5.3: Quantitative Relationships Based on Chemical Equations
 Page ID
 16120
Learning Objectives
 To calculate the amount of one substance that will react with or be produced from a given amount of another substance.
A balanced chemical equation not only describes some of the chemical properties of substances—by showing us what substances react with what other substances to make what products—but also shows numerical relationships between the reactants and the products. The study of these numerical relationships is called stoichiometry. The stoichiometry of chemical equations revolves around the coefficients in the balanced chemical equation because these coefficients determine the molecular ratio in which reactants react and products are made.
The word stoichiometry is pronounced “stowehkeyOMettree.” It is of mixed Greek and English origins, meaning roughly “measure of an element.”
Looking Closer: Stoichiometry in Cooking
Let us consider a stoichiometry analogy from the kitchen. A recipe that makes 1 dozen biscuits needs 2 cups of flour, 1 egg, 4 tablespoons of shortening, 1 teaspoon of salt, 1 teaspoon of baking soda, and 1 cup of milk. If we were to write this as a chemical equation, we would write
2 c flour + 1 egg + 4 tbsp shortening + 1 tsp salt + 1 tsp baking soda + 1 c milk → 12 biscuits
(Unlike true chemical reactions, this one has all 1 coefficients written explicitly—partly because of the many different units here.) This equation gives us ratios of how much of what reactants are needed to make how much of what product. Two cups of flour, when combined with the proper amounts of the other ingredients, will yield 12 biscuits. One teaspoon of baking soda (when also combined with the right amounts of the other ingredients) will make 12 biscuits. One egg must be combined with 1 cup of milk to yield the product food. Other relationships can also be expressed.
We can use the ratios we derive from the equation for predictive purposes. For instance, if we have 4 cups of flour, how many biscuits can we make if we have enough of the other ingredients? It should be apparent that we can make a double recipe of 24 biscuits.
But how would we find this answer formally, that is, mathematically? We would set up a conversion factor, much like we did in Chapter 1 "Chemistry, Matter, and Measurement". Because 2 cups of flour make 12 biscuits, we can set up an equivalency ratio:
\[\mathrm{\dfrac{12\: biscuits}{2\: c\: flour}}\]
We then can use this ratio in a formal conversion of flour to biscuits:
\[\mathrm{4\: c\: flour\times\dfrac{12\: biscuits}{2\: c\: flour}=24\: biscuits}\]
Similarly, by constructing similar ratios, we can determine how many biscuits we can make from any amount of ingredient. When you are doubling or halving a recipe, you are doing a type of stoichiometry. Applying these ideas to chemical reactions should not be difficult if you use recipes when you cook.
A recipe shows how much of each ingredient is needed for the proper reaction to take place. Image used with permission from Wikipedia.
Consider the following balanced chemical equation:
\[2C_2H_2 + 5O_2 \rightarrow 4CO_2 + 2H_2O \label{Eq1}\]
The coefficients on the chemical formulas give the ratios in which the reactants combine and the products form. Thus, we can make the following statements and construct the following ratios:
Statement from the Balanced Chemical Reaction  Ratio  Inverse Ratio 

two C_{2}H_{2} molecules react with five O_{2} molecules  \(\mathrm{\dfrac{2C_2H_2}{5O_2}}\)  \(\mathrm{\dfrac{5O_2}{2C_2H_2}}\) 
two C_{2}H_{2} molecules react to make four CO_{2} molecules  \(\mathrm{\dfrac{2C_2H_2}{4CO_2}}\)  \(\mathrm{\dfrac{4CO_2}{2C_2H_2}}\) 
five O_{2} molecules react to make two H_{2}O molecules  \(\mathrm{\dfrac{5O_2}{2H_2O}}\)  \(\mathrm{\dfrac{2H_2O}{5O_2}}\) 
four CO_{2} molecules are made at the same time as two H_{2}O molecules  \(\mathrm{\dfrac{2H_2O}{4CO_2}}\)  \(\mathrm{\dfrac{4CO_2}{2H_2O}}\) 
Other relationships are possible; in fact, 12 different conversion factors can be constructed from this balanced chemical equation. In each ratio, the unit is assumed to be molecules because that is how we are interpreting the chemical equation.
Any of these fractions can be used as a conversion factor to relate an amount of one substance to an amount of another substance. For example, suppose we want to know how many CO_{2} molecules are formed when 26 molecules of C_{2}H_{2} are reacted. As usual with a conversion problem, we start with the amount we are given—26C_{2}H_{2}—and multiply it by a conversion factor that cancels out our original unit and introduces the unit we are converting to—in this case, CO_{2}. That conversion factor is \(\mathrm{\dfrac{4CO_2}{2C_2H_2}}\), which is composed of terms that come directly from the balanced chemical equation. Thus, we have
\[\mathrm{26C_2H_2\times\dfrac{4CO_2}{2C_2H_2}}\]
The molecules of C_{2}H_{2} cancel, and we are left with molecules of CO_{2}. Multiplying through, we get
\[\mathrm{26C_2H_2\times\dfrac{4CO_2}{2C_2H_2}= 52CO_2}\]
Thus, 52 molecules of CO_{2} are formed.
This application of stoichiometry is extremely powerful in its predictive ability, as long as we begin with a balanced chemical equation. Without a balanced chemical equation, the predictions made by simple stoichiometric calculations will be incorrect.
Example \(\PageIndex{1}\)
Start with this balanced chemical equation.
KMnO_{4} + 8HCl + 5FeCl_{2} → 5 FeCl_{3} + MnCl_{2} + 4H_{2}O + KCl
 Verify that the equation is indeed balanced.
 Give 2 ratios that give the relationship between HCl and FeCl_{3}.
SOLUTION
 Each side has 1 K atom and 1 Mn atom. The 8 molecules of HCl yield 8 H atoms, and the 4 molecules of H_{2}O also yield 8 H atoms, so the H atoms are balanced. The Fe atoms are balanced, as we count 5 Fe atoms from 5 FeCl_{2} reactants and 5 FeCl_{3} products. As for Cl, on the reactant side, there are 8 Cl atoms from HCl and 10 Cl atoms from the 5 FeCl_{2} formula units, for a total of 18 Cl atoms. On the product side, there are 15 Cl atoms from the 5 FeCl_{3} formula units, 2 from the MnCl_{2} formula unit, and 1 from the KCl formula unit. This is a total of 18 Cl atoms in the products, so the Cl atoms are balanced. All the elements are balanced, so the entire chemical equation is balanced.
 Because the balanced chemical equation tells us that 8 HCl molecules react to make 5 FeCl_{3} formula units, we have the following 2 ratios: \(\mathrm{\dfrac{8HCl}{5FeCl_3}\:and\: \dfrac{5FeCl_3}{8HCl}}\). There are a total of 42 possible ratios. Can you find the other 40 relationships?
Exercise \(\PageIndex{1}\)
Start with this balanced chemical equation.
\[\mathrm{2KMnO_4+3CH_2\textrm{=C}H_2+4H_2O\rightarrow 2MnO_2+3HOCH_2CH_2OH+2KOH} \nonumber\]
 Verify that the equation is balanced.
 Give 2 ratios that give the relationship between KMnO_{4} and CH_{2}=CH_{2}. (A total of 30 relationships can be constructed from this chemical equation. Can you find the other 28?)
Summary
A balanced chemical equation gives the ratios in which molecules of substances react and are produced in a chemical reaction.
Concept Review Exercises
 Explain how stoichiometric ratios are constructed from a chemical equation.
 Why is it necessary for a chemical equation to be balanced before it can be used to construct conversion factors?
Answers
 Stoichiometric ratios are made using the coefficients of the substances in the balanced chemical equation.
 A balanced chemical equation is necessary so one can construct the proper stoichiometric ratios.
Exercises

Balance this equation and write every stoichiometric ratio you can from it.
NH_{4}NO_{3} → N_{2}O + H_{2}O

Balance this equation and write every stoichiometric ratio you can from it.
N_{2} + H_{2} → NH_{3}

Balance this equation and write every stoichiometric ratio you can from it.
Fe_{2}O_{3} + C → Fe + CO_{2}

Balance this equation and write every stoichiometric ratio you can from it.
Fe_{2}O_{3} + CO → Fe + CO_{2}

Balance this equation and determine how many molecules of CO_{2} are formed if 15 molecules of C_{6}H_{6} are reacted.
C_{6}H_{6} + O_{2} → CO_{2} + H_{2}O

Balance this equation and determine how many molecules of Ag_{2}CO_{3}(s) are produced if 20 molecules of Na_{2}CO_{3} are reacted.
Na_{2}CO_{3}(aq) + AgNO_{3}(aq) → NaNO_{3}(aq) + Ag_{2}CO_{3}(s)

Copper metal reacts with nitric acid according to this equation:
3Cu(s) + 8HNO_{3}(aq) → 3Cu(NO_{3})_{2}(aq) + 2NO(g) + 4H_{2}O(ℓ)
 Verify that this equation is balanced.
 How many Cu atoms will react if 488 molecules of aqueous HNO_{3} are reacted?

Gold metal reacts with a combination of nitric acid and hydrochloric acid according to this equation:
Au(s) + 3HNO_{3}(aq) + 4HCl(aq) → HAuCl_{4}(aq) + 3NO_{2}(g) + 3H_{2}O(ℓ)
 Verify that this equation is balanced.
 How many Au atoms react with 639 molecules of aqueous HNO_{3}?

Sulfur can be formed by reacting sulfur dioxide with hydrogen sulfide at high temperatures according to this equation:
SO_{2}(g) + 2H_{2}S(g) → 3S(g) + 2H_{2}O(g)
 Verify that this equation is balanced.
 How many S atoms will be formed from by reacting 1,078 molecules of H_{2}S?

Nitric acid is made by reacting nitrogen dioxide with water:
3NO_{2}(g) + H_{2}O(ℓ) → 2HNO_{3}(aq) + NO(g)
 Verify that this equation is balanced.
 How many molecules of NO will be formed by reacting 2,268 molecules of NO_{2}?
Answers

NH_{4}NO_{3} → N_{2}O + 2H_{2}O; the stoichiometric ratios are \(\mathrm{\dfrac{1NH_4NO_3}{1N_2O}\:,\: \dfrac{1NH_4NO_3}{2H_2O}\:,\: \dfrac{1N_2O}{2H_2O}\:,}\) and their reciprocals.

2Fe_{2}O_{3} + 3C → 4Fe + 3CO_{2}; the stoichiometric ratios are \(\mathrm{\dfrac{2Fe_2O_3}{3C}\:,\: \dfrac{2Fe_2O_3}{4Fe}\:,\: \dfrac{2Fe_2O_3}{3CO_2}\:,\: \dfrac{3C}{4Fe}\:,\: \dfrac{3C}{3CO_2}\:,\: \dfrac{4Fe}{3CO_2}\:,\: }\) and their reciprocals.

2C_{6}H_{6} + 15O_{2} → 12CO_{2} + 6H_{2}O; 90 molecules

 It is balanced.
 183 atoms

 It is balanced.
 1,617 atoms