Final answer:
The work done in compressing a spring a further 2.0 cm after the first 2.0 cm is three times the work done in the first compression because the work depends on the square of the displacement.
Step-by-step explanation:
When a spring is compressed from its equilibrium position, the work done on it is given by the equation W = ½kx², where k is the spring constant and x is the displacement from equilibrium.
Compressing the spring by 2.0 cm (which we can call x) and then another 2.0 cm (for a total of 4.0 cm or 2x), the work done during the second compression can be calculated as the difference in work between compressing the spring from 0 to 4.0 cm and 0 to 2.0 cm.
Using the relationship W = ½kx²,
we know that W(0 to 4.0 cm) is four times W(0 to 2.0 cm), meaning W(2.0 cm to 4.0 cm) = 3W(0 to 2.0 cm).
Thus, the work done in the second compression is three times more than the work done in the first.