""" The Fibonacci sequence is defined by the recurrence relation: Fn = Fn-1 + Fn-2, where F1 = 1 and F2 = 1. Hence the first 12 terms will be: F1 = 1 F2 = 1 F3 = 2 F4 = 3 F5 = 5 F6 = 8 F7 = 13 F8 = 21 F9 = 34 F10 = 55 F11 = 89 F12 = 144 The 12th term, F12, is the first term to contain three digits. What is the index of the first term in the Fibonacci sequence to contain 1000 digits? """ def fibonacci(n: int) -> int: """ Computes the Fibonacci number for input n by iterating through n numbers and creating an array of ints using the Fibonacci formula. Returns the nth element of the array. >>> fibonacci(2) 1 >>> fibonacci(3) 2 >>> fibonacci(5) 5 >>> fibonacci(10) 55 >>> fibonacci(12) 144 """ if n == 1 or not isinstance(n, int): return 0 elif n == 2: return 1 else: sequence = [0, 1] for i in range(2, n + 1): sequence.append(sequence[i - 1] + sequence[i - 2]) return sequence[n] def fibonacci_digits_index(n: int) -> int: """ Computes incrementing Fibonacci numbers starting from 3 until the length of the resulting Fibonacci result is the input value n. Returns the term of the Fibonacci sequence where this occurs. >>> fibonacci_digits_index(1000) 4782 >>> fibonacci_digits_index(100) 476 >>> fibonacci_digits_index(50) 237 >>> fibonacci_digits_index(3) 12 """ digits = 0 index = 2 while digits < n: index += 1 digits = len(str(fibonacci(index))) return index def solution(n: int = 1000) -> int: """ Returns the index of the first term in the Fibonacci sequence to contain n digits. >>> solution(1000) 4782 >>> solution(100) 476 >>> solution(50) 237 >>> solution(3) 12 """ return fibonacci_digits_index(n) if __name__ == "__main__": print(solution(int(str(input()).strip())))