Question

Suppose the block is released from rest with the spring compressed 5.00 cm. The mass of the block is 1.70 kg and the force constant of the spring is 955 N/m. What is the speed of the block when the spring expands to a compression of only 2.50 cm?

Answer 1

First, let's calculate the total mechanical energy when the block is at rest and the spring is compressed 5 cm:

`\begin{gathered} ME=PE+KE\\ \\ ME=(kx^2)/(2)+(mv^2)/(2)\\ \\ ME=(955\cdot0.05^2)/(2)+0\\ \\ ME=1.194\text{ J} \end{gathered}`

Now, let's use this total energy to calculate the velocity when the spring is compressed by 2.5 cm:

`\begin{gathered} ME=PE+KE\\ \\ 1.194=(kx^2)/(2)+(mv^2)/(2)\\ \\ 2.388=955\cdot0.025^2+1.7v^2\\ \\ 1.7v^2=2.388-0.597\\ \\ 1.7v^2=1.791\\ \\ v^2=(1.791)/(1.7)\\ \\ v^2=1.0535\\ \\ v=1.026\text{ m/s} \end{gathered}`

Therefore the speed is 1.026 m/s.