A solid circular member is to be subjected to an applied torque of 500 Nm. Find the required diameter of the member so as not to exceed the maximum stress \sigma _{z\theta } of 125 MPa.
Question 4.4: A solid circular member is to be subjected to an applied tor...
Given
\sigma _{z\theta } =125,MPa=1.25\times 10^{8}\frac{N}{m^{2}}, T=500Nm;let the maximum radius r=c. From Eq. (4.27),
\sigma _{z\theta }(r)=\frac{r}{c}\frac{Tc}{J}\rightarrow \sigma _{z\theta }(r)=\frac{Tr}{J}. (4.27)
\sigma _{z\theta }=\frac{Tr}{J} or \sigma _{z\theta }(r=c)=\frac{Tc}{J},
where
J=\int{r^{2}dA}=\iint{r^{2}rd\theta dr}=\int_{0}^{2\pi }{}\int_{0}^{c}{r^{3}drd\theta }=\frac{\pi }{2}c^{4}.Hence,
\sigma _{z\theta }(c)=\frac{Tc}{(\pi /2)c^{4}}=\frac{2T}{\pi c^{3}}\rightarrow c^{3}=\frac{2T}{\pi \sigma _{z\theta }}\rightarrow c=\left(\frac{2T}{\pi \sigma _{z\theta }} \right)^{1/3},or
c=\left(\frac{2(500Nm)}{\pi (1.25\times 10^{8}N/m^{2})} \right)^{1/3}=0.0137m=13.7mm,and thus the minimum allowable diameter is 2c=27.4 mm, which is just over 1 in.
Related Answered Questions
Because the shaft is fixed at both ends, the probl...
From Eqs. (4.37) and (4.40),
...
First, let us construct a free-body diagram of the...
The first structure (Fig. 4.6a) is homogenous and ...
\Theta (z)-\Theta (0)=\int_{0}^{z...