Two point masses of 3.0 kg and 1.0 kg are attached to opposite ends of a horizontal spring whose spring constant is `300 N m^(-1)` as shown in the figure. The natural vibration frequency of the system is of the order of :

Two point masses of 3 kg and 6 kg are attached to opposite ends of horizontal spring whose spring constant is 300 Nm^(-1) as shown in the figure. The natural vibration frequency of the system is approximately

A system of springs with their spring constants are as shown in figure. What is the frequency of oscillations of the mass m ?

A small block of mass 2 kg is placed on a bigger block of mass 4 kg which is attached to horizontal spring of spring constant K = 500 N //m as shown in figure, coefficient of friction between block is 0.2 .Maximum amplitude of system so that there is no relative slipping between blocks.

Two blocks of masses 6 kg and 3 kg are attached to the two ends of a massless spring of spring constant 2 pi^(2) N//m . If spring is compressed and released on a smooth horizontal surface then find the time period (in seconds) of each block.

A mass of 1.5 kg is connected to two identical springs each of force constant 300 Nm^(-1) as shown in the figure. If the mass is displaced from its equilibrium position by 10cm, then the period of oscillation is

A mass of 1.5 kg is connected to two identical springs each of force constant 300 Nm^(-1) as shown in the figure. If the mass is displaced from its equilibrium position by 10 cm, then maximum speed of the trolley is

Two springs are in a series combination and are attached to a block of mass 'm' which is in equilibrium. The spring constants and extension in the springs are as shown in the figure. Then the force exerted by the spring on the block is :

A rod of mass m and length l is connected by two spring of spring constants k_(1) and k_(2) , so that it is horizontal at equilibrium. What is the natural frequency of the system?

Two masses 8 kg 4 kg are suspended together by a massless spring of spring constant 1000 Nm^(-1) . When the masses are in equilibrium 8 kg is removed without disturbing the system . The amplitude of oscillation is

Two blocks of masses m_(1) = 2kg and m_(2) = 4kg are attached to two ends of a light ideal spring of force constant k = 1000 N // m. The system is kept on a smooth inclined plane inclined at 30^(@) with horizontal. The block m_(2) is attached to a light string whose other end is connected to a mass m_(3) = 1 kg . A force F = 15N is applied on m_(1) and the system is released from rest. Assume initially the spring is at relaxed position and the system is released from rest. Find the (a) maximum extension of the spring. (