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Would appreciate feedback quadrilinear interpolation


Keith Palmer

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(my best quess at quadrilinear interpolation
In short outra-phasicism of intangible approximatory particulates must exist in temporality between that of intracomparitive extraplanar one dimensional and two dimensional collodial superlative adherencies of relative adjuncture to the planar and aplanar modularity if in so saying that those very comparitive indeminities must persist as it is appositional to singularities as they are modular representation there of
 
Thus why I am trying to prove quadrilinearity in terms of interpolation 
 
Sum i=0 of n-1 {(a(y)-(bx^--)+c')/(a(y)-bx^--)
 
 
Why would there be purpose in trying to find a.computation module there of?
 
Simply because, if appositional planar representation is observable such as in terms of the higgs boson mechanism whereas duality and planar attribution is presentative
 
And the corrolary of the statistical approximation of 2d isometric particulates is apparent 
 
There for, one could "reazon" that such an ideminities is possible and perhaps do exist
 
To go further even if it is seemingly so time crystals are a discrete invariant representative feild observance not to say they aren't perhaps that of adhoc however the adjuncture does seem to be indicative that the immodularity exists alongside that of the relativity of the modular
 
So too must the very aphasicality exist in too of that of a representative along the wider as before stated "outra-phasicism"
 
What does fifth dimensional gas and particulates prove other then the appositional outra-exodeterminacy or interim trileanity of what is or isn't the very extraplanar disproval and presence of gravitational adherency and unadherency
 
I'm highly interested in trying to figure out what quadrilinearity is in terms of a computational module there for in so saying perhaps a "irrelevancy" of the very tertiary relevancy of where indeterminacy may lead. 
 
Sincerely
 
Keith Palmer
 
Sum i=0 of n-1 {(a(y)-(bx^--)+c')^3?/(a(y)-bx^-)!}
 
Just an idea....

15425606672968054835534560864494.jpg

What is the computational adherency of quadrilinearity when aphasicism is taken into relation when planarity and atemporality of the idemnity between the collodial adherency to that of temporality is factored as in so saying does there persist a comparitive mathematical proof?

 

Does therein exist a unique intervariability

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14 minutes ago, StringJunky said:

It looks more like someone trying very hard to sound clever...

Quadrilinear just means a function with the dependent variable depending in a linear fashion on each of four independent variables.

This could be the path taken by a particle (such as the mentioned boson) with respect to  position and time (x,y,z,t) or its energy as a function of position and time.

So could be geometry in 4D or a 5D graph or plot.

But a better presentation of the OP is needed.

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