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  1. ISEE Middle Level Mathematics Achievement

  3. Solve Equations for an Unknown

x = ?2x + 5 = 17n − 8 = 12x
ISEE MIDDLE LEVEL • MATHEMATICS ACHIEVEMENT

Solve Equations for an Unknown

Learn how to find the mystery number hiding behind a variable using inverse operations.

SECTION 1

Why Do We Solve Equations?

People have been solving equations for thousands of years. Ancient civilizations needed to figure out unknown amounts — like how much grain to store or how wide to build a wall. The idea of finding an unknown value (a number you don't know yet) is one of the oldest ideas in math.

Over time, mathematicians developed smarter and faster ways to find these mystery numbers. They invented symbols like variables (letters that stand for unknown numbers) so they could write problems more easily. Today, we use these same tools on the ISEE and in everyday math.

1800 BCE
Babylonian Math Tablets
Ancient Babylonians carved equation problems onto clay tablets. They solved for unknowns using step-by-step methods — long before algebra had a name.
820 CE
Al-Khwarizmi's Book of Algebra
The Persian mathematician al-Khwarizmi wrote a famous book about solving equations. The word "algebra" actually comes from the title of his book!
1637
Descartes Uses x for Unknowns
French mathematician René Descartes made it popular to use the letter x (and other letters) to represent unknown numbers. This is the same notation you use today.
Today
Equations Everywhere
From video game programming to building bridges, solving for an unknown is one of the most used skills in science, technology, and daily life.

So here's the big question: if you know that some expression equals a number, how do you figure out what the unknown variable is? That's exactly what this lesson will teach you.

SECTION 2

Core Principles of Solving Equations

An equation is a math sentence that says two things are equal. It always has an equals sign (=). Your job when solving an equation is to find the value of the variable that makes the equation true. Here are the key ideas you need.

1

Balance Rule

An equation is like a balanced scale. Whatever you do to one side, you must do the same thing to the other side to keep it balanced.
2

Inverse Operations

To undo an operation, use its opposite. Addition undoes subtraction, and multiplication undoes division. These opposites are called inverse operations.
3

Isolate the Variable

Your goal is to get the variable all by itself on one side of the equation. When the variable is alone, you've found the answer.
4

Check Your Work

Plug your answer back into the original equation. If both sides are equal, you solved it correctly. This is a powerful ISEE test-taking habit.
✦ KEY TAKEAWAY
Think of an equation like a seesaw at a playground. Both sides must weigh the same to stay level. If you add a 5-pound weight to one side, you have to add a 5-pound weight to the other side too, or the seesaw tips over. Solving an equation means carefully removing weights from both sides until only the variable sits on one end.
SECTION 3

Seeing the Balance

The diagram below shows how solving the equation x + 3 = 7 works like a balance scale. On the left side we have x and 3. On the right side we have 7. To isolate x, we subtract 3 from both sides.

Solving x + 3 = 7 Using a Balance ScaleSTEP 1: Start balancedx37=STEP 2: Subtract 3 from both sidesx4=Remove the 3 from both sides → 7 − 3 = 4−3−3
In Step 1, the scale is balanced with x + 3 on the left and 7 on the right. In Step 2, we subtract 3 from both sides. The scale stays balanced, and x is now alone. The answer is x = 4.

Notice that every time we do something to one side, we do the exact same thing to the other side. This is the balance rule in action. If you remember nothing else, remember this: both sides must always stay equal.

SECTION 4

The Math Behind Solving Equations

Let's look at the specific rules you'll use. On the ISEE, you'll see one-step and two-step equations. Here are the inverse operation pairs you need to know.

UNDO ADDITION
If x + a = b, then x = b − a
Subtract a from both sides to undo the addition.
UNDO SUBTRACTION
If x − a = b, then x = b + a
Add a to both sides to undo the subtraction.
UNDO MULTIPLICATION
If a × x = b, then x = b ÷ a
Divide both sides by a to undo the multiplication.
UNDO DIVISION
If x ÷ a = b, then x = b × a
Multiply both sides by a to undo the division.
💡 ISEE Test Tip
For two-step equations like 3x + 5 = 20, always undo the addition or subtraction first, then undo the multiplication or division. Think: reverse the order of operations!
SECTION 5

Types of Equations You'll See on the ISEE

On the ISEE Middle Level, equations come in two main flavors: one-step equations and two-step equations. Let's break down what each type looks like and how to handle it.

One-Step vs. Two-Step EquationsONE-STEP EQUATIONSOnly ONE operation to undox + 9 = 15Subtract 9 → x = 6n − 4 = 12Add 4 → n = 165y = 35Divide by 5 → y = 7m ÷ 3 = 8Multiply by 3 → m = 241 inverse operation neededTWO-STEP EQUATIONSTWO operations to undo (reverse order!)2x + 5 = 17Step 1: Subtract 5 → 2x = 12Step 2: Divide by 2 → x = 63n − 7 = 14Step 1: Add 7 → 3n = 21Step 2: Divide by 3 → n = 7y ÷ 4 + 2 = 5Step 1: Subtract 2 → y ÷ 4 = 3Step 2: Multiply by 4 → y = 122 inverse operations needed
One-step equations need just one inverse operation. Two-step equations need two — always undo the addition or subtraction first, then undo the multiplication or division.

Notice the pattern in the two-step column. You always handle the addition or subtraction step first, then the multiplication or division step second. This is like reversing the order of operations — you "undo" things in the opposite order from how they were built.

SECTION 6

Worked Example: Two-Step Equation

Let's solve a two-step equation step by step, just like you would on the ISEE. Follow along carefully!

Solve: 4x − 9 = 23

Step 1 — Identify the operations

Look at what's happening to x. First, x is multiplied by 4. Then 9 is subtracted. We need to undo these in reverse order.

Step 2 — Undo the subtraction (add 9 to both sides)

4x − 9 + 9 = 23 + 9. The −9 and +9 cancel on the left side.
4x = 32

Step 3 — Undo the multiplication (divide both sides by 4)

4x ÷ 4 = 32 ÷ 4. The 4 cancels on the left side.
x = 8

Step 4 — Check the answer

Plug x = 8 back into the original equation: 4(8) − 9 = 32 − 9 = 23. ✓ This matches the right side, so x = 8 is correct!
23 = 23 ✓
🎯 ISEE Strategy: Back-Solving
Since the ISEE gives you four answer choices, you can also solve by plugging each choice into the equation to see which one works. Start with the middle values to save time. This is called back-solving and it's a great backup strategy if you get stuck!
SECTION 7

Common Mistakes & How to Avoid Them

Even strong math students can make errors when solving equations. The ISEE test-makers actually design wrong answer choices based on common mistakes. Here are the top traps and how to dodge them.

Common equation-solving mistakes on the ISEE
MistakeExampleHow to Fix It
Operating on only one sidex + 5 = 12 → x = 12 (forgot to subtract 5)Always do the same operation to BOTH sides.
Using the wrong inversex − 3 = 10 → x = 10 − 3 = 7 (should add, not subtract)Ask: "What operation do I see?" Then use its opposite.
Wrong order in two-step2x + 6 = 18 → dividing by 2 first instead of subtracting 6 firstUndo add/subtract FIRST, then undo multiply/divide.
Arithmetic errors32 ÷ 4 = 6 (should be 8)Always check by plugging your answer back in.
✦ KEY TAKEAWAY
Think of wrong answer choices on the ISEE like traps in a video game. The test-makers put them there on purpose. Your best defense is checking your answer — plug it back in and make sure both sides match. That one extra step can be the difference between a right and wrong answer.
SECTION 8

From Simple Equations to Bigger Ideas

The equation-solving skills you're learning now are the foundation for everything you'll do in algebra later on. Here's how this topic connects to what comes next.

How today's skills build toward future math
What You Learn NowWhat Comes Later
One-step equations (x + 5 = 12)Multi-step equations with variables on both sides
Two-step equations (3x − 4 = 11)Equations with parentheses and distribution
Inverse operationsSolving inequalities using the same techniques
Checking your answerVerifying solutions to systems of equations

The great news is that the balance rule and inverse operations never change. No matter how complicated an equation gets, you always use the same strategy: undo operations to isolate the variable. Master it now, and future math gets a lot easier.

SECTION 9

Practice Problems

Time to practice! These five problems go from easier to harder. Remember: use inverse operations, keep the equation balanced, and check your work by plugging in.

PROBLEM 1 — CONCEPTUAL
If n + 7 = 20, what is the value of n?
PROBLEM 2 — BASIC CALCULATION
If 6y = 54, what is the value of y?
PROBLEM 3 — INTERMEDIATE
If 2x + 5 = 19, what is the value of x?
PROBLEM 4 — APPLIED
A movie ticket costs $8. Maria bought some tickets and also paid a $5 service fee. She spent $37 in total. Which equation can be used to find t, the number of tickets she bought, and what is the value of t?
PROBLEM 5 — CRITICAL THINKING
If 3(x + 2) = 21, what is the value of x?
SUMMARY

Lesson Summary

Solving an equation means finding the value of the variable that makes both sides equal. The balance rule says whatever you do to one side, you must do to the other. Use inverse operations — addition undoes subtraction, and multiplication undoes division — to isolate the variable.

For one-step equations, perform a single inverse operation. For two-step equations, undo the addition or subtraction first, then undo the multiplication or division. Always check your answer by plugging it back into the original equation. On the ISEE, you can also use back-solving — testing answer choices — as a backup strategy. You've got this!

Varsity Tutors • ISEE Middle Level • Solve Equations for an Unknown