Difference between revisions of "Fibonacci numbers"
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| − | The Fibonacci sequence | + | The Fibonacci sequence numbers $F_n$ are defined by the recurrence |
$$F_{n+2}=F_n+F_{n+1}, \quad F_1=F_2=1.$$ | $$F_{n+2}=F_n+F_{n+1}, \quad F_1=F_2=1.$$ | ||
=Properties= | =Properties= | ||
[[Limit of quotient of consecutive Fibonacci numbers]]<br /> | [[Limit of quotient of consecutive Fibonacci numbers]]<br /> | ||
| + | [[Binet's formula]]<br /> | ||
=Videos= | =Videos= | ||
Revision as of 14:37, 9 August 2016
The Fibonacci sequence numbers $F_n$ are defined by the recurrence $$F_{n+2}=F_n+F_{n+1}, \quad F_1=F_2=1.$$
Properties
Limit of quotient of consecutive Fibonacci numbers
Binet's formula
Videos
The Golden Ratio & Fibonacci Numbers: Fact versus Fiction
Doodling in Math: Spirals, Fibonacci, and Being a Plant (1 of 3)
Fibonacci mystery
See also
Golden ratio
Reciprocal Fibonacci constant
Lucas numbers
External links
The Fibonacci Quarterly
"What interesting properties of the Fibonacci sequence can I share when introducing sequences?"
