${\displaystyle \delta W=\sum \limits _{i=1}^{M}{\vec {F}}_{i}\cdot \delta {\vec {r}}_{i}+\sum \limits _{j=1}^{P}{\vec {M}}_{j}\cdot \delta {\vec {\alpha }}_{j}=0}$

${\displaystyle \delta W={\vec {F}}\cdot \delta {\vec {r}}_{01}^{\,G_{0}}+{\vec {\tau }}\cdot \delta {\vec {\alpha }}_{21}+{\vec {C}}_{x}\cdot \delta {\vec {r}}_{21}^{\,C}=0}$

${\displaystyle {\vec {r}}_{01}^{\,G_{0}}=a\cos \theta \,{\vec {\imath }}_{1}+a\,\mathrm {sen} \,\theta \,{\vec {\jmath }}_{1}}$

${\displaystyle \delta {\vec {r}}_{01}^{\,G_{0}}={\dfrac {\partial {\vec {r}}_{01}^{\,G_{0}}}{\partial \theta }}\,\delta \theta =(-a\,\mathrm {sen} \,\theta \,{\vec {\imath }}_{1}+a\cos \theta \,{\vec {\jmath }}_{1})\delta \theta }$

${\displaystyle {\vec {F}}\cdot \delta {\vec {r}}_{01}^{\,G_{0}}=-aF\,\mathrm {sen} \,\theta \,\delta \theta }$

${\displaystyle {\vec {r}}_{21}^{\,C}=4a\cos \theta \,{\vec {\imath }}_{1}}$

${\displaystyle \delta {\vec {r}}_{21}^{\,C}={\dfrac {\partial {\vec {r}}_{21}^{\,C}}{\partial \theta }}\,\delta \theta =-4a\,\mathrm {sen} \,\theta \,\delta \theta \,{\vec {\imath }}_{1}}$

${\displaystyle {\vec {C}}_{x}\cdot \delta {\vec {r}}_{21}^{\,C}=-4aC_{x}\,\mathrm {sen} \,\theta \,\delta \theta }$

${\displaystyle {\vec {\omega }}_{21}={\dfrac {\delta {\vec {\alpha }}_{21}}{\delta t}}=-{\dot {\theta }}\,{\vec {k}}}$

${\displaystyle \delta {\vec {\alpha }}_{21}={\vec {\omega }}_{21}\delta t=-\delta \theta \,{\vec {k}}}$

${\displaystyle {\vec {\tau }}\cdot \delta {\vec {\alpha }}_{21}=-\tau \,\delta \theta }$

${\displaystyle \delta W=-aF\,\mathrm {sen} \,\theta \,\delta \theta -4aC_{x}\,\mathrm {sen} \,\theta \,\delta \theta -\tau \,\delta \theta =0}$

${\displaystyle C_{x}=-{\dfrac {aF\,\mathrm {sen} \,\theta +\tau }{4a\,\mathrm {sen} \,\theta }}}$

${\displaystyle C_{x}=-294\,\mathrm {N} }$

${\displaystyle {\vec {C}}_{x}=C_{x}\,{\vec {\imath }}_{1}=-294\,{\vec {\imath }}_{1}\,\mathrm {(N)} }$

${\displaystyle \delta W={\vec {F}}\cdot \delta {\vec {r}}_{21}^{\,G_{0}}+{\vec {\tau }}\cdot \delta {\vec {\alpha }}_{21}+{\vec {C}}_{y}\cdot \delta {\vec {r}}_{21}^{\,C}=0}$

${\displaystyle \delta {\vec {r}}_{21}^{\,G_{0}}=\delta {\vec {\alpha }}_{21}\times {\vec {r}}_{21}^{\,G_{0}}=(\delta \beta \,{\vec {k}})\times (a\cos \theta \,{\vec {\imath }}_{1}+a\,\mathrm {sen} \,\theta \,{\vec {\jmath }}_{1})=(-a\,\mathrm {sen} \,\theta \,{\vec {\imath }}_{1}+a\cos \theta \,{\vec {\jmath }}_{1})\,\delta \beta }$

${\displaystyle {\vec {F}}\cdot \delta {\vec {r}}_{21}^{G_{0}}=-aF\,\mathrm {sen} \,\theta \,\delta \beta }$

${\displaystyle \delta {\vec {r}}_{21}^{\,C}=\delta {\vec {\alpha }}_{21}\times {\vec {r}}_{21}^{\,C}=(\delta \beta \,{\vec {k}})\times (4a\cos \theta \,{\vec {\imath }}_{1})=4a\cos \theta \,{\vec {\jmath }}_{1}\,\delta \beta }$

${\displaystyle {\vec {C}}_{y}\cdot \delta {\vec {r}}_{21}^{\,C}=4aC_{y}\cos \theta \,\delta \beta }$

${\displaystyle {\vec {\tau }}\cdot \delta {\vec {\alpha }}_{21}=\tau \,\delta \beta }$

${\displaystyle \delta W=-aF\,\mathrm {sen} \,\theta \,\delta \beta +4aC_{y}\cos \theta \,\delta \beta +\tau \,\delta \beta =0}$

${\displaystyle C_{y}={\dfrac {aF\,\mathrm {sen} \,\theta -\tau }{4a\cos \theta }}}$

${\displaystyle C_{y}=-79.3\,\mathrm {N} }$

${\displaystyle {\vec {C}}_{y}=C_{y}\,{\vec {\jmath }}_{1}=-79.3\,{\vec {\jmath }}_{1}\,\mathrm {(N)} }$