Square Root Calculator
Find the square root, cube root, or any nth root of a number. Check if a number is a perfect square, and simplify radical expressions with step-by-step solutions.
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Result
Perfect Squares: 1² through 30²
| n | n² | √n² | n | n² | √n² | n | n² | √n² |
|---|---|---|---|---|---|---|---|---|
| 1 | 1 | 1 | 11 | 121 | 11 | 21 | 441 | 21 |
| 2 | 4 | 2 | 12 | 144 | 12 | 22 | 484 | 22 |
| 3 | 9 | 3 | 13 | 169 | 13 | 23 | 529 | 23 |
| 4 | 16 | 4 | 14 | 196 | 14 | 24 | 576 | 24 |
| 5 | 25 | 5 | 15 | 225 | 15 | 25 | 625 | 25 |
| 6 | 36 | 6 | 16 | 256 | 16 | 26 | 676 | 26 |
| 7 | 49 | 7 | 17 | 289 | 17 | 27 | 729 | 27 |
| 8 | 64 | 8 | 18 | 324 | 18 | 28 | 784 | 28 |
| 9 | 81 | 9 | 19 | 361 | 19 | 29 | 841 | 29 |
| 10 | 100 | 10 | 20 | 400 | 20 | 30 | 900 | 30 |
How to Calculate Square Roots
The square root of a number x is the value y such that y² = x. For example, √144 = 12 because 12² = 144. Not every number has a whole-number square root — √50 = 7.071... (irrational). Numbers with whole-number square roots are called perfect squares: 1, 4, 9, 16, 25, 36, 49, 64, 81, 100, and so on.
Simplifying Radicals
Non-perfect squares can often be simplified by factoring out the largest perfect square. For example: √72 = √(36 × 2) = √36 × √2 = 6√2. The process is to find the largest perfect square factor, take its root out of the radical, and leave the remainder inside. This calculator performs this simplification automatically.
Worked Example: Simplify √200
Step 1: Factor 200 = 100 × 2
Step 2: √200 = √(100 × 2) = √100 × √2
Step 3: √100 = 10
Step 4: √200 = 10√2 ≈ 14.142
Properties of Square Roots
| Property | Formula | Example |
|---|---|---|
| Product Rule | √(a × b) = √a × √b | √(4 × 9) = √4 × √9 = 2 × 3 = 6 |
| Quotient Rule | √(a/b) = √a / √b | √(16/4) = √16 / √4 = 4/2 = 2 |
| Power Rule | √(a²) = |a| | √((-5)²) = √25 = 5 |
| Inverse | (√a)² = a | (√7)² = 7 |
| Nth Root | ⁿ√a = a^(1/n) | ∛8 = 8^(1/3) = 2 |
| Negative Numbers | √(-a) = i√a | √(-9) = 3i (imaginary) |
Where Square Roots Appear in Real Life
Square roots appear across many practical fields. The Pythagorean theorem (a² + b² = c²) requires a square root to find the hypotenuse: c = √(a² + b²). Our Square Footage Calculator uses this for diagonal measurements. In statistics, standard deviation is the square root of variance. In physics, the period of a pendulum involves √(L/g). In finance, compound annual growth rate (CAGR) uses nth roots. Even the BMI formula uses a square (kg/m²), making square roots essential for reverse-calculating height from BMI.
A 2018 survey by the Mathematical Association of America found that square roots rank as the 3rd most frequently used mathematical operation after basic arithmetic (addition/subtraction/multiplication/division) and percentages — making them one of the most practically important math concepts. Our Fraction Calculator and Percentage Calculator handle the other two.
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