1. Chapter 13 Temperature and Kinetic Theory

2. 13-1 Atomic Theory of Matter Atomic and molecular masses are measured in unified atomic mass units (u). This unit is defined so that the carbon-12 atom has a mass of exactly 12.0000 u. Expressed in kilograms: Brownian motion is the jittery motion of tiny flecks in water; these are the result of collisions with individual water molecules.

3. 13-1 Atomic Theory of Matter On a microscopic scale, the arrangements of molecules in solids (a), liquids (b), and gases (c) are quite different.

4. 13-2 Temperature and Thermometers Temperature is a measure of how hot or cold something is. Most materials expand when heated.

6. Applications of Thermal Expansion – Bimetallic Strip Thermostats –Use a bimetallic strip –Two metals expand differently

7. 13-2 Temperature and Thermometers Common thermometers used today include the liquid-in-glass type and the bimetallic strip.

8. Comparing Temperature Scales

9. Converting Among Temperature Scales

10. 13-3 Thermal Equilibrium and the Zeroth Law of Thermodynamics Two objects placed in thermal contact will eventually come to the same temperature. When they do, we say they are in thermal equilibrium. The zeroth law of thermodynamics says that if two objects are each in equilibrium with a third object, they are also in thermal equilibrium with each other.

11. 13-4 Thermal Expansion Linear expansion occurs when an object is heated. Here, α is the coefficient of linear expansion. ΔL = αL o ΔT

12. 13-4 Thermal Expansion Volume expansion is similar, except that it is relevant for liquids and gases as well as solids: (13-2) Here, β is the coefficient of volume expansion. For uniform solids,

13. 13-4 Thermal Expansion

14. 12.4 Linear Thermal Expansion Example 3 The Buckling of a Sidewalk A concrete sidewalk is constructed between two buildings on a day when the temperature is 25 o C. As the temperature rises to 38 o C, the slabs expand, but no space is provided for thermal expansion. Determine the distance y in part (b) of the drawing.

15. 12.4 Linear Thermal Expansion

16. THE BIMETALLIC STRIP

17. 12.4 Linear Thermal Expansion THE EXPANSION OF HOLES Conceptual Example 5 The Expansion of Holes The figure shows eight square tiles that are arranged to form a square pattern with a hole in the center. If the tiled are heated, what happens to the size of the hole?

18. 12.4 Linear Thermal Expansion A hole in a piece of solid material expands when heated and contracts when cooled, just as if it were filled with the material that surrounds it.

19. 12.5 Volume Thermal Expansion VOLUME THERMAL EXPANSION The volume of an object changes when its temperature changes: coefficient of volume expansion Common Unit for the Coefficient of Volume Expansion:

20. 12.5 Volume Thermal Expansion Example 8 An Automobile Radiator A small plastic container, called the coolant reservoir, catches the radiator fluid that overflows when an automobile engine becomes hot. The radiator is made of copper and the coolant has an expansion coefficient of 4.0x10 -4 (C o ) -1. If the radiator is filled to its 15-quart capacity when the engine is cold (6 o C), how much overflow will spill into the reservoir when the coolant reaches its operating temperature (92 o C)?

21. 12.5 Volume Thermal Expansion

22. Expansion of water.

23. Solid and Liquid Water Liquid Solid

24. Gas Laws Copyright© by Houghton Mifflin Company. All rights reserved. 24 P 1 V 1 =P 2 V 2 T 1 T 2 V 1 =V 2 T 1 T 2 P 1 V 1 = P 2 V 2 P 1 =P 2 T 1 T 2 n = mass molar mass PV = nRT PV = nkT P total = P a + P b + P c Boyle’s Law Gay-Lussac’s Law Charles’s Law Ideal Gas Law Dalton’s Law of Partial Pressure Combined Gas Law

25. 13-7 The Ideal Gas Law We can now write the ideal gas law: (13-3) where n is the number of moles and R is the universal gas constant.

26. 13-8 Problem Solving with the Ideal Gas Law Useful facts and definitions: Standard temperature and pressure (STP) Volume of 1 mol of an ideal gas is 22.4 L If the amount of gas does not change: Always measure T in kelvins P must be the absolute pressure

27. 13-9 Ideal Gas Law in Terms of Molecules: Avogadro’s Number Since the gas constant is universal, the number of molecules in one mole is the same for all gases. That number is called Avogadro’s number: The number of molecules in a gas is the number of moles times Avogadro’s number:

28. 13-9 Ideal Gas Law in Terms of Molecules: Avogadro’s Number Therefore we can write: where k is called Boltzmann’s constant. (13-4)

29. 14.1 Molecular Mass, the Mole, and Avogadro’s Number To facilitate comparison of the mass of one atom with another, a mass scale know as the atomic mass scale has been established. The unit is called the atomic mass unit (symbol u). The reference element is chosen to be the most abundant isotope of carbon, which is called carbon-12. The atomic mass is given in atomic mass units. For example, a Li atom has a mass of 6.941u.

30. 14.1 Molecular Mass, the Mole, and Avogadro’s Number One mole of a substance contains as many particles as there are atoms in 12 grams of the isotope cabron-12. The number of atoms per mole is known as Avogadro’s number, N A. number of moles number of atoms

31. 14.1 Molecular Mass, the Mole, and Avogadro’s Number The mass per mole (in g/mol) of a substance has the same numerical value as the atomic or molecular mass of the substance (in atomic mass units). For example Hydrogen has an atomic mass of 1.00794 g/mol, while the mass of a single hydrogen atom is 1.00794 u.

32. 14.1 Molecular Mass, the Mole, and Avogadro’s Number Example 1 The Hope Diamond and the Rosser Reeves Ruby The Hope diamond (44.5 carats) is almost pure carbon. The Rosser Reeves ruby (138 carats) is primarily aluminum oxide (Al 2 O 3 ). One carat is equivalent to a mass of 0.200 g. Determine (a) the number of carbon atoms in the Hope diamond and (b) the number of Al 2 O 3 molecules in the ruby.

33. 14.1 Molecular Mass, the Mole, and Avogadro’s Number (a) (b)

34. 14.2 The Ideal Gas Law An ideal gas is an idealized model for real gases that have sufficiently low densities. The condition of low density means that the molecules are so far apart that they do not interact except during collisions, which are effectively elastic. Ideal gas behavior breaks down at high pressure and low temperature …why? At constant volume the pressure is proportional to the temperature.

35. 14.2 The Ideal Gas Law At constant temperature, the pressure is inversely proportional to the volume. The pressure is also proportional to the amount of gas.

36. 14.2 The Ideal Gas Law THE IDEAL GAS LAW The absolute pressure of an ideal gas is directly proportional to the Kelvin temperature and the number of moles of the gas and is inversely proportional to the volume of the gas.

37. 14.2 The Ideal Gas Law k is called Boltzmann’s Constant

38. 14.2 The Ideal Gas Law Example 2 Oxygen in the Lungs In the lungs, the respiratory membrane separates tiny sacs of air (pressure 1.00x10 5 Pa) from the blood in the capillaries. These sacs are called alveoli. The average radius of the alveoli is 0.125 mm, and the air inside contains 14% oxygen. Assuming that the air behaves as an ideal gas at 310K, find the number of oxygen molecules in one of these sacs.

39. 14.2 The Ideal Gas Law

40. Consider a sample of an ideal gas that is taken from an initial to a final state, with the amount of the gas remaining constant. Combined Gas Law

41. 14.2 The Ideal Gas Law Constant T, constant n: Boyle’s law Constant P, constant n: Charles’ law Constant V, constant n:

42. Gas Law Example If a quantity of gas is at a pressure of 12 atm, a volume of 23 liters, and a temperature of 200 K, and the pressure is raised to 14 atm and the temperature is increased to 300 K, what is the new volume of the gas?

43. Gas Law Example A student heats a balloon in the oven. If the balloon initially has a volume of 0.4 liters and a temperature of 20 0 C, what will the volume of the balloon be after he heats it to a temperature of 250 0 C?

44. 14.3 Kinetic Theory of Gases The particles are in constant, random motion, colliding with each other and with the walls of the container. Each collision changes the particle’s velocity. As a result, the atoms and molecules have different velocities.

45. 14.3 Kinetic Theory of Gases THE DISTRIBUTION OF MOLECULAR SPEEDS

46. 14.3 Kinetic Theory of Gases

47. Example 6 The Speed of Molecules in Air Air is primarily a mixture of nitrogen N 2 molecules (molecular mass 28.0u) and oxygen O 2 molecules (molecular mass 32.0u). Assume that each behaves as an ideal gas and determine the rms speeds of the nitrogen and oxygen molecules when the temperature of the air is 293K.

48. 14.3 Kinetic Theory of Gases For nitrogen… For O 2, v rms =478 m/s

49. 14.3 Kinetic Theory of Gases THE INTERNAL ENERGY OF A MONATOMIC IDEAL GAS

50. 13-10 Kinetic Theory and the Molecular Interpretation of Temperature Assumptions of kinetic theory: large number of molecules, moving in random directions with a variety of speeds molecules are far apart, on average molecules obey laws of classical mechanics and interact only when colliding collisions are perfectly elastic

51. 13-6 The Gas Laws and Absolute Temperature The relationship between the volume, pressure, temperature, and mass of a gas is called an equation of state. We will deal here with gases that are not too dense. Boyle’s Law: the volume of a given amount of gas is inversely proportional to the pressure as long as the temperature is constant.

52. 13-6 The Gas Laws and Absolute Temperature The volume is linearly proportional to the temperature, as long as the temperature is somewhat above the condensation point and the pressure is constant: Extrapolating, the volume becomes zero at −273.15°C; this temperature is called absolute zero.

53. 13-6 The Gas Laws and Absolute Temperature The concept of absolute zero allows us to define a third temperature scale – the absolute, or Kelvin, scale. This scale starts with 0 K at absolute zero, but otherwise is the same as the Celsius scale. Therefore, the freezing point of water is 273.15 K, and the boiling point is 373.15 K. Finally, when the volume is constant, the pressure is directly proportional to the temperature:

54. 13-7 The Ideal Gas Law We can combine the three relations just derived into a single relation: What about the amount of gas present? If the temperature and pressure are constant, the volume is proportional to the amount of gas:

55. 13-7 The Ideal Gas Law A mole (mol) is defined as the number of grams of a substance that is numerically equal to the molecular mass of the substance: 1 mol H 2 has a mass of 2 g 1 mol Ne has a mass of 20 g 1 mol CO 2 has a mass of 44 g The number of moles in a certain mass of material:

56. 13-10 Kinetic Theory and the Molecular Interpretation of Temperature The force exerted on the wall by the collision of one molecule is Then the force due to all molecules colliding with that wall is

57. 13-10 Kinetic Theory and the Molecular Interpretation of Temperature The averages of the squares of the speeds in all three directions are equal: So the pressure is: (13-6)

58. 13-10 Kinetic Theory and the Molecular Interpretation of Temperature Rewriting, (13-7) so (13-8) The average translational kinetic energy of the molecules in an ideal gas is directly proportional to the temperature of the gas.

59. 13-10 Kinetic Theory and the Molecular Interpretation of Temperature We can invert this to find the average speed of molecules in a gas as a function of temperature: (13-9)

60. 13-11 Distribution of Molecular Speeds These two graphs show the distribution of speeds of molecules in a gas, as derived by Maxwell. The most probable speed, v P, is not quite the same as the rms speed. As expected, the curves shift to the right with temperature.

61. Summary of Chapter 13 All matter is made of atoms. Atomic and molecular masses are measured in atomic mass units, u. Temperature is a measure of how hot or cold something is, and is measured by thermometers. There are three temperature scales in use: Celsius, Fahrenheit, and Kelvin. When heated, a solid will get longer by a fraction given by the coefficient of linear expansion.

62. Summary of Chapter 13 The fractional change in volume of gases, liquids, and solids is given by the coefficient of volume expansion. Ideal gas law: One mole of a substance is the number of grams equal to the atomic or molecular mass. Each mole contains Avogadro’s number of atoms or molecules. The average kinetic energy of molecules in a gas is proportional to the temperature:

63. Summary of Chapter 13 Below the critical temperature, a gas can liquefy if the pressure is high enough. At the triple point, all three phases are in equilibrium. Evaporation occurs when the fastest moving molecules escape from the surface of a liquid. Saturated vapor pressure occurs when the two phases are in equilibrium. Relative humidity is the ratio of the actual vapor pressure to the saturated vapor pressure. Diffusion is the process whereby the concentration of a substance becomes uniform.