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The following theorem is proven: Both real and imaginary parts of thefunction F(s) defined as F(s)=zeta(s)*Gamma(s/2)*pi**(-s/2)=xi(s)/(s*(s-1)),and whose zeroes exactly coincide with the non-trivial zeroes of the Riemannzeta-function, have infinitely many zeroes for any value of Re(s).

Both real and imaginary parts of the function  F(s)=zeta(s)*Gamma(s/2)*pi**(-s/2)=xi(s)/(s*(s-1)), whose zeroes exactly  coincide with the non-trivial zeroes of the Riemann zeta-function, have  infinitely many zeroes for any value of Re(s)