# Two-Way Tables in Statistics

Statisticians use two-way tables and segmented bar charts to examine the relationship between two categorical variables.

Entries in the cells of a two-way table can be displayed as frequency counts or as relative frequencies (just like a one-way table). Or they can be displayed graphically as a segmented bar chart.

### Two-Way Frequency Tables

Dance | Sports | TV | Total | |

Men | 2 | 10 | 8 | 20 |

Women | 16 | 6 | 8 | 30 |

Total | 18 | 16 | 16 | 50 |

To the right, the two-way table shows the favorite leisure activities for 50 adults - 20 men and 30 women. Because entries in the table are frequency counts, the table is a frequency table.

Entries in the "Total" row and "Total" column are called
**marginal frequencies** or the
**marginal distribution**. Entries in the body
of the table are called **joint frequencies**.

If we looked only at the marginal frequencies in the Total row, we might conclude that the three activities had roughly equal appeal. Yet, the joint frequencies show a strong preference for dance among women; and little interest in dance among men.

### Two-Way Relative Frequency Tables

Dance | Sports | TV | Total | |
---|---|---|---|---|

Men | 0.04 | 0.20 | 0.16 | 0.40 |

Women | 0.32 | 0.12 | 0.16 | 0.60 |

Total | 0.36 | 0.32 | 0.32 | 1.00 |

Relative Frequency of Table

We can also display relative frequencies in two-way tables.
The table to the right shows preferences for leisure activities
in the form of relative frequencies. The relative
frequencies in the body of the table are called
**conditional frequencies** or the
**conditional distribution**.

Two-way tables can show relative frequencies for the whole table, for rows, or for columns. The table to the right shows relative frequencies for the whole table. Below, the table on the left shows relative frequencies for rows; and the table on the right shows relative frequencies for columns.

Relative Frequency of Row |
Relative Frequency of Column |

Each type of relative frequency table makes a different contribution to understanding the relationship between gender and preferences for leisure activities. For example, "Relative Frequency for Rows" table most clearly shows the probability that each gender will prefer a particular leisure activity. For instance, it is easy to see that the probability that a man will prefer dance is 10%; the probability that a woman will prefer dance is 53%; the probability that a man will prefer sports is 50%; and so on.

### Segmented Bar Charts

Such relationships are often easier to detect when they are
displayed graphically in a **segmented bar chart**.
A segmented bar chart has one bar for each level of a
categorical variable. Each bar is divided into "segments", such
that the length of each segment indicates proportion or percentage
of observations in a second variable.

The segmented bar chart on the right uses data from the "Relative Frequency for Rows" table above. It shows that women have an strong preference for dance; while men seldom make dance their first choice. Men are most likely to prefer sports, but the degree of preference for sports over TV is not great.

### Test Your Understanding of This Lesson

**Problem**

For | Against | No opinion | Total | |

21 - 40 | 25 | 20 | 5 | 50 |

41 - 60 | 20 | 35 | 20 | 75 |

Over 60 | 55 | 15 | 5 | 75 |

Total | 100 | 70 | 30 | 200 |

**Frequency Count**

A public opinion survey explored the relationship between age and support for increasing the minimum wage. The results are summarized in the two-way table to the right.

In the 21 to 40 age group, what percentage supports increasing the minimum wage?

(A) 12.5%

(B) 20%

(C) 25%

(D) 50%

(E) 75%

**Solution**

The correct answer is (D). A total of 50 people in the 21 to 40 age group were surveyed. Of those, 25 were for increasing the minimum wage. Thus, half of the respondents in the 21 to 50 age group (50%) supported increasing the minimum wage.