- Published on
Product of Two Irrationals: Counterexample
- Authors

- Name
- Vu Hung
Problem Statement
Prove or disprove: If and are irrational numbers with , then is irrational.
Hints
The statement is false. Find a counterexample using multiples of .
Consider and for some rational . What is ? Is it rational or irrational?
Solutions
The statement is false. We disprove by counterexample.
Counterexample:
Let and .
- Check is irrational: is irrational (well-known).
- Check is irrational: is the product of rational and irrational , so it's irrational.
- Check : Clearly since .
- Compute :
- Check rationality of : is rational.
Since we found irrational numbers and with such that is rational, the original statement is disproven.
Note: This shows that the irrationals are not closed under multiplication. The rationals are closed under multiplication, but the irrationals are not.
Takeaways
- Reconstruct the full proof from the hint and the solution outline, and justify every transformation explicitly.
- Check edge cases and verify where each assumption is used in the argument.
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 Induction: https://vumaths.com/booklets/hsc-induction/
- HSC Vectors: https://vumaths.com/booklets/hsc-vectors/
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If you're eager for more HSC Maths insights, be sure to check out my LinkedIn. For deeper dives and regular tips, join my GitHub. Let's tackle these challenging math problems together! You can also catch my daily math content on Website - Vu's Maths Hub.
