Question 2.8: A SDOF system with a friction damper vibrates with an initia...

Period of vibration T = 0.8/4 = 0.2 sec
Frequency of vibration ω = 2π/T = \frac{2\pi }{0.2} = 31.4 rad/sec
Slope of the displacement-time envelope curve = -\frac{2\mu g}{\pi \omega }

or,

\text{Slope} =\frac{50-5}{0.8} =-\frac{45}{0.8} =-\frac{2\mu g}{\pi \omega }

or,

\mu =\frac{\pi \omega }{2g} \left\lgroup\frac{45}{0.8} \right\rgroup =\frac{\pi \times 31.4\times 45}{2\times 9810\times 0.8} = 0.2828

The displacement x_{F} is given by

x_{F} =\frac{\mu g}{\omega ^{2}} =\frac{0.2828\times 9810}{31.4^{2}} = 2.81 mm

It will come to rest when

x(0)-4 x_{F}n<x_{F} and velocity is zero.

or,

n=\frac{x(0)-x_{F}}{4x_{F}} =\frac{50-2.81}{4\times 2.81} =4.198  cycles

It means the system will come to rest at the beginning of next half cycle, that is, 4.5 cycles or at 0.9 sec. The displacement at 0.9 sec will be equal to

x(0) – 4 x_{F} × 4.5 = 50 – 4 × 2.81 × 4.5 = -0.58 mm

The minus sign indicates that 0.58 mm is in a direction opposite to that of the initial displacement.