Sane irrationality, or redefining irrational numbers

Sane irrationality,

or redefining irrational numbers:

What if:

3.14/2.71/a=x

x*a=3.14/2.71

a = x * 3.14/2.71

a = x*1,158

What if x = 1?

a = 1,158

Then what would the number be that is irrational and is the fourth irrational number?

Lets call it d.

d/pi/e/a=1

d/3.14/2.71/1.15=1

d=1*3.14*2.71*1.15=9.785

This d would be the 4th dimensional pi.

And a would be the first dimensional irrational number.

Then d/pi would be our upscale factor from 3d to 4d.

What is the factor that upscaling factors change by?

d/pi=9.785/3.14=3.116

pi/e=1.158

e/1.158=2.340

So not linear.

But the 5th, lets call it f,

would be:

f/9.785/3.14/2.71/1.158=1

f=96.420

Its upscale factor is:

96.420/9.785=9.863

The 4th power root of 96.42 = 3.13358718

What if we did this more precise?

It looks really close to pi.

Does this hold for the sixth, or g number?

Lets find out:

g/96.42/9.785/3.14/2.71/1.158=1

g=9289321.33

5th power root of g = 24.75

So no.

What if we did a fractional root power?

Btw, the 9.863th power root of 96.42,

so the upscale factor of f,

and f itself, equals 1.589.

Which is pi/e more or less.

Confer. Is this luck or is there a relationship?