Course PHYSICS260 Assignment 2 Due at 11 00pm on Wednesday February 13 2008 Relating Pressure and Height in a Container Description Walks the student through a derivation of the law relating height and pressure in a container by analyzing the forces on a thin layer of fluid Learning Goal To understand the derivation of the law relating height and pressure in a container In this problem you will derive the law relating pressure to height in a container by analyzing a particular system A container of uniform cross sectional area is filled with liquid of uniform density Consider a thin horizontal layer of liquid thickness at a height as measured from the bottom of the container Let the pressure exerted upward on the bottom of the layer be and the pressure exerted downward on the top be Assume throughout the problem that the system is in equilibrium the container has not been recently shaken or moved etc Part A What is the magnitude of the force exerted upward on the bottom of the liquid Hint A 1 Formula for the force Force is equal to pressure times area ANSWER Part B What is Hint B 1 the magnitude of the force exerted downward on the top of the liquid Formula for the force Force is equal to pressure times area ANSWER Part C What is the weight of the thin layer of liquid Hint C 1 How to approach the problem where The weight of the layer is given by the formula layer and is the magnitude of the acceleration due to gravity is the mass of the Part C 2 Mass of the layer Use the definition of density to write the mass of the layer of liquid in terms of its density and its volume express volume in terms of physical dimensions given in the problem introduction Hint C 2 a Definition of density The density of an object is equal to its mass divided by its volume Part C 2 b Volume of the layer What is the volume of the thin layer of liquid Express your answer in terms of quantities given in the problem introduction ANSWER Express your answer in terms of quantities given in the problem introduction ANSWER Express your answer in terms of quantities given in the problem introduction and the magnitude of the acceleration due to gravity ANSWER Part D Since the liquid is in equilibrium the net force on the thin layer of liquid is zero Complete the force equation for the sum of the vertical forces acting on the liquid layer described in the problem introduction Hint D 1 How to approach the problem If you have completed the previous parts you have already done most of the work needed to answer this part Just add together the forces that you found in the previous three parts All three of the forces act along the y axis some are directed upward and others are directed downward Those that act downward should appear with a negative sign Express your answer in terms of quantities given in the problem introduction ANSWER Part E Solve the sum of forces equation just derived to obtain an expression for ANSWER and thus a differential equation for pressure Part F Integrate both sides of the differential equation you found for to obtain an equation for Your equation should then include a constant that depends on initial conditions Determine the value of this constant by assuming that the pressure at some reference height is Part F 1 Integrate What is the expression obtained by integrating the left hand side of the equation Although the indefinite integral of the left hand side of the equation should include a constant determined by initial conditions you can combine it with the constant on the right hand side Leave it out of your answer here ANSWER Part F 2 Integrate What is the expression obtained by integrating the right hand side of the equation Here you will need to include the constant determined by initial conditions call it ANSWER Part F 3 Determine the constant of integration According to the statement of the initial conditions the value of the constant Using this fact find Express your answer in terms of ANSWER and other given quantities Express your answer in terms of quantities given in the problem introduction along with and ANSWER Buoyant Force Conceptual Question Description Conceptual question on the properties of a floating wooden block A rectangular wooden block of weight floats with exactly one half of its volume below the waterline Part A What is the buoyant force acting on the block Hint A 1 Archimedes principle The upward buoyant force on a floating or submerged object is equal to the weight of the liquid displaced by the object Mathematically the buoyant force on a floating or submerged object is where is the density of the fluid the acceleration due to gravity is the submerged volume of the object and is Hint A 2 What happens at equilibrium The block is in equilibrium so the net force acting on it is equal to zero ANSWER The buoyant force cannot be determined Part B The density of water is 1 00 What is the density of the block Hint B 1 Applying Archimedes principle In Part A you determined that the buoyant force and hence the weight of the water displaced is equal to the weight of the block Notice however that the volume of the water displaced is one half of the volume of the block Hint B 2 Density The density of a material of mass and volume is mg Fbouyant mg Fbouyant 1 2 water g V wood gV water 2 wood ANSWER 2 00 between 1 00 and 2 00 1 00 between 0 50 and 1 00 0 50 The density cannot be determined Part C Masses are stacked on top of the block until the top of the block is level with the waterline This requires 20 of mass What is the mass of the wooden block Hint C 1 How to approach the problem When you add the extra mass on top of the block the buoyant force must change Relating the mass to the new buoyant force will allow you to write an equation to solve for Part C 2 Find the new buoyant force With the 20 mass on the block twice as much of the block is underwater Therefore what happens to the buoyant force on the block Fbouyant water gVunder Fbouyant water gVunder ANSWER Hint C 3 The buoyant force doubles The buoyant force is halved The buoyant force doesn t change System mass Before the 20 mass is placed on the block the mass of the system is just the mass of the block and this mass is supported by the buoyant force With the 20mass on top the total mass of the system is now Hint C 4 The mass equation The original buoyant force was equal to the weight buoyant force of the block If the new is twice the old buoyant force then where is the mass of the block The new buoyant force must
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