Factors of 63: Chart, Factor Pairs, and Step-by-Step Calculation
Factors of 63 are all the numbers that are divisible into 63 without any remainders. These factors are whole numbers and can be both positive and negative. In this page, we will learn how to find out all the factors of 63, including prime factors of 63.
The answer of :
- Factors of 63 are : 1, 3, 7, 9, 21, 63
- Prime Factors of 63 : 63 = 3 × 3 × 7
How to Find Factors of 63: A Step-by-Step Mathematical Approach
What are the factors of 63? The factors of 63 are the whole numbers 1, 3, 7, 9, 21, 63. As a Ministry-inspected school, Queen Elizabeth Academy emphasizes a foundations-first approach to understanding number properties: a factor is any integer that divides into 10 evenly with zero remainder. In this guide, OCT-certified educators break down how to identify factor pairs, calculate the prime factorization of 63 (), and understand their applications in higher-level algebra.
- Factors of 63: 1, 3, 7, 9, 21, 63
- Prime Factors of 63: 3, 7
- Prime Factorization:
How to Find Factors of 63: A Step-by-Step Mathematical Approach
At Queen Elizabeth Academy, we teach factorization as the process of breaking a number down into its "building blocks." Understanding how to factor 63 is a core competency in the Ontario Grade 6-8 curriculum, serving as the foundation for more advanced topics like Greatest Common Factor (GCF) and algebraic fractions.
To factor 63 effectively, our OCT-certified instructors recommend the Division Method:
Start with 1: Every integer is divisible by 1. Since , both 1 and 63 are factors.
Check 3: Since , both 3 and 21 are factors.
Test 7: Since , both 7 and 9 are factors.
Reach the Square Root: Once you reach the number's square root (approximately 7.93 for 63), you have found all unique pairs.
By mastering these fundamental building blocks, students transition from rote memorization to conceptual mastery, a key pillar of the QEA educational methodology.
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Table of Contents :
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Pair Factors of 63
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Prime Factorization of 63 (Step-by-Step)
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Factor Pairs of 63 Explained
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How to Calculate Factors: The Division Method
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Real-World Examples & Practice Problems
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FAQ: Common Questions About Factoring 63
Pair Factors of 63
In order to get the pair factors, we need to find two numbers multiplied together can get 63.
Multiplication
1 x 63
3 x 21
7 x 9
Positive pair
factors of 63
(1, 63)
(3, 21)
(7, 9)
Negative pair
factors of 63
(-1, -63)
(-3, -21)
(-7, -9)
Prime Factorization of 63 (Step-by-Step)
To obtain the prime factors of 63, you need to find the factors of 63 and divide them out.
- 63 divided by 3 is 21
- Then if you keep dividing 21
- You get the final breakdown of the 63 = 3 × 3 × 7
Prime Factorization of 63
To determine the prime factors of 63, we use the process of prime factorization to break the composite number down into its most basic building blocks.
- Step 1: Since 63 is an odd number, we check for divisibility starting with the smallest odd prime, 3. The sum of the digits (6 + 3 = 9) is divisible by 3, so we begin there.
- Step 2: . Since 21 is also divisible by 3, we divide again: .
- Step 3: Since 7 is a prime number, our factorization is complete.
The Prime Factors of 63 are 3 and 7.
The Prime Factorization Equation
Using the foundations-first method taught at Queen Elizabeth Academy, we express the final breakdown as:
Teacher’s Tip: Always remember that while 1 is a factor of 63, it is not a prime number. Therefore, it is never included in a prime factor tree or a prime factorization equation.
To find out more factors:
How to Calculate Factors: The Division Method
To identify the factors of any number, we use the Division Method. Factors are strictly integers (whole numbers). If you divide 63 by a number and the result has no remainder, that number is a factor.
The Step-by-Step Calculation
Our educators at Queen Elizabeth Academy recommend testing divisors sequentially:
(No remainder; 1 is a factor)
with a remainder of 1 (2 is not a factor)
(No remainder; 3 is a factor)
with a remainder of 3 (4 is not a factor)
with a remainder of 3 (5 is not a factor)
with a remainder of 3 (6 is not a factor)
(No remainder; 7 is a factor)
Practice Examples: Finding Common Factors
At Queen Elizabeth Academy, we teach students that finding common factors is the essential first step to simplifying fractions. Here are three examples involving the number 63.
1. Find the common factors of 63 and 21
Factors of 63: 1, 3, 7, 9, 21, 63
Factors of 21: 1, 3, 7, 21
Answer:
The common factors are 1, 3, 7, and 21. (The Greatest Common Factor is 21).
2. Find the common factors of 63 and 10
Factors of 63: 1, 3, 7, 9, 21, 63
Factors of 10: 1, 2, 5, 10
Answer:
The only common factor is 1.
Expert Note:
When two numbers only share the common factor of 1, they are called "Relatively Prime."
3. Find the common factors of 63 and 42
Factors of 63: 1, 3, 7, 9, 21, 63
Factors of 42: 1, 2, 3, 6, 7, 14, 21, 42
Answer:
The common factors are 1, 3, 7, and 21.
FAQ: Frequently Asked Questions About the Factors of 63
What are the factors of 63?
The factors of 63 are the whole numbers that divide 63 exactly without leaving a remainder. There are 6 positive factors in total: 1, 3, 7, 9, 21, and 63.
What are the multiples of 63?
Multiples are the result of multiplying 63 by another whole number. While factors are a finite set, multiples are infinite. The first five multiples are 63, 126, 189, 252, and 315.
Is 63 a prime or composite number?
63 is a composite number. A prime number has only two factors (1 and itself). Because 63 can be divided evenly by 1, 3, 7, 9, 21, and 63, it has more than two factors, making it composite.
How many prime factors does 63 have?
There are two unique prime factors for the number 63: 3 and 7. Through the process of prime factorization, 63 is broken down into its simplest prime building blocks:
This can also be expressed using exponents as:
What is a "Proper Factor" of 63?
A proper factor is any factor of a number excluding the number itself. For 63, the proper factors are 1, 3, 7, 9, and 21.
The sum of the proper factors of 63 is 41 (). Because this sum is less than the number itself, 63 is classified as a deficient number in number theory.
Can factors of 63 be negative?
Yes. In mathematical contexts where negative integers are considered, the negative factors of 63 are -1, -3, -7, -9, -21, and -63. This is because the product of two negative integers results in a positive integer (e.g., ). However, in most standard school curriculum applications, the focus remains primarily on positive integers.
