Chapter 5: Molecules, Compounds, and Chemical Equations
5.8 Writing and Balancing Chemical Equations
Learning Outcomes
- Derive chemical equations from narrative descriptions of chemical reactions
Chapter 2 introduced the use of element symbols to represent individual atoms. When atoms gain or lose electrons to yield ions, or combine with other atoms to form molecules, their symbols are modified or combined to generate chemical formulas that appropriately represent these species. Extending this symbolism to represent both the identities and the relative quantities of substances undergoing a chemical (or physical) change involves writing and balancing a chemical equation. Consider as an example the reaction between one methane molecule [latex]\ce{(CH4)}[/latex] and two diatomic oxygen molecules [latex]\ce{(O2)}[/latex] to produce one carbon dioxide molecule [latex]\ce{(CO2)}[/latex] and two water molecules [latex]\ce{(H2O)}[/latex]. The chemical equation representing this process is provided in the upper half of Figure 5.8.1, with space-filling molecular models shown in the lower half of the figure.
This example illustrates the fundamental aspects of any chemical equation:
- The substances undergoing reaction are called reactants, and their formulas are placed on the left side of the equation.
- The substances generated by the reaction are called products, and their formulas are placed on the right sight of the equation.
- Plus signs (+) separate individual reactant and product formulas, and an arrow ([latex]\longrightarrow[/latex]) separates the reactant and product (left and right) sides of the equation.
- The relative numbers of reactant and product species are represented by coefficients (numbers placed immediately to the left of each formula). A coefficient of 1 is typically omitted.
It is common practice to use the smallest possible whole-number coefficients in a chemical equation, as is done in this example. Realize, however, that these coefficients represent the relative numbers of reactants and products, and, therefore, they may be correctly interpreted as ratios. Methane and oxygen react to yield carbon dioxide and water in a 1:2:1:2 ratio. This ratio is satisfied if the numbers of these molecules are, respectively, 1-2-1-2, or 2-4-2-4, or 3-6-3-6, and so on (Figure 5.8.2). Likewise, these coefficients may be interpreted with regard to any amount (number) unit, and so this equation may be correctly read in many ways, including:
- One methane molecule and two oxygen molecules react to yield one carbon dioxide molecule and two water molecules.
- One dozen methane molecules and two dozen oxygen molecules react to yield one dozen carbon dioxide molecules and two dozen water molecules.
- One mole of methane molecules and 2 moles of oxygen molecules react to yield 1 mole of carbon dioxide molecules and 2 moles of water molecules.
Balancing Equations
The chemical equation described in above is balanced, meaning that equal numbers of atoms for each element involved in the reaction are represented on the reactant and product sides. This is a requirement the equation must satisfy to be consistent with the law of conservation of matter. It may be confirmed by simply summing the numbers of atoms on either side of the arrow and comparing these sums to ensure they are equal. Note that the number of atoms for a given element is calculated by multiplying the coefficient of any formula containing that element by the element’s subscript in the formula. If an element appears in more than one formula on a given side of the equation, the number of atoms represented in each must be computed and then added together. For example, both product species in the example reaction, [latex]\ce{CO2}[/latex] and [latex]\ce{H2O}[/latex], contain the element oxygen, and so the number of oxygen atoms on the product side of the equation is
[latex]\left(1{\ce{CO}}_{2}\text{ molecule }\times \dfrac{2 \text{ } \ce{O} \text{ atoms}}{{\ce{CO}}_{2}\text{ molecule }}\right)+\left(2{\ce{H}}_{2}\ce{O} \text{ molecule }\times \dfrac{1 \text{ } \ce{O} \text{ atom}}{{\ce{H}}_{2}\ce{O} \text{ molecule }}\right)=4 \text{ } \ce{O} \text{ atoms}[/latex]
The equation for the reaction between methane and oxygen to yield carbon dioxide and water is confirmed to be balanced per this approach, as shown here:
[latex]\ce{CH4}+\ce{2O2}\longrightarrow\ce{CO2}+\ce{2H2O}[/latex]
| Element | Reactants | Products | Balanced? |
|---|---|---|---|
| [latex]\ce{C}[/latex] | 1 × 1 = 1 | 1 × 1 = 1 | 1 = 1, yes |
| [latex]\ce{H}[/latex] | 4 × 1 = 4 | 2 × 2 = 4 | 4 = 4, yes |
| [latex]\ce{O}[/latex] | 2 × 2 = 4 | (1 × 2) + (2 × 1) = 4 | 4 = 4, yes |
A balanced chemical equation often may be derived from a qualitative description of some chemical reaction by a fairly simple approach known as balancing by inspection. Consider as an example the decomposition of water to yield molecular hydrogen and oxygen. This process is represented qualitatively by an unbalanced chemical equation:
[latex]\ce{H2O}\longrightarrow\ce{H2}+\ce{O2}\text{(unbalanced)}[/latex]
Comparing the number of [latex]\ce{H}[/latex] and [latex]\ce{O}[/latex] atoms on either side of this equation confirms its imbalance:
| Element | Reactants | Products | Balanced? |
|---|---|---|---|
| [latex]\ce{H}[/latex] | 1 × 2 = 2 | 1 × 2 = 2 | 2 = 2, yes |
| [latex]\ce{O}[/latex] | 1 × 1 = 1 | 1 × 2 = 2 | 1 ≠ 2, no |
The numbers of H atoms on the reactant and product sides of the equation are equal, but the numbers of [latex]\ce{O}[/latex] atoms are not. To achieve balance, the coefficients of the equation may be changed as needed. Keep in mind, of course, that the formula subscripts define, in part, the identity of the substance, and so these cannot be changed without altering the qualitative meaning of the equation. For example, changing the reactant formula from [latex]\ce{H2O}[/latex] to [latex]\ce{H2O2}[/latex] would yield balance in the number of atoms, but doing so also changes the reactant’s identity (it’s now hydrogen peroxide and not water). The [latex]\ce{O}[/latex] atom balance may be achieved by changing the coefficient for [latex]\ce{H2O}[/latex] to 2.
[latex]\mathbf{2}\ce{H2O}\longrightarrow\ce{H2}+\ce{O2}\text{(unbalanced)}[/latex]
| Element | Reactants | Products | Balanced? |
|---|---|---|---|
| [latex]\ce{H}[/latex] | 2 × 2 = 4 | 1 × 2 = 2 | 4 ≠ 2, no |
| [latex]\ce{O}[/latex] | 2 × 1 = 2 | 1 × 2 = 2 | 2 = 2, yes |
The [latex]\ce{H}[/latex] atom balance was upset by this change, but it is easily reestablished by changing the coefficient for the [latex]\ce{H2}[/latex] product to 2.
[latex]\ce{2H2O}\longrightarrow\mathbf{2}\ce{H2}+\ce{O2}\text{(balanced)}[/latex]
| Element | Reactants | Products | Balanced? |
|---|---|---|---|
| [latex]\ce{H}[/latex] | 2 × 2 = 4 | 2 × 2 = 2 | 4 = 4, yes |
| [latex]\ce{O}[/latex] | 2 × 1 = 2 | 1 × 2 = 2 | 2 = 2, yes |
These coefficients yield equal numbers of both [latex]\ce{H}[/latex] and [latex]\ce{O}[/latex] atoms on the reactant and product sides, and the balanced equation is, therefore:
[latex]\ce{2H2O}\longrightarrow \ce{2H2}+\ce{O2}[/latex]
Example 5.8.1: Balancing Chemical Equations
Write a balanced equation for the reaction of molecular nitrogen [latex]\ce{(N2)}[/latex] and oxygen [latex]\ce{(O2)}[/latex] to form dinitrogen pentoxide.
Show Solution
First, write the unbalanced equation:
[latex]\ce{N2}+\ce{O2}\longrightarrow\ce{N2O5}\text{(unbalanced)}[/latex]
Next, count the number of each type of atom present in the unbalanced equation.
| Element | Reactants | Products | Balanced? |
|---|---|---|---|
| [latex]\ce{N}[/latex] | 1 × 2 = 2 | 1 × 2 = 2 | 2 = 2, yes |
| [latex]\ce{O}[/latex] | 1 × 2 = 2 | 1 × 5 = 5 | 2 ≠ 5, no |
Though nitrogen is balanced, changes in coefficients are needed to balance the number of oxygen atoms. To balance the number of oxygen atoms, a reasonable first attempt would be to change the coefficients for the [latex]\ce{O2}[/latex] and [latex]\ce{N2O5}[/latex] to integers that will yield 10 O atoms (the least common multiple for the [latex]\ce{O}[/latex] atom subscripts in these two formulas).
[latex]\ce{N2}+\mathbf{5}\ce{O2}\longrightarrow\mathbf{2}\ce{N2O5}\text{(unbalanced)}[/latex]
| Element | Reactants | Products | Balanced? |
|---|---|---|---|
| [latex]\ce{N}[/latex] | 1 × 2 = 2 | 2 × 2 = 4 | 2 ≠ 4, no |
| [latex]\ce{O}[/latex] | 5 × 2 = 10 | 2 × 5 = 10 | 10 = 10, yes |
The N atom balance has been upset by this change; it is restored by changing the coefficient for the reactant [latex]\ce{N2}[/latex] to 2.
[latex]\ce{2N2}+\ce{5O2}\longrightarrow \ce{2N2O5}[/latex]
| Element | Reactants | Products | Balanced? |
|---|---|---|---|
| [latex]\ce{N}[/latex] | 2 × 2 = 4 | 2 × 2 = 4 | 4 = 4, yes |
| [latex]\ce{O}[/latex] | 5 × 2 = 10 | 2 × 5 = 10 | 10 = 10, yes |
The numbers of [latex]\ce{N}[/latex] and [latex]\ce{O}[/latex] atoms on either side of the equation are now equal, and so the equation is balanced.
Check Your Learning
It is sometimes convenient to use fractions instead of integers as intermediate coefficients in the process of balancing a chemical equation. When balance is achieved, all the equation’s coefficients may then be multiplied by a whole number to convert the fractional coefficients to integers without upsetting the atom balance. For example, consider the reaction of ethane [latex]\ce{(C2H6)}[/latex] with oxygen to yield [latex]\ce{H2O}[/latex] and [latex]\ce{CO2}[/latex], represented by the unbalanced equation:
[latex]\ce{C2H6}+\ce{O2}\longrightarrow\ce{H2O}+\ce{CO2}\text{(unbalanced)}[/latex]
Following the usual inspection approach, one might first balance [latex]\ce{C}[/latex] and [latex]\ce{H}[/latex] atoms by changing the coefficients for the two product species, as shown:
[latex]\ce{C2H6}+\ce{O2}\longrightarrow \ce{3H2O}+\ce{2CO2}\text{(unbalanced)}[/latex]
This results in seven [latex]\ce{O}[/latex] atoms on the product side of the equation, an odd number—no integer coefficient can be used with the [latex]\ce{O2}[/latex] reactant to yield an odd number, so a fractional coefficient, [latex]\frac{7}{2}[/latex] , is used instead to yield a provisional balanced equation:
[latex]\ce{C2H6}+\dfrac{7}{2}{\ce{O2}}\longrightarrow \ce{3H2O}+\ce{2CO2}[/latex]
A conventional balanced equation with integer-only coefficients is derived by multiplying each coefficient by 2:
[latex]\ce{2C2H6}+\ce{7O2}\longrightarrow \ce{6H2O}+\ce{4CO2}[/latex]
Finally with regard to balanced equations, recall that convention dictates use of the smallest whole-number coefficients. Although the equation for the reaction between molecular nitrogen and molecular hydrogen to produce ammonia is, indeed, balanced,
[latex]\ce{3N2}+\ce{9H2}\longrightarrow \ce{6NH3}[/latex]
the coefficients are not the smallest possible integers representing the relative numbers of reactant and product molecules. Dividing each coefficient by the greatest common factor, 3, gives the preferred equation:
[latex]\ce{N2}+\ce{3H2}\longrightarrow \ce{2NH3}[/latex]
Key Concepts and Summary
Chemical equations are symbolic representations of chemical and physical changes. Formulas for the substances undergoing the change (reactants) and substances generated by the change (products) are separated by an arrow and preceded by integer coefficients indicating their relative numbers. Balanced equations are those whose coefficients result in equal numbers of atoms for each element in the reactants and products. Chemical reactions in aqueous solution that involve ionic reactants or products may be represented more realistically by complete ionic equations and, more succinctly, by net ionic equations.
Try It
Balance the following equations:
- [latex]\ce{PCl5}(s)+\ce{H2O}(l)\longrightarrow\ce{POCl3}(l)+\ce{HCl}(aq)[/latex]
- [latex]\ce{Cu}(s)+\ce{HNO3}(aq)\longrightarrow\ce{Cu(NO3)2}(aq)+\ce{H2O}(l)+\ce{NO}(g)[/latex]
- [latex]\ce{Na}(s)+\ce{H2O}(l)\longrightarrow\ce{NaOH}(aq)+\ce{H2}(g)[/latex]
- [latex]\ce{PtCl4}(s)\longrightarrow\ce{Pt}(s)+\ce{Cl2}(g)[/latex]
Show Solution
The balanced equations are as follows:
- [latex]\ce{PCl5}(s)+\ce{H2O}(l)\longrightarrow\ce{POCl3}(l)+\ce{2HCl}(aq);[/latex]
- [latex]\ce{3Cu}(s)+\ce{8HNO3}(aq)\longrightarrow \ce{3Cu(NO3)2}(aq)+\ce{4H2O}(l)+\ce{2NO}(g);[/latex]
- [latex]\ce{2Na}(s)+\ce{2H2O}(l)\longrightarrow \ce{2NaOH}(aq)+\ce{H2}(g);[/latex]
- [latex]\ce{PtCl4}(s)\longrightarrow\ce{Pt}(s)+\ce{2Cl2}(g)[/latex]
Glossary
balanced equation: chemical equation with equal numbers of atoms for each element in the reactant and product
chemical equation: symbolic representation of a chemical reaction
coefficient: number placed in front of symbols or formulas in a chemical equation to indicate their relative amount
product: substance formed by a chemical or physical change; shown on the right side of the arrow in a chemical equation
reactant: substance undergoing a chemical or physical change; shown on the left side of the arrow in a chemical equation
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CC licensed content, Shared previously
- Chemistry 2e. Provided by: OpenStax. Located at: https://openstax.org/. License: CC BY: Attribution. License Terms: Access for free at
https://openstax.org/books/chemistry-2e/pages/1-introduction
symbolic representation of a chemical reaction
substance undergoing a chemical or physical change; shown on the left side of the arrow in a chemical equation
substance formed by a chemical or physical change; shown on the right side of the arrow in a chemical equation
number placed in front of symbols or formulas in a chemical equation to indicate their relative amount
chemical equation with equal numbers of atoms for each element in the reactant and product
