1. Composition of Substances
Chapter# 3
Composition of Substances

2. Stoichiometry Topics
3-1 Formula Mass and the Mole Concept 3-2 Determining Empirical and Molecular Formulas 3-3 Solution Concentration

3. The Chemical Package About Packages
The baker uses a package called the dozen. All dozen packages contain 12 objects.
The stationary store uses a package called a ream, which contains 500 sheets of paper.
So what is the chemistry package?

4. 6-2 The Chemical Package About Packages
The baker uses a package called the dozen. All dozen packages contain 12 objects.
The stationary store uses a package called a ream, which contains 500 sheets of paper.
So what is the chemistry package? Well, it is called the mole (Latin for heap).
Each of the above packages contain a number of objects that are convenient to work with, for that particular discipline.

5. 6-3 The Mole
A mole contains 6.022X1023 particles, which is the number of carbon-12 atoms that will give a mass of grams, which is a convenient number of atoms to work with in the chemistry laboratory.
The atomic weights listed on the periodic chart are the weights of a mole of atoms. For example a mole of hydrogen atoms weighs g and a mole of carbon atoms weighs g.

6. 6-4 Moles of Objects
Suppose we order a mole of marshmallows for a chemistry party. How much space here at Central would be required to store the marshmallows?

7. 6-4 Moles of Objects
Suppose we order a mole of marshmallows for a chemistry party. How much space here at Central would be required to store the marshmallows?
Would cover the entire 50 states 60 miles deep

8. 6-4 Moles of Objects
Suppose we order a mole of marshmallows for a chemistry party. How much space here at Central would be required to store the marshmallows?
Would cover the entire 50 states 60 miles deep
How about a mole of computer paper instead of a ream of computer paper, how far would that stretch?

9. 6-4 Moles of Objects
Suppose we order a mole of marshmallows for a chemistry party. How much space here at Central would be required to store the marshmallows?
Would cover the entire 50 states 60 miles deep
How about a mole of computer paper instead of a ream of computer paper, how far would that stretch? Way past the planet Pluto!

10. “the mass of one mole of that substance.”
Formula Weight
We can define the molar mass or molecular weight of a substance can as:
“the mass of one mole of that substance.”
We give molar mass the symbol M and it has units g/mol-
For an atom the molar mass is equal to the atomic weight we find on the period table.

11. Its All About Moles
For a molecule the molecular weight is equal to the sum of the atomic weights of the atoms that make it up.
The mathematical relationship between mass and moles is:
m = nM
This can be summarized by the following diagram:
moles

12. Formula Weight Calculation
To calculate the molar mass of a compound we sum together the atomic weights of the atoms that make up the formula of the compound. This is called the formula weight (MW, M).
Formula weights are the sum of atomic weights of atoms
Making up the formula.
The following outlines how to find the formula weight of water
symbol
weight
number H
1.01 X 2 =
2.02 O
16.0 X 1 =
16.0
18.0
g/mole

13. Percent Composition
Find the formula weight and the percent composition of
glucose (C6H12O6)
symbol
weight
number C
12.0 x 6 =
72.0 H
1.01 x 12 =
12.12
16.0 x 6 =
96.0 O
180.1 g/mole
72.0
%C =
X =
40.0 %C
180.1
12.12
%H =
X =
6.73 %H
180.1
96.0
%O =
X =
53.3 %O
180.1

14. Mole Concepts The key equation to remember for mole calculations is:
m = nM
Where:
M = molecular weight (gmol-1)
n = number of moles (mol)
m = mass of sample (g)

15. Mole Concepts
For a mole of a molecule the number of moles of each atom is determined by how many of that atom are in each molecule.
e.g. One mole of H2O contains:
One mole of oxygen atoms
Two moles of hydrogen atoms
In 5 moles of H2SO4 how many moles of oxygen atoms is there?
20 moles of O atoms.

16. Mole Conversions
In 50.0g of H2SO4 how many moles of oxygen atoms are there?
50.0g of H2SO4

17. Mole Conversions
In 50.0g of H2SO4 how many moles of oxygen atoms are there?
50.0g of H2SO4
mole H2SO4 =
98.0g of H2SO4

18. Mole Conversions
In 50.0g of H2SO4 how many moles of oxygen atoms are there?
50.0g of H2SO4
mole H2SO4
4mole O =
2.04 mole O
98.0g of H2SO4
mole H2SO4

19. Mole Conversions
In 5 moles of H2SO4 how many atoms of oxygen are present?

20. Mole Conversions
In 5 moles of H2SO4 how many atoms of oxygen are present?
5 moles H2SO4 =

21. Mole Conversions
In 5 moles of H2SO4 how many atoms of oxygen are present?
5 moles H2SO4
4 mole O
mole H2SO4

22. Mole Conversions
In 5 moles of H2SO4 how many atoms of oxygen are present?
5 moles H2SO4
4 mole O
6.02 x 1023 atoms O =
mole H2SO4
mole O
1.20 x 1025 atoms

23. Empirical Formulas
Empirical formula is the smallest whole number ratio between atoms and can be calculated from the percent composition.
Molecular formulas happen to be the exact number of atoms making up a molecule, and may or may no be the simplest whole number ratio. Molecular formulas are whole number multiples of the empirical formula.

24. Empirical Formula Steps
Assume 100 g of compound.
Convert percent to a mass number.
Convert the mass to moles.
Divide each mole number by the smallest mole number.
Rounding:
If the decimal is ≤ 0.1, then drop the decimals
If the decimal is ≥0.9, then round up.
All other decimal need to be multiplied by a whole number until roundable.

25. Empirical Formula Example
A compound is composed of 75.0% C and 25.0% H. Find its empirical formula.
Step #1 Assume 100 g of compound
75.0 g C
25.0 g H

26. Empirical Formula Example
A compound is composed of 75.0% C and 15.0% H. Find its empirical formula.
Step #2 Convert grams to moles.
75.0 g C
Mole C
= mole C
12.01 g
25.0 g H
Mole H
= mole H
1.008 g H

27. Empirical Formula Example
A compound is composed of 75.0% C and 15.0% H. Find its empirical formula.
Step #3 Divide each mole number by the smallest.
75.0 g C
Mole C
= mole C
12.01 g
25.0 g H
Mole H
= mole H
1.008 g H
6.225
24.802
= 1.00
= 3.98
6.225
6.225

28. Empirical Formula Example
A compound is composed of 75.0% C and 15.0% H. Find its empirical formula.
Step #4 Rounding; Decimal ≤ 0.1, drop decimals
75.0 g C
Mole C
= mole C
12.01 g
25.0 g H
Mole H
= mole H
1.008 g H
6.225
24.802
= 1.00
= 3.98
6.225
6.225

29. Empirical Formula Example
A compound is composed of 75.0% C and 15.0% H. Find its empirical formula.
Step #4 Rounding; Decimal ≤ 0.1, drop decimals
75.0 g C
Mole C
= mole C
12.01 g
25.0 g H
Mole H
= mole H
1.008 g H
6.225
24.802
= 1 C
= 3.98
6.225
6.225

30. Empirical Formula Example
A compound is composed of 75.0% C and 15.0% H. Find its empirical formula.
Step #4 Rounding; Decimal ≥ 0.9, round up
75.0 g C
Mole C
= mole C
12.01 g
25.0 g H
Mole H
= mole H
1.008 g H
6.225
24.802
= 1 C
= 3.98
6.225
6.225

31. Empirical Formula Example
A compound is composed of 75.0% C and 15.0% H. Find its empirical formula.
Step #4 Rounding; Decimal ≥ 0.9, round up
75.0 g C
Mole C
= mole C
12.01 g
25.0 g H
Mole H
= mole H
1.008 g H
6.225
24.802
= 1 C
= 3.98
6.225
6.225

32. Empirical Formula Example
A compound is composed of 75.0% C and 15.0% H. Find its empirical formula.
Step #4 Rounding; Decimal ≥ 0.9, round up
75.0 g C
Mole C
= mole C
12.01 g
25.0 g H
Mole H
= mole H
1.008 g H
6.225
24.802
= 1 C
= 4 H
6.225
6.225

33. Empirical Formula Example
A compound is composed of 75.0% C and 15.0% H. Find its empirical formula.
Step #4 Rounding; Decimal ≥ 0.9, round up
75.0 g C
Mole C
= mole C
12.01 g
25.0 g H
Mole H
= mole H
1.008 g H
6.225
24.802
= 1 C
= 4 H
6.225
6.225
Empirical Formula = CH4

34. Molecular Formulas
Empirical formula, is the smallest ratio between atoms in a molecular or formula unit.
Molecular formula, is the exact number of atoms in a molecule; a whole number multiple of an empirical formula

35. Possible Molecular Formulas
Assume an empirical formula of C3H5O
Empirical formula
Integer
Molecular Formula
C3H5O 1 2 3 4 5
C3H5O
C3H5O
C3H5O
C3H5O
C3H5O

36. 6-9 Possible Molecular Formulas
Assume an empirical formula of C3H5O
Empirical formula
Integer
Molecular Formula
C3H5O 1 2 3 4 5
C3H5O
C3H5O
C6H10O2
C3H5O
C3H5O
C3H5O

37. Possible Molecular Formulas
Assume an empirical formula of C3H5O
Empirical formula
Integer
Molecular Formula
C3H5O 1 2 3 4 5
C3H5O
C3H5O
C6H10O2
C9H15O3
C3H5O
C3H5O
C3H5O

38. Possible Molecular Formulas
Assume an empirical formula of C3H5O
Empirical formula
Integer
Molecular Formula
C3H5O 1 2 3 4 5
C3H5O
C3H5O
C6H10O2
C9H15O3
C3H5O
C3H5O
C12H20O4
C3H5O
C15H25O5

39. Sample Problem
Calculate the molecular formula of a molecule composed of 83.7%C and 16.3% H, with a molar mass of 86.0 g/mole

40. Sample Problem
Calculate the molecular formula of a molecule composed of 83.7%C and 16.3% H, with a molar mass of 86.0 g/mole
Step #1 Assume 100g of compound
83.6 g C
16.3 g H

41. Sample Problem
Calculate the molecular formula of a molecule composed of 83.7%C and 16.3% H, with a molar mass of 86.0 g/mole
Step #2 Convert grams to moles
83.6 g C
mole
12.01 g C
16.3 g H
mole
1.008 g H

42. Sample Problem
Calculate the molecular formula of a molecule composed of 83.7%C and 16.3% H, with a molar mass of 86.0 g/mole
Step #2 Convert grams to moles
83.6 g C
mole
= mole
12.01 g C
16.3 g H
mole
= mole
1.008 g H

43. Sample Problem
Calculate the molecular formula of a molecule composed of 83.7%C and 16.3% H, with a molar mass of 86.0 g/mole
Step #3 Divide each mole number by the smallest.
83.6 g C
mole
= mole
12.01 g C
16.3 g H
mole
= mole
1.008 g H

44. Sample Problem
Calculate the molecular formula of a molecule composed of 83.7%C and 16.3% H, with a molar mass of 86.0 g/mole
Step #3 Divide each mole number by the smallest.
83.6 g C
mole
6.961
= mole
= 1.00
12.01 g C
6.961
16.3 g H
mole
= mole
= 2.32
1.008 g H

45. Sample Problem
Calculate the molecular formula of a molecule composed of 83.7%C and 16.3% H, with a molar mass of 86.0 g/mole
Step #4 Round if---Not Roundable
83.6 g C
mole
6.961
= mole
= 1.00
12.01 g C
6.961
16.3 g H
mole
= mole
= 2.32
1.008 g H
Step #4, Multiply by an integer until roundable
1.00 X 3 = 3
2.32 X 3 = 7
Empirical formula C3H7

46. Molecular Formula Integer
Divide empirical weight into molecular weight
3x12 + 7x1 =43 2 43 86
Now multiply the empirical formula by 2

47. Molecular Formula Integer
Divide empirical weight into molecular weight
3x12 + 7x1 =43 2 43 86
Now multiply the empirical formula by 2
Molecular Formula is C6 H14

48. Solutions
Solutions are homogeneous mixtures of two or more substances.
The solvent is the substance in greatest quantity.
Solutes are the other ingredients in the mixture.
Solutions can exist in all states of matter.

49. Solution Examples Margarine Tap Water Steel 18 Carat Gold Air
Sterling Silver

50. Solution Examples
Composition of 18 carat gold: 75% gold, 12.5% silver,
12.5% copper.
What is the solvent in 18 ct gold ?

51. Solution Examples
Composition of 18 carat gold: 75% gold, 12.5% silver,
12.5% copper.
What is the solvent in 18 ct gold ?
Gold

52. Solution Examples
Composition of 18 carat gold: 75% gold, 12.5% silver,
12.5% copper.
What is the solvent in 18 ct gold ?
Gold
What are the solutes?

53. Solution Examples
Composition of 18 carat gold: 75% gold, 12.5% silver,
12.5% copper.
What is the solvent in 18 ct gold ?
Gold
What are the solutes?
Silver and Copper

54. Solution Properties Some general properties of solutions include:
Solutions may be formed between solids, liquids or gases.
They are homogenous in composition
They do not settle under gravity
They do not scatter light (Called the Tyndall Effect)
Solute particles are too small to scatter light and therefore light will go right through a solution like is shown on the next slide.

55. Tyndall Effect
Laser light reflected by a colloid. In a solution you would not see any red light.

56. Solutions

57. Aqueous Solutions
Water is the dissolving medium
104.5o 


58. Some Properties of Water
Water is “bent” or V-shaped.
Water is a molecular compound.
Water is a polar molecule.
Hydration occurs when ionic compounds dissolve in water.

59. SOLUTION CONCENTRATION
The ratio of the amount of solute to amount of solution, or solvent is defined by the concentration.
solute
solute
Concentration = =
solution
solvent
There are various combinations of units that are used in these rations.
Ratio
X 102
X 103
X 106
X 109
g solute
% (w/w)
ppt (w/w)
ppm (w/w)
ppb (w/w) =
g solution
g solute =
% (w/v)
ppt (w/v)
ppm (w/v)
ppb (w/v)
mL solution
mL solute =
% (v/v)
ppt (v/v)
ppm (v/v)
ppb (v/v)
mL solution

60. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
Find the mass of water and salt required to make 333 g of a
44.6 % (w/w) solution.
25.2 g NaCl

61. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
25.2 g NaCl
33.6g H2O g NaCl

62. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
33.6g H2O g NaCl

63. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
= 43.0 % NaCl
33.6g H2O g NaCl

64. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
= 43.0 % NaCl
33.6g H2O g NaCl
44.6 g NaCl
100 g solution

65. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
= 43.0 % NaCl
33.6g H2O g NaCl
44.6 g NaCl
333 g solution
100 g solution

66. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
= 43.0 % NaCl
33.6g H2O g NaCl
44.6 g NaCl
333 g solution
100 g solution

67. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
= 43.0 % NaCl
33.6g H2O g NaCl
44.6 g NaCl
333 g solution
= 149 g NaCl
100 g solution

68. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
= 43.0 % NaCl
33.6g H2O g NaCl
44.6 g NaCl
333 g solution
= 149 g NaCl
100 g solution
Mass of water?

69. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
= 43.0 % NaCl
33.6g H2O g NaCl
44.6 g NaCl
333 g solution
= 149 g NaCl
100 g solution
Mass of water?
333 g solution – 149 g NaCl = 184 g H2O

70. SAMPLE SOLUTION PROBLEMS
1. Find the % (w/w) when 25.2 g NaCl is combined with 33.6g H2O.
2. Find the mass of water and salt required to make 333 g of a 44.6 % (w/w) solution.
100
25.2 g NaCl
= 43.0 % NaCl
33.6g H2O g NaCl
44.6 g NaCl
333 g solution
= 149 g NaCl
100 g solution
Mass of water?
333 g solution – 149 g NaCl = 184 g H2O

71. SAMPLE SOLUTION PROBLEMS
How many grams of NaCl are required to dissolve in 88.2 g of water to make a 29.2% (w/w) solution.
A sugar solution is 35.2%(w/v) find the mass of sugar contained in a 432 mL sample of this sugar solution.

72. SOLUTION CONCENTRATION
The solution concentration can also be defined using moles. The most common example is molarity (M).
The molarity of a solution is defined as:
“The number of moles of solute in 1 L of solution”
and is given the formula:
Moles solute
Molarity (M) =
Liters solution

73. MOLARITY SAMPLE PROBLEMS
A student dissolves 25.8 g of NaCl in a 250 mL volumetric flask. Calculate the molarity of this solution. (picture of volumetric flask is on the next slide)
Find the mass of HCl required to form 2.00 L of a M solution of HCl.
A student evaporates the water form a 333 mL sample of a M solution of NaCl. What mass of salt remains?

74. SOLUTION PREPARATION
In the lab we would use a piece of glassware called a volumetric flask to prepare this solution.

75. SOLUTION PREPARATION

76. VOLUMETRIC FLASK

77. SOLUTION DILUTION
Often we will want to make a dilute solution from a more concentrated one.
To determine how to do this we use the formula :
C1V1 = C2V2
Where:
C1 = concentration of more concentrated solution
V1 = volume required of more concentrated solution
C2 = concentration of more dilute solution
V2 = volume of more dilute solution
We can use any units in this equation but they must be the same on both sides.

78. DILUTION PROBLEM
How would one prepare 50.0 mL of a 3.00 M solution of NaOH using a 7.10 M stock solution?
C1V1 = C2V2
(7.10 M)V1 = (3.00 M) (50.0 mL)
This means that you add 21.1 mL of the concentrated stock solution to a 50.0 mL volumetric flask and add water until the bottom of the meniscus touches the line on the volumetric flask.

79. DILUTION PROBLEM
How would one prepare 50.0 mL of a 3.00 M solution of NaOH using a 7.10 M stock solution?
C1V1 = C2V2
(7.10 M)V1 = (3.00 M) (50.0 mL)
(3.00 M) (50.0 mL)
(7.10 M)V1 =
(7.10 M)
(7.10 M)
V1 = 21.1 mL
This means that you add 21.1 mL of the concentrated stock solution to a 50.0 mL volumetric flask and add water until the bottom of the meniscus touches the line on the volumetric flask.

80. THE END