A wooden block of mass 1kg and density `800 Kg m^(-3)` is held stationery, with the help of a string, in a container filled with water of density `1000 kg m^(-3)` as shown in the figure. If the container is moved upwards with an acceleration of `2 m s^(-2)`, then the tension in the string will be ( take`g=10ms^(-2)`)

The mass of a lift if 600kg and it is moving upwards with a uniform acceleration of 2m//s^(2) . Then the tension in the cable of the lift is :

A block of mass 1 kg and density 0.8g//cm^(3) is held stationary with the help of a string as shown in figure. The tank is accelerating vertically upwards with an acceleration a =1.0m//s^(2) . Find (a) the tension in the string, (b) if the string is now cut find the acceleration of block. (Take g=10m//s^(2) and density of water =10^(3)kg//m^(3)) .

A lift of mass 200 kg is moving upward with an acceleration of 3m//s^(2) . If g=10 m//s^(2) then the tension of string of the lift will be :

If the elevator in shown figure is moving upwards with constant acceleration 1 ms^(-2) , tension in the string connected to block A of mass 6 kg would be ( take, g =10 ms^(-2) )

Two masses of 5 kg and 3 kg are suspended with the help of massless inextensible strings as shown in figure. The whole system is going upwards with an acceleration of 2m s^(-2) . The tensions T_(1) and T(2) are respectively ("Take g"=10ms^(-2))

A lift of mass 100 kg is moving upwards with an acceleration of 1 m//s^(2) . The tension developed in the string, which is connected to lift is ( g=9.8m//s^(2) )

A mass m of volume V=10cm^(2) is tied with a string to the base of a container filled with a liquid of density (P_(l)=10^(3)kg//m^(3)) as shown in the figure. The container is then accelerated with acceleration (a_(x)=9m//s^(2)) and (a_(y)=2m//s^(2)) a shown in the figure. [ g=10((m)/(s^(2))) acceleration due to gravity] the net buoyancy force acting on the mass is

Two blocks of masses 2 kg and 4 kg are hanging with the help of massless string passing over an ideal pulley inside an elevator. The elevator is moving upward with an acceleration (g)/(2) . The tension in the string connected between the blocks will be (Take g=10m//s^(2) ).

If coeffiecient of friction between the block of mass 2kg and table is 0.4 then out acceleration of the system and tension in the string. (g=10m//s^(2))

In the figure shown the man of mass 60kg is lowering a block of mass 10kg with an acceleration of 2m//s^2 . Find the reading of the machine.