How to Plug in Cubed Root in Calculator
'/%3E%3Ccircle cx='48' cy='39' r='19' fill='%23f2c9a5'/%3E%3Cpath d='M27 35c3-16 39-17 42 2-8-8-27-9-42-2z' fill='%23374151'/%3E%3Cpath d='M21 86c5-24 49-28 56 0z' fill='%232563eb'/%3E%3Ccircle cx='41' cy='41' r='2' fill='%23111827'/%3E%3Ccircle cx='55' cy='41' r='2' fill='%23111827'/%3E%3Cpath d='M42 52c4 3 9 3 13 0' stroke='%2392400e' stroke-width='3' fill='none' stroke-linecap='round'/%3E%3C/svg%3E)
Reviewed by Calculator Editorial Team
Calculating cubed roots is essential in mathematics, engineering, and science. This guide explains how to properly input and interpret cubed roots in calculators, including step-by-step instructions, formula explanations, and practical examples.
What is a Cubed Root?
The cubed root of a number x is a value that, when multiplied by itself three times, gives the original number. Mathematically, it's represented as:
∛x = y, where y × y × y = x
For example, the cubed root of 27 is 3 because 3 × 3 × 3 = 27. Cubed roots are important in geometry for finding edge lengths of cubes, in physics for volume calculations, and in algebra for solving cubic equations.
How to Calculate Cubed Root
Calculating cubed roots manually requires understanding of exponents and repeated multiplication. For most practical purposes, using a calculator is more efficient. Here's how to do it properly:
- Identify the number you want to find the cubed root of.
- Enter the number into your calculator.
- Press the cubed root function (often labeled as "x³" or "³√x").
- Read the result displayed on the calculator screen.
Note: Not all calculators have a dedicated cubed root function. In such cases, you can calculate it as x^(1/3) using the exponent function.
Calculator Methods
Different calculators have different ways to input cubed roots. Here are common methods:
| Calculator Type | Input Method |
|---|---|
| Scientific Calculator | Press the "³√x" button or use the exponent function with 1/3 |
| Graphing Calculator | Use the "cube root" function or enter x^(1/3) |
| Programmable Calculator | Write a custom program or use the built-in cube root function |
| Online Calculator | Look for the "cube root" option in the function menu |
Examples
Let's look at some practical examples of cubed roots:
| Number | Cubed Root | Verification |
|---|---|---|
| 8 | 2 | 2 × 2 × 2 = 8 |
| 27 | 3 | 3 × 3 × 3 = 27 |
| 64 | 4 | 4 × 4 × 4 = 64 |
| 125 | 5 | 5 × 5 × 5 = 125 |
These examples show how cubed roots can be used to find the edge length of a cube when you know its volume.