]]>

2/3 = 1.-3-3-3...

Also 0.999= 1. 0 0-1

]]>```
Here is pi (to 30 places after the decimal) shown
normally and pi in new Winter sytem.
I called it the Winter system because I like winter and
also you can remember that you get below zero temperatures
in the winter like the numbers used here.
3. 1 4 1 5 9 2 6 5 3 5 8 9 7 9 3 2 3 8 4 6 2 6 4 3 3 8 3 2 7 9
3. 1 4 2-4-1 3-4 5 4-4-1 0-2-1 3 2 4-2 5-4 3-4 4 3 4-2 3 3-2-1
You can obtain the above conversion just by working
from left to right or from right to left on the normal
number pi. If you go right to left, it is very easy.
Simply carry the 1 if a conversion to negative is made.
So starting at the end of the above pi, look at the 9.
Since 9 isn't allowed in the Winter system, you use need
to think ten minus one. Nine in the Winter system is a
two digit number and is written 1-1. A 1 in the ten's place
and a -1 in the one's place. So you take the -1 and write it
down below the 9. Then you carry the 1 from the ten's place.
Now we convert the next digit to the left seen above
and it is a seven. Since we had carried a one, we add it to
the seven and get eight. Then we convert eight to the Winter
system and think "eight is not allowed because it is above 5,
so eight is ten minus two". So "8" is "1-2". So write down
the -2 and carry the 1. If you run across a case where you
carry a one onto a 9, then you think okay, ten, and ten is
still 10 in Winter system, so write down zero and carry the
one. So that's my explanation of going from right to left
and converting from normal numbers to the Winter system.
If you go left to right you have to look ahead a few digits
to see what's coming next. The explanation of that is
more complicated than going right to left, but all I think
I should say is the following and let you work it out for
yourself if you want to do it that way.
A "0" digit may remain "0" or may change to "1".
A "1" digit may remain "1" or may change to "2".
A "2" digit may remain "2" or may change to "3".
A "3" digit may remain "3" or may change to "4".
A "4" digit may remain "4" or may change to "5".
A "5" digit may remain "5" or may change to "-4".
A "6" digit will change to "-3" or "-4".
A "7" digit will change to "-2" or "-3".
A "8" digit will change to "-1" or "-2".
A "9" digit will change to " 0" or "-1".
Good luck playing around with the new Winter number
system. If you have any questions, just ask!
```

]]>What if there were another notation that revealed more order, and was actually more "natural"?

]]>I hope you like it as much as I do. Imagine the possibilities!

Here is an example comparing our number system to the new Winter number system.

```
285
x64
-------
18240
or in this new Winter number system we have
3-2 5
x 1-4 4
----------
1 1 4 0
-1-1-4 0
3-2 5
-------------
2-2 2 4 0
```

four to positive five. In the left column below I am counting from 1 to 20.

In the right column I show the square of the number.

```
1 1
2 4
3 1-1
4 2-4
5 2 5
1-4 4-4
1-3 5-1
1-2 1-4 4
1-1 1-2 1
1 0 1 0 0
1 1 1 2 1
1 2 1 4 4
1 3 2-3-1
1 4 2 0-4
1 5 2 2 5
2-4 3-4-4
2-3 3-1-1
2-2 3 2 4
2-1 4-4 1
2 0 4 0 0
```