How to Calculate Cube Roots 1 to 30?
The cube roots from 1 to 30 can be calculated by using the,
Cube Root by Prime Factorization Method
We use the prime factorization method for finding the cube root of the perfect cubes, i.e. the cube root of the number whose prime factors are in pair of three. We can understand this by the example, the prime factor of 27 is 3×3×3 thus, the cube root of 27 is found as,
(27)1/3 = (3×3×3)1/3 = 3
Cube Root by Long Division Method
In Cube Root by Long Division Method, we take group of three digits in dividends and divide it using a suitable divisor whose cube is nearest to the selected three digits. A more detailed explanation of it can be read at Cube Root by Long Division Method.
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Cube Root 1 to 30
Cube Root 1 to 30 are the cube roots of the natural number from 1 to 30. These cube roots help us to solve various problems of mathematics. The cube root of any number is the number raised to the power 1/3. For finding the cube root of a number we take a number and find its prime factors and then take one out of three prime factors to get the required cube root.
This is explained as suppose we have to find a cube root of 8, this is represented as, ∛(8) or (8)1/3 factors of, and now for its value, we take all the prime factors of 8, i.e. 8 = 2 × 2 × 2.
∛(8) = ∛(2 × 2 × 2) = 2
Thus, the cube root of 8 is 2.
In this article, we will learn about the cube root of numbers from 1 to 30, their charts, perfect cube roots, examples, and others in detail.
Table of Content
- Cube Root 1 to 30
- What is Cube Root 1 to 30?
- Cube Root 1 to 30 List
- Cube Root 1 to 30 for Perfect Cubes
- How to Calculate Cube Roots 1 to 30?
- Solved Examples on Cube Root 1 to 30
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