![](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 = −0.877439 + 0.744862I
a = 0.162359 + 0.986732I
b = 0.162359 + 0.986732I
5.65624I −2.97732 − 5.45590I
u = −0.877439 + 0.744862I
a = −0.500000 − 0.424452I
b = −0.500000 − 0.424452I
4.13758 + 2.82812I 1.30443 − 3.86214I
u = −0.877439 − 0.744862I
a = 0.162359 − 0.986732I
b = 0.162359 − 0.986732I
− 5.65624I −2.97732 + 5.45590I
u = −0.877439 − 0.744862I
a = −0.500000 + 0.424452I
b = −0.500000 + 0.424452I
4.13758 − 2.82812I 1.30443 + 3.86214I
u = 0.754878
a = −1.16236 + 0.98673I
b = −1.16236 + 0.98673I
−4.13758 − 2.82812I −7.82711 − 0.80415I
u = 0.754878
a = −1.16236 − 0.98673I
b = −1.16236 − 0.98673I
−4.13758 + 2.82812I −7.82711 + 0.80415I
18