let there be any base"b"
That can represent a number by the sum of their positional digits:
number = sum(d_i * b ^ i)
where i is the position index and d_i is the digit at this position. (note: index starts with0, from the least digit farthest to the right)
Wow I never thought about that.
But it is always like this:
let there be any base "b" That can represent a number by the sum of their positional digits: number = sum(d_i * b ^ i) where i is the position index and d_i is the digit at this position. (note: index starts with 0, from the least digit farthest to the right)
So the (decimal) number 4 in base 4 is then
And (decimal) number 8 in base 8 is
And 10 in base 10:
All your bases belong to 10
All your base are belong to 10
You have no chance to survive make your time.
Someone set us up the base!