\frac{dx_{1}}{dt} = \left(-1 \cdot \left(k_{30} \cdot x_{1} \cdot x_{40} \cdot k_{31}^{k_{1}} / \left(x_{75}^{k_{1}} + k_{31}^{k_{1}}\right) - k_{32} \cdot x_{39}\right) + 1 \cdot k_{33} \cdot x_{59} + 1 \cdot k_{6} \cdot k_{159} \cdot \left(k_{189}^{k_{1}} / \left(k_{189}^{k_{1}} + x_{1}^{k_{1}} + \frac{1}{1000}\right) - k_{160} \cdot x_{1}\right)\right) / k_{6}\\
\frac{dx_{2}}{dt} = \left(1 \cdot k_{14} \cdot x_{43} + -1 \cdot \left(k_{15} \cdot x_{2} \cdot x_{42} \cdot k_{16}^{k_{1}} / \left(x_{80}^{k_{1}} + k_{16}^{k_{1}}\right) \cdot k_{17}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{17}^{k_{1}}\right) - k_{18} \cdot x_{41}\right) + 1 \cdot k_{6} \cdot k_{157} \cdot \left(k_{188}^{k_{1}} / \left(k_{188}^{k_{1}} + x_{2}^{k_{1}} + \frac{1}{1000}\right) - k_{158} \cdot x_{2}\right)\right) / k_{6}\\
\frac{dx_{3}}{dt} = \left(-1 \cdot \left(k_{118} \cdot x_{3} \cdot x_{49} \cdot k_{119}^{k_{1}} / \left(x_{71}^{k_{1}} + k_{119}^{k_{1}}\right) \cdot \left(1 + x_{91}^{k_{1}} / \left(x_{91}^{k_{1}} + k_{120}^{k_{1}}\right)\right) - k_{121} \cdot x_{48}\right) + 1 \cdot k_{122} \cdot x_{47} + 1 \cdot k_{6} \cdot k_{161} \cdot \left(k_{190}^{k_{1}} / \left(k_{190}^{k_{1}} + x_{3}^{k_{1}} + \frac{1}{1000}\right) - k_{162} \cdot x_{3}\right)\right) / k_{6}\\
\frac{dx_{4}}{dt} = \left(-1 \cdot \left(k_{123} \cdot x_{4} - k_{124} \cdot x_{64}\right) + 1 \cdot k_{6} \cdot k_{163} \cdot \left(k_{191}^{k_{1}} / \left(k_{191}^{k_{1}} + x_{4}^{k_{1}} + \frac{1}{1000}\right) - k_{164} \cdot x_{4}\right)\right) / k_{6}\\
\frac{dx_{5}}{dt} = \left(1 \cdot k_{64} \cdot x_{38} + -1 \cdot \left(k_{65} \cdot x_{5} \cdot x_{37} \cdot k_{66}^{k_{1}} / \left(x_{75}^{k_{1}} + k_{66}^{k_{1}}\right) - k_{67} \cdot x_{36}\right) + 1 \cdot k_{6} \cdot k_{175} \cdot \left(k_{197}^{k_{1}} / \left(k_{197}^{k_{1}} + x_{5}^{k_{1}} + \frac{1}{1000}\right) - k_{176} \cdot x_{5}\right)\right) / k_{6}\\
\frac{dx_{6}}{dt} = \left(-1 \cdot \left(k_{101} \cdot x_{6} \cdot x_{31} - k_{102} \cdot x_{30}\right) + 1 \cdot k_{141} \cdot x_{32} + 1 \cdot k_{6} \cdot k_{173} \cdot \left(k_{196}^{k_{1}} / \left(k_{196}^{k_{1}} + x_{6}^{k_{1}} + \frac{1}{1000}\right) - k_{174} \cdot x_{6}\right)\right) / k_{6}\\
\frac{dx_{7}}{dt} = \left(-1 \cdot \left(k_{87} \cdot x_{7} \cdot x_{34} - k_{88} \cdot x_{33}\right) + 1 \cdot k_{142} \cdot x_{35} + 1 \cdot k_{6} \cdot k_{171} \cdot \left(k_{195}^{k_{1}} / \left(k_{195}^{k_{1}} + x_{7}^{k_{1}} + \frac{1}{1000}\right) - k_{172} \cdot x_{7}\right)\right) / k_{6}\\
\frac{dx_{8}}{dt} = \left(-1 \cdot \left(k_{103} \cdot x_{8} \cdot x_{28} - k_{104} \cdot x_{27}\right) + 1 \cdot k_{143} \cdot x_{29} + 1 \cdot k_{6} \cdot k_{169} \cdot \left(k_{194}^{k_{1}} / \left(k_{194}^{k_{1}} + x_{8}^{k_{1}} + \frac{1}{1000}\right) - k_{170} \cdot x_{8}\right)\right) / k_{6}\\
\frac{dx_{9}}{dt} = \left(1 \cdot k_{145} \cdot x_{65} + -1 \cdot \left(k_{146} \cdot x_{9} \cdot x_{90} - k_{147} \cdot x_{91}\right)\right) / k_{6}\\
\frac{dx_{10}}{dt} = \left(-1 \cdot \left(k_{135} \cdot x_{10} \cdot x_{52} - k_{136} \cdot x_{53}\right) + 1 \cdot k_{144} \cdot x_{66} + 1 \cdot k_{6} \cdot k_{167} \cdot \left(k_{193}^{k_{1}} / \left(k_{193}^{k_{1}} + x_{10}^{k_{1}} + \frac{1}{1000}\right) - k_{168} \cdot x_{10}\right)\right) / k_{6}\\
\frac{dx_{11}}{dt} = \left(-1 \cdot \left(k_{8} \cdot x_{11} \cdot x_{45} \cdot k_{9}^{k_{1}} / \left(x_{80}^{k_{1}} + k_{9}^{k_{1}}\right) - k_{10} \cdot x_{44}\right) + 1 \cdot k_{148} \cdot x_{46} + 1 \cdot k_{6} \cdot k_{155} \cdot \left(k_{187}^{k_{1}} / \left(k_{187}^{k_{1}} + x_{11}^{k_{1}} + \frac{1}{1000}\right) - k_{156} \cdot x_{11}\right)\right) / k_{6}\\
\frac{dx_{12}}{dt} = 0\\
\frac{dx_{13}}{dt} = 0\\
\frac{dx_{14}}{dt} = 0\\
\frac{dx_{15}}{dt} = 0\\
\frac{dx_{16}}{dt} = 0\\
\frac{dx_{17}}{dt} = 0\\
\frac{dx_{18}}{dt} = 0\\
\frac{dx_{19}}{dt} = 0\\
\frac{dx_{20}}{dt} = 0\\
\frac{dx_{21}}{dt} = 0\\
\frac{dx_{22}}{dt} = 0\\
\frac{dx_{23}}{dt} = 0\\
\frac{dx_{24}}{dt} = 0\\
\frac{dx_{25}}{dt} = 0\\
\frac{dx_{26}}{dt} = 0\\
\frac{dx_{27}}{dt} = 1 \cdot \left(k_{103} \cdot x_{8} \cdot x_{28} - k_{104} \cdot x_{27}\right) / k_{7}\\
\frac{dx_{28}}{dt} = -1 \cdot \left(k_{103} \cdot x_{8} \cdot x_{28} - k_{104} \cdot x_{27}\right) / k_{7}\\
\frac{dx_{29}}{dt} = -1 \cdot k_{143} \cdot x_{29} / k_{7}\\
\frac{dx_{30}}{dt} = 1 \cdot \left(k_{101} \cdot x_{6} \cdot x_{31} - k_{102} \cdot x_{30}\right) / k_{7}\\
\frac{dx_{31}}{dt} = -1 \cdot \left(k_{101} \cdot x_{6} \cdot x_{31} - k_{102} \cdot x_{30}\right) / k_{7}\\
\frac{dx_{32}}{dt} = -1 \cdot k_{141} \cdot x_{32} / k_{7}\\
\frac{dx_{33}}{dt} = 1 \cdot \left(k_{87} \cdot x_{7} \cdot x_{34} - k_{88} \cdot x_{33}\right) / k_{7}\\
\frac{dx_{34}}{dt} = -1 \cdot \left(k_{87} \cdot x_{7} \cdot x_{34} - k_{88} \cdot x_{33}\right) / k_{7}\\
\frac{dx_{35}}{dt} = -1 \cdot k_{142} \cdot x_{35} / k_{7}\\
\frac{dx_{36}}{dt} = 1 \cdot \left(k_{65} \cdot x_{5} \cdot x_{37} \cdot k_{66}^{k_{1}} / \left(x_{75}^{k_{1}} + k_{66}^{k_{1}}\right) - k_{67} \cdot x_{36}\right) / k_{7}\\
\frac{dx_{37}}{dt} = -1 \cdot \left(k_{65} \cdot x_{5} \cdot x_{37} \cdot k_{66}^{k_{1}} / \left(x_{75}^{k_{1}} + k_{66}^{k_{1}}\right) - k_{67} \cdot x_{36}\right) / k_{7}\\
\frac{dx_{38}}{dt} = \left(-1 \cdot k_{64} \cdot x_{38} + 1 \cdot \left(k_{68} \cdot k_{186} \cdot k_{69}^{k_{1}} / \left(x_{63}^{k_{1}} + k_{69}^{k_{1}}\right) \cdot k_{70}^{k_{1}} / \left(k_{184}^{k_{1}} + k_{70}^{k_{1}}\right) \cdot \left(x_{38}^{k_{1}} / \left(x_{38}^{k_{1}} + k_{71}^{k_{1}}\right) + x_{79}^{k_{1}} / \left(x_{79}^{k_{1}} + k_{72}^{k_{1}}\right) + x_{71}^{k_{1}} / \left(x_{71}^{k_{1}} + k_{73}^{k_{1}}\right)\right) - k_{74} \cdot x_{38}\right)\right) / k_{7}\\
\frac{dx_{39}}{dt} = 1 \cdot \left(k_{30} \cdot x_{1} \cdot x_{40} \cdot k_{31}^{k_{1}} / \left(x_{75}^{k_{1}} + k_{31}^{k_{1}}\right) - k_{32} \cdot x_{39}\right) / k_{7}\\
\frac{dx_{40}}{dt} = -1 \cdot \left(k_{30} \cdot x_{1} \cdot x_{40} \cdot k_{31}^{k_{1}} / \left(x_{75}^{k_{1}} + k_{31}^{k_{1}}\right) - k_{32} \cdot x_{39}\right) / k_{7}\\
\frac{dx_{41}}{dt} = 1 \cdot \left(k_{15} \cdot x_{2} \cdot x_{42} \cdot k_{16}^{k_{1}} / \left(x_{80}^{k_{1}} + k_{16}^{k_{1}}\right) \cdot k_{17}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{17}^{k_{1}}\right) - k_{18} \cdot x_{41}\right) / k_{7}\\
\frac{dx_{42}}{dt} = -1 \cdot \left(k_{15} \cdot x_{2} \cdot x_{42} \cdot k_{16}^{k_{1}} / \left(x_{80}^{k_{1}} + k_{16}^{k_{1}}\right) \cdot k_{17}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{17}^{k_{1}}\right) - k_{18} \cdot x_{41}\right) / k_{7}\\
\frac{dx_{43}}{dt} = -1 \cdot k_{14} \cdot x_{43} / k_{7}\\
\frac{dx_{44}}{dt} = 1 \cdot \left(k_{8} \cdot x_{11} \cdot x_{45} \cdot k_{9}^{k_{1}} / \left(x_{80}^{k_{1}} + k_{9}^{k_{1}}\right) - k_{10} \cdot x_{44}\right) / k_{7}\\
\frac{dx_{45}}{dt} = -1 \cdot \left(k_{8} \cdot x_{11} \cdot x_{45} \cdot k_{9}^{k_{1}} / \left(x_{80}^{k_{1}} + k_{9}^{k_{1}}\right) - k_{10} \cdot x_{44}\right) / k_{7}\\
\frac{dx_{46}}{dt} = -1 \cdot k_{148} \cdot x_{46} / k_{7}\\
\frac{dx_{47}}{dt} = \left(-1 \cdot k_{122} \cdot x_{47} + 1 \cdot k_{7} \cdot \left(k_{132} \cdot k_{217} \cdot \left(1 + x_{69}^{k_{1}} / \left(x_{69}^{k_{1}} + k_{133}^{k_{1}}\right)\right) - k_{134} \cdot x_{47}\right)\right) / k_{7}\\
\frac{dx_{48}}{dt} = 1 \cdot \left(k_{118} \cdot x_{3} \cdot x_{49} \cdot k_{119}^{k_{1}} / \left(x_{71}^{k_{1}} + k_{119}^{k_{1}}\right) \cdot \left(1 + x_{91}^{k_{1}} / \left(x_{91}^{k_{1}} + k_{120}^{k_{1}}\right)\right) - k_{121} \cdot x_{48}\right) / k_{7}\\
\frac{dx_{49}}{dt} = -1 \cdot \left(k_{118} \cdot x_{3} \cdot x_{49} \cdot k_{119}^{k_{1}} / \left(x_{71}^{k_{1}} + k_{119}^{k_{1}}\right) \cdot \left(1 + x_{91}^{k_{1}} / \left(x_{91}^{k_{1}} + k_{120}^{k_{1}}\right)\right) - k_{121} \cdot x_{48}\right) / k_{7}\\
\frac{dx_{50}}{dt} = -1 \cdot k_{7} \cdot \left(k_{125} \cdot x_{64} \cdot x_{50} \cdot k_{126}^{k_{1}} / \left(x_{76}^{k_{1}} + k_{126}^{k_{1}}\right) - k_{127} \cdot x_{51}\right) / k_{7}\\
\frac{dx_{51}}{dt} = 1 \cdot k_{7} \cdot \left(k_{125} \cdot x_{64} \cdot x_{50} \cdot k_{126}^{k_{1}} / \left(x_{76}^{k_{1}} + k_{126}^{k_{1}}\right) - k_{127} \cdot x_{51}\right) / k_{7}\\
\frac{dx_{52}}{dt} = -1 \cdot \left(k_{135} \cdot x_{10} \cdot x_{52} - k_{136} \cdot x_{53}\right) / k_{7}\\
\frac{dx_{53}}{dt} = 1 \cdot \left(k_{135} \cdot x_{10} \cdot x_{52} - k_{136} \cdot x_{53}\right) / k_{7}\\
\frac{dx_{54}}{dt} = 0\\
\frac{dx_{55}}{dt} = 1 \cdot k_{7} \cdot \left(k_{11} \cdot k_{199} \cdot \left(1 + x_{44}^{k_{1}} / \left(x_{44}^{k_{1}} + k_{12}^{k_{1}}\right)\right) - k_{13} \cdot x_{55}\right) / k_{7}\\
\frac{dx_{56}}{dt} = 1 \cdot k_{7} \cdot \left(k_{19} \cdot k_{214} \cdot k_{215} \cdot k_{20}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{20}^{k_{1}}\right) \cdot k_{21}^{k_{1}} / \left(x_{85}^{k_{1}} + k_{21}^{k_{1}}\right) \cdot \left(1 + x_{55}^{k_{1}} / \left(x_{55}^{k_{1}} + k_{22}^{k_{1}}\right)\right) - k_{23} \cdot x_{56}\right) / k_{7}\\
\frac{dx_{57}}{dt} = 0\\
\frac{dx_{58}}{dt} = 1 \cdot k_{7} \cdot \left(k_{24} \cdot k_{200} \cdot k_{25}^{k_{1}} / \left(x_{48}^{k_{1}} + k_{25}^{k_{1}}\right) \cdot k_{26}^{k_{1}} / \left(x_{79}^{k_{1}} + k_{26}^{k_{1}}\right) \cdot \left(x_{41}^{k_{1}} / \left(x_{41}^{k_{1}} + k_{27}^{k_{1}}\right) + x_{51}^{k_{1}} / \left(x_{51}^{k_{1}} + k_{28}^{k_{1}}\right)\right) - k_{29} \cdot x_{58}\right) / k_{7}\\
\frac{dx_{59}}{dt} = \left(-1 \cdot k_{33} \cdot x_{59} + 1 \cdot k_{7} \cdot \left(k_{40} \cdot k_{216} \cdot k_{41}^{k_{1}} / \left(k_{185}^{k_{1}} + k_{41}^{k_{1}}\right) \cdot k_{42}^{k_{1}} / \left(x_{69}^{k_{1}} + k_{42}^{k_{1}}\right) \cdot k_{43}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{43}^{k_{1}}\right) \cdot \left(x_{58}^{k_{1}} / \left(x_{58}^{k_{1}} + k_{44}^{k_{1}}\right) + x_{56}^{k_{1}} / \left(x_{56}^{k_{1}} + k_{45}^{k_{1}}\right) + x_{76}^{k_{1}} / \left(x_{76}^{k_{1}} + k_{46}^{k_{1}}\right)\right) - k_{47} \cdot x_{59}\right)\right) / k_{7}\\
\frac{dx_{60}}{dt} = 0\\
\frac{dx_{61}}{dt} = 1 \cdot k_{7} \cdot \left(k_{55} \cdot k_{201} \cdot k_{56}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{56}^{k_{1}}\right) \cdot k_{57}^{k_{1}} / \left(x_{75}^{k_{1}} + k_{57}^{k_{1}}\right) \cdot \left(1 + x_{39}^{k_{1}} / \left(x_{39}^{k_{1}} + k_{58}^{k_{1}}\right)\right) - k_{59} \cdot x_{61}\right) / k_{7}\\
\frac{dx_{62}}{dt} = 0\\
\frac{dx_{63}}{dt} = 1 \cdot k_{7} \cdot \left(k_{34} \cdot k_{202} \cdot k_{35}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{35}^{k_{1}}\right) \cdot \left(x_{48}^{k_{1}} / \left(x_{48}^{k_{1}} + k_{36}^{k_{1}}\right) + x_{39}^{k_{1}} / \left(x_{39}^{k_{1}} + k_{37}^{k_{1}}\right) + x_{61}^{k_{1}} / \left(x_{61}^{k_{1}} + k_{38}^{k_{1}}\right)\right) - k_{39} \cdot x_{63}\right) / k_{7}\\
\frac{dx_{64}}{dt} = \left(1 \cdot \left(k_{123} \cdot x_{4} - k_{124} \cdot x_{64}\right) + -1 \cdot k_{7} \cdot \left(k_{125} \cdot x_{64} \cdot x_{50} \cdot k_{126}^{k_{1}} / \left(x_{76}^{k_{1}} + k_{126}^{k_{1}}\right) - k_{127} \cdot x_{51}\right) + 1 \cdot k_{7} \cdot \left(k_{128} \cdot k_{213} \cdot k_{212} \cdot k_{129}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{129}^{k_{1}}\right) \cdot \left(1 + x_{27}^{k_{1}} / \left(x_{27}^{k_{1}} + k_{130}^{k_{1}}\right)\right) - k_{131} \cdot x_{64}\right)\right) / k_{7}\\
\frac{dx_{65}}{dt} = \left(-1 \cdot k_{145} \cdot x_{65} + 1 \cdot k_{7} \cdot \left(k_{149} \cdot k_{218} \cdot k_{150}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{150}^{k_{1}}\right) \cdot \left(x_{51}^{k_{1}} / \left(x_{51}^{k_{1}} + k_{151}^{k_{1}}\right) + x_{68}^{k_{1}} / \left(x_{68}^{k_{1}} + k_{152}^{k_{1}}\right) + x_{58}^{k_{1}} / \left(x_{58}^{k_{1}} + k_{153}^{k_{1}}\right)\right) - k_{154} \cdot x_{65}\right) + 1 \cdot k_{165} \cdot \left(k_{192}^{k_{1}} / \left(k_{192}^{k_{1}} + x_{65}^{k_{1}} + \frac{1}{1000}\right) - k_{166} \cdot x_{65}\right)\right) / k_{7}\\
\frac{dx_{66}}{dt} = \left(-1 \cdot k_{144} \cdot x_{66} + 1 \cdot \left(k_{177} \cdot k_{198} \cdot k_{178}^{k_{1}} / \left(x_{51}^{k_{1}} + k_{178}^{k_{1}}\right) \cdot \left(x_{83}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{179}^{k_{1}}\right) + x_{48}^{k_{1}} / \left(x_{48}^{k_{1}} + k_{180}^{k_{1}}\right) + x_{79}^{k_{1}} / \left(x_{79}^{k_{1}} + k_{181}^{k_{1}}\right) + x_{71}^{k_{1}} / \left(x_{71}^{k_{1}} + k_{182}^{k_{1}}\right)\right) - k_{183} \cdot x_{66}\right)\right) / k_{7}\\
\frac{dx_{67}}{dt} = 0\\
\frac{dx_{68}}{dt} = 1 \cdot k_{7} \cdot \left(k_{112} \cdot k_{203} \cdot k_{113}^{k_{1}} / \left(x_{85}^{k_{1}} + k_{113}^{k_{1}}\right) \cdot k_{114}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{114}^{k_{1}}\right) \cdot \left(x_{69}^{k_{1}} / \left(x_{69}^{k_{1}} + k_{115}^{k_{1}}\right) + x_{30}^{k_{1}} / \left(x_{30}^{k_{1}} + k_{116}^{k_{1}}\right)\right) - k_{117} \cdot x_{68}\right) / k_{7}\\
\frac{dx_{69}}{dt} = 1 \cdot k_{7} \cdot \left(k_{105} \cdot k_{204} \cdot k_{106}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{106}^{k_{1}}\right) \cdot \left(x_{48}^{k_{1}} / \left(x_{48}^{k_{1}} + k_{107}^{k_{1}}\right) + x_{51}^{k_{1}} / \left(x_{51}^{k_{1}} + k_{108}^{k_{1}}\right) + x_{53}^{k_{1}} / \left(x_{53}^{k_{1}} + k_{109}^{k_{1}}\right) + x_{27}^{k_{1}} / \left(x_{27}^{k_{1}} + k_{110}^{k_{1}}\right)\right) - k_{111} \cdot x_{69}\right) / k_{7}\\
\frac{dx_{70}}{dt} = 0\\
\frac{dx_{71}}{dt} = 1 \cdot k_{7} \cdot \left(k_{89} \cdot k_{205} \cdot \left(1 + x_{33}^{k_{1}} / \left(x_{33}^{k_{1}} + k_{90}^{k_{1}}\right)\right) - k_{91} \cdot x_{71}\right) / k_{7}\\
\frac{dx_{72}}{dt} = 0\\
\frac{dx_{73}}{dt} = 0\\
\frac{dx_{74}}{dt} = 0\\
\frac{dx_{75}}{dt} = 1 \cdot k_{7} \cdot \left(k_{60} \cdot k_{207} \cdot x_{63}^{k_{1}} / \left(x_{63}^{k_{1}} + k_{61}^{k_{1}}\right) \cdot x_{76}^{k_{1}} / \left(x_{76}^{k_{1}} + k_{62}^{k_{1}}\right) - k_{63} \cdot x_{75}\right) / k_{7}\\
\frac{dx_{76}}{dt} = 1 \cdot k_{7} \cdot \left(k_{48} \cdot k_{208} \cdot k_{49}^{k_{1}} / \left(x_{30}^{k_{1}} + k_{49}^{k_{1}}\right) \cdot k_{50}^{k_{1}} / \left(x_{69}^{k_{1}} + k_{50}^{k_{1}}\right) \cdot \left(x_{58}^{k_{1}} / \left(x_{58}^{k_{1}} + k_{51}^{k_{1}}\right) + x_{63}^{k_{1}} / \left(x_{63}^{k_{1}} + k_{52}^{k_{1}}\right) + x_{76}^{k_{1}} / \left(x_{76}^{k_{1}} + k_{53}^{k_{1}}\right)\right) - k_{54} \cdot x_{76}\right) / k_{7}\\
\frac{dx_{77}}{dt} = 0\\
\frac{dx_{78}}{dt} = 0\\
\frac{dx_{79}}{dt} = 1 \cdot k_{7} \cdot \left(k_{75} \cdot k_{209} \cdot k_{76}^{k_{1}} / \left(x_{76}^{k_{1}} + k_{76}^{k_{1}}\right) \cdot k_{77}^{k_{1}} / \left(x_{69}^{k_{1}} + k_{77}^{k_{1}}\right) \cdot k_{78}^{k_{1}} / \left(x_{30}^{k_{1}} + k_{78}^{k_{1}}\right) \cdot \left(x_{80}^{k_{1}} / \left(x_{80}^{k_{1}} + k_{79}^{k_{1}}\right) + x_{83}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{80}^{k_{1}}\right)\right) - k_{81} \cdot x_{79}\right) / k_{7}\\
\frac{dx_{80}}{dt} = 1 \cdot k_{7} \cdot \left(k_{82} \cdot k_{210} \cdot k_{83}^{k_{1}} / \left(x_{39}^{k_{1}} + k_{83}^{k_{1}}\right) \cdot x_{36}^{k_{84}} / \left(x_{36}^{k_{84}} + k_{85}^{k_{84}}\right) - k_{86} \cdot x_{80}\right) / k_{7}\\
\frac{dx_{81}}{dt} = 0\\
\frac{dx_{82}}{dt} = -1 \cdot k_{7} \cdot \left(k_{137} \cdot x_{82} \cdot k_{211} \cdot k_{138}^{k_{1}} / \left(x_{39}^{k_{1}} + k_{138}^{k_{1}}\right) \cdot \left(1 + x_{36}^{k_{1}} / \left(x_{36}^{k_{1}} + k_{139}^{k_{1}}\right)\right) - k_{140} \cdot x_{83}\right) / k_{7}\\
\frac{dx_{83}}{dt} = 1 \cdot k_{7} \cdot \left(k_{137} \cdot x_{82} \cdot k_{211} \cdot k_{138}^{k_{1}} / \left(x_{39}^{k_{1}} + k_{138}^{k_{1}}\right) \cdot \left(1 + x_{36}^{k_{1}} / \left(x_{36}^{k_{1}} + k_{139}^{k_{1}}\right)\right) - k_{140} \cdot x_{83}\right) / k_{7}\\
\frac{dx_{84}}{dt} = 0\\
\frac{dx_{85}}{dt} = 1 \cdot k_{7} \cdot \left(k_{92} \cdot k_{206} \cdot k_{93}^{k_{1}} / \left(x_{80}^{k_{1}} + k_{93}^{k_{1}}\right) \cdot k_{94}^{k_{1}} / \left(x_{69}^{k_{1}} + k_{94}^{k_{1}}\right) \cdot k_{95}^{k_{1}} / \left(x_{27}^{k_{1}} + k_{95}^{k_{1}}\right) \cdot \left(x_{30}^{k_{1}} / \left(x_{30}^{k_{1}} + k_{96}^{k_{1}}\right) + x_{63}^{k_{1}} / \left(x_{63}^{k_{1}} + k_{97}^{k_{1}}\right) + x_{71}^{k_{1}} / \left(x_{71}^{k_{1}} + k_{98}^{k_{1}}\right) + x_{83}^{k_{1}} / \left(x_{83}^{k_{1}} + k_{99}^{k_{1}}\right)\right) - k_{100} \cdot x_{85}\right) / k_{7}\\
\frac{dx_{86}}{dt} = 0\\
\frac{dx_{87}}{dt} = 0\\
\frac{dx_{88}}{dt} = 0\\
\frac{dx_{89}}{dt} = 0\\
\frac{dx_{90}}{dt} = -1 \cdot \left(k_{146} \cdot x_{9} \cdot x_{90} - k_{147} \cdot x_{91}\right) / k_{7}\\
\frac{dx_{91}}{dt} = 1 \cdot \left(k_{146} \cdot x_{9} \cdot x_{90} - k_{147} \cdot x_{91}\right) / k_{7}\\
\frac{dx_{92}}{dt} = 0\\
\frac{dx_{93}}{dt} = 0\\
\frac{dx_{94}}{dt} = 0