300\\;\\text{m}\/\\text{s})^{2}+2\\times -90,000;\\text{m}\/\\text{s}^{2}\\times 0.25\\;\\text{m}}\\\\\nV_{(f)}=\\sqrt{ 45,000\\text{m}^{2}\/\\text{s}^{2}}\\\\"

"V_{(f)}=212\\;\\text{m}\/\\text{s}"

Answer.

The velocity with which it emerges from the second target is "\\displaystyle \\color{red}{\\boxed{V_{(f)}=212\\;\\text{m}\/\\text{s}}}"