Stoichiometry 1 Formulas and the Mole

Stoichiometry 1Formulas and the Mole L. Scheffler Lincoln High School 1

The Mole • Chemical reactions involve atoms and molecules. • The ratios with which elements combine depend on the number of atoms not on their mass. • The masses of atoms or molecules depend on the substance. • Individual atoms and molecules are extremely small. Hence a larger unit is appropriate for measuring quantities of matter. • A mole is equal to exactly the number of atoms in exactly 12.0000 grams of carbon 12. • This number is known as Avogadro’s number. 1 mole is equal to 6.022 x 1023 particles. 2

Definitions of the Mole • 1 mole of a substance has a mass equal to the formula mass in grams. • Examples • 1 mole H2O is the number of molecules in 18.015 g H2O • 1 mole H2 is the number of molecules in 2.016 g H2. • 1 mole of atoms has a mass equal to the atomic weight in grams. • 1 mole of particles = 6.02214 x 1023 particles for any substance! • TheMolar mass is the mass of one mole of a substance • Avogadro's number is the number of particles (molecules) in one mole for any substance 3

The Mole A mole is equivalent to a gram atomic weight or gram molecular weight 4

The Formula Mass • The formula mass is the sum of atomic masses in a formula. • If the formula is a molecular formula, then the formula mass may also be called a molecular mass. 5

Gram Formula Mass and Molar Mass • If the formula mass is expressed in grams it is called a gram formula mass. • The gram formula mass is also known as the Molar Mass. • The molar mass is the number of grams necessary to make 1 mole of a substance. • The units for Molar Mass areg mol-1. 6

Formula Mass and the Mole • The atomic mass of Carbon 12 is exactly 12.00000. • 1 atomic mass unit = 1/12 of the atomic mass of carbon 12. • The periodic table gives the average atomic mass for an element relative to Carbon 12. • 1 mole of a substance is 6.022 x 1023 particles. • The mole of atomic mass units is equal to 1.000 gram. 7

Gram Formula Mass • The formula mass is the sum of the atomic masses in a formula. • A gram formula mass is the same number expressed in grams. • It is also equal to Avogadro’s Number of particles • Example: H2O From the Periodic Table - Atomic Masses: H =1.00797, O = 15.999 The formula mass = 2(1.00797)+15.999 = 18.015 • Adding the unit “grams” to the formula mass transforms it into a gram formula mass or mole. 8

The Mole • The mole is connects the macro world that we can measure with the micro world of atoms and molecules. • A Mole is also equal to • 1 gram formula mass. • 22.4 dm3 of any gas measured at 0o C and 1.0 atmosphere of pressure. 9

Example 1: Calculating the Molar Mass of a Compound • Calculate the gram formula mass or Molar Mass of Na3PO4. Therefore the molar mass is 164.0 g mol-1 10

Example 2: Find the mass of 2.50 moles of Ca(OH)2 Find the molar mass of Calcium hydroxide and multiply by 2.50 mol The molar mass of Ca(OH)2 is 1 Ca 1 x 40.08 = 40.08 2 O 2 x 16.00 = 32.00 2 H 2 x 1.01 = 2.02 Molar Mass = 74.10 g mol-1 2.50 mol x 74.10 g mol-1 = 185.25 g 11

Calculating Moles • The number of moles in a given mass of a substance can be determined by dividing the mass by the molar mass 12

Example 3: Find the number of moles in 44.46 grams of Ca(OH)2 Find the molar mass of and divide it into the given mass From the previous example the molar mass of calcium hydroxide is 74.10 gmol-1. 44.46 g Ca(OH)2 .= 0. 6000 mol 74.10 g mol-1Ca(OH)2 13

Example 4: Calculating Moles • Calculate the number of moles in 20.5 grams of Na3PO4 = 0.125 mol Note: Mol is the standard abbreviation for a mole 14

Calculating Mass From Moles • The mass of a quantity of a substance can be found by multiplying the number of moles by the molar mass 15

Example 5 Calculating Mass from Moles • Calculate the mass of 2.50 moles of Na3PO4 16

Percentage Composition • According to the law of definite proportions, compounds, contain definite proportions of each element by mass. • The sum of all of the atomic masses of elements in a formula is called theformula mass. • If it is expressed in grams, then it is called a gram formula mass or molar mass. • If it represents the sum of all of the masses of all of the elements in a molecule then it is called a molecular mass. • To find the percentage of each element in a compound it is necessary to compare the total mass of each element with the formula mass. 17

Percentage Composition • The percent by mass of each element in a compound is equal to the percentage that its atomic mass is of the formula mass. • Example: Calculate the percentage of oxygen in potassium chlorate, KClO3 Atomic masses: K = 39.09, Cl = 35.45 and O = 16.00. Formula mass = 39.09 + 35.45+ 3(16.00) = 122.54 Percent Oxygen = (3(16.00)/122.54) (100) = 39.17% 18

Example 2 • Calculate the percentage by mass of each element in potassium carbonate, K2CO3 First calculate the formula mass for K2CO3 . Find the atomic mass of each element from the periodic table. Multiply it by the number of times it appears in the formula and add up the total 2 Potassium atoms K 2 x 39.10 = 78.20 1 carbon atom C 1 x 12.01 = 12.01 3 Oxygen atoms O 3 x 16.00 = 48.00 Total = 138.21 To find the percent of each element divide the part of the formula mass that pertains to that element with the total formula mass Percent of Potassium K = 78.20 X 100 =56.58 % 138.21 Percent of Carbon C = 12.01 X 100 = 8.69 % 138.21 Percent of Oxygen O = 48.00 X 100 = 34.73 % 138.21 19

Empirical Formula Determination The empirical formula is the simplest ratio of the numbers of atoms of each element that make a compound. To find the empirical formula of a compound: • Divide the amount of each element (either in mass or percentage) by its atomic mass. This calculation gives you moles of atoms for each element that appears in the formula • Convert the results to small whole number ratios. Often the ratios are obvious. If they are not divide all of the other quotients by the smallest quotient 20

Example 1 Analysis of a certain compound showed that 32.356 grams of compound contained 0.883 grams of hydrogen, 10.497 grams of Carbon, and 27.968 grams of Oxygen. Calculate the empirical formula of the compound. First divide the amount by the atomic mass to get the number of moles of each kind of atom in the formula Hydrogen H = 0.883 g = 0.874 mol 1.01 g mol-1 Carbon C = 10.497 g = 0.874 mol 12.01 g mol-1 Oxygen O = 27.968 g = 1.748 mol 16.00 g mol-1 • Analysis of the ratio s shows that the first two are identical and that the third is twice the other two. Therefore the ratio of H to C to O is 1 to 1 to 2. The empirical formula is HCO2 21

Molecular Formula • To calculate the molecular formula from the empirical formula it is necessary to know the molecular (molar) mass. • Add up the atomic masses in the empirical formula to get the factor • Divide this number into the molecular formula mass. • If the number does not divide evenly you probably have a mistake in the empirical formula or its formula mass • Multiply each subscript in the empirical formula by the factor to get the molecular formula 22

Molecular Formula Example • Example: Suppose the molecular mass of the compound in the previous example, HCO2 is 90.0. Calculate the molecular formula. • The empirical formula mass of is 1 H 1.0 x 1 = 1.0 1 C 12.0 x 1 = 12.0 2 O 16.0 x 2 = 32.0 Total 45.0 • Note that 45 is exactly half of the molecular mass of 90. • So the formula mass of HCO2 is exactly half of the molecular mass. Hence the molecular formula is double that of the empirical formula or H2C2O4 23

Part 2: Stoichiometry Problems • Mass-Mass Problems • Mass-Volume 24

Stoichiometry Problems • Stoichiometry problems involve the calculation of amounts of materials in a chemical reaction from known quantities in the same reaction • The substance whose amount is known is the given substance • The substance whose amount is to be determined is the required substance 25

Mass to Mass Problems • Goal: To calculate the mass of a substance that appears in a chemical reaction from the mass of a given substance in the same reaction. • The given substance is the substance whose mass is known. • The required substance is the substance whose mass is to be determined. 26

Steps in a Mass to Mass Problem • Find the gram formula masses for the given and the required substances • Convert the given mass to moles by dividing it by the molar mass • Multiple the given moles by the mole ratio to get the moles of the required substance • Multiple the number of moles of the required substance by its molar mass to get the mass of the required substance 27

Summary of Mass Relationships 28

Example 1 Mass-Mass Problem • Glucose burns in oxygen to form CO2 and H2O according to this equation: C6H12O6 + 6 O2 6 CO2 + 6 H2O How manygrams of CO2 are produced from burning 45.0 g of glucose? 29

Example 1 Mass-Mass Problem Glucose burns in oxygen to form CO2 and H2O according to this equation: C6H12O6 + 6 O2 6 CO2 + 6 H2O How manygrams of CO2 are produced from burning 45.0 g of glucose? • Make sure that the equations is balanced • Divide the mass of the given by its molar mass 30

Example 1 Mass-Mass Problem Glucose burns in oxygen to form CO2 and H2O according to this equation: C6H12O6 + 6 O2 6 CO2 + 6 H2O How many grams of CO2 are produced from burning 45.0 g of glucose? • Make sure that the equations is balanced • Divide the mass of the given by its molar 3. Multiply by the mole ratio = 1.5 moles CO2 31

Example 1 Mass-Mass Problem Glucose burns in oxygen to form CO2 and H2O according to this equation: C6H12O6 + 6 O2 6 CO2 + 6 H2O How many grams of CO2 are produced from burning 45 g of glucose? • Make sure that the equations is balanced • Divide the mass of the given by its molar • Multiply by the mole ratio • Multiply by the molar mass of the required = 66.0 g of CO2 32

Example 2 Mass-Mass Problem What mass of Barium chloride is required to react with 48.6 grams of sodium phosphate according to the following reaction: 2 Na3PO4 + 3BaCl2 Ba3(PO4)2 + 6 NaCl 33

Example 2 What mass of Barium chloride is required to react with 48.6 grams of sodium phosphate according to the following reaction 2 Na3PO4 + 3BaCl2 Ba3(PO4)2 + 6 NaCl Molar Masses: Na3PO4 = 3(23.0)+31.0+4(16.0) =164 g mol-1 BaCl2 = 137.3 +2(35.5) = 208.3 g mol-1 = 92.6 g of BaCl2 34

Example 3 What mass of carbon dioxide is produced from burning 100 grams of ethanol in oxygen according to the following reaction : C2H5OH + 3 O2 2 CO2 + 3 H2O 35

Example 3 What mass of carbon dioxide is produced from burning 100 grams of ethanol in oxygen according to the following reaction : C2H5OH + 3 O2 2 CO2 + 3 H2O Molar Masses: C2H5OH = 2(12) +6(1)+ 16 = 46 CO2 = 12 + 2(16) = 44.0 = 191.3 g CO2 36

Mass to Volume Problems 37

Mass to Volume Problems • Goal: To calculate the volume of a gas that appears in a chemical reaction from the mass of a given substance in the same reaction. • The given substance is the substance whose mass is known. • The required substance is the gas whose volume is to be determined. • Remember 1 mole of any gas at STP is equal to 22.4 dm3. STP is defined as 0 oC and 1 atmosphere of pressure. 38

Steps in a Mass to Volume Problem • Find the gram formula masses for the given substance. • Convert the given mass to moles by dividing it by the molar mass • Multiple the given moles by the mole ratio to get the moles of the required substance • Multiple the number of moles of the required substance by the molar volume, 22.4 dm3 mol-1, to get the volume of the required substance. • This procedure is only valid if the required substance is a gas. It does not work for solids, liquids, or solutions. 39

Example 1 Mass-Volume Problem • Sucrose burns in oxygen to form CO2 and H2O according to this equation: C12H22O11 + 12 O2 12 CO2 + 11 H2O What volume of CO2 measured at STP is produced from burning 100 g of sucrose? 40

Example 1 Mass-Volume Problem Sucrose burns in oxygen to form CO2 and H2O according to this equation: C12H22O11 + 12 O2 12 CO2 + 11 H2O What volume of CO2 measured at STP is produced from burning 100 g of sucrose? 1. Find the molar mass of the given substance Molar mass of C12H22O11=12 (12.0) +22 (1.0) + 11 (16.0) = 342.0 g mol-1 41

Example 1: Mass-Volume Problem Sucrose burns in oxygen to form CO2 and H2O according to this equation: C12H22O11 + 12 O2 12 CO2 + 11 H2O What volume of CO2 measured at STP is produced from burning 100 g of sucrose? 2. Find moles of the given: 42

Example 1: Mass-Volume Problem Sucrose burns in oxygen to form CO2 and H2O according to this equation: C12H22O11 + 12 O2 12 CO2 + 11 H2O What volume of CO2 measured at STP is produced from burning 100 g of sucrose? 3. Multiply by the mole ratio: = 3.51 moles CO2 43

Example 1: Mass-Volume Problem Sucrose burns in oxygen to form CO2 and H2O according to this equation: C12H22O11 + 12 O2 12 CO2 + 11 H2O What volume of CO2 measured at STP is produced from burning 100 g of sucrose? 4. Multiply by the molar volume, 22.4 dm3 mol-1. =78.6 dm3 44

Example 2 Mass-Volume Problem What volume of carbon dioxide gas would be produced by reacting 25.0 g of sodium carbonate with hydrochloric acid according to the following reaction: Na2CO3 + 2 HCl  2 NaCl+ CO2 + H2O 45

Example 2 Mass-Volume Problem • What volume of carbon dioxide gas would be produced by reacting 25.0 g of Sodium carbonate with hydrochloric acid according to the following reaction: Na2CO3 + 2 HCl  2 NaCl + CO2 + H2O Molar Mass:Na2CO3 =2(23.0)+ 12.0 +3(16.0) =106.0 = 5.28 dm3 of CO2 46

Summary of Stoichiometric Relationships 47

Solutions and Stoichiometry • Many times the reactants and/or products of chemical reactions are water solutions. • In these cases the concentration of the solution must be determined in order to determine amounts of reactants or products • The concentration of a solution is a measure of the amount of solute that is dissolved in a given amount of solution 48

Molarity • The most common concentration unit is Molarity 49

Molarity Calculations How many grams of NaOH are required to prepare 250 cm3 of 0.500 M solution? • Molar Mass of NaOH = 23+16+1 = 40.0 g/mol • 250 cm3 = 0.250 dm3 50

Stoichiometry 1 Formulas and the Mole