The oddly even square

 

Squaring Lines into form

Using Units

of Unity

itty bitty things

[|]

One

Begin with unity

the one

one

1

[|]

squared

one becomes one

by multiplying itself

by its self

as

1

One

generating surface

making the one

audible

and

visible

as

1

from one perspective

and

[|]

from another 

and others from

others

Added

to

One

Become the many

and the double

at once

as

L

the Line becomes

One

The square idea

 when

 two

is to add two 

units of one

to the one

square

and

[|]

Two squared then

becomes one square

added to two copies

of one unit as |

and the one squared

as

[|]

generated from

[|]

The formula then

to find the square

of N

as

NXN

is 

to know how the

squares are formed

when the odd number

is  added to the odd

square number that

is unity as [|]

[n]

then is

generated from

[n-1]

added to

two X |n-1|

added to

[|]

To Pythagorus

for the lines of length N 

and N-1 The Square of N

is

N^2= [n-1]^2 N minus one squared

Added to

2X[n-1] twice the line N-1

added to

[|]

the square of the idea of one

you began with

8^2 = 7^2 + 2X7 + 1

64 

===

49+

14+

1

7^2 = 6^2 + 2X6 + 1

6^2 = 5^2 + 2X5 + 1

5^2 = 4^2 + 2X4 + 1

4^2 = 3^2 + 2X3 + 1

3^2 = 2^2 + 2X2 + 1

2^2  = 1^2 + 2X1 + 1 

1^2 = 0^2 + 2X0 + 1