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FURTHER TOPICS ON CHEMICAL EQUILIBRIUM KNOCKHARDY PUBLISHING 2008 SPECIFICATIONS KNOCKHARDY PUBLISHING CHEMICAL EQUILIBRIUM (2) INTRODUCTION This Powerpoint show is one of several produced to help students understand selected topics at AS and A2 level Chemistry. It is based on the requirements of the AQA and OCR specifications but is suitable for other examination boards. Individual students may use the material at home for revision purposes or it may be used for classroom teaching if an interactive white board is available. Accompanying notes on this, and the full range of AS and A2 topics, are available from the KNOCKHARDY SCIENCE WEBSITE at... www.knockhardy.org.uk/sci.htm Navigation is achieved by... either or clicking on the grey arrows at the foot of each page using the left and right arrow keys on the keyboard CHEMICAL EQUILIBRIUM (2) CONTENTS • The Equilibrium Law • The equilibrium constant Kc • Calculations involving Kc • Calculations involving gases • Mole fraction and partial pressure calculations • Calculations involving Kp THE EQUILIBRIUM LAW Simply states “If the concentrations of all the substances present at equilibrium are raised to the power of the number of moles they appear in the equation, the product of the concentrations of the products divided by the product of the concentrations of the reactants is a constant, provided the temperature remains constant” There are several forms of the constant; all vary with temperature. Kc the equilibrium values are expressed as concentrations in mol dm-3 Kp the equilibrium values are expressed as partial pressures The partial pressure expression can be used for reactions involving gases THE EQUILIBRIUM CONSTANT Kc for an equilibrium reaction of the form... aA + bB then (at constant temperature) cC + dD [C]c . [D]d = a constant, (Kc) [A]a . [B]b where [ ] Kc denotes the equilibrium concentration in mol dm-3 is known as the Equilibrium Constant THE EQUILIBRIUM CONSTANT Kc for an equilibrium reaction of the form... aA + bB then (at constant temperature) cC + dD [C]c . [D]d = a constant, (Kc) [A]a . [B]b where [ ] Kc denotes the equilibrium concentration in mol dm-3 is known as the Equilibrium Constant VALUE OF Kc AFFECTED by a change of temperature NOT AFFECTED by a change in concentration of reactants or products a change of pressure adding a catalyst CALCULATIONS INVOLVING Kc • construct the balanced equation, including state symbols (aq), (g) etc. • determine the number of moles of each species at equilibrium • divide moles by volume (in dm3) to get the equilibrium concentrations in mol dm-3 (If no volume is quoted, use a V; it will probably cancel out) • from the equation constructed in the first step, write out an expression for Kc. • substitute values from third step and calculate the value of Kc with any units CALCULATIONS INVOLVING Kc • construct the balanced equation, including state symbols (aq), (g) etc. • determine the number of moles of each species at equilibrium • divide moles by volume (in dm3) to get the equilibrium concentrations in mol dm-3 (If no volume is quoted, use a V; it will probably cancel out) • from the equation constructed in the first step, write out an expression for Kc. • substitute values from third step and calculate the value of Kc with any units Example 1 One mole of ethanoic acid reacts with one mole of ethanol at 298K. When equilibrium is reached it is found that two thirds of the acid has reacted. Calculate the value of Kc. CALCULATIONS INVOLVING Kc • construct the balanced equation, including state symbols (aq), (g) etc. • determine the number of moles of each species at equilibrium • divide moles by volume (in dm3) to get the equilibrium concentrations in mol dm-3 (If no volume is quoted, use a V; it will probably cancel out) • from the equation constructed in the first step, write out an expression for Kc. • substitute values from third step and calculate the value of Kc with any units Example 1 One mole of ethanoic acid reacts with one mole of ethanol at 298K. When equilibrium is reached it is found that two thirds of the acid has reacted. Calculate the value of Kc. CH3COOH(l) + C2H5OH(l) CH3COOC2H5(l) + H2O(l) CALCULATIONS INVOLVING Kc • construct the balanced equation, including state symbols (aq), (g) etc. • determine the number of moles of each species at equilibrium • divide moles by volume (in dm3) to get the equilibrium concentrations in mol dm-3 (If no volume is quoted, use a V; it will probably cancel out) • from the equation constructed in the first step, write out an expression for Kc. • substitute values from third step and calculate the value of Kc with any units Example 1 One mole of ethanoic acid reacts with one mole of ethanol at 298K. When equilibrium is reached it is found that two thirds of the acid has reacted. Calculate the value of Kc. CH3COOH(l) + C2H5OH(l) moles (initially) moles (at equilibrium) 1 1 - 2/3 1 1 - 2/3 CH3COOC2H5(l) + 0 2/3 H2O(l) 0 2/3 Initial moles of CH3COOH = 1 moles reacted = 2/3 equilibrium moles of CH3COOH = 1/3 For every CH3COOH that reacts; a similar number of C2H5OH’s react (equil moles = 1 - 2/3) a similar number of CH3COOC2H5’s are produced a similar number of H2O’s are produced CALCULATIONS INVOLVING Kc • construct the balanced equation, including state symbols (aq), (g) etc. • determine the number of moles of each species at equilibrium • divide moles by volume (in dm3) to get the equilibrium concentrations in mol dm-3 (If no volume is quoted, use a V; it will probably cancel out) • from the equation constructed in the first step, write out an expression for Kc. • substitute values from third step and calculate the value of Kc with any units Example 1 One mole of ethanoic acid reacts with one mole of ethanol at 298K. When equilibrium is reached it is found that two thirds of the acid has reacted. Calculate the value of Kc. CH3COOH(l) + C2H5OH(l) moles (initially) moles (at equilibrium) equilibrium concs. 1 1 - 2/3 1/3 / V 1 1 - 2/3 1/3 / V V = volume (dm3) of the equilibrium mixture CH3COOC2H5(l) + 0 2/3 2/3 / V H2O(l) 0 2/3 2/3 / V CALCULATIONS INVOLVING Kc • construct the balanced equation, including state symbols (aq), (g) etc. • determine the number of moles of each species at equilibrium • divide moles by volume (in dm3) to get the equilibrium concentrations in mol dm-3 (If no volume is quoted, use a V; it will probably cancel out) • from the equation constructed in the first step, write out an expression for Kc. • substitute values from third step and calculate the value of Kc with any units Example 1 One mole of ethanoic acid reacts with one mole of ethanol at 298K. When equilibrium is reached it is found that two thirds of the acid has reacted. Calculate the value of Kc. CH3COOH(l) + C2H5OH(l) moles (initially) moles (at equilibrium) equilibrium concs. 1 1 - 2/3 1/3 / V 1 1 - 2/3 1/3 / V V = volume (dm3) of the equilibrium mixture Kc = [CH3COOC2H5] [H2O] [CH3COOH] [C2H5OH] CH3COOC2H5(l) + 0 2/3 2/3 / V H2O(l) 0 2/3 2/3 / V CALCULATIONS INVOLVING Kc • construct the balanced equation, including state symbols (aq), (g) etc. • determine the number of moles of each species at equilibrium • divide moles by volume (in dm3) to get the equilibrium concentrations in mol dm-3 (If no volume is quoted, use a V; it will probably cancel out) • from the equation constructed in the first step, write out an expression for Kc. • substitute values from third step and calculate the value of Kc with any units Example 1 One mole of ethanoic acid reacts with one mole of ethanol at 298K. When equilibrium is reached it is found that two thirds of the acid has reacted. Calculate the value of Kc. CH3COOH(l) + C2H5OH(l) moles (initially) moles (at equilibrium) equilibrium concs. 1 1 - 2/3 1/3 / V CH3COOC2H5(l) + 1 1 - 2/3 1/3 / V 0 2/3 2/3 / V 0 2/3 2/3 / V V = volume (dm3) of the equilibrium mixture Kc = [CH3COOC2H5] [H2O] [CH3COOH] [C2H5OH] = 2/3 / V . 2/3 / V 1/3 / V . 1/3 / V H2O(l) = 4 CALCULATIONS INVOLVING Kc Example 2 Consider the equilibrium P + 2Q R + S (all species are aqueous) One mole of P and one mole of Q are mixed. Once equilibrium has been achieved 0.6 moles of P are present. How many moles of Q, R and S are present at equilibrium ? P 1 0·6 Initial moles At equilibrium + 2Q 1 0·2 (0·4 reacted) (2 x 0·4 reacted) 1- 0·6 remain 1- 0·8 remain Explanation • • • • • R 0 0·4 + S 0 0·4 (get 1 R and 1 S for every P that reacts) if 0.6 mol of P remain of the original 1 mol, 0.4 mol have reacted the equation states that 2 moles of Q react with every 1 mol of P this means that 0.8 (2 x 0.4) mol of Q have reacted, leaving 0.2 mol one mol of R and S are produced from every mol of P that reacts this means 0.4 mol of R and 0.4 mol of S are present at equilibrium CALCULATIONS INVOLVING GASES Method • carried out in a similar way to those involving concentrations • one has the choice of using Kc or Kp for the equilibrium constant • when using Kp only take into account gaseous species for the expression • use the value of the partial pressure of any gas in the equilibrium mixture • pressure is usually quoted in Nm-2 or Pa - atmospheres are sometimes used • as with Kc, the units of the constant Kp depend on the stoichiometry of the reaction CALCULATIONS INVOLVING GASES Method • carried out in a similar way to those involving concentrations • one has the choice of using Kc or Kp for the equilibrium constant • when using Kp only take into account gaseous species for the expression • use the value of the partial pressure of any gas in the equilibrium mixture • pressure is usually quoted in Nm-2 or Pa - atmospheres are sometimes used • as with Kc, the units of the constant Kp depend on the stoichiometry of the reaction USEFUL RELATIONSHIPS total pressure = sum of the partial pressures partial pressure = total pressure x mole fraction mole fraction = number of moles of a substance number of moles of all substances present MOLE FRACTION AND PARTIAL PRESSURE Example A mixture of 16g of O2 and 42g of N2 , exerts a total pressure of 20000 Nm-2. What is the partial pressure of each gas ? MOLE FRACTION AND PARTIAL PRESSURE Example A mixture of 16g of O2 and 42g of N2 , exerts a total pressure of 20000 Nm-2. What is the partial pressure of each gas ? moles of O2 moles of N2 total moles = mass / molar mass = mass / molar mass = 0.5 + 1.5 = 16g / 32g = 42g / 28g = 0.5 mol = 1.5 mol = 2.0 mol MOLE FRACTION AND PARTIAL PRESSURE Example A mixture of 16g of O2 and 42g of N2 , exerts a total pressure of 20000 Nm-2. What is the partial pressure of each gas ? moles of O2 moles of N2 total moles = mass / molar mass = mass / molar mass = 0.5 + 1.5 mole fraction of O2 mole fraction of N2 sum of mole fractions = 16g / 32g = 42g / 28g = 0.5 / 2 = 1.5 / 2 = 0.75 + 0.25 = 0.5 mol = 1.5 mol = 2.0 mol = 0.25 = 0.75 = 1 (sum should always be 1) MOLE FRACTION AND PARTIAL PRESSURE Example A mixture of 16g of O2 and 42g of N2 , exerts a total pressure of 20000 Nm-2. What is the partial pressure of each gas ? moles of O2 moles of N2 total moles = mass / molar mass = mass / molar mass = 0.5 + 1.5 = 16g / 32g = 42g / 28g = 0.5 mol = 1.5 mol = 2.0 mol mole fraction of O2 mole fraction of N2 sum of mole fractions = 0.5 / 2 = 1.5 / 2 = 0.75 + 0.25 partial pressure of O2 = mole fraction x total pressure = 0.25 x 20000 Nm-2 = 5000 Nm-2 = mole fraction x total pressure = 0.75 x 20000 Nm-2 = 15000 Nm-2 partial pressure of N2 = 0.25 = 0.75 = 1 MOLE FRACTION AND PARTIAL PRESSURE Example A mixture of 16g of O2 and 42g of N2 , exerts a total pressure of 20000 Nm-2. What is the partial pressure of each gas ? moles of O2 moles of N2 total moles = mass / molar mass = mass / molar mass = 0.5 + 1.5 = 16g / 32g = 42g / 28g = 0.5 mol = 1.5 mol = 2.0 mol mole fraction of O2 mole fraction of N2 sum of mole fractions = 0.5 / 2 = 1.5 / 2 = 0.75 + 0.25 partial pressure of O2 = mole fraction x total pressure = 0.25 x 20000 Nm-2 = 5000 Nm-2 = mole fraction x total pressure = 0.75 x 20000 Nm-2 = 15000 Nm-2 partial pressure of N2 = 0.25 = 0.75 = 1 CALCULATIONS INVOLVING Kp Example When nitrogen (1 mole) and hydrogen (3 moles) react at constant temperature at a pressure of 8 x 106 Pa, the equilibrium mixture was found to contain 0.7 moles of ammonia. Calculate Kp . CALCULATIONS INVOLVING Kp Example When nitrogen (1 mole) and hydrogen (3 moles) react at constant temperature at a pressure of 8 x 106 Pa, the equilibrium mixture was found to contain 0.7 moles of ammonia. Calculate Kp . moles (initially) moles (equilibrium) N2(g) 1 1-x + 3H2(g) 3 3 - 3x 2NH3(g) 0 2x (x moles of N2 reacted) CALCULATIONS INVOLVING Kp Example When nitrogen (1 mole) and hydrogen (3 moles) react at constant temperature at a pressure of 8 x 106 Pa, the equilibrium mixture was found to contain 0.7 moles of ammonia. Calculate Kp . moles (initially) moles (equilibrium) mole fractions partial pressures N2(g) 1 1-x + 3H2(g) 3 3 - 3x 2NH3(g) 0 2x (x moles of N2 reacted) (1-x)/(4-2x) (3-3x)/(4-2x) 2x/(4-2x) (total moles = 4 - 2x) P.(1-x)/(4-2x) P.(3-3x)/(4-2x) P.2x/(4-2x) (total pressure = P ) CALCULATIONS INVOLVING Kp Example When nitrogen (1 mole) and hydrogen (3 moles) react at constant temperature at a pressure of 8 x 106 Pa, the equilibrium mixture was found to contain 0.7 moles of ammonia. Calculate Kp . moles (initially) moles (equilibrium) mole fractions partial pressures N2(g) 1 1-x + 3H2(g) 3 3 - 3x 2NH3(g) 0 2x (x moles of N2 reacted) (1-x)/(4-2x) (3-3x)/(4-2x) 2x/(4-2x) (total moles = 4 - 2x) P.(1-x)/(4-2x) P.(3-3x)/(4-2x) P.2x/(4-2x) (total pressure = P ) at equilibrium there are 0.7 moles of ammonia, so 2x = 0.7 the total pressure (P) = 8 x 106 Pa. and x = 0.35 CALCULATIONS INVOLVING Kp Example When nitrogen (1 mole) and hydrogen (3 moles) react at constant temperature at a pressure of 8 x 106 Pa, the equilibrium mixture was found to contain 0.7 moles of ammonia. Calculate Kp . N2(g) 1 1-x moles (initially) moles (equilibrium) mole fractions partial pressures + 3H2(g) 3 3 - 3x 2NH3(g) 0 2x (x moles of N2 reacted) (1-x)/(4-2x) (3-3x)/(4-2x) 2x/(4-2x) (total moles = 4 - 2x) P.(1-x)/(4-2x) P.(3-3x)/(4-2x) P.2x/(4-2x) (total pressure = P ) at equilibrium there are 0.7 moles of ammonia, so 2x = 0.7 the total pressure (P) = 8 x 106 Pa. applying the equilibrium law Kp = and (PNH3)2 (PN2) . (PH2)3 x = 0.35 with units of Pa-2 CALCULATIONS INVOLVING Kp Example When nitrogen (1 mole) and hydrogen (3 moles) react at constant temperature at a pressure of 8 x 106 Pa, the equilibrium mixture was found to contain 0.7 moles of ammonia. Calculate Kp . N2(g) 1 1-x moles (initially) moles (equilibrium) mole fractions partial pressures + 3H2(g) 3 3 - 3x 2NH3(g) 0 2x (x moles of N2 reacted) (1-x)/(4-2x) (3-3x)/(4-2x) 2x/(4-2x) (total moles = 4 - 2x) P.(1-x)/(4-2x) P.(3-3x)/(4-2x) P.2x/(4-2x) (total pressure = P ) at equilibrium there are 0.7 moles of ammonia, so 2x = 0.7 the total pressure (P) = 8 x 106 Pa. applying the equilibrium law Kp = and (PNH3)2 x = 0.35 with units of Pa-2 (PN2) . (PH2)3 Substituting in the expression gives Kp = 1.73 x 10-14 Pa-2 FURTHER TOPICS ON CHEMICAL EQUILIBRIUM THE END © JONATHAN HOPTON & KNOCKHARDY PUBLISHING