${\displaystyle {\vec {\omega }}_{21}={\dot {\theta }}\,{\vec {k}}_{1},\qquad {\vec {v}}_{21}^{\,A}={\dot {x}}\,{\vec {\jmath }}_{1}}$

${\displaystyle T=T_{T}+T_{R}}$

${\displaystyle T_{T}={\dfrac {1}{2}}m|{\vec {v}}_{21}^{\,G}|^{2}}$

${\displaystyle {\begin{array}{ll}{\vec {v}}_{21}^{\,G}&={\vec {v}}_{21}^{\,A}+{\vec {\omega }}_{21}\times {\overrightarrow {AG}}=-b{\dot {\theta }}\,\mathrm {sen} \,\theta \,{\vec {\imath }}_{1}+({\dot {x}}+b{\dot {\theta }}\cos \theta )\,{\vec {\jmath }}_{1}\\&{\vec {v}}_{21}^{\,A}={\dot {x}}\,{\vec {\jmath }}_{1}\\&{\vec {\omega }}_{21}\times {\overrightarrow {AG}}=({\dot {\theta }}\,{\vec {k}}_{1})\times (b\cos \theta \,{\vec {\imath }}_{1}+b\,\mathrm {sen} \,\theta \,{\vec {\jmath }}_{1})=-b{\dot {\theta }}\,\mathrm {sen} \,\theta \,{\vec {\imath }}_{1}+b{\dot {\theta }}\cos \theta \,{\vec {\jmath }}_{1}\end{array}}}$

${\displaystyle T_{T}={\dfrac {1}{2}}m\,({\dot {x}}^{2}+b^{2}{\dot {\theta }}^{2}+2b{\dot {x}}{\dot {\theta }}\cos \theta )}$

${\displaystyle T_{R}={\dfrac {1}{2}}I_{G}|{\vec {\omega }}_{21}|^{2}={\dfrac {1}{2}}\,{\dfrac {1}{12}}m(2b)^{2}\,{\dot {\theta }}^{2}}$

${\displaystyle T={\dfrac {1}{2}}m{\dot {x}}^{2}+{\dfrac {2}{3}}mb^{2}{\dot {\theta }}^{2}+mb{\dot {x}}{\dot {\theta }}\cos \theta .}$

${\displaystyle U=U_{g}=-mgb\cos \theta .}$

${\displaystyle {\begin{array}{ll}{\vec {v}}_{21}^{\,C}&={\vec {v}}_{21}^{\,A}+{\vec {\omega }}_{21}\times {\overrightarrow {AC}}=-s{\dot {\theta }}\,\mathrm {sen} \,\theta +({\dot {x}}+s{\dot {\theta }}\cos \theta )\,{\vec {\jmath }}_{1}\\&{\vec {v}}_{21}^{\,A}={\dot {x}}\,{\vec {\jmath }}_{1}\\&{\vec {\omega }}_{21}\times {\overrightarrow {AC}}=({\dot {\theta }}\,{\vec {k}}_{1})\times (s\cos \theta \,{\vec {\imath }}_{1}+s\,\mathrm {sen} \,\theta \,{\vec {\jmath }}_{1})=-s{\dot {\theta }}\,\mathrm {sen} \,\theta \,{\vec {\imath }}_{1}+s{\dot {\theta }}\cos \theta \,{\vec {\jmath }}_{1}\end{array}}}$

${\displaystyle L=T-U={\dfrac {1}{2}}m{\dot {x}}^{2}+{\dfrac {2}{3}}mb^{2}{\dot {\theta }}^{2}+mb{\dot {x}}{\dot {\theta }}\cos \theta +mgb\cos \theta }$

${\displaystyle \Delta p_{x}={\hat {Q}}_{x}^{NC},\qquad \Delta p_{\theta }={\hat {Q}}_{\theta }^{NC}.}$

${\displaystyle p_{x}={\dfrac {\partial L}{\partial {\dot {x}}}}=m{\dot {x}}+mb{\dot {\theta }}\cos \theta \Longrightarrow \Delta p_{x}=\left.(m\Delta {\dot {x}}+mb\Delta {\dot {\theta }}\cos \theta )\right|_{x=0,\theta =0}=m\Delta {\dot {x}}+mb\Delta {\dot {\theta }}.}$

${\displaystyle {\hat {Q}}_{x}^{NC}={\vec {\hat {F}}}\cdot {\dfrac {\partial {\vec {v}}_{21}^{\,C}}{\partial {\dot {x}}}}=\left.{\hat {F}}_{0}\,(-{\vec {\imath }}_{1}+{\vec {\jmath }}_{1})\cdot ({\vec {\jmath }}_{1})\right|_{x=0,\theta =0}={\hat {F}}_{0}}$

${\displaystyle \Delta {\dot {x}}+b\Delta {\dot {\theta }}={\hat {F}}_{0}/m\qquad (1)}$

${\displaystyle p_{\theta }={\dfrac {\partial L}{\partial {\dot {\theta }}}}={\dfrac {4}{3}}mb^{2}{\dot {\theta }}+mb{\dot {x}}\cos \theta \Longrightarrow \Delta p_{\theta }=\left.({\dfrac {4}{3}}mb^{2}\Delta {\dot {\theta }}+mb\Delta {\dot {x}}\cos \theta )\right|_{x=0,\theta =0}={\dfrac {4}{3}}mb^{2}\Delta {\dot {\theta }}+mb\Delta {\dot {x}}.}$

${\displaystyle {\hat {Q}}_{\theta }^{NC}={\vec {\hat {F}}}\cdot {\dfrac {\partial {\vec {v}}_{21}^{\,C}}{\partial {\dot {\theta }}}}=\left.{\hat {F}}_{0}\,(-{\vec {\imath }}_{1}+{\vec {\jmath }}_{1})\cdot (-s\,\mathrm {sen} \,\theta \,{\vec {\imath }}_{1}+s\cos \theta {\vec {\jmath }}_{1})\right|_{x=0,\theta =0}={\hat {F}}_{0}s}$

${\displaystyle 3\Delta {\dot {x}}+4b\Delta {\dot {\theta }}={\dfrac {3{\hat {F}}_{0}s}{mb}}\qquad (2)}$

${\displaystyle \Delta {\dot {x}}={\dfrac {{\hat {F}}_{0}}{mb}}\,(4b-3s),\qquad \Delta {\dot {\theta }}=-{\dfrac {3{\hat {F}}_{0}}{mb^{2}}}\,(b-s)}$

${\displaystyle {\dot {x}}^{+}={\dfrac {{\hat {F}}_{0}}{mb}}\,(4b-3s),\qquad {\dot {\theta }}^{+}=-{\dfrac {3{\hat {F}}_{0}}{mb^{2}}}\,(b-s)}$

${\displaystyle \Delta {\vec {C}}={\vec {\hat {F}}}+{\vec {\hat {A}}}\Longrightarrow {\vec {\hat {A}}}=\Delta {\vec {C}}-{\vec {\hat {F}}}}$

${\displaystyle \Delta {\vec {C}}=m\Delta {\vec {v}}_{21}^{\,G}=\left.(-b\Delta {\dot {\theta }}\,\mathrm {sen} \,\theta \,{\vec {\imath }}_{1}+(\Delta {\dot {x}}+b\Delta {\dot {\theta }}\cos \theta )\,{\vec {\jmath }}_{1})\right|_{x=0,\theta =0}=(\Delta {\dot {x}}+b\Delta {\dot {\theta }})\,{\vec {\jmath }}_{1}.}$

${\displaystyle {\vec {\hat {A}}}={\hat {F}}_{0}\,{\vec {\imath }}_{1}}$

${\displaystyle {\vec {v}}_{21}^{\,A+}={\dot {x}}^{+}\,{\vec {\jmath }}_{1}={\dfrac {{\hat {F}}_{0}}{mb}}\,(4b-3s)\,{\vec {\jmath }}_{1}}$