If:

There exist a complex

Number of the form:

t' = t + i(σ' - σ)

And hence:

There exist a Polimorphic

Complex number of the form:

s' = σ' + it'

Whose imaginary part be:

Im(t')

When:

Re(σ') = Re(6)

Is the real part.

Then:

s'

Is a non trivial zero

And a counterexample

Of the Reimann hypothesis

Since:

σ' ≠ 1/2

6 ≠ 1/2

If:

s = σ + it

It is a non trivial zero.

And hence:

t' = i(σ' - σ) + t

Is the imaginary part of:

s' = σ' + t'

When: σ = 1/2

Then:

There exist a contradiction

By ambiguity.

Since:

σ' ≠ 1/2

Being:

σ ≠ σ'

When:

σ = 1/2

If:

ζ(s) = 0

Then:

ζ(s') = 0