\frac{dx_{1}}{dt} = 1 \cdot k_{43} \cdot x_{25} / k_{2}\\
\frac{dx_{2}}{dt} = -1 \cdot k_{44} \cdot x_{25} / \left(x_{25} + k_{45}\right) / k_{2}\\
\frac{dx_{3}}{dt} = -1 \cdot k_{46} / k_{2}\\
\frac{dx_{4}}{dt} = 1 \cdot k_{46} / k_{2}\\
\frac{dx_{5}}{dt} = \left(-1 \cdot x_{7} \cdot x_{5} \cdot k_{56} / \left(k_{55} + x_{5}\right) + 1 \cdot k_{58} \cdot x_{26} / \left(x_{26} + k_{57}\right)\right) / k_{3}\\
\frac{dx_{6}}{dt} = \left(-1 \cdot k_{47} \cdot x_{6} / \left(x_{6} + k_{48}\right) + 1 \cdot k_{49} \cdot x_{19} \cdot x_{20} / \left(k_{50} + x_{19}\right)\right) / k_{2}\\
\frac{dx_{7}}{dt} = \left(-1 \cdot k_{51} \cdot x_{7} / \left(k_{52} + x_{7}\right) + 1 \cdot k_{53} \cdot x_{23} \cdot x_{6} / \left(k_{54} + x_{23}\right)\right) / k_{2}\\
\frac{dx_{8}}{dt} = 1 \cdot \exp\left(k_{59} \cdot \left(k_{62} - x_{4} / k_{60}\right)\right) / \left(1 + 2 \cdot \exp\left(k_{59} \cdot \left(k_{62} - x_{4} / k_{60}\right)\right) + \exp\left(2 \cdot k_{59} \cdot \left(k_{62} - x_{4} / k_{60}\right)\right)\right) / k_{61} \cdot \frac{3657}{125} / k_{2}\\
\frac{dx_{9}}{dt} = 1 \cdot k_{44} \cdot x_{25} / \left(x_{25} + k_{45}\right) / k_{2}\\
\frac{dx_{10}}{dt} = \left(-1 \cdot \left(k_{13} \cdot x_{10} \cdot x_{12} - k_{14} \cdot x_{28}\right) + 1 \cdot k_{21} \cdot x_{17} / \left(k_{22} + x_{17}\right)\right) / k_{2}\\
\frac{dx_{11}}{dt} = 1 \cdot \exp\left(k_{11} - x_{4} / k_{10}^{\frac{13}{10}}\right) \cdot k_{9} \cdot x_{4} / k_{12}^{\frac{3}{10}} \cdot \left(k_{11} - x_{4} / k_{10}^{\frac{13}{10}}\right) / k_{2}\\
\frac{dx_{12}}{dt} = \left(1 \cdot \exp\left(k_{6} - x_{4} / k_{5}^{\frac{7}{20}}\right) \cdot k_{4} \cdot \left(x_{4} + k_{8}\right) / k_{7}^{\frac{-13}{20}} \cdot \left(k_{6} - x_{4} / k_{5}^{\frac{7}{20}}\right) + -1 \cdot \left(k_{13} \cdot x_{10} \cdot x_{12} - k_{14} \cdot x_{28}\right) + 1 \cdot \left(k_{19} \cdot x_{31} - k_{20} \cdot x_{12} \cdot x_{32}\right)\right) / k_{2}\\
\frac{dx_{13}}{dt} = -1 \cdot \exp\left(k_{11} - x_{4} / k_{10}^{\frac{13}{10}}\right) \cdot k_{9} \cdot x_{4} / k_{12}^{\frac{3}{10}} \cdot \left(k_{11} - x_{4} / k_{10}^{\frac{13}{10}}\right) / k_{2}\\
\frac{dx_{14}}{dt} = -1 \cdot \exp\left(k_{6} - x_{4} / k_{5}^{\frac{7}{20}}\right) \cdot k_{4} \cdot \left(x_{4} + k_{8}\right) / k_{7}^{\frac{-13}{20}} \cdot \left(k_{6} - x_{4} / k_{5}^{\frac{7}{20}}\right) / k_{2}\\
\frac{dx_{15}}{dt} = \left(-1 \cdot k_{35} \cdot x_{20} \cdot x_{15} / \left(k_{36} + x_{15}\right) + 1 \cdot k_{38} \cdot x_{19} / \left(x_{19} + k_{37}\right)\right) / k_{2}\\
\frac{dx_{16}}{dt} = \left(-1 \cdot k_{31} \cdot x_{21} \cdot x_{16} / \left(k_{32} + x_{16}\right) + 1 \cdot k_{34} \cdot x_{20} / \left(k_{33} + x_{20}\right)\right) / k_{2}\\
\frac{dx_{17}}{dt} = \left(-1 \cdot k_{21} \cdot x_{17} / \left(k_{22} + x_{17}\right) + 1 \cdot k_{23} \cdot x_{32}\right) / k_{2}\\
\frac{dx_{18}}{dt} = \left(-1 \cdot k_{39} \cdot x_{18} \cdot x_{6} / \left(x_{18} + k_{40}\right) + 1 \cdot k_{42} \cdot x_{23} / \left(x_{23} + k_{41}\right)\right) / k_{2}\\
\frac{dx_{19}}{dt} = \left(1 \cdot k_{35} \cdot x_{20} \cdot x_{15} / \left(k_{36} + x_{15}\right) + -1 \cdot k_{38} \cdot x_{19} / \left(x_{19} + k_{37}\right) + 1 \cdot k_{47} \cdot x_{6} / \left(x_{6} + k_{48}\right) + -1 \cdot k_{49} \cdot x_{19} \cdot x_{20} / \left(k_{50} + x_{19}\right)\right) / k_{2}\\
\frac{dx_{20}}{dt} = \left(1 \cdot k_{31} \cdot x_{21} \cdot x_{16} / \left(k_{32} + x_{16}\right) + -1 \cdot k_{34} \cdot x_{20} / \left(k_{33} + x_{20}\right)\right) / k_{2}\\
\frac{dx_{21}}{dt} = \left(1 \cdot k_{27} \cdot x_{32} \cdot x_{22} / \left(x_{22} + k_{28}\right) + -1 \cdot k_{29} \cdot x_{21} / \left(k_{30} + x_{21}\right)\right) / k_{2}\\
\frac{dx_{22}}{dt} = \left(-1 \cdot k_{27} \cdot x_{32} \cdot x_{22} / \left(x_{22} + k_{28}\right) + 1 \cdot k_{29} \cdot x_{21} / \left(k_{30} + x_{21}\right)\right) / k_{2}\\
\frac{dx_{23}}{dt} = \left(1 \cdot k_{39} \cdot x_{18} \cdot x_{6} / \left(x_{18} + k_{40}\right) + -1 \cdot k_{42} \cdot x_{23} / \left(x_{23} + k_{41}\right) + 1 \cdot k_{51} \cdot x_{7} / \left(k_{52} + x_{7}\right) + -1 \cdot k_{53} \cdot x_{23} \cdot x_{6} / \left(k_{54} + x_{23}\right)\right) / k_{2}\\
\frac{dx_{24}}{dt} = -1 \cdot \exp\left(k_{59} \cdot \left(k_{62} - x_{4} / k_{60}\right)\right) / \left(1 + 2 \cdot \exp\left(k_{59} \cdot \left(k_{62} - x_{4} / k_{60}\right)\right) + \exp\left(2 \cdot k_{59} \cdot \left(k_{62} - x_{4} / k_{60}\right)\right)\right) / k_{61} \cdot \frac{3657}{125} / k_{2}\\
\frac{dx_{25}}{dt} = \left(1 \cdot k_{24} \cdot x_{33} + -1 \cdot k_{43} \cdot x_{25}\right) / k_{2}\\
\frac{dx_{26}}{dt} = \left(1 \cdot x_{7} \cdot x_{5} \cdot k_{56} / \left(k_{55} + x_{5}\right) + -1 \cdot k_{58} \cdot x_{26} / \left(x_{26} + k_{57}\right)\right) / k_{3}\\
\frac{dx_{27}}{dt} = -1 \cdot \left(k_{25} \cdot x_{26} + k_{26} \cdot x_{8}\right) / k_{3}\\
\frac{dx_{28}}{dt} = \left(1 \cdot \left(k_{13} \cdot x_{10} \cdot x_{12} - k_{14} \cdot x_{28}\right) + -1 \cdot \left(k_{15} \cdot x_{28} \cdot x_{11} - k_{16} \cdot x_{30}\right)\right) / k_{2}\\
\frac{dx_{29}}{dt} = \left(-1 \cdot \left(k_{17} \cdot x_{29} \cdot x_{30} - k_{18} \cdot x_{31}\right) + 1 \cdot k_{23} \cdot x_{32}\right) / k_{2}\\
\frac{dx_{30}}{dt} = \left(1 \cdot \left(k_{15} \cdot x_{28} \cdot x_{11} - k_{16} \cdot x_{30}\right) + -1 \cdot \left(k_{17} \cdot x_{29} \cdot x_{30} - k_{18} \cdot x_{31}\right)\right) / k_{2}\\
\frac{dx_{31}}{dt} = \left(1 \cdot \left(k_{17} \cdot x_{29} \cdot x_{30} - k_{18} \cdot x_{31}\right) + -1 \cdot \left(k_{19} \cdot x_{31} - k_{20} \cdot x_{12} \cdot x_{32}\right)\right) / k_{2}\\
\frac{dx_{32}}{dt} = \left(1 \cdot \left(k_{19} \cdot x_{31} - k_{20} \cdot x_{12} \cdot x_{32}\right) + -1 \cdot k_{23} \cdot x_{32}\right) / k_{2}\\
\frac{dx_{33}}{dt} = \left(-1 \cdot k_{24} \cdot x_{33} + 1 \cdot \left(k_{25} \cdot x_{26} + k_{26} \cdot x_{8}\right)\right) / k_{3}\\
\frac{dx_{34}}{dt} = 0 / k_{1}