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In the figure shown, `AB = BC = 2m`. Friction coefficient everywhere is `mu=0.2.` Find the maximum compression of the spring.

In the figure shown, the frictional coefficient between the table and the block is 0.2. Find the ratio of tensions in the right and the left strings.

A block of mass m is moving with a speed v on a horizontal rought surface and collides with a horizontal monted spring of spring constant k as shown in the figure .The coefficient of friction between the block and the floor is mu The maximum cobnpression of the spring is

The spring constant of the spring shown in the figure is 250Nm^(-1) . Find the maximum compression of the spring?

Find maximum compression is the spring from the given figure.

Consider the following figure taking the coefficient fo friction, mu to be 0.5 and calculate the maximum compression of teh spring. .

Consider Example 6.8 taking the coefficient of friction , mu to be and calculate the maximum compression of the spring .

The arrangement shown in figure is at rest. An ideal spring of natural length l_0 having spring constant k=220Nm^-1 , is connected to block A. Blocks A and B are connected by an ideal string passing through a friction less pulley. The mass of each block A and B is equal to m=2kg when the spring was in natural length, the whole system is given an acceleration veca as shown. If coefficient of friction of both surfaces is mu=0.25 , then find the maximum extension in 10(m) of the spring. (g=10ms^-2) .

The arrangement shown in figure is at rest. An ideal spring of natural length l_0 having spring constant k=220Nm^-1 , is connected to block A. Blocks A and B are connected by an ideal string passing through a friction less pulley. The mass of each block A and B is equal to m=2kg when the spring was in natural length, the whole system is given an acceleration veca as shown. If coefficient of friction of both surfaces is mu=0.25 , then find the maximum extension in 10(m) of the spring. (g=10ms^-2) .

A block of mass m is placed on a smooth block of mass M = m with the help of a spring as shown in the figure. A velocity v_(0) is given to upper block when spring is in natural length. Find maximum compression in the spring.