Bill Adongo

LAST POST DEVELOPMENT STRATEGIC OF MY CENTRAL POINT LAW

Central Point Law(or Adongo's Linear Point Values Interval Law):

At central point (x, y), the point variable x is adding itself to infinity when the point variable y is subtracting itself to infinity and vice-versa.

[x ; y ]=[(x+x; x+x+x, ….); (y-y; y-y-y, ….)]

or

[x ; y]=[(x-x; x-x-x, ….); (y+y; y+y+y, ….)]

[x ; y ]=[ℓ_xx; ℓ_yy]

For ℓ_x=1,2,3,4,………, is correspond to ℓ_y=0,-1,-2,-

Three Plane Infinite Solution Without Assumption:

One additional plane is three plane infinite solution which I  derived from the Central Point Law and it is given ax+by+cz=D where D denoted derived constant.

Four Plane Infinite Solution Without Assumption:

From three plane infinite solution, is four plane infinite solution and it obeys Central Point Law(or Adongo’s Point Values Interval Law) of this equation and variable representation below:

a₁x₁+a₂x₂+a₃x₃+a₄x₄=c₂+c₁=C

X₁=c₁/2a₁,

X₂=c₁/2a₂,

X₃=(c₂-c₁)/2a₃,

X₄=(c₂-c₁)/2a₄

Two Unique plane Of Unique System Interval Infinite

Graphical intersection of line or simultaneous system running or solved values as unique solution. That is if a₁x₁+a₂x₂=c₁ and b₁x₁+b₂x₂=c₂, then must have a unique solution, but must represent[(x₁, x₁-x₁, ….), (x₂, x₂+x₂,…)] of matching (x₁,x₂), (x₁-x₁, x₂+x₂), in representation.

Three Unique Plane Of Unique System Interval  Infinite :

Graphical intersection of line or simultaneous system running or solved values as unique infinite solution using the  Central Point Law(or Adongo Point Values Interval Law) and it is three plane presenting pairs (x₁, x₂, x₃).

Four Unique Plane Of System Interval Infinite :

Graphical intersection of line or simultaneous system running or solved values as unique infinite solution using the  Central Point Law(or Adongo Point Values Interval Law) and it is four plane presenting pairs (x₁, _x2, x₃, x₄).

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Infinite Unique Plane Of Unique System Interval Infinite: