The shocking secret behind converting 5 over 8 into a decimal - Sigma Platform

Understanding the Context

The Simple Math Behind 5 ÷ 8

At first glance, converting 5 over 8 into decimal might seem tricky. But let’s break it down:

• Division 5 ÷ 8 means splitting 5 into 8 equal parts.
  - Because 8 doesn’t go evenly into 5, you’re left with a repeating decimal.
  - Here’s the key: 5 ÷ 8 = 0.625

That’s right—deutsch 0.625—but why exactly is it 0.625, and what’s the secret math behind this repeating pattern?

Key Insights

The Surprising Secret: Terminating vs. Repeating Decimals

Most fractions convert to terminating decimals (like 0.5 for 1/2), but 5/8 follows a special rule: since the denominator (8) is only made up of the prime factor 2, the decimal terminates, but its precision involves breaking the division step-by-step.

Here’s how to unlock the secret:

1. Divide 5 by 8:
   8 goes into 5 zero times—write 0., then bring down a 0 → 50 ÷ 8 = 6 (because 8 × 6 = 48).
   Write down 6, remainder 2.

Final Thoughts

2. Add another 0, making it 20:
   8 × 2 = 16 → 2, remainder 4.

3. Add one more 0, making it 40:
   8 × 5 = 40 → 5, remainder 0.

Because the remainder hits zero so quickly, the division stops cleanly—and here’s the secret: this rapid convergence to zero is what makes the decimal 0.625 so precise and deceptively simple. Unlike fractions with repeating decimals (like 1/3 = 0.333…), 5/8 terminates instantly because 8 = 2³, a power of 2, allowing exact division within a few steps.

Why This Matters: The Hidden Logic of Denominators

The decimal form reveals whether a fraction terminates or repeats—based on the foil of prime factors in the denominator.
- If the denominator’s prime factors are only 2s or 5s (like 8 = 2³, or 100 = 2²×5²), the decimal terminates.
- If any other prime factors are present—like 3, 7, or 11—it repeats indefinitely.