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Chapter 9 Solids and Fluids
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States of matter Solid Liquid Gas Plasma
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Solids Have definite volume and shape Molecules:
1) are held in specific locations by electrical forces 2) vibrate about equilibrium positions 3) can be modeled as springs connecting molecules
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Solids Crystalline solid: atoms have an ordered structure (e.g., diamond, salt) Amorphous solid: atoms are arranged almost randomly (e.g., glass)
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Fluids Fluids – substances that can flow (gases, liquids)
Fluids conform with the boundaries of any container in which they are placed Fluids lack orderly long-range arrangement of atoms and molecules they consist of Fluids can be compressible and incompressible
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Liquids Have a definite volume, but no definite shape
Exists at a higher temperature than solids The molecules “wander” through the liquid in a random fashion The intermolecular forces are not strong enough to keep the molecules in a fixed position
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Gases Have neither definite volume nor definite shape
Molecules are in constant random motion The molecules exert only weak forces on each other Average distance between molecules is large compared to the size of the molecules
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Plasmas Matter heated to a very high temperature
Many of the electrons are freed from the nucleus Result is a collection of free, electrically charged ions Plasmas exist inside stars
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Indeterminate structures
Indeterminate systems cannot be solved by a simple application of the equilibrium conditions In reality, physical objects are not absolutely rigid bodies Concept of elasticity is employed
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Elasticity All real “rigid” bodies can change their dimensions as a result of pulling, pushing, twisting, or compression This is due to the behavior of a microscopic structure of the materials they are made of Atomic lattices can be approximated as sphere/spring repetitive arrangements
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stress = modulus * strain
Stress and strain All deformations result from a stress – deforming force per unit area Deformations are described by a strain – unit deformation Coefficient of proportionality between stress and strain is called a modulus of elasticity stress = modulus * strain
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Tension and compression
Strain is a dimensionless ratio – fractional change in length of the specimen ΔL/Li The modulus for tensile and compressive strength is called the Young’s modulus Thomas Young (1773 – 1829)
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Tension and compression
Strain is a dimensionless ratio – fractional change in length of the specimen ΔL/Li The modulus for tensile and compressive strength is called the Young’s modulus
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Shearing For the stress, force vector lies in the plane of the area
Strain is a dimensionless ratio Δx/h The modulus for this case is called the shear modulus
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Hydraulic stress The stress is fluid pressure P = F/A
Strain is a dimensionless ratio ΔV/V The modulus is called the bulk modulus
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Density and pressure Density SI unit of density: kg/m3 Pressure
Blaise Pascal ( ) Density and pressure Density SI unit of density: kg/m3 Pressure SI unit of pressure: N/m2 = Pa (pascal) Pressure is a scalar – at a given point in a fluid the measured force is the same in all directions For a uniform force on a flat area
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Atmospheric pressure Atmospheric pressure:
P0 = 1.00 atm = x 105 Pa Specific gravity of a substance is the ratio of its density to the density of water at 4° C (1000 kg/m3) Specific gravity is a unitless ratio
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Fluids at rest For a fluid at rest (static equilibrium) the pressure is called hydrostatic For a horizontal-base cylindrical water sample in a container
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Fluids at rest The hydrostatic pressure at a point in a fluid depends on the depth of that point but not on any horizontal dimension of the fluid or its container Difference between an absolute pressure and an atmospheric pressure is called the gauge pressure
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Measuring pressure Mercury barometer Open-tube manometer
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Chapter 9 Problem 19 A collapsible plastic bag contains a glucose solution. If the average gauge pressure in the vein is 1.33 × 103 Pa, what must be the minimum height h of the bag in order to infuse glucose into the vein? Assume that the specific gravity of the solution is 1.02.
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Pascal’s principle Pascal’s principle: A change in the pressure applied to an enclosed incompressible fluid is transmitted undiminished to every portion of the fluid and to the walls of its container Hydraulic lever With a hydraulic lever, a given force applied over a given distance can be transformed to a greater force applied over a smaller distance
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Archimedes’ principle
of Syracuse ( BCE) Archimedes’ principle Buoyant force: For imaginary void in a fluid p at the bottom > p at the top Archimedes’ principle: when a body is submerged in a fluid, a buoyant force from the surrounding fluid acts on the body. The force is directed upward and has a magnitude equal to the weight of the fluid that has been displaced by the body
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Archimedes’ principle
Sinking: Floating: Apparent weight: If the object is floating at the surface of a fluid, the magnitude of the buoyant force (equal to the weight of the fluid displaced by the body) is equal to the magnitude of the gravitational force on the body
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Chapter 9 Problem 34 A light spring of force constant k = 160 N/m rests vertically on the bottom of a large beaker of water. A 5.00-kg block of wood (density = 650 kg/m3) is connected to the spring, and the block–spring system is allowed to come to static equilibrium. What is the elongation ΔL of the spring?
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Motion of ideal fluids Flow of an ideal fluid:
Steady (laminar) – the velocity of the moving fluid at any fixed point does not change with time (either in magnitude or direction) Incompressible – density is constant and uniform Nonviscous – the fluid experiences no drag force Irrotational – in this flow the test body will not rotate about its center of mass
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Equation of continuity Equation of continuity
For a steady flow of an ideal fluid through a tube with varying cross-section Equation of continuity
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Bernoulli’s equation For a steady flow of an ideal fluid:
Daniel Bernoulli ( ) Bernoulli’s equation For a steady flow of an ideal fluid: Kinetic energy Gravitational potential energy Internal (“pressure”) energy
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Bernoulli’s equation Total energy
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Chapter 9 Problem 43 A hypodermic syringe contains a medicine having the density of water. The barrel of the syringe has a cross-sectional area A = 2.50 × 10-5 m2, and the needle has a cross-sectional area a = 1.00 × 10-8 m2. In the absence of a force on the plunger, the pressure everywhere is 1 atm. A force F of magnitude 2.00 N acts on the plunger, making medicine squirt horizontally from the needle. Determine the speed of the medicine as it leaves the needle’s tip.
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Surface tension Net force on molecule A is zero, because it is pulled equally in all directions Net force on B is not zero, because no molecules above to act on it It is pulled toward the center of the fluid
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Surface tension The net effect of this pull on all the surface molecules is to make the surface of the liquid contract Makes the surface area of the liquid as small as possible – surface tension
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Surface tension Surface tension: the ratio of the magnitude of the surface tension force to the length along which the force acts: SI units are N/m Surface tension of liquids decreases with increasing temperature Surface tension can be decreased by adding ingredients called surfactants to a liquid (e.g., a detergent)
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Liquid surfaces Cohesive forces are forces between like molecules, adhesive forces are forces between unlike molecules The shape of the surface depends upon the relative strength of the cohesive and adhesive forces If adhesive forces are greater than cohesive forces, the liquid clings to the walls of the container and “wets” the surface
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Liquid surfaces Cohesive forces are forces between like molecules, adhesive forces are forces between unlike molecules The shape of the surface depends upon the relative strength of the cohesive and adhesive forces If cohesive forces are greater than adhesive forces, the liquid curves downward and does not “wet” the surface
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Contact angle If cohesive forces are greater than adhesive forces, Φ > 90° If adhesive forces are greater than cohesive forces, Φ < 90°
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Capillary action Capillary action is the result of surface tension and adhesive forces The liquid rises in the tube when adhesive forces are greater than cohesive forces
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Capillary action Capillary action is the result of surface tension and adhesive forces The level of the fluid in the tube is below the surface of the surrounding fluid if cohesive forces are greater than adhesive forces
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Viscous fluid flow Viscosity: friction between the layers of a fluid
Layers in a viscous fluid have different velocities The velocity is greatest at the center Cohesive forces between the fluid and the walls slow down the fluid on the outside
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Questions?
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Answers to the even-numbered problems
Chapter 9 Problem 14: 1.9 × 104 N
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Answers to the even-numbered problems
Chapter 9 Problem 22: 10.5 m; no, some alcohol and water evaporate
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Answers to the even-numbered problems
Chapter 9 Problem 26: 0.611 kg
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