Answer:
9 cm.
Explanation:
The energy used for stretch the spring from [tex]15 cm[/tex] to [tex]21 cm[/tex] will be , [tex]E_{1}=27J[/tex]
The energy used for stretch the spring from [tex]21 cm[/tex] to [tex]27 cm[/tex] will be , [tex]E_{2}=45J[/tex]
using the energy of spring formula ,we find that
[tex]27 = \frac{1}{2}K((21-L^{2})-(15-L^{2}))[/tex]
[tex]45 = \frac{1}{2}K((27-L^{2})-(21-L^{2}))[/tex]
Dividing both the equation will get,
[tex]\frac{3}{5}=\frac{(21-L)^{2}-(15-L)^{2}}{(27-L)^{2}-(21-L)^{2}}\\5((21-L)^{2}-(15-L)^{2})=3((27-L)^{2}-(21-L)^{2})\\3(729 - 54L + L^{2}- 441 + 42L - L^{2} ) = 5(441 - 42L + L^{2} - 225 + 30L - L^{2} )\\3(288 - 12L) = 5(216 - 12L)\\24L = 216\\L = 9 cm[/tex]
Therefore, the natural length of the spring is, 9 cm.
