A weight of mass `m=1` kg attached to a spring of force constant `k = 20 N m"^(-1)` is able to oscillate on a rouch `(mu = 0.05)` steel rod. The displacement from the initial position of equilibrium is `a=30` cm. Find how many swings (i.e., movement from maximum to the equilibrium or back) will it make before coming to rest ? Take `g = 10 ms^(-2)`
[Hint : Use energy conservation to find `a_(n)` and hence have number of swings]

A weight of mass 1 kg attached to a spring with a force constant of 20 N/m is able to oscillate on a horizontal steel rod Fig. The initial displacement from the position of equilibrium is 30 cm. Find how many swings the weight will make before stopping completely. One swing is the movement from maximum displacement to the equilibrium position (or back). For numerical calculation put g=10m//s^(2) and coefficient of friction mu=0.05 .

A mass of 2kg attached to a spring of force constant 800 N/m makes 100 oscillation. The time taken is (in seconds)

A block of mass 0.2 kg is attached to a mass less spring of force constant 80 N/m as shown in figure. Find the period of oscillation. Take g=10 m//s^(2) . Neglect friction

A block of mass 0.2 kg is attached to a mass less spring of force constant 80 N/m as shown in figure. Find the period of oscillation. Take g=10 m//s^(2) . Neglect friction

A block of mass 0.2 kg is attached to a mass less spring of force constant 80 N/m as shown in figure. Find the period of oscillation. Take g=10 m//s^(2) . Neglect friction

A 5 kg collar is attached to a spring of spring constant 500 N m^(-1) . It slides without friction over a horizontal rod. The collar is displaced from its equilibrium position by 10 cm and released. The time period of oscillation is

A 5 kg collar is attached to a spring of spring constant 500 N m^(-1) . It slides without friction over a horizontal rod. The collar is displaced from its equilibrium position by 10 cm and released. The time period of oscillation is

A block of mass 1 kg is attached to one end of a spring of force constant k = 20 N/m. The other end of the spring is attached to a fixed rigid support. This spring block system is made to oscillate on a rough horizontal surface (mu = 0.04) . The initial displacement of the block from the equilibrium position is a = 30 cm. How many times the block passes from the mean position before coming to rest ? (g = 10 m//s^(2))