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Cubes from 1 to 30 Table and Trick to Learn

Cubes from 1 to 30: If one multiplies a number 3 times with the same number then the resultant product is considered the cube of that particular number. For example, the cube of 4 is 64. Here the multiplication of 4 three times results in 4x4x4 = 64, then means that 64 represents the cube of 4. Memorizing the values of cubes of numbers from 1 to 30 assists you in solving problems related to math, physics, and accounting easily and quickly. In this article, you will learn cubes from 1 to 30, the cubes from 1 to 30 chart for even and odd numbers, and the methods to solve cube values.

Cubes from 1 to 30

Cubes of numbers from 1 to 30 cover the cube values from 1 to 27000. The largest cube value is 30³ = 27000 and the smallest value is 1³ = 1. The cubes from 1 to 30 are expressed as x³ in the exponential form. For example, the cube of 5 is 5³ means 125. So the value of the cube of 5 is 125. These cube values help students to easily simplify the long-time-taking mathematical calculations.

Cubes from 1 to 30 Chart

The cube from 1 to 30 chart helps students quickly find out the values of the cubes of numbers from 1 to 30. After learning these cubes from 1 to 30, you can make time-consuming mathematical equations simpler at the time of examinations. Many times, students are suggested to remember these cube values from 1 to 30 thoroughly for maintaining faster calculations in exams. The perfect cube numbers in the cubes from 1 to 30 are 1, 8, and 27 only. The value of the cube of numbers ranging from 1 to 30 is listed below.

Cubes from 1 to 30 Chart
1³ = 1 16³  = 4096
2³ = 8 17³  = 4913
3³ = 27 18³  = 5832
4³  = 64 19³  = 6859
5³  = 125 20³  = 8000
6³  = 216 21³  = 9261
7³ = 343 22³  = 10648
8³  = 512 23³ = 12167
9³  = 729 24³ = 13824
10³ = 1000 25³ = 15625
11³ = 1331 26³  = 17576
12³ = 1728 27³  = 19683
13³ = 2197 28³ = 21952
14³ = 2744 29³ = 24389
15³ = 3375 30³ = 27000

Cubes from 1 to 30 for Even Numbers

The value of cubes of even numbers ranging from 1 to 30 is given below in table form. Only 8 as an even number is the perfect cube in the cubes from 1 to 30.

Cubes from 1 to 30 for Even Numbers
2³ = 8 4³ = 64
6³ = 216 8³ = 512
10³ = 1000 12³ = 1728
14³ = 2744 16³ = 4096
18³ = 5832 20³ = 8000
22³ = 10648 24³ = 13824
26³ = 17576 28³ = 21952
30³ = 27000

Cubes from 1 to 30 for Odd Numbers

The value of cubes of odd numbers ranging from 1 to 30 is given below in table form. Only 1 and 27 as odd numbers are the perfect cube in the cubes from 1 to 30.

Cubes from 1 to 30 for Odd Numbers
1³ = 1 3³ = 27
5³ = 125 7³ = 343
9³ = 729 11³ = 1331
13³ = 2197 15³ = 3375
17³ = 4913 19³ = 6859
21³ = 9261 23³ = 12167
25³ = 15625 27³ = 19683
29³ = 24389

How to Calculate Cubes from 1 to 30?

The one method named multiplication by itself is mentioned below for calculating the values of cubes of numbers ranging from 1 to 30.

Multiplication by itself

Under this method, the value of the cube is solved by the multiplication of a given number by itself three times. The result after three times multiplication is called the cube of that number. For example, the value of a cube of 3 = 3 × 3 × 3 = 27. Here, the final result 27 informs that it is the cube of the number 3. This method of Multiplication by itself is generally applied to smaller numbers.

Cubes from 1 to 30 Solved Questions

Question 1: When a cube-shaped box has a side of 7 inches. Calculate the volume of that box.

Solution: As we know the volume of the cube (V) = a³ where a = side of the cube

Here side of the cube = 7

So the volume of that box = 7³

Putting the cube value of 7 from cube from 1 to 30 chart,

We get, V = 4913

Hence, the volume of that box = 4913 inches³.

Question 2: The length of one side of a cubic almirah is 9 cm. Find the volume of that table.

Solution: As we know the volume of the cube (V) = a³ where a = side of the cube

Here side of the almirah = 9

So the volume of that almirah = 9³

The volume of that almirah is, V= 9³ cm³ = 729 cm³

Question 3: Calculate the value of the given expression [6³+ 12³ + 5³]

Solution: Putting the cube values of 6, 12, and 5 in the given expression, we get

[6³+ 12³ + 5³] = 216 + 1728 + 125

[6³+ 12³ + 5³] = 2069

Question 4: Evaluate 6 times 3 cubes plus 12.

Solution: As per the given question, 9 × 3³ + 12 = 9 × 27 + 12 = 255

Hence the value of 6 times 3 cubes plus 12 is 255.

Question 5: Find the volume of a spherical ball having a radius of 3 inches.

Solution: As we know the volume of a sphere (V) = 4/3 π R³

⇒ V = 4/3 π R³ = 4/3 × 3.14 × 3³

⇒ V = 1.333 × 3.14 × 27 = 113.04 in³

Hence, the volume of the given ball is 113.04 in³

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