Generate the first 50 Fibonacci numbers

The formula for calculating the nth Fibonacci number F_{n}is denoted:

F_{n}= F_{n - 1}+ F_{n - 2}where F_{0}= 0 and F_{1}= 1

Number | Fibonacci Math Notation | Fibonacci Math | Fibonacci Number |
---|---|---|---|

F_{0} | 0 | N/A | 0 |

F_{1} | 1 | N/A | 1 |

F_{2} | F_{1} + F_{0} | 1 + 0 | 1 |

F_{3} | F_{2} + F_{1} | 1 + 1 | 2 |

F_{4} | F_{3} + F_{2} | 2 + 1 | 3 |

F_{5} | F_{4} + F_{3} | 3 + 2 | 5 |

F_{6} | F_{5} + F_{4} | 5 + 3 | 8 |

F_{7} | F_{6} + F_{5} | 8 + 5 | 13 |

F_{8} | F_{7} + F_{6} | 13 + 8 | 21 |

F_{9} | F_{8} + F_{7} | 21 + 13 | 34 |

F_{10} | F_{9} + F_{8} | 34 + 21 | 55 |

F_{11} | F_{10} + F_{9} | 55 + 34 | 89 |

F_{12} | F_{11} + F_{10} | 89 + 55 | 144 |

F_{13} | F_{12} + F_{11} | 144 + 89 | 233 |

F_{14} | F_{13} + F_{12} | 233 + 144 | 377 |

F_{15} | F_{14} + F_{13} | 377 + 233 | 610 |

F_{16} | F_{15} + F_{14} | 610 + 377 | 987 |

F_{17} | F_{16} + F_{15} | 987 + 610 | 1,597 |

F_{18} | F_{17} + F_{16} | 1,597 + 987 | 2,584 |

F_{19} | F_{18} + F_{17} | 2,584 + 1,597 | 4,181 |

F_{20} | F_{19} + F_{18} | 4,181 + 2,584 | 6,765 |

F_{21} | F_{20} + F_{19} | 6,765 + 4,181 | 10,946 |

F_{22} | F_{21} + F_{20} | 10,946 + 6,765 | 17,711 |

F_{23} | F_{22} + F_{21} | 17,711 + 10,946 | 28,657 |

F_{24} | F_{23} + F_{22} | 28,657 + 17,711 | 46,368 |

F_{25} | F_{24} + F_{23} | 46,368 + 28,657 | 75,025 |

F_{26} | F_{25} + F_{24} | 75,025 + 46,368 | 121,393 |

F_{27} | F_{26} + F_{25} | 121,393 + 75,025 | 196,418 |

F_{28} | F_{27} + F_{26} | 196,418 + 121,393 | 317,811 |

F_{29} | F_{28} + F_{27} | 317,811 + 196,418 | 514,229 |

F_{30} | F_{29} + F_{28} | 514,229 + 317,811 | 832,040 |

F_{31} | F_{30} + F_{29} | 832,040 + 514,229 | 1,346,269 |

F_{32} | F_{31} + F_{30} | 1,346,269 + 832,040 | 2,178,309 |

F_{33} | F_{32} + F_{31} | 2,178,309 + 1,346,269 | 3,524,578 |

F_{34} | F_{33} + F_{32} | 3,524,578 + 2,178,309 | 5,702,887 |

F_{35} | F_{34} + F_{33} | 5,702,887 + 3,524,578 | 9,227,465 |

F_{36} | F_{35} + F_{34} | 9,227,465 + 5,702,887 | 14,930,352 |

F_{37} | F_{36} + F_{35} | 14,930,352 + 9,227,465 | 24,157,817 |

F_{38} | F_{37} + F_{36} | 24,157,817 + 14,930,352 | 39,088,169 |

F_{39} | F_{38} + F_{37} | 39,088,169 + 24,157,817 | 63,245,986 |

F_{40} | F_{39} + F_{38} | 63,245,986 + 39,088,169 | 102,334,155 |

F_{41} | F_{40} + F_{39} | 102,334,155 + 63,245,986 | 165,580,141 |

F_{42} | F_{41} + F_{40} | 165,580,141 + 102,334,155 | 267,914,296 |

F_{43} | F_{42} + F_{41} | 267,914,296 + 165,580,141 | 433,494,437 |

F_{44} | F_{43} + F_{42} | 433,494,437 + 267,914,296 | 701,408,733 |

F_{45} | F_{44} + F_{43} | 701,408,733 + 433,494,437 | 1,134,903,170 |

F_{46} | F_{45} + F_{44} | 1,134,903,170 + 701,408,733 | 1,836,311,903 |

F_{47} | F_{46} + F_{45} | 1,836,311,903 + 1,134,903,170 | 2,971,215,073 |

F_{48} | F_{47} + F_{46} | 2,971,215,073 + 1,836,311,903 | 4,807,526,976 |

F_{49} | F_{48} + F_{47} | 4,807,526,976 + 2,971,215,073 | 7,778,742,049 |