A spring with a constant of $6 \frac{k g}{s^{2}}$ $6 (kg)/(s^2)$ is lying on the ground with one end attached to a wall. An object with a mass of $7 k g$ $7 kg$ and speed of $5 \frac{m}{s}$ $5 m/s$ collides with and compresses the spring until it stops moving. How much will the spring compress?

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A spring with a constant of $6 \frac{k g}{s^{2}}$ $6 (kg)/(s^2)$ is lying on the ground with one end attached to a wall. An object with a mass of $7 k g$ $7 kg$ and speed of $5 \frac{m}{s}$ $5 m/s$ collides with and compresses the spring until it stops moving. How much will the spring compress?

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Answer 1 · 2017-10-01T06:56:04

5,4 m

Explanation:

what is the energy of a object in movement? it is given by its kinetic energy : $E_{k} = \frac{1}{2} m v^{2} = \frac{1}{2} \times 7 k g \times {(5 \frac{m}{s})}^{2} = 87, 5 J$ $E_k= 1/2mv^2= 1/2 xx 7 kg xx (5m/s)^2= 87,5 J$ When the object is stopped its kinetic energy is Zero. Where is now the energy that without friction and anelastic strikes preserve itself? In the energy elastic of the spring: $E_{s} = \frac{1}{2} K \times X^{2}$ $E_s= 1/2 K xx X^2$ where X is the compress of the spring. $X = \sqrt{2 \frac{E}{K}} = \sqrt{\frac{175 J}{6 \frac{K g}{s^{2}}}} = 5, 4 m$ $X = sqrt (2 E/K) = sqrt ( (175J)/(6( Kg)/s^2)) =5,4 m$

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A spring with a constant of $6 \frac{k g}{s^{2}}$ $6 (kg)/(s^2)$ is lying on the ground with one end attached to a wall. An object with a mass of $7 k g$ $7 kg$ and speed of $5 \frac{m}{s}$ $5 m/s$ collides with and compresses the spring until it stops moving. How much will the spring compress?

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A spring with a constant of 6 (kg)/(s^2)6kgs26 (kg)/(s^2) is lying on the ground with one end attached to a wall. An object with a mass of 7 kg 7kg7 kg and speed of 5 m/s5ms 5 m/s collides with and compresses the spring until it stops moving. How much will the spring compress?

1 Answer

Explanation:

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A spring with a constant of $6 \frac{k g}{s^{2}}$ $6 (kg)/(s^2)$ is lying on the ground with one end attached to a wall. An object with a mass of $7 k g$ $7 kg$ and speed of $5 \frac{m}{s}$ $5 m/s$ collides with and compresses the spring until it stops moving. How much will the spring compress?