Radical Simplifier Calculator
Simplify radical expressions and convert between radical and exponential forms. Enter values for instant results with step-by-step formulas.
Formula
nth-root(a^n * b) = a * nth-root(b)
Where a raised to the nth power is the largest perfect nth power factor of the radicand, a comes outside the radical as the coefficient, and b is the remaining factor that stays under the radical sign. The process involves prime factorization and grouping factors into sets of n.
Worked Examples
Example 1: Simplify the Square Root of 72
Problem: Simplify the radical expression sqrt(72).
Solution: Step 1: Find the prime factorization of 72\n72 = 2 x 2 x 2 x 3 x 3 = 2^3 x 3^2\nStep 2: Identify pairs of prime factors (for square root)\nPairs: (2,2) and (3,3), with one 2 left over\nStep 3: Extract pairs as single factors\nOutside: 2 x 3 = 6\nInside: 2\nResult: sqrt(72) = 6 * sqrt(2)
Result: sqrt(72) = 6 * sqrt(2), approximately 8.485281
Example 2: Simplify the Cube Root of 250
Problem: Simplify the radical expression 3rd-root(250) with a coefficient of 2.
Solution: Step 1: Prime factorization of 250\n250 = 2 x 5 x 5 x 5 = 2 x 5^3\nStep 2: Identify triples of prime factors (for cube root)\nTriple: (5,5,5), with 2 left over\nStep 3: Extract triples as single factors\nOutside: 5\nInside: 2\nStep 4: Multiply by coefficient 2\nFinal coefficient: 2 x 5 = 10\nResult: 2 * 3rd-root(250) = 10 * 3rd-root(2)
Result: 2 * 3rd-root(250) = 10 * 3rd-root(2), approximately 12.599210
Frequently Asked Questions
What does it mean to simplify a radical expression?
Simplifying a radical expression means rewriting it so the number under the radical sign (the radicand) has no perfect square, perfect cube, or perfect nth power factors remaining. For example, the square root of 72 simplifies to 6 times the square root of 2 because 72 equals 36 times 2, and the square root of 36 is 6. The goal is to extract as many factors as possible from under the radical to make the expression simpler and easier to work with in further calculations. A fully simplified radical has the smallest possible radicand with no perfect power factors other than 1.
How do I convert between radical and exponential form?
The nth root of a number x can be written in exponential form as x raised to the power of 1 over n. So the square root of x equals x to the one-half power, the cube root of x equals x to the one-third power, and the fourth root of x equals x to the one-fourth power. This conversion works in both directions. If you have x to the power of 3 over 4, that equals the fourth root of x cubed, or equivalently the fourth root of x quantity cubed. This relationship is fundamental in algebra because exponential notation allows you to use the laws of exponents to multiply, divide, and raise radical expressions to powers more easily than manipulating radical notation directly.
How do I multiply and divide radical expressions?
To multiply radicals with the same index, multiply the radicands together under a single radical sign and then simplify. For example, the square root of 6 times the square root of 10 equals the square root of 60, which simplifies to 2 times the square root of 15. Any coefficients outside the radicals are multiplied separately. To divide radicals with the same index, divide the radicands under a single radical sign. The square root of 50 divided by the square root of 2 equals the square root of 25, which is 5. If radicals have different indices, convert them to exponential form first, find a common denominator for the exponents, then combine. Rationalizing the denominator means eliminating radicals from the bottom of a fraction.
What does the coefficient in front of a radical mean?
The coefficient is the number multiplied by the radical expression. In the expression 3 times the square root of 5, the coefficient is 3 and the radicand is 5. The decimal value is 3 times 2.236 which equals approximately 6.708. When simplifying a radical like the square root of 75, you extract the perfect square factor 25 to get 5 times the square root of 3, where 5 becomes the coefficient. If you start with a coefficient already present, like 2 times the square root of 75, the final coefficient is 2 times 5 which equals 10, giving 10 times the square root of 3. Coefficients follow all normal rules of algebra and can be combined when adding or subtracting like radicals.
When are two radical expressions considered like radicals?
Two radical expressions are like radicals when they have the same index and the same radicand, regardless of their coefficients. For example, 3 times the square root of 7 and 5 times the square root of 7 are like radicals because both have index 2 and radicand 7. They can be combined by adding or subtracting their coefficients, giving 8 times the square root of 7. However, the square root of 7 and the square root of 5 are not like radicals and cannot be combined through addition or subtraction. Similarly, the square root of 7 and the cube root of 7 are not like radicals because they have different indices. Always simplify radicals fully before determining if they are like radicals, because the square root of 12 and the square root of 27 become like radicals after simplification.
Can I share or bookmark my calculation?
You can bookmark the calculator page in your browser. Many calculators also display a shareable result summary you can copy. The page URL stays the same so returning to it will bring you back to the same tool.