In $$e^{j\pi/\gamma x}=c$$ if $x$ and $c$ are known, how to find $\gamma$ since if we break to sine and cosine term the problem becomes more complicated. This is a complex value and $j$ indicates complex value.
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Apply logarithm? – a concerned citizen Jul 11 '22 at 13:13
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2Which one of $c$, $x$, and/or $\gamma$ are real and which ones are complex ? – Hilmar Jul 11 '22 at 13:47
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As a concerned citizen says:
import numpy as np
x = 0.1278147
c = 5.42958205
gamma = 1jnp.pix/np.log(c)
print(gamma)
yields
0.23733713769810083j
Peter K.
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