BLUEPRINT:0,51,607,605,600,600,2314,0,637794899079863244,0.9.24.11286,Fractionator%20Loop%20Mk3%200-75%C2%B0,Compact%2C%20chainable%2C%2010x%20Fractionator%20loop%20that%20fits%20into%20the%20two%20tropics%20between%200-75%C2%B0.%20Can%20be%20laterally%20tiled%20via%20tesselation%20or%202%20step%20offset."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"89136AB7237B17E6E9D38DB201851DE2