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Now, beginning with Version 2 of our expression for the Gravitational Potential of Axisymmetric Mass Distributions, let's also map the (unprimed) cylindrical coordinate pair, $(ϖ, z)$ , to the same (but, unprimed) toroidal coordinate system, $(η, θ)$ , and place the toroidal coordinate system's anchor ring in the equatorial plane of the cylindrical-coordinate system such that, $(ϖ_{a}, z_{a}) = (a, 0)$ . This gives, what we will refer to as the,

Gravitational Potential of an Axisymmetric Mass Distribution (Version 3)
$Φ (ϖ, z) \|_{a x i s y m}$	$=$	$- 2 G a^{2} [\frac{(\cosh η - \cos θ)}{\sinh η}]^{1 / 2} \iint_{c o n f i g} [\frac{\sinh η^{'}}{(\cosh η^{'} - \cos θ^{'})^{5}}]^{1 / 2} μ K (μ) ρ (η^{'}, θ^{'}) d η^{'} d θ^{'},$
$w h e r e : μ^{2} = \frac{2 \sinh η^{'} \cdot \sinh η}{\sinh η^{'} \cdot \sinh η + \cosh η^{'} \cdot \cosh η - \cos (θ^{'} - θ)} .$

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