A cubical block of side 0.5 M floats on water with `30%` of its volume under water. What is the maximum weight that can be put on the block without fully submerging it under water?
[Take density of water `=10^(3)kg//m^(3)`]

A block of wood floats in water with 2/3 of its volume submerged. Its relative density is

A cubical block of side 10 cm floats at the interface of an oil and water. The pressure above that of atmosphere at the lower face of the block is

A block of wood floats in water two-thirds of its volume submerged. In oil the block of floats with 0.90 of its volume submerged. Find the density of (a) wood and (b) oil, if density of water I 10^(3) kg//m^(3) .

A block of wood floats with 3/4 th of its volume submerged in water. The density of wood is ________

A body is floating in water with 3/5th of its volume below the water surface. What will be density of the body?

A cubical block of wood of edge 3 cm floats in water. The lower surface of the cube just touches the free end of a vertical spring fixed at the bottom of the pot. Find the maximum weight that can be put on the block without wetting it. Density of wood =800kg//m^(3) and spring constant of the spring =50N//m . Take g=10m//s^(2)