A solid cylinder of mass `M = 10kg` and cross - sectional area `A = 20cm^(2)` is suspended by a spring of force contant `k = 100 N//m` and hangs partically immersed in water. Calculate the period of small oscillation of the cylinder.

A solid right circular cylinder of weight 10 kg and cross sectional area 100cm^2 is suspended by a spring, where k=1(kg)/(cm) , and hangs partially submerged in water of density 1000(kg)/(m^3) as shown in Fig. What is its perod when it makes simple harmonic vertical oscillations? (Take g=10(m)/(s^2) )

A mass m is suspended from a spring of force constant k and just touches another identical spring fixed to the floor as shown in the fig. The time period of small oscillations is

A uniform cylinder of height h, mass m and cross sectional area A is suspended vertically from a fixed point by a massless spring of force constant k, A beaker full of water is placed under the cylinder so that 1//4^(th) of its volume is submerged in the water at equilibrium position. When the cylinder is given a small downward push and released, it starts oscillating vertically with small amplitude. Calculate the frequency of oscillation of the cylinder, Take, density of water = rho .

A solid cylinder of mass m length L and radius R is suspended by means of two ropes of length l each as shown. Find the time period of small angular oscillations of the cylinder about its axis AA'

The period of oscillation of a mass M, hanging from a spring of force constant k is T. When additional mass m is attached to the spring, the period of oscillation becomes 5T/4. m/M =

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