Løs for α (complex solution)
\alpha =\frac{2\left(\ln(\sigma _{x})+\ln(\frac{3}{2})\right)}{\ln(2)+\pi i}+\frac{2\pi n_{1}i}{\ln(2)+\pi i}
n_{1}\in \mathrm{Z}
\sigma _{x}\neq 0
Løs for σ_x (complex solution)
\sigma _{x}=-\frac{2\left(-2\right)^{\frac{\alpha }{2}}}{3}
\sigma _{x}=\frac{2\left(-2\right)^{\frac{\alpha }{2}}}{3}
Løs for α
\alpha =\frac{\ln(\sigma _{x}^{2})+\ln(\frac{9}{4})}{\ln(2)}
\sigma _{x}\neq 0\text{ and }Numerator(\frac{\ln(\sigma _{x}^{2})+2\ln(3)}{\ln(2)}-2)\text{bmod}2=0\text{ and }Denominator(\frac{\ln(\sigma _{x}^{2})+2\ln(3)}{\ln(2)})\text{bmod}2=1
Løs for σ_x
\sigma _{x}=\frac{2\sqrt{\left(-2\right)^{\alpha }}}{3}
\sigma _{x}=-\frac{2\sqrt{\left(-2\right)^{\alpha }}}{3}\text{, }Denominator(\alpha )\text{bmod}2=1\text{ and }\left(-2\right)^{\alpha }\geq 0
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