Chapter 5 Written by JoAnne Swanson University of Central Florida

Thermodynamics Chapter 5 Written by JoAnne Swanson University of Central Florida

Topics • Types of energy and units of energy • Exothermic vs. endothermic reactions • Heat capacity and specific heat • Energy transfers in changes of state • Calorimetry • Enthalpy and entropy • Hess’s Law

Energy is defined as the capacity to do work. • There are two categories of energy: • Kinetic energy. • Potential energy • Kinetic Energy is the energy of motion • Potential energy is energy of position,

Chemical energy is a form of potential energy stored in the structure of a chemical substance due to its composition.

Consider the potential energy of a rock up on a cliff. If one rock is up on a 1000 ft. cliff and another is up on a 10 ft. hill, the rock that is 1000ft. up will hit the ground with much more energy than the other if it falls.

Chemical energy has similar differences in that the structure of one substance may contain much more potential energy than another substance.

Kinetic Energy of an object depends on its mass and velocity: Ek = ½ (mv2) or mv2/2 mass is in Kg, and Kg.m2/s2 = 1 Joule, the unit used to designate energy. From this equation you should see that Ek increases with mass and with velocity

Potential Energy depends on gravity, mass, and position: Ep = mgh = (mass, gravity, height) (gravitational constant = 9.8 m/s2) But Ep of submicroscopic substances (molecules, ions, etc.) electrical charges between particles.

Electrical charge is designated by the symbol ‘Q’ and has the value of an electron charge = 1.60 x 10-19 C The unit for electrical charge is the coulomb ( C). Eel = kQ1Q2 / d where k=8.99x109Jm C2 This equation shows the electrostatic forces of attraction between two particles, 1 and 2, are inversely proportional to the distance between the particles.

Another energy unit we will use is the calorie. 1 c = 1 cal = 4.184 J This differs from the nutritional calorie which is 1C = 1000c = 1Kcal

Thermochemistry is the study of heat transfers occurring in chemical and physical changes of substances. • Thermal energy • random motion of atoms and molecules.

The Universe is made up of the system and the surroundings The system is the part of the universe that is of interest to us. The surroundings is everything outsideof the system.

Energy is transferred as heat and work. Work = Force x Distance = pressure x volume It usually pertains to either the electrical work (for instance in a battery) or mechanical work (like the pressure exerted on or by a gas in a reaction).

The change in Internal Energy of a system = DE = q + w • DE is the change in internal energy • q = heat • w = work • Heat can flow into the system or out of the system. • sign on q • Work can be done on the system or by the system. • sign on w

Exothermic vs. Endothermic Processes • Any process that gives off heat to the surroundings is an Exothermic process. • bonds are made

When a process absorbs heat from the surroundings it is an Endothermic process. When ice melts it absorbs heat from the surroundings, thus it is an endothermic process.

To measure the change in internal energy of a chemical reaction, the reaction is often carried out in a “bomb calorimeter”. There is no change in volume in this sealed container, therefore there is no work involved and DE = qreaction (at constant volume)

The symbol DH is used to represent the change in heat into or out of the system. It is defined as the change in enthalpy.

Enthalpy and Internal Energy are nearly equal. Enthalpy takes into account reactions at constant pressure where an expanding gas does work on the surroundings. Remember w = PV, but if w is done by the system, w = -PV H = E +PV and DH = DE + DPV w = - DPV so, DH = (q + w) – w DH = q (at constant pressure)

1 mole gas at 25oCand 1atm has a volume of 24.5L =( 24.5 L.atm / mol ) • 1 L.atm = 0.1013 kJ • DPV makes little difference in the DH value, and even less difference for liquids or solids. • why?

If 1 L.atm = 0.1013 kJ how many kJ are in the molar volume of a gas at 25oC? 24.5 L.atm x 0.1013 kJ = 2.5 kJ 1 L.atm see next example

Examples: given the values for PV, calculate the change in enthalpy for the combustion of methane where DE = -885 kJ PV at 25oC CH4(g) 2.5 KJ/ mol O2(g) 2.5 KJ/ mol CO2(g) 2.5 KJ/ mol H20(l) 0.0018 KJ/ mol DH = DE + DPV (DPV = PV products – PV reactants) continued………

CH4(g) + 2 O2 (g)  CO2(g) + 2 H2O (l) DPV = PV CO2 + 2PV H2O –[PV CH4 + 2PV O2 DPV = [2.5 KJ + 2(0.0018 KJ)] – [2.5 KJ + 2(2.5 KJ) ] DPV = -5.0 KJ DH = -885 KJ - 5.0 KJ = -890 KJ Carried out at constant pressure, DH = -885 KJ Not a big difference when DPV is added

EXAMPLE 2: • Calculate the kinetic energy in joules, of a 45 g golf ball moving at 61 m/s. • Convert this energy to calories. • What happens to the energy when the ball strikes a tree? • Since 1J = 1kg m2/s2 • change g to kg. • 45 g = 0.045 kg

Ek = mv2 / 2 = 0.045 kg x (61m/s)2 • 2 • = 84 kg m2= 84 J • s2 • 84 J x 1cal = 20 cal • 4.184 J • c. When the ball hits the tree, velocity = 0 and so does Kinetic energy. Kinetic Energy is transferred as potential energy to the tree and the deformed golf ball.

Example 4: Calculate DE when a balloon is inflated completely by heating it. The volume changes from 4.00 x 106 L to 4.50 x 106 L, with the addition of 1.3 x 108 J of heat. The balloon expands against an internal pressure of 1.0 atm. DE = q+w w = - DPV because ________________ q is positive because _________________

DV = 4.50 x 106L - 4.00 x 106L = 5.00 x 105 L -PDV = 5.00 x 105 L x (-1.0 atm) =5.00 x 105 Latm = -5.07 x 107 J DE = 1.3 x 108J – 5.07 x 107J = 7.9 x 107 J

Example 3: Calculate DE when a gas is compressed from 6.0 x 104L to 5.3 x 104L under an external pressure of 1.3 atm. The amount of heat transferred to the surroundings was 4.3 x 102 J. DE = w + q, where w = +DPV why? DV = 5.3 x 104L - 6.0 x 104L = - 7.0 x 103L DPV = (1.3 atm)(- 7.0 x 103L) = -9.1 x 103Latm

-9.1 x 103 Latm x 0.1013 kJ = -9.2 x 102 KJ Latm In this case since the gas was compressed, w = + and since heat was transferred to the surroundings, q = - . DE = w – q, = -9.2 x 105 J – 4.3 x 102 J = = - 9.2043 x 105 J = - 9.2 x 105 J

The enthalpy of reaction is the difference between the enthalpies of the products and reactants. DH(rxn) = S DHf(products) – S DHf(reactants)

energy expelled Ea Ea energy added products Energy reactants Energy products reactants reaction progression reaction progression Endothermic Exothermic

The diagram illustrates energy givenoff when bonds are madebetween H2 and O2 , (a). Energy is absorbed when bonds are brokenin HgO , (b).

The units of energy are Kilojoules and Calories. Enthalpy of reaction will be expressed as Kilojoules (Kj).

It is important to note the following when calculating the enthalpy of reaction: • The enthalpy of a substance in its standard state is equal to zero. • Enthalpy is dependent on the quantity of the substance therefore the enthalpy of a substance must be multiplied by its coefficient in the chemical equation.

When a rxn is reversed, the sign on the enthalpy of rxn is changed. • If a rxn is divided through or multiplied through by a number, so is the enthalpy of rxn. • the state of matter is important in enthalpy calculations.

Enthalpy of formation values of compounds are found in tables of thermodynamic data. The enthalpy of formation is defined as the energy associated with the formation of 1 mole of a substance from its elements in their standard states. Na(s) + 1/2 Cl2 (g) NaCl The formation equation for sodium chloride

Ex. 1 Determine the enthalpy for the following chemical reaction: CO2 (g) + 2 H2O (l) -----> 2 O2 (g) + CH4 (g)

Use appendix C pg. 1041 in your text to find the individual enthalpy values. CO2 (g) = -393.509, H2O (l) = -285.83 CH4 (g) = -74.81 , O2(g)= 0 CO2 + 2 H2O  2 O2 + CH4 DH =SDHf(products) – S DHf(reactants) DH = (0 + -74.81)-(-393.509 + 2(- 285.83)) = -74.81 + 965.17 = 890.36 Kj

HESS’S LAW ENTHALPY IS A STATE FUNCTION. ENTHALPY OF A REACTION WILL BE THE SAME NO MATTER WHAT PATH IS TAKEN TO ARRIVE AT THE PRODUCTS.

This means that if we need to calculate the enthalpy of a reaction for which we do not know the enthalpies of formation, we can algebraically manipulate other reactions to arrive at the enthalpy for the desired reaction.

Ex. Determine the DHrxn for Sn(s) + 2 Cl2 (g) SnCl4(l) Given the following: Sn(s) + Cl2 (g) SnCl2(s) DH1= -349.8 kJ SnCl2(s) + Cl2 (g) SnCl4(l) DH2= -195.4 kJ Sn (s) + 2 Cl2 (g) SnCl4(l) DH3= ? DH1 + DH2 = DH3 = -545.2 kJ

Ex. Calculate theDHrxn for S (s) + O2(g) SO2(g) Given S (s) + 3/2 O2(g) SO3(g) DH= -395.2 kJ SO2(g) + O2(g) 2 SO3(g) DH= -198.2 kJ NOTICE THAT WE NEED SO2(g) TO BE ON THE PRODUCT SIDE. THEREFORE WE MUST REVERSE THE SECOND RXN CONTINUED

S (s) + O2(g) SO2(g) S (s) + 3/2 O2(g) SO3(g) DH= -395.2 kJ 2SO3(g) O2(g)+ 2 SO2(g) DH= +198.2 kJ IT IS ALSO NECESSARY TO DIVIDE EQUATION 2 BY 2, SO THAT WE HAVE 1SO2(g) IN THE PRODUCT. WE MUST ALSO DIVIDE THE DH +198.2 kJ / 2 = 99.10 kJ

Now add the reactions and the enthalpies. S (s) + 3/2 O2(g) SO3(g) DH= -395.2 kJ SO3(g) 1/2 O2(g)+ SO2(g) DH= +99.1 kJ S (s) + O2(g) SO2(g) DH= -296.1 kJ

The enthalpy of formation of a substance in a chemical reaction can also be calculated if the enthalpy of reaction is known and the enthalpies of the other substancesin the reaction areknown. Simply call the unknown enthalpy ‘X’ and plug in all known values to solve for ‘X’. example on transparency

Specific heat and heat Capacity Heat capacity is the amount of heat required to raise the temperature of a given quantity of a substance by 1o C. Specific Heat is the amount of heat required to raise the temperature of 1 gram of a substance by 1o C. J/goC Molar heat capacity is J / mol oC

a substance’s ability to absorb heat and to store heat. • For example, a metal _______________ • ________________________________ • A liquid like water (which contains strong intermolecular forces, hydrogen bonds), __________________________________________________________________

The metal has a ______________ and the water has a ________________. The specific heat capacity ( C ) of water is an important and easy number to remember ; C = 1 cal / g oC , (or 4.184 J / goC ) Since oC and Kelvin have the same size increments, they are interchangeable in these equations.

Calorimetry is a technique used in the lab to measure the change in enthalpy of a reaction. One apparatus used is the Bomb Calorimeter. It is a Heavy walled, steel container which has a known specific heat.

Types of Calorimetry problems we will cover: • simple change in water temperature • change in state of water • a rxn in a coffee cup calorimeter • a rxn in a bomb calorimeter • a mixture of hot substance with cold substance in a calorimeter.

Chapter 5 Written by JoAnne Swanson University of Central Florida