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Cubes 1 to 50: How to Calculate Cube Values Easily
IMPORTANT LINKS
Let us first understand the meaning of the cube number. When an integer is multiplied by itself three times the resultant number is known as its cube number. Basically, a cube number is a number obtained by the product of three same numbers. For example,
Cubes
Maths Notes Free PDFs
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| Class 12 Maths Important Topics Free Notes PDF | Download PDF |
| Class 10, 11 Mathematics Study Notes | Download PDF |
| Most Asked Maths Questions in Exams | Download PDF |
| Increasing and Decreasing Function in Maths | Download PDF |
What are Cubes 1 to 50?
The cube of a number means multiplying that number by itself three times. So, the cube of a number "x" is written as x3. For example, the cube of 2 is 23=2×2×2=8.
Cubes from 1 to 50 are simply the cube values of each number starting from 1 up to 50. These cube values start from 1 (which is 13) and go up to 125000 (which is 503).
The values of
- Exponent form of cube number, (
): - Highest value of cubes from
to : - Lowest value of cubes from
to :
The image given below shows the
Cube 1 to 50 for Even Numbers
The table given below shows the cube numbers from
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Numbers |
Cube 1 to 50 – Even Numbers |
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Cube 1 to 50 for Odd Numbers
The table given below shows the cubes from
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Numbers |
Cube 1 to 50 – Odd Numbers |
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- 3 Live Test
- 163 Class XI Chapter Tests
- 157 Class XII Chapter Tests
How to Calculate Values of Cube 1 to 50?
The cubes
How to Find Cubes from 1 to 50
To get the cube of a number between 1 and 50, just multiply the number by itself three times.
For example:
To find the cube of 17, do this:
17 × 17 × 17 = 4913
So, the cube of 17 is 4913.
This same method works for all numbers from 1 to 50.
Properties of Cubes (1 to 50)
- Cube of a Number
The cube of a number is found by multiplying the number by itself three times.
Example: Cube of 5 = 5 × 5 × 5 = 125
- Cube of Even Numbers is Even
When you cube an even number, the result is always even.
Example: 4³ = 64, 6³ = 216
- Cube of Odd Numbers is Odd
When you cube an odd number, the result is always odd.
Example: 3³ = 27, 5³ = 125
- Cubes Can End with Different Digits
The last digit of cube numbers can be any digit from 0 to 9.
Example: 2³ = 8 (ends in 8), 4³ = 64 (ends in 4), 7³ = 343 (ends in 3)
- Cubes Grow Very Fast
As the base number increases, its cube becomes much bigger.
Example:
5³ = 125
10³ = 1000
20³ = 8000
50³ = 125000
- The Cube of Any Number Is Always Positive
If the number is positive, its cube is positive.
If the number is negative, its cube is also negative.
Example:
(3)³ = 27
(−3)³ = −27
- Perfect Cubes
The cubes of whole numbers are called perfect cubes.
Example: 1, 8, 27, 64, 125, etc., are perfect cubes.
- Cube Roots Are Reverses of Cubes
If you know the cube of a number, you can also find its cube root.
Example: Cube root of 216 is 6 because 6³ = 216.
The cube of a number is found by multiplying the number by itself three times.
Example: Cube of 5 = 5 × 5 × 5 = 125
When you cube an even number, the result is always even.
Example: 4³ = 64, 6³ = 216
When you cube an odd number, the result is always odd.
Example: 3³ = 27, 5³ = 125
The last digit of cube numbers can be any digit from 0 to 9.
Example: 2³ = 8 (ends in 8), 4³ = 64 (ends in 4), 7³ = 343 (ends in 3)
As the base number increases, its cube becomes much bigger.
Example:
5³ = 125
10³ = 1000
20³ = 8000
50³ = 125000
If the number is positive, its cube is positive.
If the number is negative, its cube is also negative.
Example:
(3)³ = 27
(−3)³ = −27
The cubes of whole numbers are called perfect cubes.
Example: 1, 8, 27, 64, 125, etc., are perfect cubes.
If you know the cube of a number, you can also find its cube root.
Example: Cube root of 216 is 6 because 6³ = 216.
Cube Table 1 to 50
The table given below shows the cube numbers from
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Numbers |
Cubes 1 to 50 |
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Cube 1 to 50 Solved Examples
Example 1. Evaluate
Solution: The value of
Therefore, the value of
Example 2. If a cube has a side of length
Solution: Volume of the cube
Using values from cube
i.e.
Therefore, the volume of the cube is
We hope that the above article is helpful for your understanding and exam preparations. Stay tuned to the Testbook App for more updates on related topics from Mathematics, and various such subjects. Also, reach out to the test series available to examine your knowledge regarding several exams.
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If you are checking Cube 1 to 50 article, also check related maths articles: |
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FAQs For Cubes 1 To 50
What is the value of cube 1 to 50?
The values of
How to calculate the values of cubes 1 to 50?
The cubes
How many numbers in cubes 1 to 50 are odd?
The odd numbers between
What values of cubes from 1 to 50 are between 1 and 300 inclusive?
The values of cubes
What is the sum of all perfect cubes from 1 to 50?
The sum of all perfect cubes from
What is the use of learning cubes from 1 to 50?
Knowing cube values helps in solving math problems related to: Volume of cubes Algebra Simplifying expressions Competitive exams like SSC, Bank, CUET, etc.
Is the cube of a number always bigger than the number itself?
Yes, except for 0 and 1. For any number greater than 1 or less than -1, the cube is always bigger in absolute value.