- Published on
Exponential Comparison of Three Four and Five
- Authors

- Name
- Vu Hung
Problem Statement
Prove or disprove: There exists a real number such that .
Hints
The statement is true. Try a few values: gives (equality, not ).
Try : Is ? Calculate vs .
Alternatively, divide by to get and analyze the function behavior.
Solutions
The statement is true.
Proof by Example:
Try :
Since , the inequality holds.
Therefore, is a real number satisfying the inequality.
Alternative Proof (Analysis):
Divide the inequality by :
Let .
- At : (equality)
- The derivative:
Since and , both logarithms are negative, so .
- Therefore, is strictly decreasing.
Since and is strictly decreasing, for any , we have .
Thus, the inequality holds for all . In particular, it holds for (and infinitely many other values).
Note: This shows the power of the "divide by largest term" technique in inequality problems. The critical point is where equality holds (Pythagorean triple: ).
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 Last Resorts: https://vumaths.com/booklets/hsc-last-resorts/
- HSC Trigonometry: https://vumaths.com/booklets/hsc-trigonometry/
Connect with me
If you're eager for more HSC Maths insights, be sure to check out my Instagram. For deeper dives and regular tips, join my YouTube - HSC Maths Extension 1+2. Let's tackle these challenging math problems together! You can also catch my daily math content on GitHub.
