Question

A spring with a constant of `9` `kgs^-2` is lying on the ground with one end attached to a wall. An object with a mass of `2` `kg` and speed of `12` `ms^-1` collides with and compresses the spring until it stops moving. How much will the spring compress?

Answer 1

The compression is `=5.66m`

Explanation:

The spring constant is `k=9kgs^-2`

The kinetic energy of the object is

`KE=1/2m u^2`

`KE=1/2*2*(12)^2=144J`

This kinetic energy will be stored in the spring as potential energy.

`PE=144J`

So,

`1/2kx^2=144`

`x^2=2*(144)/(9)=32m^2`

`x=sqrt(32)=5.66m`

Answer 2

The displacement of the spring, `x`, will be `4` `m`.

Explanation:

The kinetic energy of the moving object will be `E_k=1/2mv^2=1/2xx2xx12^2=144` `J`.

This will be converted to spring potential energy: `E_"sp"=1/2kx^2`.

Rearranging: `x=sqrt((E_"sp")/k)`

We can substitute in the calculated value of `E_k` for `E_"sp"`:

`x=sqrt((E_"sp")/k)=sqrt((E_k)/k)=sqrt((144)/9) = 12/3 = 4` `m`