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  1. ISEE Middle Level Mathematics Achievement

  3. Find mean, median, or mode.

ISEE MIDDLE LEVEL • MATHEMATICS ACHIEVEMENT

Find mean, median, or mode.

Learn the three main ways to describe the center of a data set and know when to use each one.

SECTION 1

Where Did Mean, Median, and Mode Come From?

People have been working with averages for thousands of years. Ancient astronomers wanted a single number to represent their many measurements of a star's position. Over time, mathematicians developed different ways to find the "middle" of a group of numbers.

~1500s
Early Averages
Astronomers began adding up observations and dividing to find a central value. This idea became what we now call the mean.
1700s
The Median Appears
Mathematicians realized that the middle value in an ordered list could be more useful than the mean when extreme numbers were present.
1895
Karl Pearson Names the Mode
The famous statistician Karl Pearson gave the name "mode" to the value that appears most often in a data set.
Today
Used Everywhere
Mean, median, and mode are used in sports stats, school grades, science experiments, and even video game leaderboards.

The big question these ideas answer is simple: What single number best represents a whole group of numbers? The ISEE will test whether you can calculate each one correctly and quickly. Let's learn how.

SECTION 2

Core Definitions: Mean, Median, and Mode

Each of these three measures tells you something different about a set of numbers. Think of them as three different cameras taking a picture of the same data — each one gives you a slightly different view.

1

Mean (Average)

Add up all the numbers and divide by how many numbers there are. The mean shares the total evenly across every value.
2

Median (Middle Value)

Put the numbers in order from least to greatest. The median is the number right in the middle of that list.
3

Mode (Most Frequent)

The mode is the number that shows up more often than any other number. A set can have no mode, one mode, or more than one mode.
✦ KEY TAKEAWAY
Imagine you and four friends share a pizza equally. That equal share is like the mean. Now line everyone up by height — the person in the middle is like the median. And if three of you are wearing blue shirts, blue is the mode of shirt colors!
SECTION 3

See It: Mean, Median, and Mode on a Number Line

Let's look at the data set: 2, 4, 4, 5, 7, 8, 10. The diagram below shows each value as a dot on a number line. The mean, median, and mode are marked so you can see how they relate.

Data Set: 2, 4, 4, 5, 7, 8, 1012345678910×2Mean ≈ 5.7Median = 5Mode = 4
Notice how the mode (4) has two dots stacked because it appears twice. The median (5) sits in the exact middle of the ordered list. The mean (≈ 5.7) is pulled slightly right by the larger value of 10.

This picture shows an important idea: the three measures don't always have the same value. On the ISEE, you need to calculate the correct one based on what the problem asks. Always read the question carefully to see if it says mean, median, or mode.

SECTION 4

The Formulas You Need

Let's look at the exact steps for calculating each measure. These are the formulas and rules you should memorize for test day.

MEAN (AVERAGE)
Mean = Sum of all values ÷ Number of values
Add every number in the data set together. Then divide that total by how many numbers there are. For example, for the set {3, 5, 7}: Mean = (3 + 5 + 7) ÷ 3 = 15 ÷ 3 = 5.
MEDIAN (MIDDLE VALUE)
Step 1: Order values from least to greatest. Step 2: Find the middle position.
If there is an odd number of values, the median is the single middle number. If there is an even number of values, the median is the mean (average) of the two middle numbers.
MODE (MOST COMMON VALUE)
Mode = the value that appears most often
Count how many times each number appears. The one with the highest count is the mode. If all numbers appear the same number of times, there is no mode. If two numbers tie for the highest count, there are two modes.
💡 ISEE Test Tip
When a problem says "average," it almost always means the mean. Also, be careful with even-numbered data sets when finding the median — you'll need to average the two middle values.
SECTION 5

The Tricky Part: Even Number of Values

Finding the median with an odd number of values is easy — just pick the one in the middle. But what happens when you have an even number of values? Let's look at how this works with a diagram.

Finding the Median: Odd vs. Even CountODD COUNT (5 values)357911Median = 7(the single middle number)EVEN COUNT (6 values)24681012Median = (6 + 8) ÷ 2 = 7(average of two middle numbers)Quick Position FormulaMiddle position = (n + 1) ÷ 2where n = total number of valuesn = 5 → position 3n = 6 → position 3.5 (between 3rd & 4th)
With an odd count, the median is the single middle value. With an even count, you must average the two middle values. The position formula (n + 1) ÷ 2 helps you find the right spot quickly.

A common mistake is forgetting to put the numbers in order before finding the median. Always sort from least to greatest first! If you skip that step, you'll pick the wrong middle number.

SECTION 6

Worked Example: All Three Measures

Let's work through a complete problem using the data set: 12, 8, 15, 8, 10, 7. We'll find the mean, median, and mode step by step.

Find the Mean, Median, and Mode of: 12, 8, 15, 8, 10, 7

Step 1 — Find the Mean

Add all the values: 12 + 8 + 15 + 8 + 10 + 7 = 60. Count the values: there are 6 numbers. Divide: 60 ÷ 6 = 10.
Mean = 10

Step 2 — Order the Values for the Median

Put the numbers in order from least to greatest: 7, 8, 8, 10, 12, 15. There are 6 values (even), so the median is the average of the 3rd and 4th values.
The 3rd value is 8. The 4th value is 10.

Step 3 — Calculate the Median

Average the two middle values: (8 + 10) ÷ 2 = 18 ÷ 2 = 9.
Median = 9

Step 4 — Find the Mode

Look at the ordered list: 7, 8, 8, 10, 12, 15. The number 8 appears twice. Every other number appears only once. So 8 is the most frequent value.
Mode = 8
✓ Check Your Work
A great way to double-check the mean is to multiply your answer by the number of values. If 10 × 6 = 60, and your sum was 60, you know you got it right!
SECTION 7

When to Use Each Measure

Each measure of central tendency has strengths and weaknesses. On the ISEE, you mostly just need to calculate them. But understanding when each is useful can help you answer trickier questions.

Comparing Mean, Median, and Mode
MeasureStrengthsWeaknesses
MeanUses every value in the set; most commonly usedOne very large or very small number (an outlier) can pull it way up or down
MedianNot affected by outliers; shows the true centerDoesn't use the actual values of every number — just their position
ModeEasy to spot; works with non-number data (like colors)May not exist, or there could be more than one mode
✦ KEY TAKEAWAY
Think of it this way: if you're looking at house prices in a neighborhood and one mansion costs 10 million dollars, the mean would make it seem like everyone lives in an expensive home. The median would give you a much better picture of the typical house price. That extreme value is called an outlier.
SECTION 8

What Comes Next: Range and Weighted Averages

On the ISEE, you may also see the word range (the difference between the largest and smallest values). Range is not a measure of center — it tells you how spread out the data is. In later math courses, you'll also learn about weighted averages, where some values count more than others.

Building on Mean, Median, and Mode
What You Know NowWhat You'll Learn Later
Mean: add all values, divide by countWeighted mean: some values count more than others (like final exams)
Median: the middle value in orderQuartiles: dividing data into four equal parts
Mode: the most frequent valueFrequency distributions and histograms for large data sets
Range: largest minus smallestStandard deviation: a precise measure of how spread out data is

Don't worry about these advanced topics for the ISEE. Just focus on mastering the mean, median, and mode. The skills you're building now are the foundation for everything that comes later!

SECTION 9

Practice Problems

Try these five problems. They start easier and get harder, just like on the real ISEE. Remember: there's no penalty for guessing, so always pick an answer! Use process of elimination to cross out choices that can't be right.

PROBLEM 1 — CONCEPTUAL
Which measure of central tendency is found by adding all values and dividing by the number of values?
PROBLEM 2 — BASIC CALCULATION
What is the mean of the data set: 6, 10, 14, 18, 22?
PROBLEM 3 — INTERMEDIATE
The data set is: 3, 7, 7, 9, 12, 15. What is the median?
PROBLEM 4 — APPLIED
Maya scored 85, 90, 78, 92, and 90 on her five math tests. What is the mode of her scores?
PROBLEM 5 — CRITICAL THINKING
A data set has five numbers. The mean is 12, and four of the numbers are 8, 10, 14, and 16. What is the fifth number?
SUMMARY

Quick Review: Mean, Median, and Mode

The mean is the sum of all values divided by the count. The median is the middle value after you put numbers in order from least to greatest — for an even count, average the two middle numbers. The mode is the value that appears most often.

On the ISEE, always read carefully to see which measure the question asks for. Remember to sort the data first before finding the median. Watch for missing-value problems where you work backward from a given mean: multiply the mean by the count to find the total, then subtract the known values. You've got this — practice makes these problems fast and automatic!

Varsity Tutors • ISEE Middle Level • Find mean, median, or mode.