What happens if mass and velocity are doubled?

What happens to the momentum of a body when velocity is doubled keeping the mass unchanged.

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Option 3 : Momentum increases by 2 times and kinetic energy by 4 times

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The correct answer is Momentum increases by 2 times and kinetic energy by 4 times.

If the velocity is doubled, then Momentum increases by 2 times and kinetic energy by 4 times.

Key Points

Solution:
- Momentum (P) = mv
- Kinetic Energy $K = {1 \over2} mv^2$
  - v' = 2v.
  - So, $K' = {{1 \over2} m(2v)^2 = 4 \times{1 \over2} mv^2 = 4K}$

Additional Information

Kinetic energy is seen when the object is in motion. Energy is exerted on the object in order to make it move.
The kinetic energy of the object is dependent on the mass of the object and the speed at which it moves.

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Answer

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Hint: In simple word kinetic energy is energy which the body gets while the body is in motion. The energy of a body depends on mass and velocity. Kinetic energy is equal to half of the product mass and velocity. SI unit is joules.

Complete answer:

To solve the question first understand what question you want to convey.Question explanation- If the body has a mass m and velocity v then its energy is given by formula given in equation (1). If we have twice the mass and velocity of the body then what will be its kinetic energy?Kinetic energy- Energy gained by a body when the body is in motion and it is given by,\[KE=\dfrac{1}{2}m{{v}^{2}}\] ----------(1)Now let's assume that our next kinetic energy is same as that of first kinetic energy but according to our question, the mass of next energy is double than the mass of first energy and velocity of next energy is double than the velocity of first energy which is given as ${{m}_{1}}=2m$ and ${{v}_{1}}=2v$So next Kinetic energy is energy by \[K{{E}_{1}}=\dfrac{1}{2}{{m}_{1}}{{v}_{1}}^{2}\]Now put the value of ${{m}_{1}}\And {{v}_{1}}$ in the above equation,We get,\[\begin{align} & K{{E}_{1}}=\dfrac{1}{2}(2m){{(2v)}^{2}} \\ & K{{E}_{1}}=\dfrac{1}{2}(2m)(4{{v}^{2}}) \\ & K{{E}_{1}}=8(\dfrac{1}{2}m{{v}^{2}}) \\ \end{align}\]Put the value of equation one in the above equation,We get,\[K{{E}_{1}}=8KE\]So from the above equation, we can conclude that double the mass and velocity then eight will be our next energy.

Note:

Your next energy does not depend on your first energy. Do not get confused between potential energy and kinetic energy. A body possesses kinetic energy when the body is in motion and a body possesses potential energy when it is at some height.

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What happens if mass and velocity are doubled?

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