In the arrangement shown if Fig. Pulleys are small and lught and spring are ideal and `K_1=25(pi^2)(N)/(m)`, `K_2=2K_1`,`K_3=` and `K_4=4K_1` are the force constant of the spring. Calculate the period of small vertical oscillation of block of mass `m=3kg`.

In the arrangement shown in figure, pulleys are light and spring are ideal. K_(1) , k_(2) , k_(3) and k_(4) are force constant of the spring. Calculate period of small vertical oscillations of block of mass m .

In the arrangement shown in figure, pulleys are light and spring are ideal. K_(1) , k_(2) , k_(3) and k_(4) are force constant of the spring. Calculate period of small vertical oscillations of block of mass m .

In the arrangement shown in figure, pulleys are light and spring are ideal. K_(1) , k_(2) , k_(3) and k_(4) are force constant of the spring. Calculate period of small vertical oscillations of block of mass m .

In the arrangement shown in the diagram, pulleys are small and springs are ideal. k_(1)=k_(2)=k_(3)=k_(4)=10Nm^(-1) are force constants of the springs and mass m=10kg. If the time period of small vertical oscillations of the block of mass m is given by 2pix seconds, then find the value of x.

In the arrangement shown in the diagram, pulleys are small and springs are ideal. k_(1)=k_(2)=k_(3)=k_(4)=10Nm^(-1) are force constants of the springs and mass m=10kg. If the time period of small vertical oscillations of the block of mass m is given by 2pix seconds, then find the value of x.

Two springs are jonied and connected to a mass m as shown in figure. If the force constants of the two springs are k_(1) and k_(2) , shown that frequency of oscillation of mass m is

Two spring of force constants K and 2K are connected a mass m below The frequency of oscillation the mass is

Figure shows a system consisting of pulley having radius R, a spring of force constant k and a block of mass m. Find the period of its vertical oscillation.