The Mandelbrot hole will go live in approximately . Why not try and solve it ahead of time?

GeoffroyF

8,329
β€’
7,928
πŸ₯‡1
β€’
πŸ₯ˆ0
β€’
πŸ₯‰0

β›³

12 / 117 Holes

πŸ”£

1 / 60 Langs

πŸ†

7 / 82 Cheevos

πŸ“…

Christmas Trees
641st
Divisors
1st
Emirp Numbers
74th
Evil Numbers
114th
Fibonacci
1,376th
Fizz Buzz
53rd
Niven Numbers
363rd
Odious Numbers
265th
Pangram Grep
Pascal’s Triangle
606th
Pernicious Numbers
400th
Prime Numbers
223rd
Ο€
455th