Draft:Shaky triangles

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1. The observation:
a) there are infinite number of primes
b) there are infinite natural numbers
c) all prime numbers are a natural number
d) all prime numbers are bound by the property that +1 yields a non prime, which is a natural number (outbound)
e) all prime numbers are bound by the property that -1 yields a non prime, which is a natural number (inbound)
f) for all non prime natural numbers, there exists EXACTLY 1 representation as a sum of products of primes
if and only if all above stands tall then:
-One can state:
g) if and only if all non-trivial points reside on f(y)=0, if and only if at least 1 trivial point is found on f(x)=1/2 a)
h) because from any point,outbound of (-2,0) on f(y)=0, one can find:
EXACTLY 1 FIRST (prime number AND natural number AND non-trivial point) inbound
EXACTLY 1 FIRST (prime number AND natural number AND non-trivial point) outbound
i) because from any point,outbound of (1/2, X) on f(x)=1/2, one can find:
EXACTLY 1 FIRST (prime number AND natural number AND trivial point) inbound
EXACTLY 1 FIRST (prime number AND natural number AND trivial point) outbound
-One must stand tall and state:
consider the Riemann hypothesis proved b)

for X=17: This ties up neatly with itselve (the first inbound prime to be found outbound).
for X=15: This splices up neatly (3x5), with the inbound prime (13), defining the boundry condition,
in which the first trivial point is to be found (1/2, 14.1347...) as well as marking the unfortunate:
Within his lifespan he wasn't able to observe the boundry condition (2 ≤ n+1) in which the objectivity resides.
He was granted one point (0,0) and calculated (pen & paper) exactly 1 non-trivial AND exactly 1 trivial point)

a) Bernhard Riemann, I salute you,
sincerely
b) subject to objectivity

2. Shaky Triangles <p1,p2,p3>:
There are infinite number of shaky triangles, bound by their property:
p1:(1/2,0),90°
p2:Rx, subject to clause h)
p3:Ry, subject to clause i)

The idea upon which to expand...