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What is Cube Root?
The cube root of a number a is that number which when multiplied by itself three times gives the number ‘a’ itself. The cube root is the inverse operation of cubing a number. The cube root symbols is∛, it is the “radical” symbol (used for square roots) with a little three to mean cube root.
If n is a perfect cube for any integer m i.e., n = m³, then m is called the cube root of n and it is denoted by m = ∛n.
Cube root list 1 to 30 will help students to solve the cube root problem easily, accurately, and with speed.
How to Find Cube Root of Non-Perfect Cubes?
We cannot find the cube root of numbers which are not perfect cube using the prime factorization and estimation method. Hence, we will use here some other method.
Let us find the cube root of 30 here. Here, 30 is not a perfect cube.
Step 1:
Now we would see 30 lies between 27 ( the cube of 3) and 64 (the cube of 4). So, we will consider the lower number here, i.e. 3.
Step 2:
Divide 30 by square of 3, i.e., 30/9 = 3.33
Step 3:
Now subtract 3 from 3.33 (whichever is greater) and divide it by 3. So,
3.33 – 3 = 0.33 & 0.33/3 = 0.11
Step 4:
At the final step, we have to add the lower number which we got at the first step and the decimal number obtained.
So, 3 + 0.11 = 3.11
Therefore, the cube root of 30 is ∛30 = 3.11
This is not an accurate value but closer to it.
Let us find the cube root of 1 to 30 natural numbers
Cube Root of 1 to 30
The cube root from 1 to 30 will help students to solve mathematical problems. A list of cubic roots of numbers from 1 to 30 is provided herein a tabular format. The cube root has many applications in Maths, especially in geometry where we find the volume of different solid shapes, measured in cubic units. It will help us to find the dimensions of solids. For example, a cube has volume ‘x’ cubic meter, then we can find the side-length of the cube by evaluating the cube root of its volume, i.e., side = ∛x. Let us see the values of cubic roots of numbers from 1 to 30.
|
Number |
Cube Root ( ∛ ) |
|
1 |
1.000 |
|
2 |
1.260 |
|
3 |
1.442 |
|
4 |
1.587 |
|
5 |
1.710 |
|
6 |
1.817 |
|
7 |
1.913 |
|
8 |
2.000 |
|
9 |
2.080 |
|
10 |
2.154 |
|
11 |
2.224 |
|
12 |
2.289 |
|
13 |
2.351 |
|
14 |
2.410 |
|
15 |
2.466 |
|
16 |
2.520 |
|
17 |
2.571 |
|
18 |
2.621 |
|
19 |
2.668 |
|
20 |
2.714 |
|
21 |
2.759 |
|
22 |
2.802 |
|
23 |
2.844 |
|
24 |
2.884 |
|
25 |
2.924 |
|
26 |
2.962 |
|
27 |
3.000 |
|
28 |
3.037 |
|
29 |
3.072 |
|
30 |
3.107 |
Solved Examples
Example 1: Solve ∛4 + ∛7.
Solution:
From the table, we can get the value of ∛4 and ∛7
∛4 = 1.587
∛7 = 1.913
Therefore,
∛4 + ∛7 = 1.587 + 1.913
= 3.5
Example 2: Evaluate the value of 4 ∛9
Solution:
We know,
∛9 = 2.080
Therefore,
4 ∛9 = 4 x 2.080
= 8.32
Quiz Time
Find the Value of:
-
Evaluate 3∛9 + 7
-
Solve ∛7 – ∛3