- Published on
Odd Squares and Divisibility by 8
- Authors

- Name
- Vu Hung
Problem Statement
Prove that if is any odd integer, then is divisible by 8.
Hints
Attempt the proof independently first. Focus on the key theorem, algebraic transformation, or contradiction setup that links the hypothesis to the target conclusion.
Solutions
Direct Proof
Step 1: Express as an odd integer
Since is odd, we can write:
for some integer .
Step 2: Expand
Step 3: Analyze
Note that and are consecutive integers.
Therefore, one of them must be even, which means their product is divisible by 2.
Write for some integer .
Step 4: Substitute and conclude
Since , we conclude that is divisible by 8.
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Takeaways
- Odd Integer Form: Any odd integer can be written as for some integer
- Consecutive Integer Property: Product of consecutive integers is always even (one must be even)
- Factor Extraction: From , directly see divisibility by 8
- Alternative View: Can also factor , both even for odd , with one divisible by 4
Further Readings
If you found this proof interesting, be sure to check out these relevant HSC booklets to sharpen your reasoning skills:
- HSC Proofs: https://vumaths.com/booklets/hsc-proofs/
- HSC Last Resorts: https://vumaths.com/booklets/hsc-last-resorts/
- HSC Mechanics: https://vumaths.com/booklets/hsc-mechanics/
Connect with me
If you're eager for more HSC Maths insights, be sure to check out my Website - Vu's Maths Hub. For deeper dives and regular tips, join my LinkedIn. Let's tackle these challenging math problems together! You can also catch my daily math content on Instagram.
