O estado plano de tensão que age sobre um ponto crítico na ...
Próximas questões
Com base no mesmo assunto
Ano: 2023
Banca:
CESGRANRIO
Órgão:
Transpetro
Prova:
CESGRANRIO - 2023 - Transpetro - Profissional Transpetro de Nível Superior - Junior: Ênfase 25: Engenharia Naval |
Q2329286
Engenharia Naval
O estado plano de tensão que age sobre um ponto crítico
na estrutura de uma viga é mostrado na Figura abaixo.
![Imagem associada para resolução da questão](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZcAAAEFCAIAAACgqj0SAAAAAXNSR0IArs4c6QAAIABJREFUeAHtnYd7E1fWxvc/wWBTbIobrrKNG66ygUD4NoVkIaSHZhtYTHFR75JJ77ubTULoAduyKQGCs9kkpG35QrLByZcEDBib4gaWNd9K17oMckE2OiPZev3MI67u3Dln9N5zf5x7ZzT6nYA/KAAFoMBEVuB3E/nkce5QAApAAQEUQxBAASgwsRUAxSZ2/+HsoQAUAMUQA1AACkxsBUCxid1/OHsoAAVAMcQAFIACE1sBUGxi9x/OHgpAAVAMMQAFoMDEVgAUm9j9h7OHAlAAFEMMQAEoMLEVAMUmdv/h7KEAFADFEANQAApMbAVAsYndfzh7KAAFQDE/xMDPP//81BNPvPH6GwMDA2Jz3d3dFRvK9Tq9V724DcpQAArcowKg2D0K6Dq8v9+xedPmOZFRX375FTc3MDCg1xvmRs0+8+WXvBIFKAAF/K4AKOYfSS9fbpelpC5fdn9XVzez+NVXX8+eFbmzbicSMf9IDCtQYAQFQLERhBl79eHD9bOmz3jllVcEQeju7r5v8ZKlS+7r6e0duyUcAQWgwBgUAMXGINboTR2OgYryinmz55w71/rSiy/FzJ3373/9e/RDsBcKQIF7VwAUu3cNb1s4f/7CgrSMB3//YFx0zGuvvn57B0pQAAqQKQCK+VnahobG8ClhDz/4cC/mkn6WFuagwPAKgGLD6zLu2t7e3vApYa+/9tq4LeBAKAAFxqQAKDYmue7eGBS7u0ZoAQX8qgAo5lc5BQEU87OgMAcF7qYAKHY3hca4HxQbo2BoDgXuVQFQ7F4V9Dq+r69vcUnpgf37verxFgpAASIFQDEiYWEWCkABiRQAxSQSGm6gABQgUgAUIxIWZqEAFJBIAVBMIqHhBgpAASIFQDEiYWEWCkABiRQAxSQSGm6gABQgUgAUIxIWZqEAFJBIAVCMVuiBgYH2K1d6enpo3cA6FAhhBUAx2s6/evXa448/eehwPa0bWIcCIawAKEbb+Rfa2uJjYm22Olo3sA4FQlgBUIy2889fuBAfE2u1gmK0OsN6KCsAitH2/oUL7lwMFKOVGdZDWgFQjLb7Bylm20nrBtahQAgrAIrRdj4oRqsvrEMBQQDFaKPAs7qPXIxWZ1gPZQVAMdre9+RiWN2n1RnWQ1kBUIy290ExWn1hHQpgRkkdA5hRUisM+1AAuRhtDHgohhklrc6wHsoKgGK0vQ+K0eoL61AAM0rqGGhruzg/Js6G+8WohYb9EFYAuRht5zOK1YFitDLDekgrAIrRdv+Ftovub4PjfjFanWE9lBUAxWh7n1EMuRityrAe2gqAYrT9jxklrb6wDgWwuk8dA8jFqBWGfSiAXIw2BpCL0eoL61AAuRh1DGB1n1ph2IcCyMVoYwAUo9UX1qEAcjHqGADFqBWGfSiAXIw2BkAxWn1hHQogF6OOAazuUysM+1AAuRhtDIBitPrCOhRALkYdA5hRUisM+1AAuRhtDDCK4RtItCrDemgrAIrR9j8oRqsvrEMBzCipYwAzSmqFYR8KIBejjQGs7tPqC+tQALkYdQyAYtQKwz4UQC5GGwOgGK2+sA4FkItRxwAoRq0w7EMB5GK0MYBrlLT6wjoUQC5GHQOgGLXCsA8FkIvRxgAoRqsvrEMB5GLUMYB1MWqFYR8KIBejjQFGMfyqLq3KsB7aCoBitP0PitHqC+tQADNK6hjAN5CoFYZ9KIBcjDYGsLpPqy+sQwHkYtQxAIpRKwz7UAC5GG0M4Bolrb6wDgWQi1HHAChGrTDsQwHkYrQxgBklrb6wDgWQi1HHAChGrTDsQwHkYrQxgPvFaPWFdSiAXIw6Bi60tcXHxOLefWqdYT+UFUAuRtv7HorV0bqBdSgQwgqAYrSd75lRgmK0OsN6KCsAitH2Plvdt9lAMVqdYT2UFQDFaHvfQ7GdtG5gHQqEsAKgGG3ng2K0+sI6FMA1SuoYuHAB1yipNYb9UFcAuRhtBHiuUWJGSaszrIeyAqAYbe8jF6PVF9ahAGaU1DHgycVwjZJaadgPXQWQi9H2PcvFrFZQjFZnWA9lBUAx2t6/dOlyWors5ZdfpXUD61AghBUAxWg7/9atW6dbPvm/X36ldQPrUCCEFQDFQrjz8dGhwKRQABSbFN2IDwEFQlgBUCyEOx8fHQpMCgVAsUnRjfgQUCCEFQDFQrjz8dGhwKRQABSbFN2IDwEFQlgBUCyEOx8fHQpMCgVAsUnRjfgQUCCEFQDFQrjz8dGhwKRQABSj7UbHwMD3//nRbm8+fLihvr6xvsHe0GBvaGxqbGxqtLs2u73Z3tTc1HRkcGs+6io0Hw3m7ciRY8F8erfFdKtqb3IpbLc3M8EbG5saGpsaGuz1Dfb6+sbDhxsa7U3/+933DscAbSjAOpkCoBiZtG7D165fX7J4SfiUMGzBrEBhQdHVq9doQwHWyRQAxcikdRu+cqUjaX5CSlLK+g0VTz+z5pln1z63Zt2aNevXrStbt758/fry9RsqNpRtLCvfWMZeyzeV861iU3mF6G35pjL3Vs5eKwbflpVvKq/Y7Hr1FHgzVlPubllesZkVeEtmXPx28EBuzW3Tbd99Ji4LmzdsqHj8iafXrS9jBl2vbr+i03Y1G9x724LL++027BB2YqLD2cm4PXosuE9bfODgXo8at0/PIw5rzEy5tCrbuGFDxfoNLrXXrS9ft65szdoNzz237tln1z79zJp168sWZCyIjY69fLmdNhRgnUwBUIxMWrdhRrGsBZkqjX5HtaKqRlmjUNcqNQqVVqnWqTR6tdag0RnZptWbvDadwcxqeIE3GFqj1ZuGVuoM5qGV3AgviJvdtb1GZ/Q6K/EhzJS4hnsZvcAP4QWv9iPVezUTv2XCqrUGlUav0uiVap1Cpa1VaqprVVU1yu1VtUq1rjC/MDY6BhSjHQmU1kExSnUF4UpHR3JCUmZGZq1Ss3V79faq2h3ViupalRfLGM7UWoMYapxuKIxVAaYke+X8Uqp1tUpNjUJdXavaUa3YXlW7dXt1jUKdn1cQHxsHitGOBErroBiluoLQ0dGZkpicmZGpVOu2V9XyXEyp1inVOs4slj7wLIYV9EYLtrEq4KUhE1ajMzKiDZuLFeQXzo+LB8VoRwKldVCMUl03xVKTkrMWZKm1BpaF1So1fC7J5oA6g5mNVYPJis2/CjBhGdq0ehObWrKkjGVkKo2+EBSjHQTk1kExWok7OjpTk1OyM7M0OmN1rYohjKVgbGixQWs027DRKWAwWRnOtHoTy8s4yNRaQ1FhcUL8fORitCOB0jooRqmuOxeTpaRmZ2Vr9aYahVqh0qo0erY6rjdaDCYr3dCFZbEC7H8LvdGiM5g1OqNKo1eotDUKtUZnBMVoxwC9dVCMVuOOjk5ZcmpOVo7OYOaJGJtIAmFiykhTZkkZm1qydEyrNxUXFifOT0AuRjsSKK2DYpTqunOxtBRZbk6u3mjhiZjOYAbCpMHWUC8Gk5WlY2qtQaHS6gzm4iI5KEY7DIitg2K0And0dKalyhbmLNQbLeyipFZvwlxyKFwkq/FKx/RGi7xInpiQiFyMdiRQWgfFKNV152LpqWkLcxYaTFalWqfRGZGISQaskRzxdEyp1jGKJYFitOOA1jooRqtvR0dneqpsYW6e0Wxj6/qg2EhwkayeU0yl0RtMVnmRHBSjHQbE1kExWoG9KIbppGSoGt2R3mjR6k2DFCsuAcVohwGldafTCYpRCuyZUebl5pksdSqNnlFs9AGGvRIoAIrRxr2E1kExcrHduVha3kIXxdRaAygmAaF8ccEoptYajGabvLgkOTEJq/vkg4HGAShGo6vIqhfF2JeNfBlmaEOqgMFkZXeNGc22ElBMFLETrgiKkXcZKEYKo3EbZwv8LBcbpFg7ni9GPhwoHIBiFKreYdNDsXw2o0QuNm7u+PfAYSiGpyTeEbkT5g0oRt5VHR2dGbJ0vi4GivkXRuO2BoqRh75UDkAxcqVduZjs9uo+bhYbN3f8eyAoRh76UjkAxciVHjqjxDco/cuj8VkDxchDXyoHoBi50qDY+ChDfRQoRh76UjkAxciVxoySmkfjsw+KkYe+VA5AMXKlkYuNjzLUR4Fi5KEvlQNQjFxpD8UG793H6j41nny0D4qRh75UDkAxcqVBMR+xInEzUIw89KVyAIqRKw2KSYwnH92BYuShL5UDUIxcaVDMR6xI3AwUIw99qRyAYuRKeyh2+xtIuF9MYmAN624YiuF7lOSjgcQBKEYiq9ioi2K4dz/4fm1zGIrhe5TiwJ04ZVCMvK+Gfo8SudiwyZHElWKK4fli5MOA0gEoRqmu2zYoJjGefHQnphieL0Y+DCgdgGKU6noolp6Kb4PbfISLZM3EFEMuRj4MKB2AYpTqcophXSy418VAMfJhQOkAFKNUl1PMnYsZzTa11oB79yXLtkZ3JM7FMKMkHwaUDkAxSnU5xdy5GCg2OlYk3jsMxXCnBfloIHEAipHIKjaK1X2J8eSju2EohjstxIE7ccqgGHlfee56xbfBg2uBHxQjD32pHIBi5Ep7cjHcux+8FMPqPvkwoHQAilGq67aNXMzHKZ7EzcS5GChGPgwoHYBilOp6KOb1G0i4d19iYA3rTkwxXKMkHwaUDkAxSnU9FMNdr8NyJLCVoBh56EvlABQjV9ozo8S6WPCuiwU8Fzt79nuz0eQViydPnqquqtq8cePu3Xu6urr43v7+fru9aeuWLVu3VB46dPjmzZt8l7hgtVg3lVfUH64XVwqC0Nrauqm8oqaq+tq1a4IgNDc3byqvEG82q+2rr74eGBjwOjBo34Ji5F3joRiuUYJiwwfbxYuX5IVFeTm5fLfT6XzrzbdnRUxPTkhMT5XNDI94bNVjPT29giAMDAyolOoZ4RFpySmypOQZ4RFb/rjF4XDwY3mhpLhk+tRpSxYt7u/v55WCIFgt1ulTpyXEzb948ZLrrdU2feq0jFRZVnoG2+KiY6JmzHr33ffERwVzGRQj7x1QLLAzx5G8B8OMcmBg4MyZLwvzCyLCpoop1t7ePj8uvmxDWWfn1b6+m396+8+R02ecOHFSEISz352dGzlbo9b09PR0dXUZDaaZEdN/+OE/Q+O4pLhk6ZL7pk8LP9fayvf29fUtkpcuWbxETLGE2PhLly7zNr/++pu8qDgtJZUlawydN91/XkDkhwS2AIqR6w+KjcSRwNYHA8Xs9uaombM2lm/cvn2HmGInTpwMnxLW+tPPLDoHBgaKCgp3bN8hCMJf/vJOfHTsZc8Nul1d3YnzE1579bWhcVxSXLJtS2Vuds5LL77E9/7zn/+Ki46xWupGoZggCO+8827UzFnffXdWEAS7vWn5suUzwiPCp4TlZufsen+X0+nkBoOhAIqR94KHYlgXw4zSO9i++ebbzz773OFw6PUGMcXeeP2N6LnzxInPujXrHvifBwRBqKmqLswv4Bzp7++/f+n9myo2eZsWhJLiEkV1jVqlXnrfUr52ZrPaVj668p2//HV0ir344stzo2afO9f6xedfzJkVuaR00fM7d9bZbMWFxTOmhbf+9NNQdwGsAcXIxfdQDOtioNiIweZFMZPBmJ2ZLV5fr95RJS8qFgRhw9p1Kx5awQ05nc7Vq1Y99eRTvIYXSopLlDW1n39xZk5k1Pff/yAIQn9/v7xIvmvXB14Ui4+O/fHHc9fcf50dnfX1DckJSUsWLbl582b94frly+6/cOECM/tT60/Tp047cvQo9xIMBVCMvBdcFMOTefBknlEDzYtiRoMxNztXTDFFTQ2j2Pq16x5d8Sg35nQ6n1y9ehSK9ff3L0jPePmlVwRB+Oc//5WcmPTrr796USx8SpjXlpGW/s2333IvVzo6vv32Hx8eOFhTXTtjWnhDYyPfFQwFUIy8F5CLBXb9ayTv4nWxgN+770Wxl158KTkxWXzlsaKsfPn9y/+bT23dUrl0yVIetQ6H48H/eaC8rJzX8ALLxQRBUClVSxYtdjgcdba6lX9Y6XQ6vSg2NzLqhedf+PPbb7u3P506dbqnp4dNWtvbr6xft372zFkzwyOiZs5akJY+feo0UIyLHCoF5GIjcSSw9WKKBfx+MS+K2e3NEVOn8SV8p9P5++W/X/vcWkEQXn/9jZTEpBs3Bm8f6+3ty1qQpdfphw4nTrG///2z2LnRZ89+X1xQtOv9Xa7F+7utizFrTqdTrdbERce+/dafvvzyy59/+rn1XOusiOmg2FC1J3kNcrHA0mok78FMsV9++WVu1OxXX32NTSq//vqbObMi33vvfUEQPv/8izmRUQcPfsiGzZEjRyPCpp4+3TJ0FHGKdff05GRl79hRPW/2nPPnz4+JYsuXLX9s1WPsNPr7+y0Wa/iUsIMHDw51F8AazCjJxQfFRuJIYOvFFAu2GaXD4ago3xgRNvWRhx5e++ya6NlzcrOy290Pcbx58+ZDDzwUETb1qSeefPLxJ6JmzFp239K+vr6hccwpJgiCokYxY1r4qpWr2CzV91zMbLZMnxb+0AMP/nHjpoK8grmRUZEzZr75xhtD3QWwBhQjF9/1ZJ609LyFuNMieK9RBpxir7zy6oqHHhbH4vXr140GU2F+fmZaenlZ+Y8//sj3trVdVNQqcrOyczKztm/b3tZ2ke8SF1avWr3TVsdqvvjizAJZ2t69e9nb/fsOLJKXshnrm2++tai4pL39ivhYXr5x44bBYMzLyc3JzKrcUvnVV18//eRTGrWWNwiGAihG3gtsXSw/r8BkqcNz9wObf4m9i3OxgK+LkUfhpHYAipF3LygmZkfwlDnFTJY6UIx8GFA6AMUo1XXbFlNMozPiN5CCBGSgGHnoS+UAFCNXmj2xms0oQbEgQZjRbGMU0+iMyMXIxwCxA1CMWGBB4BQzW3eCYkFKMXlpcmISvz+LPCbgwK8KgGJ+lXM4Y6BY8JBLfCYGk1VvtAzmYqDYcKE7UepAMfKeYnda5OcVIBcTQyTgZVCMPPSlcgCKkSvd0dG5ID2jIP82xQI+gHECTAHkYuTRL4kDUIxcZncu5qKYxfY8WxcDRIJEATHFUhKTsS5GPhhoHIBiNLqKrHooVmixPa/Vm/RGS5CMYZwGKCaK0wlcBMXIO49RrDAfFAuubyAZzTa90aLVm8zWnaXyUuRi5COBzEHQUezGjRtff/OP8xfa+DN5yT67RIYHKVYAigUxxUoWpSQlX3Z/3VqisCB209d38+z3//nhhx/Fj1ok9hkw88FCMafT2dXVdfLU6fXrNsTMjbbZdoofERcwefzh2L26v6CwoNBa9wJmlEE1jb2dizGKeX6Swx/dHmAbv52/8PvlDyxIz3j99TfPnWudNKNpWFkDTzEXv7q7T7d8srFi09yo2ezJuRaLbWAguH5nZVj5fKns7LyanZldWFAEigUVwtjt+1q9yWJ7vrRkkSxFdqWjw5cOnRBtrly5Ii+Sh08Jiwibmp+X/9bbfzp3rnXSzG+8uiCQFHM6nZfbrzTamzasL5s9K1L85O8VD6/Yu2//vv0H2LZ33/69e/fvcW379uzZt3vPXrZ9sHvv7t17P/Bsu91vh30dtg0/XHwIb8kK4l1evtjhu3fv3bNn3/4DBw8c/PDgh4cOHao/XN9QX9/Y0GBvbGyy25t3794bOy+G3S+GXCyoQGYwWRnFFpcu/u+Ts3bt2m23Nzc2NjU02OvrGw/XNx46VP/hh4cPHDy0/8DBffsP7N6zzys8hg0hcZzwKOLRwiOK7+I1rqjePRjbPMjvLLiCf88e1yhwD4f9bGi4Xj3jZf/+g/v3H3zttTcS4xPEYyo3O+fll1799h//6u0d5mFkXlyYWG8DSbH//sreZ5+fSU1OEWvNyjOmhcfHxMbOi/Fs0bHzXFvMvOiYuXybFzM3SLbouOiYuOjYuOjY+JjY+Ni4+bHxCXHzE+MTUpKSZSmp4WFTC/IL2ZjBNcrgARmn2LJly8OnhKWmpKYmpyTOT0iImz8/Nj4+Ni4+xtWn7s0Viu7YC2zI8eB3F9yDgg0N96t7vLhDkU9rxIMrImxq5dbtVzo6Jxak7nq2gaSY0+ns7Oy0WOtysrKnTwsXy/2HR1eeOPlx85FjfGtqPubamo7a+WY/YhdtjfYjXpt9SI24wSh7vXZxL+zwYfY2HT1y9PjRYx8dO37i+EcnPzpx6sTJj0993HK65W+ffvrZRydOxc2LKS6SY0YZPPxiZ8Iptqh08ZzIqGPHTnz6989Ot/zt1MctJ06ePnHi4+MfnTx2/MTRYx8dOXq8+cgxV+yNHFSj7BIHnleZRVejO5LFASaOOmaZ19weAk1Hm5qOsqHBR8qRI8ePHT/57nsfeOVi86LmPLLi0b99+pn4Zy7vCogJ0SCQFBMEwel03rx5q63t0gsvvJyTlRMRNpWxTK83OhyOgQn153T/De31jo7OzAys7gfdBUq+LjZ4p8XI1yidTueEikTXyba1XSzML2Sjad7sOX94dGVLy9+6u3sm5TJ/gCnGxrzT6XQ4HJcuXX7xxZcX5uTOiphhq3t+0lwh9lyjLMJdr8GWi92+Rikvdd1pMVmuUf73RyovtF1csvi+ebPnrFr52Kefftbb2ztZl/ZZMvS7oelDoGr6+/t//e38O3997/PPz0wmimWkZRQWgGJBl47dptjkutPC6XRevXrtwMFDR44e7+7umTRDaSQuBUUuJj45lpc5HI5J81/HYC6Ge/eD7+fB76BY4qS665WNo0nPL4aOoKOYmGiTo+x5pgXu3Q/GXEyjM+IbSBN9oIFi5D3o/gZSOp5pEWyLYux7lKAY+QCgdwCKkWvMKcafkhiE4zkETwlPSSQPfakcgGLkSg+lmMFkDUFqBNtHBsXIQ18qB6AYudKMYnhiNShGHmqh6gAUI+95UCzY+MXO545fcsOvh5CPA0IHoBihuMy0i2KydORiwcYyUIw89KVyAIqRK43fBg82folzMbXWgF/VJR8DxA5AMWKB3b+qmy5LY78NrtYadAYzVveDgWssFwPFyAcAvQNQjFxjlovlLcw3WepAsWDgl1cuZjTbSopL8Nvg5COBzAEoRiatxzAoFjzkEp8Jz8VAMU+oTtR/QTHynnNRLDUtb2EecjExRAJeBsXIQ18qB6AYudLsGiVmlAHHltcJgGLkoS+VA1CMXGnkYl74CJK3oBh56EvlABQjV9pDMazuB9czLUAx8tCXygEoRq60h2JYFwPFyIMtNB2AYuT9DooFyRTS6zSQi5GHvlQOQDFypT0Uw4wSuRh5sIWmA1CMvN89FMszmm2469UrIQrgW+Ri5KEvlQNQjFxpUCyAqBrFNShGHvpSOQDFyJXmFMNdr6MwRfpdoBh56EvlABQjV9pDMayLYV2MPNhC0wEoRt7vnnv3cacFKEYebKHpABQj73fkYtLPFn3xiBkleehL5QAUI1faRTEZvg0eXImY0WwDxchDXyoHoBi50p5cDDPK4AIZKEYe+lI5AMXIlQbFfJnfSd8GFCMPfakcgGLkSoNi0hPKF4+gGHnoS+UAFCNXGutivjBF+jagGHnoS+UAFCNXGrmY9ITyxSMoRh76UjkAxciVRi7mC1OkbwOKkYe+VA5AMXKlQTHpCeWLR1CMPPSlcgCKkSuNGaUvTJG+zTAUa28njwY4IFAAFCMQ9U6TyMWkJ5QvHoeh2GVQ7M7YnSDvQDHyjsL3KH1hivRtQDHy0JfKAShGrjQoJj2hfPEIipGHvlQOQDFypT0zSjyZB99AIg+20HQAipH3u2d1HxQDxciDLTQdgGLk/e6hGL4NDoqRB1toOgDFyPsdFPNllUr6NlgXIw99qRyAYuRKg2LSE8oXj6AYeehL5QAUI1faRTE8JdEcXNNJPCWRPO4ldACKkYsNivmSGUnfBrkYeehL5QAUI1caM0rpCeWLR1CMPPSlcgCKkSsNivnCFOnbgGLkoS+VA1CMXGlOMaPZptYadAaz3miRftDCo5cCYorJi0uSE5Mu43uU5KOBxAEoRiKr2CinGP9tcFDMCygBeSumWAkoJg7ZiVYGxch7DBQLCKTu6hQUIw99qRyAYuRKg2J3BUpAGuiNFq3epNYajGYbZpTkw4DYwe+I7Ye6eS+KafUmzCgDgi0vp4xiKo0eFJsEQxQUo+1EN8VkC3Nd36NUafSMYgaT1WtQ4a3ECnCKGUxWeXFJUkIiVvdpRwKldVCMUl1B4BQzmm2gmMSoGsWdzmDW6Iw8FwPFaIcBsXVQjFZgMcWUap1GZ9QZzMjFRuGLBLvY0r5GZ1SqdXqjRV4kB8VohwGxdVCMVuCOjs60VNnCnIUGk1Wp1qm1BiyNScCp0V3ojRaWi4FitNEvlXVQjFZpRrHc7Fy90cIohnRsdMRQ7zWYrPwCJaNYcZE8EetitOOA1jooRquvi2IpMkYxhUqr0uhxBz81p0axzxDGF8UUKq3OYHZRbH4CVvdpRwKldVCMUl336n5aSmpOVo7OYK5VapRqHVvjx+rYKKyh28XnkmqtQanW1SjUWr0JFKMdA/TWQTFajTs6OlOTU7Izs7V6U3WtSqHS8tUx9p1KrPTTMUtsmWdh7GZXpVqnUGmra1UanbGooCghfj5yMdqRQGkdFKNU152LpSalZC3I0uiMVTXKGoWazyvZApneaNEbLQaTlW3igYfyPSrAVWUis4kky8IUKm2NQl1Vo1Rp9KAY7Rigtw6K0Wrc0dGZkpictSBLpdHvqFZU16oYyNjUUqMzanRGrd6kM5hZasbGG179qIDOYNbqTVq9id0gxrKwGoW6ula1o1qhVOsK8wvnx8UjF7vHkXDs6LEnVz/e0vKJ2E53T8+2yq0vPP+Cw+EQ1/u3DIr5V09va26KJWVmZCpU2m07asQg40mZWmvgOGPjjXON0Q2vY1KAa8jIpdEZ1VqDWmtQafQKlZZnYTuqFdt21ChU2gJQzDtsx/O+q6tr2X1L02VpbW0X2fGOgQGQFDqyAAAEnElEQVStRhczZ97Zs9+Px6LPx4BiPks1roZXrnQkJyRmZmTWKjWV26oYyKpqlCwpq1Vq2EoZS81UGj3b2KjD670owMVUqnUs/2L8qq5VVdUoGcIqt1XVKNQFeQXxMXHIxcYV4Hcc9N13Z+dGzV7z3Npbt24JgtDcfGRuZNSuXbucTucd7fz9BhTzt6J32mu/0pEYn5CTlWMwWdk1SpZ5sXtf+YoYWwAyWerYZrbuNFnq2CuvMVt3so3t4nvFBd6At/Hay61x++JD+AmIC8M2EJvlpsRHiSuZBf7Kz8HLiPhw3ljcxqvsdWJ8r9iOyVLHfiuErZGxO8VYdqbS6GuVGr3RUlwkj42OAcXujNzxvHM6nW+++dasiOm73v/gl19+SZqf8Nwzz/b394/H1liOAcXGotbY27pzsaSombMyZOmy5NS0FFlaqiw9NS1dlp4uS8+QpWekZfBtQXoGNr8rwOXNSHNp7tpS09JSZWkpMllyarosfU5klO8Uczgchw43bN+2Y8uWyqFb5Zatg1vl1kqftm13a3bXBvfmyH3CQz/Ili2VlZXb3n33/Z7e3jFF/a1b/Y+vfjxuXsyy+5bm5y5sb28f0+HjawyKjU83X4/q7u7ZsaNaXiwvLCgsLiwuLiqWF8lLikv4ViovdW0lrtdFJYtKS1yvrq3U/crKw70uLl082LJk0eLSxeytuNJHO6zZ4IHMaekQ76UuF65TGvmshnEtPu2RD+Sf4nZh5MYjeRlUwHOGXEaXsG5tB3WWl5YUl8iL5fIiuas7CosLCwrlRfLy8o1dXV2+dGp/f7/BYF6QniFLTuFbWkqq95bq+u9qHFv6qEcNu5dX8oKX33TXf5yuzave9VZ05rKUVNfm+VzpqbLNmyuvX7/hiyziNq2tP8XHxEZMnXbq1MfieroyKEanrcuy0+ns67vZ1dV9o4v/dfOSqMAreaGrq4uVu0UFVsnruQHWhrdk9V6mxHv5LnGBl73MDrXGz423HFON+EzEBw49AS/Xw35M3kZ8uLiluJ4LyCoHX/v6+nxcu3F3aN+169evXbt+7fYfezvy62D7654D72zJ97psitp41Yv3Xr/d7Lqo7G1fvIsdfpfX2x/p2rVrvb29PsoiHkUtLZ/MnhUZPiXMZqsbx+FiUz6WQTEfhUIzKAAF7q7Ab7+dz0hLf+ThFZV/rJw9M7LldMvdj7nnFqDYPUsIA1AACrgVuHXr1urHVqckJre2/tTZ2ZmfuzB/YZ4El01AMQQgFIACflDA6XS+9ebbM6aFHzp0mJlraflkTmTUHzdvcTgG/OBgZBOg2MjaYA8UgAI+K/DFmTNzIqOqq6rFt+mbjKbwKWGNjXafzYynISg2HtVwDBSAAmIFenp6yjeUPfLwCq9Lvd3d3c8+/czqlauuXr0qbu/fMijmXz1hDQpAAakVAMWkVhz+oAAU8K8CoJh/9YQ1KAAFpFYAFJNacfiDAlDAvwqAYv7VE9agABSQWgFQTGrF4Q8KQAH/KgCK+VdPWIMCUEBqBUAxqRWHPygABfyrACjmXz1hDQpAAakVAMWkVhz+oAAU8K8C/w/OY6SU65uMQAAAAABJRU5ErkJggg==)
Qual o valor da menor tensão de escoamento, em MPa, para um aço a ser selecionado para fabricar a viga, levando-se em consideração um fator de segurança de 3,5 e a teoria da energia de distorção máxima (Von Mises)?
Qual o valor da menor tensão de escoamento, em MPa, para um aço a ser selecionado para fabricar a viga, levando-se em consideração um fator de segurança de 3,5 e a teoria da energia de distorção máxima (Von Mises)?