Solution: Prime factorize both numbers: - Ready Digital AB

Understanding the Context

What Is Prime Factorization?

Prime factorization refers to expressing a number as a product of prime numbers, each raised to an appropriate power. For example, the number 60 can be expressed as:
60 = 2² × 3 × 5

This decomposition is unique—thanks to the Fundamental Theorem of Arithmetic—making prime factorization both powerful and reliable.

Key Insights

Why Prime Factorization Matters

1. Cryptography: Secure encryption methods like RSA rely on the difficulty of factoring large numbers into primes.
   
2. Simplifying Fractions: Prime factors help reduce fractions to lowest terms.
   
3. Finding Least Common Multiples (LCM) and Greatest Common Divisors (GCD): Helps solve ratios and divisibility problems.
   
4. Solving Number Theory Problems: Essential in proofs and analyzing divisibility properties.

Step-by-Step Solution to Prime Factorize a Number

Final Thoughts

To factorize any composite number, use these systematic steps:

Step 1: Check divisibility by small primes

Begin dividing the number starting from the smallest prime, 2.

• If divisible, divide and note down the prime factor.
  
• Repeat until the quotient becomes 1.

Example: Factor 84
84 ÷ 2 = 42 → 42 ÷ 2 = 21 → 21 ÷ 3 = 7 → 7 ÷ 7 = 1
So, 84 = 2² × 3 × 7

Step 2: Run 小 prime trials

Proceed with small primes: 2, 3, 5, 7, 11, 13, …
Stop when quotient reaches 1.

Step 3: Use efficient algorithms for large numbers

For very large numbers, manual division is inefficient. Algorithms like:

• Trial Division (optimized)
  
• Pollard’s Rho
  
• Quadratic Sieve
  
• Elliptic Curve Factorization
  are used in computational mathematics.