also, in the integral should not contain (lambda)(R), it should be (lambda)(R-R_e)
of course, this makes it very hard to work with
after the integration, i was not able to isolate r_s
\omega_0 should not change whether the system is driven or not. It is the natural frequency. \omega_d however, will be changing in each of the three calculations of amplitude.
Homework Statement
A mass-spring system has b/m = \omega_0/5 , where b is the damping constant and \omega_0 the natural frequency. How does its amplitude when driven at frequencies 10% above \omega_0 compare with its amplitude at \omega _0 ? How does its amplitude when driven at...