Cartesian coordinates for the vertices of a great retrosnub icosidodecahedron are all the even permutations of

(±2α, ±2, ±2β),

(±(α−βτ−1/τ), ±(α/τ+β−τ), ±(−ατ−β/τ−1)),

(±(ατ−β/τ+1), ±(−α−βτ+1/τ), ±(−α/τ+β+τ)),

(±(ατ−β/τ−1), ±(α+βτ+1/τ), ±(−α/τ+β−τ)) and

(±(α−βτ+1/τ), ±(−α/τ−β−τ), ±(−ατ−β/τ+1)),

with an even number of plus signs, where

α = ξ−1/ξ

and

β = −ξ/τ+1/τ²−1/(ξτ),

where τ = (1+√5)/2 is the golden mean and ξ is the smaller positive real root of ξ³−2ξ=−1/τ, namely

${\displaystyle \xi ={\frac {\left(1+i{\sqrt {3}}\right)\left({\frac {1}{2\tau }}+{\sqrt {{\frac {\tau ^{-2}}{4}}-{\frac {8}{27}}}}\right)^{\frac {1}{3}}+\left(1-i{\sqrt {3}}\right)\left({\frac {1}{2\tau }}-{\sqrt {{\frac {\tau ^{-2}}{4}}-{\frac {8}{27}}}}\right)^{\frac {1}{3}}}{2}}\approx 0.3264046}$ 

Taking the odd permutations of the above coordinates with an odd number of plus signs gives another form, the enantiomorph of the other one. Taking the odd permutations with an even number of plus signs or vice versa results in the same two figures rotated by 90 degrees.

The circumradius for unit edge length is

${\displaystyle R={\frac {1}{2}}{\sqrt {\frac {2-x}{1-x}}}=0.580002\dots }$ 

where ${\displaystyle x}$  is the appropriate root of ${\displaystyle x^{3}+2x^{2}={\Big (}{\tfrac {1\pm {\sqrt {5}}}{2}}{\Big )}^{2}}$ . The four positive real roots of the sextic in ${\displaystyle R^{2},}$ 

${\displaystyle 4096R^{12}-27648R^{10}+47104R^{8}-35776R^{6}+13872R^{4}-2696R^{2}+209=0}$ 

are the circumradii of the snub dodecahedron (U₂₉), great snub icosidodecahedron (U₅₇), great inverted snub icosidodecahedron (U₆₉), and great retrosnub icosidodecahedron (U₇₄).

• List of uniform polyhedra
• Great snub icosidodecahedron
• Great inverted snub icosidodecahedron

• Weisstein, Eric W. "Great retrosnub icosidodecahedron". MathWorld.