A cube of mass m = 620 kg is totally immersed in a liquid of density ρ = 1.12 g/cm3. The cube has an edge length of L = 1.4 m and is held at a depth of d = 1.1 m from the top of the cube to the surface of the liquid. 1) Calculate the difference, in pascals, between the fluid pressure acting on the bottom surface of the cube and that acting on the top surface. 2) Enter an expression for the difference between the magnitude of the force the liquid exerts on the bottom surface of the cube and the magnitude of the force it exerts on the top surface, in terms of the defined quantities and the acceleration due to gravity, g. This is the magnitude of the net vertical force the liquid exerts on the cube. That force points up and is called the buoyant force, denoted Fb.
A cube of mass m = 620 kg is totally immersed in a liquid of density ρ = 1.12 g/cm3. The cube has an edge length of L = 1.4 m and is held at a depth of d = 1.1 m from the top of the cube to the surface of the liquid. 1) Calculate the difference, in pascals, between the fluid pressure acting on the bottom surface of the cube and that acting on the top surface. 2) Enter an expression for the difference between the magnitude of the force the liquid exerts on the bottom surface of the cube and the magnitude of the force it exerts on the top surface, in terms of the defined quantities and the acceleration due to gravity, g. This is the magnitude of the net vertical force the liquid exerts on the cube. That force points up and is called the buoyant force, denoted Fb.
College Physics
11th Edition
ISBN:9781305952300
Author:Raymond A. Serway, Chris Vuille
Publisher:Raymond A. Serway, Chris Vuille
Chapter1: Units, Trigonometry. And Vectors
Section: Chapter Questions
Problem 1CQ: Estimate the order of magnitude of the length, in meters, of each of the following; (a) a mouse, (b)...
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A cube of mass m = 620 kg is totally immersed in a liquid of density ρ = 1.12 g/cm3. The cube has an edge length of L = 1.4 m and is held at a depth of d = 1.1 m from the top of the cube to the surface of the liquid.
1) Calculate the difference, in pascals, between the fluid pressure acting on the bottom surface of the cube and that acting on the top surface.
2) Enter an expression for the difference between the magnitude of the force the liquid exerts on the bottom surface of the cube and the magnitude of the force it exerts on the top surface, in terms of the defined quantities and the acceleration due to gravity, g. This is the magnitude of the net vertical force the liquid exerts on the cube. That force points up and is called the buoyant force, denoted Fb.
3)
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