### Luca, F and Stanica, P (2014)

#### On The First Digits Of The Fibonacci Numbers And Their Euler Function

Uniform Distribution Theory 9(1), pp. 21–25.

**ISSN/ISBN:** Not available at this time.
**DOI:** Not available at this time.

**Abstract:** Here, we show that given any two finite strings of base b digits, say s1 and s2, there are infinitely many Fibonacci numbers Fn such that the base b representation of Fn starts with s1 and the base b representation of φ(Fn) starts with s2.

**Bibtex:**

```
@article {,
AUTHOR = {Luca, Florian and Stanica, Pantelimon},
TITLE = {On The First Digits Of The Fibonacci Numbers And Their Euler Function },
JOURNAL = {Uniform Distribution Theory},
YEAR = {2014},
VOLUME = {9},
NUMBER = {1},
PAGES = {21–-25},
DOI = {},
URL = {https://math.boku.ac.at/udt/vol09/no1/03LucaStanica.pdf},
}
```

**Reference Type:** Journal Article

**Subject Area(s):** Number Theory