# q = e^x ln(x) - ratio of areas

- Author:
- RV'SMath

Generating Integers 1 - 400 - ( The Area Expands out of the Picture - But the Numbers that are Generated are listed as the Area Expands ) -
1) Rectangle Area (Green) / Triangle Area (Pink) gives Integer Values
2) What I find to be " Remarkable " is the Green Function (q) Intersects 2^(x) at x = 1.79 ; which is one of the numbers I have derived using other geometry and have shown
previously that it comes up : " Analysis of the Normal Curve " ; before, mentioned in that geometry. But also, the Value of the Integral from 1 to 1.79 = 1.17 which is
real close to 1.16.
3) Home setting is " 3 " so to show the Intersection and the Point (1.79 , 3.48 ) ; the y - value I have not tied in to any relationship yet ; other than even decimal point.
4) In terms of Subspace - Function (q) does not contain the Null Space - Therefore this equation is not in the Solutions set of i^2 - But it has some common points
of interest that can be used for reference. ( Has it's own space )

study geometry and the numbers