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Factors and Multiples - Prime and Composite Numbers

Grade 5ICSE

Review the key concepts, formulae, and examples before starting your quiz.

🔑Concepts

Factors are numbers that divide a given number exactly without leaving a remainder. For example, the factors of 1212 are 1,2,3,4,6,1, 2, 3, 4, 6, and 1212. Visually, you can think of factors as building blocks: a number like 1212 can be arranged into rectangular grids of 1×121 \times 12, 2×62 \times 6, or 3×43 \times 4.

Multiples are the products obtained when a number is multiplied by whole numbers (1,2,3,...1, 2, 3, ...). For example, the first four multiples of 66 are 6,12,18,246, 12, 18, 24. On a number line, multiples look like equal 'jumps' starting from zero, such as jumping by 55 units each time to reach 5,10,15,5, 10, 15, and so on.

Prime Numbers are natural numbers greater than 11 that have exactly two factors: 11 and the number itself. Examples include 2,3,5,7,11,2, 3, 5, 7, 11, and 1313. Visually, prime numbers cannot be arranged into any rectangular shape other than a single row or column.

Composite Numbers are numbers that have more than two factors. Examples include 4,6,8,9,104, 6, 8, 9, 10. These can be visualized using a 'Factor Tree' where the main number at the top branches out into smaller pairs of factors until only prime numbers remain at the tips of the branches.

The number 11 is a unique number in mathematics. It has only one factor (itself), so it is classified as neither a prime number nor a composite number. In a group of numbers, 11 is often visualized as a single isolated dot that cannot branch or form a rectangle.

Prime Factorization is the process of breaking down a composite number into a product of prime numbers. For example, 20=2×2×520 = 2 \times 2 \times 5. This is visually represented as a factor tree where the final 'leaves' of the tree are all circled prime numbers.

The number 22 is the smallest prime number and the only even prime number. All other even numbers are composite because they can be divided by 22. Visually, in a list of prime numbers, 22 is the unique starting point that is even, while all other primes are odd.

Twin Primes are pairs of prime numbers that have a difference of 22, such as (3,5)(3, 5), (5,7)(5, 7), and (11,13)(11, 13). On a number line, these are prime 'neighbors' separated by only one composite even number.

📐Formulae

Number=Factor1×Factor2\text{Number} = \text{Factor}_1 \times \text{Factor}_2

Multiples of n={n×1,n×2,n×3,...}\text{Multiples of } n = \{n \times 1, n \times 2, n \times 3, ...\}

Prime Factorization of 12=2×2×3=22×3\text{Prime Factorization of } 12 = 2 \times 2 \times 3 = 2^2 \times 3

Total Factors of a Prime Number=2\text{Total Factors of a Prime Number} = 2

💡Examples

Problem 1:

Find all the factors of 2424 and determine if it is prime or composite.

Solution:

Step 1: Find pairs of numbers that multiply to 2424. 1×24=241 \times 24 = 24 2×12=242 \times 12 = 24 3×8=243 \times 8 = 24 4×6=244 \times 6 = 24 Step 2: List the unique factors: 1,2,3,4,6,8,12,241, 2, 3, 4, 6, 8, 12, 24. Step 3: Count the factors. There are 88 factors.

Explanation:

Since 2424 has more than two factors (it has 88 factors), it is a composite number. A prime number would only have 11 and itself as factors.

Problem 2:

Express 3636 as a product of its prime factors using the factor tree method.

Solution:

Step 1: Split 3636 into any two factors, e.g., 6×66 \times 6. Step 2: Split each 66 into its factors: 2×32 \times 3. Step 3: Since 22 and 33 are prime numbers, we stop here. Step 4: Write the product: 36=2×3×2×336 = 2 \times 3 \times 2 \times 3.

Explanation:

By breaking the number down until only primes remain, we get the prime factorization. Rearranging them in ascending order, we get 36=2×2×3×336 = 2 \times 2 \times 3 \times 3 or 22×322^2 \times 3^2.