Diferencia entre revisiones de «Disco apoyado en barra y caja Septiembre 2015 (G.I.C.)»

${\displaystyle {\begin{array}{l}{\vec {N}}_{0\to 2}^{B}=-{\vec {N}}_{2\to 0}^{B}\\{\vec {N}}_{3\to 2}^{D}=-{\vec {N}}_{2\to 3}^{D}\\{\vec {N}}_{3\to 0}^{A}=-{\vec {N}}_{0\to 3}^{A}\\\end{array}}}$

${\displaystyle {\begin{array}{l}{\vec {F}}=F\,{\vec {\jmath }}\\\\{\vec {P}}_{2}=-Mg\,\mathrm {sen} \,\alpha \,{\vec {\imath }}-Mg\cos \alpha \,{\vec {\jmath }}\\\\{\vec {N}}_{1\to 3}^{O}=N_{1\to 3}^{O}\,\mathrm {sen} \,\alpha \,{\vec {\imath }}+N_{1\to 3}^{O}\,\cos \alpha \,{\vec {\jmath }}\\\\{\vec {f}}_{1\to 3}^{O}=f_{1\to 3}^{O}\,\cos \alpha \,{\vec {\imath }}-f_{1\to 3}^{O}\,\mathrm {sen} \,\alpha \,{\vec {\jmath }}\\\end{array}}}$

${\displaystyle {\overrightarrow {OE}}\times {\vec {F}}+{\overrightarrow {OC}}\times {\vec {P}}_{2}={\vec {0}}}$

${\displaystyle {\overrightarrow {OE}}\times {\vec {F}}=(4R\,{\vec {\imath }})\times (F\,{\vec {\jmath }})=4FR\,{\vec {k}}}$

${\displaystyle \left.{\begin{array}{l}{\overrightarrow {OC}}=3R\,{\vec {\imath }}+R\,{\vec {\jmath }}\\\\{\vec {P}}_{2}=-Mg\,\mathrm {sen} \,\alpha \,{\vec {\imath }}-Mg\cos \alpha \,{\vec {\jmath }}\end{array}}\right|\Longrightarrow {\overrightarrow {OC}}\times {\vec {P}}_{2}=-MgR\,(3\cos \alpha -\mathrm {sen} \,\alpha )\,{\vec {k}}}$

${\displaystyle {\vec {F}}={\dfrac {Mg}{4}}\,(3\cos \alpha -\mathrm {sen} \,\alpha )\,{\vec {\jmath }}}$

${\displaystyle {\vec {F}}+{\vec {P}}_{2}+{\vec {N}}_{1\to 3}^{O}+{\vec {f}}_{1\to 3}^{O}}$

${\displaystyle {\begin{array}{l}(X)\to N_{1\to 3}^{O}\,\mathrm {sen} \,\alpha +f_{1\to 3}^{O}\cos \alpha =Mg\,\mathrm {sen} \,\alpha \\\\(Y)\to N_{1\to 3}^{O}\cos \alpha -f_{1\to 3}^{O}\,\mathrm {sen} \,\alpha =Mg\cos \alpha -F\end{array}}}$

${\displaystyle N_{1\to 3}^{O}=Mg-F\cos \alpha }$

${\displaystyle f_{1\to 3}^{O}=F\,\mathrm {sen} \,\alpha }$

${\displaystyle |{\vec {f}}_{1\to 3}^{O}|\leq \mu |{\vec {N}}_{1\to 3}^{O}|}$

${\displaystyle f_{1\to 3}^{O}\leq \mu N_{1\to 3}^{O}}$

${\displaystyle {\begin{array}{l}F={\dfrac {Mg}{2{\sqrt {2}}}}\\\\N_{1\to 3}^{O}={\dfrac {3}{4}}Mg\\\\f_{1\to 3}^{O}={\dfrac {Mg}{4}}\\\end{array}}}$

${\displaystyle \mu \geq {\dfrac {1}{3}}}$

${\displaystyle {\vec {P}}_{2}+{\vec {N}}_{0\to 2}^{B}+{\vec {N}}_{3\to 2}^{D}={\vec {0}}}$

${\displaystyle {\begin{array}{l}{\vec {P}}_{2}=-Mg\,\mathrm {sen} \,\alpha \,{\vec {\imath }}-Mg\cos \alpha \,{\vec {\jmath }}\\\\{\vec {N}}_{0\to 2}^{B}=N_{0\to 2}^{B}\,{\vec {\imath }}\\\\{\vec {N}}_{3\to 2}^{D}=N_{3\to 2}^{D}\,{\vec {\jmath }}\end{array}}}$

${\displaystyle {\begin{array}{l}N_{0\to 2}^{B}=Mg\,\mathrm {sen} \,\alpha \\\\N_{3\to 2}^{D}=Mg\cos \alpha \end{array}}}$