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Industrial Chemistry Hess’s law, Fertiliser, Sulphuric Acid, Petrochemical, Pharmaceutical and Chemical Industries.

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Presentation on theme: "Industrial Chemistry Hess’s law, Fertiliser, Sulphuric Acid, Petrochemical, Pharmaceutical and Chemical Industries."— Presentation transcript:

1 Industrial Chemistry Hess’s law, Fertiliser, Sulphuric Acid, Petrochemical, Pharmaceutical and Chemical Industries

2 Index Hess’s Law and its experimental verification
Hess’s Law calculations Industrial Chemistry Fertiliser Industry and Haber process Sulphuric acid industry Petrochemical industry and natural gas Pharmaceutical industry

3 “enthalpy change is independent of the route taken”
Hess’s Law and calculations Hess’s law states that “enthalpy change is independent of the route taken”

4 Verification of Hess’s Law
H = enthalpy change NaOH (s) NaCl (aq) Route 1 H 1 NaOH (s) NaOH (aq) + H2O (l) NaCl (aq) + HCl aq) Route 2 H 2 H 3 The conversion of solid NaOH to sodium chloride solution can be achieved by two possible routes. One is a direct,single-step process, (adding HCl (aq) directly to the solid NaOH) and secondly a two-step process (dissolve the solid NaOH in water first, then add the HCl(aq)) All steps are exothermic. If Hess’s Law applies, the enthalpy change for route 1 must be the same for the overall change for route 2. H 1 = H 2 H 3 +

5 Experimental Confirmation of Hess’s Law
Route 1 H 1 50 ml 1mol l-1 HCl Route 2 H 2 + H 3 50 ml H2O 50 ml HCl then 2.50g of KOH added to a dry, insulated beaker. Before adding the acid, its temperature is recorded. The final temperature rise after adding the acid is also recorded. g of KOH added to a dry, insulated beaker. 2. Before adding the water, its temperature is recorded. The final temperature rise after adding the water is also recorded. 3. Now add the acid, again, recording the final temperature rise. Use the equation below to calculate H2 and H 3 H 2 Knowing the specific heat capacity for water, it is then possible to calculate the Enthaply change for this reaction. H 3 H = c m T H 1 = c m T H 2 + H 3 = H 1 will verify Hess’s law

6 Combining Equations Route 1 cannot be carried out
H c C= -394 kJ mol –1 H c H = -286 kJ mol –1 Combining Equations Hess’s law can be used to calculate enthalpy changes that cannot be directly measured by experiment. Route 1 3C (s) + 3H2 (g) C3H6 (g) 3CO2 (g) + 3H2O(g) Route 2a Route 2b Route 1 cannot be carried out in a lab, as Carbon and Hydrogen will not combine directly. The products of combustion act as a stepping stone which enables a link with carbon and hydrogen (the reactants) with propane (the product) Route 2a involves the combustion of both carbon and hydrogen 3C (s) + 3O2 (g)  3CO2 (g) and 3H2 (s) O2 (g)  3H2O (g) Route 2b involves the reverse combustion of propane 3CO2 (g) + 3H2O(l)  3C2H6 (g) + 41/2O2 (g)

7 + H1 H 1 = H 2a H 2b + H 1 = + = 18.5 kJ mol -1 Route 1 3 3 3 3
3C (s) + 3H2 (g) C3H6 (g) Route 1 3CO2 (g) + 3H2O(g) Route H 2a Route H 2b 3 3 H 1 = H 2a H 2b + Route 2a H c C= -394 kJ mol –1 H c H = -286 kJ mol –1 H 2a = kJ mol –1 H 2a = -( x 394) = kJ mol -1 -( x 286) = -858 kJ mol -1 + 3 3 Route 2b H 2b = kJ mol –1 (note the reverse sign) H c Propane = kJ mol –1 H 1 = -2040 kJ mol -1 + ( kJ mol –1) = 18.5 kJ mol -1

8 Alternative approach to calculate the ΔHf of propane
C(graphite) + O2 (g)  CO2(g) ΔHo298 = -394 kJmol-1 H2(g) + ½O2(g)  H2O(g) ΔHo298 = -286 kJmol-1 C3H6(g) + 4½O2(g)  3H2O(g) + 3CO2(g)ΔHo298 = kJmol-1 3C(graphite) + 3H2 (g)  C3H6(g) ΔHf = ? Re-write the equations so that the reactants and products are on the same side of the “arrow” as the equation you are interested in. Multiply each equation so that there are the same number of moles of each constituent also. 3C(graphite) + 3O2 (g)  3CO2(g) ΔHc = 3 x -394 3H2(g) + 1½O2(g)  3H2O(g) ΔHc = 3 x -286 3H2O(g) + 3CO2(g)  C3H6(g) + 4½O2(g) ΔHc = Equation has been reversed; (enthalpy now has opposite sign)

9 Time to go! 3C(graphite) + 3O2 (g)  3CO2(g) ΔHc = 3 x -394
3H2(g) + 1½O2(g)  3H2O(g) ΔHc = 3 x -286 3H2O(g) + 3CO2(g)  C3H6(g) + 4½O2(g) ΔHc = Now add the equations and also the corresponding enthalpy values 3C(graphite) + 3H2(g)  C3H6(g) ΔHf = (3 x -394) + (3 x -286) + ( ) ΔHf = kJ mol-1 Time to go!

10 Calculate the enthalpy change for the reaction:
Example 2 Calculate the enthalpy change for the reaction: C6H6(l) + 3H2 (g)  C6H12(l) Route 1 6H2O(g) + 6CO2(g) Route 2a Route 2b 3 The products of combustion act as a stepping stone which enables a link with benzene and hydrogen (the reactants) with hexane (the product) Route 2a involves the combustion of both benzene and hydrogen C6H6(g) + 7½O2(g)  3H2O(g) + 6CO2(g) H c benzene = kJ mol –1 H2(g) + ½O2(g)  H2O(g) H c hydrogen = -286 kJ mol –1 Route 2b involves the reverse combustion of hexane 6CO2 (g) + 6H2O(l) => C6H12 (g) + 71/2O2 (g) H c hexane = kJ mol –1 H 1 = H 2a + H 2b = ( ( x - 286)) = 207 kJ mol -1 3

11 Alternative approach to problem 2
C6H12(l) + 9O2 (g)  6H2O(g) + 6CO2(g) ΔHo298 = kJmol-1 H2(g) + ½O2(g)  H2O(g) ΔHo298 = -286 kJmol-1 C6H6(g) + 7½O2(g)  3H2O(g) + 6CO2(g) ΔHo298 = kJmol-1 C6H6(l) H2(g)  C6H12(l) ΔHf = ? Re-write the equations so that the reactants and products are on the same side of the “arrow” as the equation you are interested in. Multiply each equation so that there are the same number of moles of each constituent also. C6H6(l) + 7½O2 (g)  6CO2(g) + 3H2O(g) ΔHc = 3H2(g) + 1½O2(g)  3H2O(g) ΔHc = 3 x -286 6H2O(g) + 6CO2(g)  C6H12(g) + 9O2(g) ΔHc = Equation has been reversed; (enthalpy now has opposite sign)

12 C6H6(l) + 7½O2 (g)  6CO2(g) + 3H2O(g) ΔHc = -3273
3H2(g) + 1½O2(g)  3H2O(g) ΔHc = 3 x -286 6H2O(g) + 6CO2(g)  C6H12(l) + 9O2(g) ΔHc = Now add the equations and also the corresponding enthalpy values C6H6(l) + 3H2(g)  C6H12(l) ΔHf = (3 x -286) ΔHf = -207 kJ mol-1

13 3. Use the enthalpy changes of combustion shown in the table to work out the enthalpy change of formation of ethyne, C2H2. Substance C(graphite) H2(g) C2H2(g) ΔHo(combustion) -395 kJmol-1 -286 kJmol-1 -1299 kJmol-1 “Second method” “Required” equation, 2C(graphite) + H2(g)  C2H2(g) ΔHf = ? ● 2C(graphite) + 2O2(g)  2CO2(g) ΔHc = 2 x -395 kJ mol-1 ● H2(g) + ½O2(g)  H2O(g) ΔHc = kJ mol-1 C2H2(g) + 2½O2(g)  2CO2(g) + H2O(g) ΔHc = kJ mol-1 ● 2CO2(g) + H2O(g)  C2H2(g) + 2½O2(g) ΔHc = kJ mol-1 Adding “bulleted” equations gives us 2C(graphite) + H2(g)  C2H2(g) ΔHf = (2 x -395) + (-286) ΔHf = kJ mol-1

14 Alternative method ΔHc = 278 + (2 x -394) + (3 x -286)
4. Using the following standard enthalpy changes of formation, ΔHof / kJmol-1 : CO2(g), -394; H2O(g), -286; C2H5OH(l), -278 calculate the standard enthalpy of combustion of ethanol i.e. the enthalpy change for the reaction C2H5OH(l) + 3O2(g)  2CO2(g) + 3H2O(l) C2H5OH(l) + 3O2(g)  2CO2(g) + 3H2O(g) ΔHc = ? Alternative method C(graphite) + 3H2(g) + ½O2(g)  C2H5OH(l) ΔHf = -278 ● 2C(graphite) + 2O2(g)  2CO2(g) ΔHf = 2 x -394 ● 3H2(g) ½O2(g)  3H2O (g) ΔHf = 3 x -286 ● C2H5OH(l)  C(graphite) + 3H2(g) + ½O2(g) ΔHf = +278 Add bulleted equations C2H5OH(l) + 3O2(g)  2CO2(g) + 3H2O(g) solve equation for ΔHc ΔHc = (2 x -394) + (3 x -286) ΔHc = kJ mol-1

15 Industrial Chemistry The UK chemical industry is the nation’s 4th largest manufacturing industry and the 5th largest in the world. The 3 largest sections are (a) food, drink and tobacco, (b) mechanical engineering and (c) paper, printing and publishing All chemical plants require a source of raw materials, which can either be non-living eg minerals, or living, eg plants and micro-organisms. (collectively known as biomass). A chemical plant produces the desired products. The process used to manufacture the product may be operated in continuous or batch sequences.

16

17 Temp, pressure, catalyst
Economic aspects Energy in or out Separation products Co-products Feedstock preparation REACTION Temp, pressure, catalyst Recycle loop Operating conditions Costs, capital, fixed and variable Use of energy Location of the Chemical industry Safety and the environment Consideration has to be given to

18 Choices to be made Crude oil 1. Cost, availability of feedstocks
2. Yield of the reaction 3. Can un-reacted materials be recycled 4. Can by-products be sold 5. Cost of waste disposal 6. Energy consumption, generating your own, conservation, use of catalysts, recycling, (heat exchangers), 7. Environmental issues Value added, eg the value of the products from crude oil Crude oil naphtha propene polypropene carpeting £’s per tonne 1x£’s per tonne 3x£’s per tonne 8x£’s per tonne 20x£’s per tonne

19 Fertiliser Industry Haber process Stage 1 Stage 2 Stage 3
Ammonia is manufactured from N2 and H2. The nitrogen is available from the raw material, air. (something which is available naturally). The hydrogen, like nitrogen, a feedstock for the manufacture of NH3. Hydrogen is usually produced from methane. Natural gas Water Catalyst CH4 (g) H2O(g) heat Stage 1 AIR Catalyst Stage 2 Stage 3 Catalyst N2(g) + H2 (g) alkali CO2 removed

20 Haber Process Stage 1 Stage 2 Stage 3
CH4 (g) + H2O (g)  CO (g) + 3H2 (g) ΔH1 = +210 kJ Stage 2 4N2 (g) + O2 (g) + 2H2(g)  2H2O (g) + 4N2 (g) ΔH2 = -484 kJ ΔH3 = -41 kJ Stage 3 CO (g) + H2O (g)  CO2 (g) + H2 (g) In order to achieve a ratio of 3x hydrogen to nitrogen, stage 1 and 3 need to be 3.5x greater than stage 2. Combining the three stages 3.5 CH4 (g) + 4N2 (g) + O2(g) + 5H2O (g)  4N2 (g) + 12H2 (g) CO2 ΔH1 = (+210 x 3.5) kJ ΔH2 = -(484) kJ ΔH3 = -(41 x 3.5) kJ (ΔH1 + ΔH2 + ΔH3 ) ΔHtotal = -41 kJ

21 Haber process Reaction Conditions N2 (g) + 3H2 (g) 2NH3 (g)
ΔHf = -92 kJ Low temperature shifts the equilibrium to the right, but means a slow reaction rate. Fe catalyst improves this. A high pressure favours also shifts the equilibrium to the right because this is the side with fewer gas molecules. Temperatures around 500oC and pressures of over 150 atmospheres give a yield of ammonia of about 15%. Product removal: In practice, equilibrium is not reached as unreacted gases are recycled and the ammonia gas is liquefied.

22 Sulphuric Acid Industry
Sulphuric acid is manufactured by the Contact Process. water absorber mixer H2SO4 98% acid Waste gases Stage 3 Sulphur Air burner S O2(g) heat Stage 1 Catalytic Converter Cat=V2O5 SO2(g) SO3(g) Stage 2 feedstock

23 Suphuric Acid The raw materials for the manufacture of H2SO4 are H2O, O2 from air and S or a compound containing sulphur. Sources of sulphur SO2 from smelting of ores, eg ZnS. The SO2 is converted into sulphuric acid rather than released into the atmosphere. CaSO4, the mineral anhydrite, is roasted with coke (C) and SiO2 (sand) S deposits in the ground. S can be extracted from oil and natural gas. Stage 1 S (l) + O2 (g)  SO2 (g) ΔH = -299 kJ Stage 2 2SO2 (g) + O2 (g) 2SO3 (g) ΔH = -98 kJ The catalyst does not function below 400 0C, a 99% yield is obtained. Stage 3 SO3 (g) + H2O (l)  H2SO4 (l) ΔH = -130 kJ The acid produced is absorbed in 98% H2SO4,. If dissolved in water too much heat is created and gases are lost to the atmosphere.

24 Sulphuric Acid Cost considerations
Capital costs: The cost of building the plant and all the associated costs of all buildings Variable costs: The cost that changes throughout the year and is dependant of how much product is sold. Buying raw materials, treating waste and despatching the product Fixed costs: The cost of the staff, local rates, advertising and utility bills.

25 Petrochemical Industry
Grangemouth is one of the UK’s major oil refineries and petrochemical plants. The crude oil is processed to increase its market value. Oil refining is a continuous process. The crude oil is processed to increase its market value. The fractions produced have many uses and heavier fractions are further processed by processes such as cracking which produces key feedstock for the plastic industry. Refinery gas, eg propane and butane bottled gas Petrol, which is further purified and blended Naphtha, feedstock for the plastic industry Kerosine, aviation fuel Diesel, Fuel oil, eg ships, oil-fired power stations, industrial heating residue, lubricating oil, waxes, bitumen

26 Natural gas The market value of Natural Gas is increased by desulphurisation and separating it into its constituent parts. Natural gas becomes a liquid at below -161oC. Fractional distillation is then used to separate out the constituents of natural gases in a continuous process. Natural gases sulphur methane ethane propane butane Gas grid Cracker (ethene) LPG petrol

27 Pharmaceutical Industry
Drugs alter the biochemical processes in our bodies, for example, changing the way we feel and behave. Drugs which lead to an improvement in health are called medicines. Once a new drug is discovered, it will be patented, the licence lasting 20 years. Many years of trials may be needed before the drug even becomes commercially available. The Government is also involved in this process, providing the necessary licensing for the new drug. The Chemical Industry earns £1000 million pounds a year in ‘invisible earning’ for licensing fees for patented chemicals and processes. Once the necessary licensing has been granted a pilot plant will be built for small scale production to allow for product evaluation. Full scale production is then implemented, where safety, environmental and energy saving factors have to be considered.


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