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Mean, Median, and Mode

Measures of Central Tendency

Essential Understanding: These three measures help us find the “center” or “typical value” of a data set. Each measure has its own purpose and is useful in different situations.

Mean: The average

Median: The middle value

Mode: The most frequent

The Three Averages

$\bar{x}$

Mean (Arithmetic Average)

Definition: The sum of all values divided by the number of values.

\[ \bar{x} = \frac{\sum x}{n} \]

When to use: When all data values are important and there are no extreme outliers.

Median (Middle Value)

Definition: The middle value when data is arranged in order.

Finding it:

Odd $n$: Middle value
Even $n$: Average of two middle values

When to use: When data has outliers or is skewed.

Mode (Most Common)

Definition: The value that appears most frequently.

Special cases:

No mode: All values appear equally
Bimodal: Two modes
Multimodal: More than two modes

When to use: For categorical data or finding the most popular item.

Interactive Calculator

Data Analyzer

Enter your data values separated by commas and see the mean, median, and mode calculated instantly!

Enter data values (separated by commas):

Mean

–

Median

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Mode

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Step-by-Step Examples

Example 1: Finding Mean, Median, and Mode

Data: The ages of 7 students are: 14, 15, 13, 15, 16, 15, 14

Finding the Mean:

Add all values: $ 14 + 15 + 13 + 15 + 16 + 15 + 14 = 102 $

Divide by count: $ \bar{x} = \frac{102}{7} = 14.57 $ (to 2 d.p.)

Finding the Median:

Arrange in order: 13, 14, 14, 15, 15, 15, 16

Find middle position: $ \frac{7+1}{2} = 4 $th value

Median = 15 (the 4th value)

Finding the Mode:

Count each value: 13 appears 1 time, 14 appears 2 times, 15 appears 3 times, 16 appears 1 time

Mode = 15 (appears most often)

Example 2: Even Number of Values (Finding Median)

Data: Test scores: 72, 85, 63, 91, 78, 84

Arrange in order: 63, 72, 78, 84, 85, 91

With 6 values (even), find the two middle values: 3rd and 4th positions

Middle values are 78 and 84

Median = $ \frac{78 + 84}{2} = \frac{162}{2} = 81 $

Mean from a Frequency Table

Formula for Grouped Data

When data is given in a frequency table:

\[ \bar{x} = \frac{\sum fx}{\sum f} \]

where $f$ = frequency and $x$ = data value (or class midpoint for grouped data)

Example 3: Mean from Frequency Table

Question: Find the mean number of goals scored.

Goals ($x$)	Frequency ($f$)	$fx$
0	3	0
1	7	7
2	5	10
3	4	12
4	1	4
Total	$\sum f = 20$	$\sum fx = 33$

Solution:

\[ \bar{x} = \frac{\sum fx}{\sum f} = \frac{33}{20} = 1.65 \text{ goals} \]

When to Use Each Measure

Measure	Best Used When	Avoid When
Mean	Data is symmetrical with no outliers	Data has extreme values (outliers)
Median	Data is skewed or has outliers	You need to use all data values in calculations
Mode	Data is categorical or you want the most common value	All values appear with equal frequency

The Effect of Outliers

Example: Salaries at a small company: $30,000, $35,000, $32,000, $28,000, $500,000

Mean: $\frac{625,000}{5} = \$125,000$ – Heavily affected by the CEO’s salary!
Median: $32,000 – A much better representation of a “typical” salary

This is why median household income is often reported instead of mean income.

CSEC Practice Questions

Test Your Understanding

Find the mean of: 4, 7, 9, 5, 10

Solution: $\bar{x} = \frac{4+7+9+5+10}{5} = \frac{35}{5} = 7$

Find the median of: 12, 5, 8, 3, 9, 7, 15

8.5

Solution:
Sorted: 3, 5, 7, 8, 9, 12, 15
7 values, so median is the 4th value = 8

The mode of the data set 2, 5, 3, 5, 7, 5, 8 is:

Solution: 5 appears 3 times (more than any other value), so the mode is 5.

The mean of 5 numbers is 12. If four of the numbers are 10, 15, 8, and 14, find the fifth number.

Solution:
Sum of all 5 numbers = Mean × Count = 12 × 5 = 60
Sum of known numbers = 10 + 15 + 8 + 14 = 47
Fifth number = 60 – 47 = 13

Key Points to Remember

Mean = $\frac{\text{Sum of values}}{\text{Number of values}} = \frac{\sum x}{n}$
Median = Middle value when data is ordered (average of two middle values if even count)
Mode = Most frequently occurring value (can have no mode, or multiple modes)
For frequency tables: Mean = $\frac{\sum fx}{\sum f}$
Outliers affect the mean but not the median

CSEC Examination Tips

Always show your working – write out the sum and division for mean
For median: First sort the data, then find the middle position
For grouped data: Use class midpoints and the $\frac{\sum fx}{\sum f}$ formula
Check your answer: The mean should be between the smallest and largest values
Read carefully: Questions may ask for the “most appropriate” average – consider outliers!

[/raw]

Goals (\(x\))	Frequency (\(f\))	\(fx\)
0	3	0
1	7	7
2	5	10
3	4	12
4	1	4
Total	\(\sum f = 20\)	\(\sum fx = 33\)