Question 16.3: Rotating Blade Design Analysis A disk of uniform thickness i...

The material properties are (Table B.1)

\begin{array}{c} \rho=\frac{0.284}{386}=7.358 \times 10^{-4} lb \cdot s ^2 / in ^4, \quad \nu=0.3 \\ E=29 \times 10^6 psi , \quad S_{y s}=30 ksi \end{array}

We have

\rho \omega^2=7.358 \times 10^{-4}\left(\frac{12,000 \times 2 \pi}{60}\right)^2=1161.929

a. The tangential stress, expressed by Equation 16.31b with p = 0, has the form

\sigma_\theta=\frac{3+\nu}{8}\left(a^2+b^2-\frac{1+3 v}{3+v} r^2+\frac{a^2 b^2}{r^2}\right) \rho \omega^2

The stresses in the inner and outer edges of the blade are, from the preceding equation,

\left(\sigma_\theta\right)_{r=1}=\frac{3.3}{8}\left\lgroup 1^2+5^2-\frac{1.9 \times 1^2}{3.3}+\frac{1^2 \times 5^2}{1^2} \right\rgroup (1161.929)=24.17  ksi

\left(\sigma_\theta\right)_{r=5}=\frac{3.3}{8}\left\lgroup 1^2+5^2-\frac{1.9 \times 5^2}{3.3}+1^2 \right\rgroup (1161.929)=6.04  ksi

The maximum shear stress occurs at the inner surface (r = 1 in.), where \sigma _{r} = 0:

\tau_{\max }=\frac{\sigma_\theta}{2}=\frac{24.17}{2}=12.09  ksi

The factor of safety, based on the maximum shear stress theory, is then

n=\frac{S_{y s}}{\tau_{\max }}=\frac{30}{12.09}=2.48

Comment: Should there be starts and stops, the condition is one of fatigue failure, and a lower value of n would be obtained by the techniques of Section 7.11.

b. The largest radial stress in the disk, from Equation 16.33, is given by

\begin{aligned} \sigma_{r, \max } &=\frac{3+ \nu }{8}(b-a)^2 \rho \omega^2 \\ &=\frac{3.3}{8}(5-1)^2(1161.929)=7669  ksi \end{aligned}

The radial displacement of the disk is expressed by Equation 16.31c with p = 0. Hence,

u=(u)_p+\frac{(3+\nu)(1-\nu)}{8 E}\left\lgroup a^2+b^2-\frac{1+v}{3+\nu} r^2+\frac{1+\nu}{1-\nu} \frac{a^2 b^2}{r^2} \right\rgroup \rho \omega^2 r          (16.31c)

is the radial displacement at the outer periphery.