112 LearnersLast updated on June 9th, 2025
Cubes from 1 to 100
A Cube is an integer, when you get by multiplying the same integer three times. For example, 10³ = 10 × 10 × 10. Cubes are commonly used in urban planning to calculate building volumes and in wind turbine design to evaluate efficiency. In this topic, we are going to study about cubes from 1 to 100.
What are cubes from 1 to 100?
The cube number is an integer when you get by multiplying the same number 3 times. Such as, x3 = x × x × x. The cube of numbers from 1 to 100 comes between 13 = 1 to 1003 = 1000000.
In exponential form, the cube of a number is expressed as x3. The smallest cube is 13 = 1, and the largest is 1003 = 1000000.
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Cubes Table from 1 to 100
Learning the cubes of numbers from 1 to 100 helps the students recognize perfect cubes up to 1000000 and estimate the cube roots by comparing values. The table below lists the cubes from 1 to 100.
List of Cubes from 1 to 100
Students don’t need to remember cube numbers but should understand what they are and how to calculate them. Below is the list of cube numbers between 1 and 100.
Cubes from 1 to 10
Studying cubes from 1 to 10 is important for volume calculations and understanding 3D shapes. Let’s explore the cube of numbers from 1 to 10.
Cubes from 11 to 20
The cube numbers from 11 to 20 are commonly used in calculations involving larger volumes and measurements. Let’s see the cube of numbers from 11 to 20.
Cubes from 21 to 30
For understanding volume and solving problems in algebra and geometry, cubes of numbers from 21 to 30 are useful. Let’s explore the cube of numbers from 21 to 30.
Cubes from 31 to 40
In engineering and physics calculations, cubes of numbers from 31 to 40 are often useful. Let’s explore the cube of numbers from 31 to 40.
Cubes from 41 to 50
For advanced calculations and problem-solving, especially in scientific fields, cubes from 41 to 50 are useful. Let’s see the cube of numbers from 41 to 50.
Cubes from 51 to 60
The cubes of numbers from 51 to 60 are useful in scaling, proportion, and also in estimation. Let’s explore the cube of numbers from 51 to 60.
Cubes from 61 to 70
Measurements and calculations with large numbers, the cubes of numbers from 61 to 70 are often used. Let’s see the cube of numbers from 61 to 70.
Cubes from 71 to 80
For finding volume, surface area, and proportion calculation, the cubes from 71 to 80 are used. Let’s explore the cube of numbers from 71 to 80.
Cubes from 81 to 90
A cube of numbers from 81 to 90 is important for solving cubic equations and important calculations. Let’s explore the cube of numbers from 81 to 90.
Cubes from 91 to 100
The cubes of numbers from 91 to 100 are significant for statistics, percentages, and real-world calculation. Let’s explore the cube of numbers from 91 to 100.
Cubes from 1 to 100 - Even Numbers
The numbers that can be divided by 2 without leaving a remainder. The even numbers from 1 to 100 are 2, 4, 6, 8, 10, 12, 14, and so on up to 100. Learning the cubes of these numbers is also significant. Here, the below table shows the cube of numbers between 1 and 100.
Cubes from 1 to 100 - Odd Numbers
The cubes of odd numbers from 1 to 100 are obtained by multiplying each odd number by itself two times. Here, the below table shows the cube of a number between 1 and 100.
How to Calculate Cubes from 1 to 100
The cube of a number can be easily calculated using two methods, which are by multiplication method and pattern recognition.
By Multiplication Method
This multiplication method includes a cube of a number by itself 3 times to find its cube, use the below steps to determine a cube of a number.
Step 1: First write the number which we need to multiply.
For example, 3
Step 2: Multiply the number 3 itself to get 32.
Now, 3 × 3 = 9
Step 3: Multiplying the result in step 2 with the number 3 to get the result
So, 9 × 3 = 27
Therefore, 33 = 27
By Pattern Recognition
Pattern recognition is identifying repeating patterns in numbers. Using the below pattern recognition method, the cube of a number can be obtained:
Step 1: The formula to find the cube of a number by using a pattern method is
(n2 - n) + 1. Here, n is any number which we require to find a cube.
For example, to find the cube of 3
33 = (32 - 3) + 1= (9 - 3) +1 = 6 + 1 = 7
Step 2: The sequence of odd numbers begins at 7 and continues up to 3 numbers.
Now, 33 = 7 + 9 + 11= 27
So, the cube of 3 is 27
Rules for calculating cubes from 1 to 100
For writing a cube of a number, there are specific rules to be followed. Now, let's see the cube of a number from 1 to 100.
Rule 1: Understanding Exponents
Students might wrongly think of cubes as squares. A square is a number multiplied by itself two times (a2), while a cube is a number multiplied by itself three times (a3).
Rule 2: Using the Cube Formula (a3 = a × a × a)
Students should know the cube of a number is the product of the same number when it is multiplied by itself thrice. Such as, 33 = 3 × 3 × 3
Rule 3: Identifying Patterns in Cubes
Cubes can be written as the sum of consecutive odd numbers. For example, 33 = 27 can be expressed as 7 + 9 + 11 = 27. In this case, the sequence of odd numbers starts from 7 and continues for 3 numbers to equal the cube of 3.
Tips and Tricks in Cubes from 1 to 100
Tips and tricks make it easy for students to understand and learn the cube of a number. To get the cube of a number, these tips and tricks will help students.
- The sum of consecutive odd integers always gives the cube of a number.
- The last digit of a perfect cube is the same as last digits of its base: 13= 1, 23 = 8, 33 = 27, 43 = 64, 53 =125, 63 = 216, 73 = 343, 83 = 512, 93 = 729, 103 = 1000. This pattern continues for all larger numbers.
- The cube of any even number is always even, while the cube of any odd number is always odd.
Common Mistakes and How to Avoid Them in Cubes from 1 to 100
Calculating the cube of numbers is an essential topic, but students often make mistakes. Here are some common mistakes when calculating the cube of a number.
Mistake 1
Confusing between cubes and cube roots
Students sometimes mix up cubes and cube roots. Instead of finding the cube root, they multiply the number itself three times. Which is incorrect. I.e., the cube root of 8 is 2, but they might wrongly think it means we need to multiply 8 three times.
Mistake 2
Confusing cube formula
Students may mix up the square formula (a + b)2 with the cube formula (a + b)3. Always verify the correct formula before applying the expression.
Mistake 3
Confusion of 0 and 1 as base
It is possible that students will be confused when the base is 0 or 1. For example, 03 might be wrongly calculated as 3 instead of 0. To avoid this confusion, students should practice carefully for better understanding.
Mistake 4
Confusing negative exponents
Students may assume that a negative exponent doesn’t mean the number is negative. i.e., 2-3 = -8 is wrong, the correct answer is 2-3 = 1/23 = 1/8
Mistake 5
Incorrect multiplication
Students might multiply the numbers only twice. That is 30 × 30 and not 30 × 30 × 30. Always remember that 303 = 30 × 30 × 30.
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Cubes 1 to 100 Examples
Problem 1
Find the volume of the cube, which has a side of 100 units.
The volume of the cube is 1000000 cubic units.
Explanation
Volume = Side3
Substitute the value of side length
Volume = 1003 =1000000 cubic units
Therefore, the volume of the cube, which has a side of 100 units, is 1000000 cubic units.
Problem 2
If the side length of the cube is 75 cm, what is the volume?
The volume is 421875 cm3.
Explanation
Use the volume formula for a cube v = side3.
Substitute 50 for the side length: v = 753 = 421875 cm3.
Problem 3
Find the difference between 50³ and 100³.
503= 125000
1003= 1000000
503 - 1003= 125000 - 1000000 = -875000.
Explanation
The answer will be negative because the cube of 50 is 125000 is smaller than the cube of 100 is 1000000, so the difference between them is -875000.
Problem 4
Simplify (80³)².
Using the property (am)n = am.n
(803)2 = 803 × 2 = 806.
Explanation
The rule of exponent states that when we are raising a power to another, we can multiply the exponents. The final answer is 806.
Problem 5
Find the diagonal of a cube whose side length is 60 cm.
The diagonal of a cube is approximately 103.9 cm.
Explanation
The formula for the diagonal of a cube is d = s√3
Side length s = 60
Now, substitute the value
d = 60 x √3
= 60 × 1.732
≈ 103.9 cm
Therefore, the diagonal of a cube whose side length is 60 cm is approximately 103.9 cm.
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FAQs on cubes from 1 to 100
1.What are the perfect cube up to 100?
2.How do you calculate 100³?
3.What is the cube of 25?
4.Is 75 a perfect cube?
5.What is the cube formula?
6.How does learning Algebra help students in Oman make better decisions in daily life?
7.How can cultural or local activities in Oman support learning Algebra topics such as Cubes from 1 to 100?
8.How do technology and digital tools in Oman support learning Algebra and Cubes from 1 to 100?
9.Does learning Algebra support future career opportunities for students in Oman?
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Important Glossaries for Cubes from 1 to 100
- Perfect cube: We say a cube is perfect when we can write it as n3. Where “n” is an integer.
- Even number: An even number is a number that can be divided by 2 without leaving any remainder. Such as, when 6 is divided by 2, the quotient is 3, and 0 is a remainder.
- Integer: An integer is a whole number. It can be zero, negative, and positive. For e.g., 0, -3, and 3 are all integers.
- Odd numbers: Odd numbers are numbers that cannot be divided by 2 and leave a remainder of 1 when divided. Here, 7 is an odd number because when divided by 2, the quotient is 3 with the remainder 1.
Jaskaran Singh Saluja
About the Author
Jaskaran Singh Saluja is a math wizard with nearly three years of experience as a math teacher. His expertise is in algebra, so he can make algebra classes interesting by turning tricky equations into simple puzzles.
Fun Fact
: He loves to play the quiz with kids through algebra to make kids love it.
