Diferencia entre revisiones de «Cálculo de materiales»
Línea 36: | Línea 36: | ||
\begin{align} | \begin{align} | ||
A_{saco} & = \left(L_v - \dfrac{\pi h}{3} \right) \times h + 2 \left(\pi \left( | A_{saco} & = \left(L_v - \dfrac{\pi h}{3} \right) \times h + 2 \left(\pi \left(h^2 \times \dfrac{2\alpha}{360} - \dfrac{1}{2} \times h \sqrt{h^2 - \left(\dfrac{h}{2} \right)^2} \right) \\ | ||
& = L_v h - \dfrac{\pi h^2}{3} + 2 \left(\dfrac{\pi h^2}{4} \times \dfrac{1}{6} - \dfrac{1}{2} \times \dfrac{h^2}{2} \sqrt{3} \right) \\ | & = L_v h - \dfrac{\pi h^2}{3} + 2 \left(\dfrac{\pi h^2}{4} \times \dfrac{1}{6} - \dfrac{1}{2} \times \dfrac{h^2}{2} \sqrt{3} \right) \\ | ||
& = L_v h - \dfrac{h^2}{3} + \dfrac{\pi h^2}{12} - \dfrac{h^2}{2}\sqrt{3} \\ | & = L_v h - \dfrac{h^2}{3} + \dfrac{\pi h^2}{12} - \dfrac{h^2}{2}\sqrt{3} \\ |