Problem 4.10. Shear resistance of a masonry wall

Shear resistance, V_R [kN]=

Follow steps of Example 4.2.

Step 1. Determine normal stress distribution from the given normal force, N. Calculate the average normal stress.

Check normal stressHide normal stress

Step 2. Determine the shear resistance of the cross section.

Check shear resistanceHide shear resistance

Follow steps of Example 4.2.

Assuming elastic material and linear normal stress distribution, the maximum normal stress arises from the given normal force, N is 

$$\begin{gathered} N=\frac{{\sigma }^{\max }{h}_{\mathrm{c}}b}{2} \to {\sigma }^{\max }=\frac{2N}{h_{\mathrm{c}}b}=\frac{2\times 250\times {10}^3}{3720\times 300}=0.896\frac{\mathrm{N}}{{\mathrm{mm}}^2} \\ \mathrm{where} \\ {h}_{\mathrm{c}}=3\left(\frac{h}{2}–e\right)=3\left(\frac{4.0}{2}–0.76\right)=3.72 \mathrm{m} \end{gathered}$$

Normal stress is below the compressive strength (f_c = 1.74 N/mm²), thus the assumption holds true, the material is elastic (see stress diagram in the Figure).

The average normal stress is

${\sigma }_{\mathrm{c}}=\frac{{\sigma }^{\max }}{2}=\frac{0.896}{2}=0.448 \frac{\mathrm{N}}{{\mathrm{mm}}^2}$

Shear resistance of the cross section results in

$$\begin{gathered} {\mathit{V}}_{\mathbf{R}}= h_{\mathrm{c}}b\left(f_{\mathrm{v}0}+0.4{\sigma }_{\mathrm{c}}\right)=h_{\mathrm{c}}b\left(f_{\mathrm{v}0}+0.4\frac{2N}{2h_{\mathrm{c}}b}\right)=h_{\mathrm{c}}b{f}_{\mathrm{v}0}+0.4N= \\ =3720\times 300\times 0.14+0.4\times 500\times {10}^3=356.2\times {10}^3 \mathrm{N}\mathbf{=}\mathbf{356}\mathbf{.}\mathbf{2}\mathbf{ }\mathbf{kN} \end{gathered}$$