${\displaystyle {\begin{array}{ll}{\vec {v}}_{01}={\dot {s}}\,{\vec {\jmath }}_{1},&{\vec {\omega }}_{01}={\vec {0}}\\{\vec {a}}_{01}={\ddot {s}}\,{\vec {\jmath }}_{1},&{\vec {\alpha }}_{01}={\vec {0}}\end{array}}}$

${\displaystyle {\begin{array}{ll}{\vec {v}}_{21}^{\,C}={\vec {0}},&{\vec {\omega }}_{01}=-{\dot {\theta }}\,{\vec {k}}_{1}\\{\vec {a}}_{21}^{\,C}={\vec {0}},&{\vec {\alpha }}_{21}=-{\ddot {\theta }}\,{\vec {k}}_{1}\end{array}}}$

${\displaystyle {\begin{array}{l}{\vec {\omega }}_{20}={\vec {\omega }}_{21}-{\vec {\omega }}_{01}=-{\dot {\theta }}\,{\vec {k}}_{1}\\{\vec {\alpha }}_{20}={\vec {\alpha }}_{21}-{\vec {\alpha }}_{01}-{\vec {\omega }}_{01}\times {\vec {\omega }}_{20}=-{\ddot {\theta }}\,{\vec {k}}_{1}\\{\vec {v}}_{20}^{\,C}={\vec {v}}_{21}^{\,C}-{\vec {v}}_{01}^{\,C}=-{\dot {s}}\,{\vec {\jmath }}_{1}\\{\vec {a}}_{20}^{\,C}={\vec {a}}_{21}^{\,C}-{\vec {a}}_{01}^{\,C}-2{\vec {\omega }}_{01}\times {\vec {v}}_{20}^{\,C}=-{\ddot {s}}\,{\vec {\jmath }}_{1}\\\end{array}}}$

${\displaystyle {\vec {v}}_{20}^{\,A}={\vec {0}}\Longrightarrow {\vec {v}}_{20}^{\,C}+{\vec {\omega }}_{20}\times {\overrightarrow {CA}}=(-{\dot {s}}+R{\dot {\theta }})\,{\vec {\jmath }}_{1}={\vec {0}}\Longrightarrow {\dot {s}}=R{\dot {\theta }}}$

${\displaystyle T=T_{0}+T_{2}}$

${\displaystyle T_{0}={\dfrac {1}{2}}m|{\vec {v}}_{01}|^{2}={\dfrac {1}{2}}m{\dot {s}}^{2}}$

${\displaystyle T_{2}={\dfrac {1}{2}}I_{C}|{\vec {\omega }}_{01}|^{2}={\dfrac {1}{4}}mR^{2}{\dot {\theta }}^{2}={\dfrac {1}{4}}m{\dot {s}}^{2}}$

${\displaystyle T=T_{0}+T_{2}={\dfrac {3}{4}}m{\dot {s}}^{2}}$

${\displaystyle {\begin{array}{l}U_{0g}=mgs\\U_{0k}={\dfrac {1}{2}}k(s-l_{0})^{2}\\U=U_{0g}+U_{0k}=mgs+{\dfrac {1}{2}}k(s-l_{0})^{2}\end{array}}}$

${\displaystyle L=T-U={\dfrac {3}{4}}m{\dot {s}}^{2}-mgs-{\dfrac {1}{2}}k(s-l_{0})^{2}}$

${\displaystyle {\dfrac {\mathrm {d} }{\mathrm {d} t}}\left({\dfrac {\partial L}{\partial {\dot {s}}}}\right)-{\dfrac {\partial L}{\partial s}}=0}$

${\displaystyle {\dfrac {3}{2}}m{\ddot {s}}+k(s-l_{0})+mg=0}$

${\displaystyle {\ddot {s}}=-{\dfrac {2k}{3m}}s-{\dfrac {2}{3}}g+{\dfrac {2kl_{0}}{3m}}}$

${\displaystyle \omega _{0}={\sqrt {\dfrac {2k}{3m}}},\qquad \tau ={\dfrac {2\pi }{\omega _{0}}}=2\pi {\sqrt {\dfrac {3m}{2k}}}}$

${\displaystyle s_{eq}=l_{0}-{\dfrac {mg}{2k}}}$

${\displaystyle {\dfrac {\mathrm {d} }{\mathrm {d} t}}\left({\dfrac {\partial L}{\partial {\dot {s}}}}\right)-{\dfrac {\partial L}{\partial s}}=Q_{s}^{NC}}$

${\displaystyle Q_{s}^{NC}={\vec {\tau }}\cdot {\dfrac {\partial {\vec {\omega }}_{21}}{\partial {\dot {s}}}}=-{\dfrac {\tau _{0}}{R}}\cos(\omega t)}$

${\displaystyle {\ddot {s}}+{\dfrac {2k}{3m}}s+{\dfrac {2}{3}}g.{\dfrac {2kl_{0}}{3m}}=-{\dfrac {2\tau _{0}}{3mR}}\cos(\omega t)}$

${\displaystyle \omega \simeq \omega _{0}={\sqrt {\dfrac {2k}{3m}}}}$

${\displaystyle {\vec {\hat {F}}}=[{\hat {F}}_{0},{\hat {F}}_{0},0]_{1}}$

${\displaystyle \Delta p_{s}={\hat {Q}}_{s}^{NC}}$

${\displaystyle p_{s}={\dfrac {\partial L}{\partial {\dot {s}}}}={\dfrac {3}{2}}m{\dot {s}}}$

${\displaystyle \Delta p_{s}={\dfrac {3}{2}}m({\dot {s}}(0^{+})-{\dot {s}}(0^{-}))={\dfrac {3}{2}}ms(0^{+})}$

${\displaystyle {\hat {Q}}_{s}^{NC}={\vec {\hat {F}}}\cdot {\dfrac {\partial {\vec {v}}_{21}^{\,B}}{\partial {\dot {s}}}}}$

${\displaystyle {\vec {v}}_{21}^{\,B}={\vec {v}}_{21}^{\,C}+{\vec {\omega }}_{21}\times {\overrightarrow {CB}}=-{\dot {s}}\,{\vec {\jmath }}_{1}}$

${\displaystyle {\hat {Q}}_{s}^{NC}=-{\hat {F}}_{0}}$

${\displaystyle {\dot {s}}(0^{+})=-{\dfrac {2{\hat {F}}_{0}}{3m}}}$