Hydrostatics: Fluids at Rest

Hydrostatics: Fluids at Rest

Fluid Mechanics • applying Newtonian principles to fluids • hydrostatics—the study of stationary fluids in which all forces are in equilibrium

Fluid Mechanics • hydrodynamics—the study of fluids in motion

Density • abbreviation: ρ • mass per unit volume • g/cm³ is commonly used • SI unit: kg/m³

Density • specific gravity: density relative to water • dimensionless number • numerically equal to the density of the substance in g/cm³

Units of Pressure • Pressure is defined as the force exerted perpendicular to a unit area. • When a fluid is at rest, the pressure is uniform throughout the fluid in all directions.

Units of Pressure • At the boundaries of a fluid, the container exerts a pressure on the fluid identical to the pressure the fluid exerts on the container.

Units of Pressure • SI unit: Pascal (Pa) • Earliest: atmosphere (atm) • 1 atm = 1.013 × 105 Pa • torr • bars and millibars (mb) • 1 atm = 1.013 bar = 1013 mb

Units of Pressure • gauge pressure (Pg) often used with piping systems • absolute pressure (P)

Incompressible Fluids • pressure changes with depth • density is usually assumed to be constant throughout depth • y = d2 = d1 + Δd • ΣF = 0 N

Incompressible Fluids • ΣFy = Fd1 + Fd2 + Fw = 0 N • to calculate the pressure at any depth d: Pd = Pref + ρgd

Incompressible Fluids Pd = Pref + ρgd • d is expressed as a negative scalar distance • g = -9.81 m/s² • Pref is atmospheric pressure if the liquid’s container is open to the atmosphere

ρref - |g|h Pref P = Prefe Compressible Fluids • usually referring to gases, since their density is not constant with height/depth

Compressible Fluids • must remember that temperature also affects the pressure of a gas

Hydraulic Devices • Pascal’s principle: the external pressure applied to a completely enclosed incompressible fluid is distributed in all directions throughout the fluid

Hydraulic Devices • machines that transmit forces via enclosed liquids • small input forces can generate large output forces

Hydraulic Devices • note the cross-sectional areas of each • Fout = nFin

Hydraulic Devices • note the distance each piston travels

Pressure Indicators • manometer • barometer • first instrument to accurately measure atmospheric pressure • used mercury

Buoyancy • famous problem: Archimedes and the crown • What happens when an object is placed in a fluid?

Buoyancy • for object in fluid: • Fw-o: gravitational force on object in fluid • Fb: buoyant force on object • Fb = ρ|g|V

Buoyancy • Fb = ρ|g|V • ρ is the density of the displaced fluid

Buoyancy • Archimedes’ principle: any system that is submerged or floats in a fluid is acted on by an upward buoyant force equal in magnitude to the weight of the fluid it displaces

Buoyancy • If the buoyant force is equal to the system’s weight, the forces are balanced and no acceleration occurs. • requires object and fluid to have equal density

Buoyancy • If the weight of a system is greater than that of the displaced fluid, its density is greater than the fluid’s. • Since weight exceeds the buoyant force, the object will sink.

Buoyancy • If the weight of a system is less than that of the displaced fluid, its density is less than the fluid’s. • Since buoyant force is greater than weight, the object will accelerate up.

Buoyancy • When the object rises to the surface of the liquid, its volume remaining beneath the surface changes the buoyant force until they are in equilibrium.

Buoyancy • This is also true with gases. • The density of a gas changes with altitude and temperature. • The object may respond to a change in pressure.

Center of Buoyancy • Every object submerged in a fluid has both a center of mass and a center of buoyancy. • These are the same for objects of uniform density that are completely submerged.

Center of Buoyancy • defined: the center of mass of the fluid that would occupy the submerged space that the object occupies

Center of Buoyancy • If the center of mass and center of buoyancy are not the same, the object will experience a torque and rotate. • The center of buoyancy will be directly above the center of gravity.

Hydrometer • instrument used to measure density • has many uses

Hydrodynamics: Fluids in Motion

Ideal Fluids • assumptions: • the fluid flows smoothly • the velocity of the fluid does not change with time at a fixed location in the fluid path

Ideal Fluids • assumptions: • the density of the fluid is constant (incompressible) • friction has no effect on fluid flow

Ideal Fluids • Streamlines • not a physical reality • laminar • turbulent • flow tube

Ideal Fluids • The rate of volume and mass flow into a segment of a flow tube equals the rate of volume and mass flow out of the flow tube segment.

Flow Continuity • equation of flow continuity: A1v1 = A2v2 • requires tubes with smaller cross-sectional areas to have higher fluid velocities

Bernoulli’s Principle • background equations: ΔK = ½ρΔVv22 – ½ρΔVv12 Equation 17.12 ΔU = ρΔV|g|h2 – ρΔV|g|h1 Equation 17.13

Bernoulli’s Principle • background equations: Wncf = ΔK + ΔU Equation 17.14 Wncf = P1ΔV – P2ΔV Equation 17.15

P1 + ½ρv12 + ρ|g|h1 = P2 + ½ρv22 + ρ|g|h2 Bernoulli’s Principle • Bernoulli’s Equation:

P1 + ½ρv12 + ρ|g|h1 = P2 + ½ρv22 + ρ|g|h2 Bernoulli’s Principle • if the velocity does not change: v1 = v2 P1 + ρ|g|h1 = P2 + ρ|g|h2

P1 + ½ρv12 + ρ|g|h1 = P2 + ½ρv22 + ρ|g|h2 Bernoulli’s Principle • if the elevation of the fluid does not change: h1 = h2 P1 + ½ρv12 = P2 + ½ρv22

Bernoulli’s Principle • A faster-flowing fluid will have streamlines that are closer together. • A lower-pressure fluid will have streamlines that are closer together.

Lift • airfoil: any device that generates lift as air flows along its surface • hydrofoil: object that creates lift in liquid

Theories of Lift • Bernoulli principle • Conadă effect

Real Fluids • viscosity: a measure of the resistance of fluid to a flow • caused by cohesive forces between particles of a fluid • a type of internal friction • coefficient of viscosity (η)

Real Fluids • lower coefficients of viscosity indicate that the fluids flow more easily • viscosity is sometimes referred to as the “thickness” of a fluid

Real Fluids • particles closest to the walls move more slowly than those farther from the walls

Hydrostatics: Fluids at Rest