σ x max = M z z A = 27 , 0103 e 3 0 , 2 ⋅ 0 , 06 {\displaystyle \sigma _{x_{\text{max}}}={\dfrac {M_{z}}{zA}}={\dfrac {27,0103e3}{0,2\cdot 0,06}}}
σ x max = 70 , 395 × 10 6 , σ y max = 190 , 208 × 10 6 , τ x y max = 63 , 9677 × 10 6 {\displaystyle \sigma _{x_{\text{max}}}=70,395\times 10^{6},\sigma _{y_{\text{max}}}=190,208\times 10^{6},\tau _{xy_{\text{max}}}=63,9677\times 10^{6}}
σ 1 = σ x + σ y 2 + 1 2 ( σ x − σ y ) 2 + 4 τ x y 2 {\displaystyle \sigma _{1}={\dfrac {\sigma _{x}+\sigma _{y}}{2}}+{\dfrac {1}{2}}{\sqrt {(\sigma _{x}-\sigma _{y})^{2}+4\tau _{xy}^{2}}}}
σ 2 = σ x + σ y 2 − 1 2 ( σ x − σ y ) 2 + 4 τ x y 2 {\displaystyle \sigma _{2}={\dfrac {\sigma _{x}+\sigma _{y}}{2}}-{\dfrac {1}{2}}{\sqrt {(\sigma _{x}-\sigma _{y})^{2}+4\tau _{xy}^{2}}}}
σ c > σ eq = σ 1 2 + σ 2 2 − 2 σ 1 σ 2 {\displaystyle \sigma _{c}>\sigma _{\text{eq}}={\sqrt {\sigma _{1}^{2}+\sigma _{2}^{2}-2\sigma _{1}\sigma _{2}}}}
σ eq = 175 , 278 × 10 6 Pa {\displaystyle \sigma _{\text{eq}}=175,278\times 10^{6}\,{\text{Pa}}}
