Throughout vortex math we come across polar pairs. these are pairs of numbers that total nine.

If we take 9 as being the whole, there are four ways to split 9 into two whole numbers.

1 and 8

2 and 7

3 and 6

4 and 5

These are the polar pairs and keeping track of them as we go will reveal some fascinating symmetries.

lets have a look at the male 9 times table

9

18

27

36

45

54

63

72

81

90

Notice the 9 times table produces nothing but polar pairs and if we continue

99

108 we can take the first two digits and implode them 10>)1 that gives us 1 and 8 a polar pair

117 we can take the first two digits and implode them 11>)2 that gives us 2 and 7 a polar pair

126 we can take the first two digits and implode them 12>)3 that gives us 3 and 6 a polar pair

We can do this to infinity always leaving the last digit and imploding the remaining digits will always produce a polar pair.

When we made circles out of our multiplication tables we found that polar pair were always opposite.

Lets compare the 1 and 8 times table

1 2 3 4 5 6 7 8 9

8 7 6 5 4 3 2 1 9

Every step creates polar pairs, its the same if we compare the 2 and 7 times table.

2 4 6 8 1 3 5 7 9

7 5 3 1 8 6 4 2 9

Polar pairs again and if we compare 4 and 5 times table we get the same again.

4 8 3 7 2 6 1 5 9

5 1 6 2 7 3 8 4 9

Now lets look at the 3 and 6 times table.

3 6 9

6 3 9

The 3 and 6 are unique for many reasons, one of the reasons is that they are the only Polar Pair to be in the same family member group.

What’s a family member? lets take a look.