BLUEPRINT:0,41,2040,2314,2003,2003,0,0,637845212872833467,0.9.24.11286,Belt%20Setup%20for%204-Stacked%20Hydrogen%20Fractionation,When%20fractionating%204-Stacked%20Hydrogens%2C%20the%20circulating%20Hydrogen%20must%20be%20split%20into%20single%20item-carrying%20belts%2C%20in%20order%20to%20maintain%20the%20maximum%20possible%20flow%20rate%20constantly.%20Each%20of%20these%20belts%20must%20be%20connected%20to%20an%20inflowing%20belt%2C%20which%20also%20carries%20non-stacked%20items%2C%20and%20then%20stacked%20back%20again."H4sIAAAAAAAAC5WaCXQW1RXH3xe2IEhCxQURRCioJWIkKMEo+YbPXUQFEVCWIMqigiLaIi4BVCJoC7iQRYEoq1RZZAnKErSKuFCgQWuQCkWLWqQCQkCRTO998+7Mn3A50Zzzbv7nO98vd3vz3puZxIwxKTTqmeCnGY3TnI4Z35j17uPTzE73sTngf+MlmTHx2P2DSlA/6Y9P8Cir08rUoO/59BPjPxP+PWs+DwHU8qWv67S2IP80SElpEHxa01T9SWKTmV/uHfBz47F2ZZmorzN5CR4cSUyJhKMzyfk7vNaVufEphf2yUP9IKfzo0khS4JqSBn0Sj61tvBx186M5CR4Mn6zAtQQuuinLekNtTPsED4ZrKnBtgT+4eqTNE/VRPyPBg+FartqxpAiuw+aI/0EYKmpjlnbmcbhOLHZ89alW4tmYtWHrRD+UNy3Bgz2nKGHXFbik56thzqJvnHhOBx4MJyvwSQI37zM+zFn0qQMXd+DBcF3JGeB6krOEirq6nOuzaZT/ofc/38+OtdudifoCml0XuBlWx4VtwDP33tw4dZO37qifPaV3/yzUh2l2HXYzrL6Ssw1hIHmr8Espz5WZqAeR10HOcz3Fc4qdZgWbvCWVpbbCqH8grz84zw0Uz6nBr0Wez97sxEAd/PzaS7Qhm7lDS8O8US+nKJa7SE5XIvkdm51D1gUVL4x1RL2FwC0ObujmdiwWwadEaRAwuXGHY/VvS6MRm/2DS8Miou5GUXRzkTRW0jiVzfMU+kHbvrJM1EUEFjmYvdSrkoZdiBvnL/Z2u7xRp9EcSHPz4BTFMxfV3DJ1hfcOV7xxThbqawm81sGnKfAZbIaStx9tqLszUd9F4F0OTlVgroM5qWCFt5iLRL1GvZDAhQ4+Q4HPZPOLnx8uTairu2SbRDBd45llJairg88SmD4PPYuuDm4q8PxzZ2QILLo6uJmdKfmF4eqCGleaM83x1/vZbG6aWhxcWdRb1LgRNlOq3ZzNG0PnBhOjPCcLdQlNzRI3Pc9W4HPYfDtkgfednZInd0RdxqCD2QtP0ViNCG4R/FoERYp0xe0DEzwYPlfx3FLgXp2H2VBRJ9MOmux20RYK/HuB8ybtsqGi3ks76F63i7aUsGEXbcUmRu2ZUT9jGbcHdQpVOsVVu6nSqtZsKl4s9qZsW1PC7UFdScWqdAVrpYTNdTCH/ble7srh7Xn/Qv0Ngd84uLUCn8fmTgpVlh7UuKM0UcI+n02tgmLYUSL9JoFvOvg8xfMf2BwaPNdbxADlibo7hdzdhX2+ArdhU0Czyi49tOgdowkscDB7Sa0yw9Kkz9E1HOnner2c4MHwRYrnCwRe2nOnDRV1StfhJTwYTlPgtgKf3WedXTFRjz44yw6GL5CwAb6QzXxqz34OlQDUeVTpPFfts5RWpbO5t7DYu6nSt6Gi/paK9a0r2IVK2BfJDKNfnsww0c0IbObgdAVuJzkbPtC7akc6+ClMTgu3XAM/Gcb+xbywPah3Ur47Xc6XK57bs3l20CSvO+dJUxL1GQSe4eAMBb6YTdchU8MKo36M8n3M5cxeuOK4P1/C5gc/NzwhofYJ9B3sKZ47SM5yHkW9gEJe4MK+RIEz2Xw7eJK3lK+k8r5ZqBsS2NDBHRS4I5sXKE85UqIupJALXdjspUmVnC9ls8e/kEJN9c68z2SjrqCVs8Ktnr0Vz1kC8578RWVuNuqTaM0+ya3bIxX4Mjb7/fvCKYnaUL7G5XyFAl8urRIANcKXKXAnNrQphr1FjfATCpzN5if/xrC3qGMExhzcSYHjbCr8/qE31Og5W4G9qGCBN9QIxxW4c5SzDzn7x3kerMAJyVkA1Ah3VuArJGfbHjq4oUY4ocBXRjnHrTfUl1TmJHgwPESBrxI4ZtI9gUWPH/7fi3mc6BB3deQ5uBhQ45lklOL5GoHlcQjqn+iK+sldVVcq8LXQKnuHgxqXoWEKfJ20yp6xCUCN1b5Wga+XVgmAGuHrFLhLVO0AQI3w9Qp8Axu+hpPcrQFqhLsocFdjgqVXvKHGI/MNCnwjm3lDJ3nr+ZhMWwzqZAKTHdxVgW9i8xUtt3K6R413teyFT/u49N4sfebf0mfRmPN4xXM36bMAqBG+WYG7S58FQI1wNwW+RfosAGqEuytwD+mzAKgRvkWBb5U+C4AaTwY9FLgnm6S7J3n7+68q4d6irkFgDQffqsC92Oyh3sqtAep91ON9rs/spWmVPve2MO2MvGK+5Ae7pOgYrSIxt5L0UTzfxmZmWiy8BUR9iLwecp5zFPj2qFU7rDfUh2kJOuyWoQcUuI+ELQDqJAo5yYWdpcB92RzwU8L9CTU+ZFmjwP2kz0m8VtMugVq+dKJ1u794lgqjxjPJQMVzjm12n11xeTKFGu/cVynwADZ7/bODnZHyRI1ze5AC34EFk7BFH6I2HXKtelSBB0bwDoAD3YDybeByvkOB74zgVO+24SYb9UHyetB57q/Ad7Hh1SPJFNs8UW9Nm5/JA88kSQAPwlbJJBHdgiZICzdJ1iqeB0fTMzj1ocZqD1DgIRK2HCVQ7xwzLcGD4QcVeCibYEMvji+t9DuhxpPBNQp8d1TtMXHaEbJR4wuDxxX4HjbJ1BraeWyeqDMIzHBwiQLfKwXjo8RWY7JR/0I9/sX1+WEFHiawbKuosdq5CjxcCtZ6SzPPPnEFXYNCruHCvlqB72PDm1uqyfHk7ClaPJ/oRvR+Y4KVpJXzdqzOSPgu52cUzyOinIMjI2r50omWoQckZ7mGUR8grwec56GK55GR5+Jw6RWNk+QRBX5Q5racN1GP3fPcWzwYvkuBH5LpafN0l6To6nL+o8D7N6d5fPOJGsOe6DzhLvknyXmfBWiLBY171QTXGoRHSbVloUeNl+TtSs4Pi2cqUrb0WTReGHIOwzVsNBte6OVZJ2q8MJ5SPD8innkBiLbYQNelkOu6sMcp8KNRq4rDRV90LQJrOfhuBX5MwpY9GTXexfZV4MfFMy0edgFA3efDjAQPhp9UCpYrnu3q4TyLxoI9qXgeY+E2Me9MPzi4ocYnrmMVmD8zF9GGHhzcyjJR47PelQo8LmpVHFoVP+4Qd68CPyGw3OqjxpwfU+Anoz4Ht0Oo8bXbbQr8lMD8W1olGh8gjlHg8VHOAYAawx6twHls+DKUaxh1HSpWHVcw3h34Th2v56eNCdZtWT1Q49mTF/h+VeAJErZd6Hv3z0Jdk8CaDr5UCXuiFMzuT+V9s1D/TAvBz24xuFOBn5GwfYLYG+pnO7ZP8MBHl3hhPMvmEOVoNzeakqi/juUleDD8Z/pesTn2KTN/ZppTmAzwrQHqs6hNZ7lW/UUJmz+zxwrZVlHPGdsvwYPhexR4UvAr3eu0uY8XvH6J9ENHMxI8GJ4sYcMzff6MPkz3jm7sakNF3ZLa1NK1apnieYpUW05AqHGGLVbg59ikth0Z5Emhos49vKQzD4afp+9NM8e+NeLPzHcvjgkqXJ6ThXqqv6QzD4ZfUDy/IGGnsDd3Fys68/G6CR4MT1HgF9nUNvd7212FUSfT1Ex203OqhA3V5s9MZwIGl1GFCwdkocZqL1E850urWqaPCFsl+opY+wQPhgsUuEAmyfa2A73gDUqkJya1T/BguFiBCyXsFWmBN9QTKOQJLuwiBS6Sgnnsje7iUO8lcK+DpynwSxJ20ZDxYdiin6Z5/bSb2y/Tt2abY5ehl6Vg+zc+bs+bqFdVZiR4MJyveJ4mYae6iYFalt5f+x8P0+WP7Xaho8ZJM4O+91qVNGZI9XPKgtBRjyVwrIMLlTSKpYDRgT39uMP7r03jFSlo/YLJYUFF4/HyVSWSVyWSe/InuPNopMfS7BvrZuBsc/xruJlSg55TJ9u1HHVt8lrbeZ6leJ4l1W9ivQXVF72PwH0Ofk3xPFvCTjJPhwUU3XRPih0nOo/PYbN3cxevrimwuwjqcUl5CR7seS59b6E5dkfhz0zalk4W4AqjbkNta+N2lHlKzvMkbOvNHuwi3fKjnAQPhl9R4NekYDZPN/dFy5dOlPN8Nqe37R7mifrHg0s682DPf5WcYV3nz8zWNgPCPFH3oDW9h1vXX1fCfl3Ctt6oPag3XFonwYPhmQr8BpsRtHel5hdbb6hxbi9QYP7M3iLH8wttnqg30LK8wS3NCxV4ocDSHtS/9RJdZIzb29pmWO+o99NCsd8tFv3M8XN9scBftPHCm3XReOhbpKTxJhs+YgbeguOmaLzTv0rxvETgcvZGuwrqIvJa5Dy/qXheyoaPmOIN9RHyesR5HqF4XiaweEOdS23Lda1bqni2DyH4fCoVRo1n1YcUzyUCS4VRp1O+6S7n5YrnFTJpYmaeBVCnkdc05/kNBX6LTYW/Pe67N4ioZcad6Pp+O4JLAS79VfBKge0Nun00Eunq4FUCy70X6urg1WzW9N0Vl3+6Q43/sPO2UjB+Rm5apMfC/7NB/T3dwH3vbuJWK3Apmzf67YrLf0GgHkdexznPbynwWjZb28XC/zlBjbePpQr8Dptt/oy4cU9lUffs2C3Bg+H3FPhdNh2KVse7sTfaZlE3ppAbu7DfUeC/sen0SnmYJ+rRFPJoF/a7bjoi/J6EXcn9pS0H9XQCpzv4H4rn96Ocg2cpqJtvn5XggTnjHeA6NptmrI5Lb1E3onwbuZzfVzx/wKbHq+XhrEL9EoX8kgt7nbuKEF4vYct8Rv2fLt0SPBj+WPH8IZs5c1bH5bUUanyDul6BP2Lz/MzyuLw1RY1vUNnLqiphfyxhy9M61N8R+J2DtyiePxFY/ukOdd7nsxI8MGds1QY29eetjg+9fI19+IQa3yZ+onj+O5uvKE95+IQa3yayl5VVct7I5lM/O8gzs6wEdXXL0CaBfZ7P61/vgLo6eDOb2qu6xPcxwPeeoEcROMrlvEnJmS8Ws+yOcfExldvjfL+Jeg/lu8flvFmBy9hcv6JLfDc/bKMDO+pm5LWZ87xRgbdYuNe4ePLRXPtSH/UR8nrEeS5T4E/ZfECeanCFaWKgfmHB9AQPhrcq8Gdszp1ekX0ye2vcNwt1bQq5tgv7UwX+J5ucqzPCPFF/RSF/5cL+zE0KhD+XsOW5P+oV5HWF87xD8VwusH0h5mDRj17epAMPhj9X4K0Cx9wjXdR9F6y1g+FyBf5CYDsl6RpGPWxyvwQPhrcr8DY2Yx6syB7Hs4qWHtSnU76nu5y/UOB/sZmdyAjnM+qJVOmJrtrb3FWE8JdRtYvtv6ajrqSTUKU7DUnBcCXZHuVcCjnLgSY6+X+phL1DhO2tezsuGp+Hy/VsAP638xyXf+tEXd2btf8D+ybyE2k2AAA="40CD1A12B0E052B2088B029129E39673