src/algebra/balanced-ternary.md
This is a non-standard but still positional numeral system. Its feature is that digits can have one of the values -1, 0 and 1.
Nevertheless, its base is still 3 (because there are three possible values). Since it is not convenient to write -1 as a digit,
we'll use letter Z further for this purpose. If you think it is quite a strange system - look at the picture - here is one of the
computers utilizing it.
So here are few first numbers written in balanced ternary:
0 0
1 1
2 1Z
3 10
4 11
5 1ZZ
6 1Z0
7 1Z1
8 10Z
9 100
This system allows you to write negative values without leading minus sign: you can simply invert digits in any positive number.
-1 Z
-2 Z1
-3 Z0
-4 ZZ
-5 Z11
Note that a negative number starts with Z and positive with 1.
It is easy to represent a given number in balanced ternary via temporary representing it in normal ternary number system. When value is
in standard ternary, its digits are either 0 or 1 or 2. Iterating from the lowest digit we can safely skip any 0s and 1s,
however 2 should be turned into Z with adding 1 to the next digit. Digits 3 should be turned into 0 on the same terms -
such digits are not present in the number initially but they can be encountered after increasing some 2s.
Example 1: Let us convert 64 to balanced ternary. At first we use normal ternary to rewrite the number:
$$ 64_{10} = 02101_{3} $$
Let us process it from the least significant (rightmost) digit:
1,0 and 1 are skipped as it is.( Because 0 and 1 are allowed in balanced ternary )2 is turned into Z increasing the digit to its left, so we get 1Z101.The final result is 1Z101.
Let us convert it back to the decimal system by adding the weighted positional values:
$$ 1Z101 = 81 \cdot 1 + 27 \cdot (-1) + 9 \cdot 1 + 3 \cdot 0 + 1 \cdot 1 = 64_{10} $$
Example 2: Let us convert 237 to balanced ternary. At first we use normal ternary to rewrite the number:
$$ 237_{10} = 22210_{3} $$
Let us process it from the least significant (rightmost) digit:
0 and 1 are skipped as it is.( Because 0 and 1 are allowed in balanced ternary )2 is turned into Z increasing the digit to its left, so we get 23Z10.3 is turned into 0 increasing the digit to its left, so we get 30Z10.3 is turned into 0 increasing the digit to its left( which is by default 0 ), and so we get 100Z10.The final result is 100Z10.
Let us convert it back to the decimal system by adding the weighted positional values:
$$ 100Z10 = 243 \cdot 1 + 81 \cdot 0 + 27 \cdot 0 + 9 \cdot (-1) + 3 \cdot 1 + 1 \cdot 0 = 237_{10} $$