- Published on
Prime denominators and cycle length
- Authors

- Name
- Vu Hung
Problem Statement
Let be prime, , and be period length of .
- Show is the least positive integer with .
- Deduce .
- Find periods for and .
Hints
Use Fermat's theorem and first occurrence of .
Solutions
Recurring block theory gives , hence ; minimality gives least such . By Fermat, , so the order divides . Since and not , period is . Since and not , period is .
Further Readings
- HSC Integrals: https://vumaths.com/booklets/hsc-integrals/
- HSC Inequalities: https://vumaths.com/booklets/hsc-inequalities/
- HSC Polys Ext 1: https://vumaths.com/booklets/hsc-polys-ext-1/
- HSC Vectors: https://vumaths.com/booklets/hsc-vectors/
Connect with me
- YouTube - HSC Maths Extension 1+2: https://www.youtube.com/playlist?list=PLHSE0sAlTr2w
- Substack: https://vuhung16.substack.com/
- GitHub: https://github.com/vuhung16au/
