Table of Contents

The **cube root of 24** is the number, which multiplied by itself three times, is 24. In other words, this number to the power of 3 equals 24.

Besides the real value of

along with an explanation, on this page you can also find what the elements of the cube root of 24 are called.

In addition to the terminology, we have a calculator you don’t want to miss:

## Calculator

**³√24 = 2.8844991406**

*cube root of twenty-four*, then you are right here, too.

## Third Root of 24

In this section we provide you with important additional information about the topic of this post:

The term can be written as ³√24 or 24^1/3.

As the index 3 is odd, 24 has only one cube real root: ³√24 sometimes called principal cube root of 24.

If you want to know how to find the value of this root, then read our article Cube Root located in the header menu.

There, we also discuss the properties for index n = 3 by means of examples: multiplication, division, exponentiation etc.

Next, we have a look at the inverse function.

### Inverse of Cube Root of 24

Extracting the cube root is the inverse operation of ^3:

In the following paragraph, we are going to name the elements of this ∛.

## What is the Cube Root of 24?

You already have the answer to that question, and you also know about the inverse operation of 24 cube root.

Keep reading to learn what the parts are called.

- ³√24 is the cube root of 24 symbol
- 3 is the index
- 24 = radicand; the radicand is the number below the radical sign
- Cube root = 2.8844991406
- √ is called radical symbol or radical only

**Third root of 24 = 2.8844991406**

As a sidenote: All values on this page have been rounded to ten decimal places.

Now you really know all about ³√24, including its values, parts and the inverse.

If you need to extract the 3rd root of any other real number use our calculator above.

Simply insert the number of which you want to find the cube root (e.g. 24); the calculation is done automatically.

If you like our information about ³√24, then a similar cube root you may be interested in is, for example: cube root of 26.

In the following table you can find the n-th root of 24 for number n = 2,3,4,5,6,7,8,9,10.

## Table

The aim of this table is to provide you with an overview of the nth roots of 24.

Index | Radicand | Root | Symbol | Value |
---|---|---|---|---|

2 | 24 | Square Root of 24 | ²√24 | ±4.8989794856 |

3 | 24 | Cube Root of 24 | ³√24 | 2.8844991406 |

4 | 24 | Forth Root of 24 | ⁴√24 | ±2.2133638394 |

5 | 24 | Fifth Root of 24 | ⁵√24 | 1.8881750226 |

6 | 24 | Sixth Root of 24 | ⁶√24 | ±1.6983813296 |

7 | 24 | Seventh Root of 24 | ⁷√24 | 1.5746101063 |

8 | 24 | Eight Root of 24 | ⁸√24 | ±1.4877378262 |

9 | 24 | Nineth Root of 24 | ⁹√24 | 1.4234978143 |

10 | 24 | Tenth Root of 24 | ¹⁰√24 | ±1.3741088103 |

A few lines down from here we review the FAQs.

## Cube Root of Twenty-Four

If you have been searching for *what’s the cube root of twenty-four* or 3rd root of 24, then you are reading the right post as well.

The same is true if you typed 3 root of 24 or 24 3 root in the search engine of your preference, just to name a few similar terms.

If something remains unclear do not hesitate getting in touch with us.

We are constantly trying to improve our site, and truly appreciate your feedback.

Ahead is the wrap-up of our information.

## Summary

To sum up, the cube root of 24 is 2.8844991406.

Finding the third root of the number 24 is the inverse operation of rising the ³√24 to the power of 3. That is to say, (2.8844991406)^{3} = 24.

Further information related to ³√24 can be found on our page n-th Root.

Note that you can also locate roots like ³√24 by means of the search form in the menu and in the sidebar of this site.

If our article about the cube √ 24 has been useful to you , then press some of the share buttons located at the bottom of this page.

BTW: A term closely related to cube roots is *perfect cube*. We tell you everything about perfect cubes in our article Cube Numbers.

If you have any questions about the 3rd root of 24, fill in the comment form below.

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– Article written by Mark, last updated on November 26th, 2023