![](data:image/png;base64,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)
(vi) Complex Volumes and Cusp Shapes
Solutions to I
u
2
√
−1(vol +
√
−1CS) Cusp shape
u = −0.339110 + 0.822375I
a = −1.24082 + 0.82885I
b = −0.839233 + 0.066856I
−4.60570 − 0.49930I −15.4849 − 0.9665I
u = −0.339110 + 0.822375I
a = 1.51588 + 1.67630I
b = −1.43083 − 1.67189I
−4.60570 + 3.56046I −15.4849 − 7.8947I
u = −0.339110 + 0.822375I
a = 1.09190 − 2.13507I
b = 0.0324686 − 0.0684453I
−4.60570 + 3.56046I −15.4849 − 7.8947I
u = −0.339110 + 0.822375I
a = −0.46038 − 2.85787I
b = 0.03124 + 2.01433I
−4.60570 − 0.49930I −15.4849 − 0.9665I
u = −0.339110 − 0.822375I
a = −1.24082 − 0.82885I
b = −0.839233 − 0.066856I
−4.60570 + 0.49930I −15.4849 + 0.9665I
u = −0.339110 − 0.822375I
a = 1.51588 − 1.67630I
b = −1.43083 + 1.67189I
−4.60570 − 3.56046I −15.4849 + 7.8947I
u = −0.339110 − 0.822375I
a = 1.09190 + 2.13507I
b = 0.0324686 + 0.0684453I
−4.60570 − 3.56046I −15.4849 + 7.8947I
u = −0.339110 − 0.822375I
a = −0.46038 + 2.85787I
b = 0.03124 − 2.01433I
−4.60570 + 0.49930I −15.4849 + 0.9665I
u = 0.766826
a = 0.651697 + 0.410335I
b = 1.034330 − 0.571171I
−2.53372 + 2.02988I −14.5189 − 3.4641I
u = 0.766826
a = 0.651697 − 0.410335I
b = 1.034330 + 0.571171I
−2.53372 − 2.02988I −14.5189 + 3.4641I
10