Ayuda con integrales definidas

df · Publicado: Sab Ago 04, 2012 7:28 pm **Asunto**: (Sin Asunto)

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$[tex] \nabla ^u \nabla_u \phi = g^{ij} \Big( \frac{\partial ^2 \phi}{\partial x^i \partial x^j} - \Gamma^{k}_{ij} \frac{\partial \phi}{\partial x^k} \Big)\\\\\frac{\partial \sigma^{ij}}{\partial x^i} + \sigma^{kj} \Gamma^i _{ki} + \sigma^{ik} \Gamma^j _{ki} = 0[/tex]$

glynbueso · Nivel 1 Registrado: 04 Ago 2012 Mensajes: 4

df · Publicado: Dom Ago 05, 2012 4:08 pm **Asunto**: (Sin Asunto)

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$[tex] \nabla ^u \nabla_u \phi = g^{ij} \Big( \frac{\partial ^2 \phi}{\partial x^i \partial x^j} - \Gamma^{k}_{ij} \frac{\partial \phi}{\partial x^k} \Big)\\\\\frac{\partial \sigma^{ij}}{\partial x^i} + \sigma^{kj} \Gamma^i _{ki} + \sigma^{ik} \Gamma^j _{ki} = 0[/tex]$

glynbueso · Nivel 1 Registrado: 04 Ago 2012 Mensajes: 4

df · Publicado: Dom Ago 05, 2012 4:45 pm **Asunto**: (Sin Asunto)

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$[tex] \nabla ^u \nabla_u \phi = g^{ij} \Big( \frac{\partial ^2 \phi}{\partial x^i \partial x^j} - \Gamma^{k}_{ij} \frac{\partial \phi}{\partial x^k} \Big)\\\\\frac{\partial \sigma^{ij}}{\partial x^i} + \sigma^{kj} \Gamma^i _{ki} + \sigma^{ik} \Gamma^j _{ki} = 0[/tex]$

WoS · Publicado: Dom Ago 05, 2012 5:21 pm **Asunto**: (Sin Asunto)

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Last night Darth Vader came down from planet Vulcan and he told me that if I didn't take Loraine to the dance, that he'd melt my brain!