Derousseau's Generalization of the Malfatti circles

The Smallest Eisenstein Triangle

\(C=120\degree\).   \(a:b:c=3:5:7\).


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\(\mathbf{4b}\) \((301)\)

Exactly,
\[\begin{aligned}\overrightarrow{AA^\prime}&={}\frac{8\sqrt{7}+9\sqrt{3}-5}{2}\overrightarrow{AI_B},&\overrightarrow{BB^\prime}&={}\frac{8\sqrt{7}-9\sqrt{3}+5}{30}\overrightarrow{BI_B},&\overrightarrow{CC^\prime}&={}\frac{4\sqrt{7}-3\sqrt{3}-5}{18}\overrightarrow{CI_B}.\end{aligned}\]
\[\begin{alignedat}{4}A^\prime&={}&-\frac{8\sqrt{7}+9\sqrt{3}-10}{5}&{}:{}&-\frac{8\sqrt{7}+9\sqrt{3}-5}{2}&{}:{}&\frac{7\left(8\sqrt{7}+9\sqrt{3}-5\right)}{10}&,\\B^\prime&={}&\frac{8\sqrt{7}-9\sqrt{3}+5}{50}&{}:{}&-\frac{8\sqrt{7}-9\sqrt{3}-10}{15}&{}:{}&\frac{7\left(8\sqrt{7}-9\sqrt{3}+5\right)}{150}&,\\C^\prime&={}&\frac{4\sqrt{7}-3\sqrt{3}-5}{30}&{}:{}&-\frac{4\sqrt{7}-3\sqrt{3}-5}{18}&{}:{}&\frac{4\sqrt{7}-3\sqrt{3}+40}{45}&.\end{alignedat}\]
Approximately,
\[\begin{aligned}\overrightarrow{AA^\prime}&\approx{}15.877233878318\overrightarrow{AI_B},\\\overrightarrow{BB^\prime}&\approx{}0.352585107347\overrightarrow{BI_B},\\\overrightarrow{CC^\prime}&\approx{}0.021491823420\overrightarrow{CI_B}.\end{aligned}\]
\[\begin{alignedat}{4}A^\prime&\approx{}&-5.350893551327&{}:{}&-15.877233878318&{}:{}&22.228127429646&,\\B^\prime&\approx{}&0.211551064408&{}:{}&0.294829785307&{}:{}&0.493619150285&,\\C^\prime&\approx{}&0.012895094052&{}:{}&-0.021491823420&{}:{}&1.008596729368&.\end{alignedat}\]
4b (301)

Hiroyasu Kamo