Question 5.4: The cantilevered tube shown in Fig. 5–17 is to be made of 20...

Since the maximum bending moment is M = 120F, the normal stress, for an element on the top surface of the tube at the origin, is

σ_{x} =\frac {P}{A} +\frac {Mc}{I} =\frac {9}{A} +\frac {120(1.75)(d_{o}/2)}{I} =\frac {9}{A} +\frac {105d_{o}}{I}               (1)

where, if millimeters are used for the area properties, the stress is in gigapascals.The torsional stress at the same point is

τ_{zx} =\frac {Tr}{J} =\frac {72(d_{o}/2)}{J} =\frac {36d_{o}}{J}                    (2)

For accuracy, we choose the distortion-energy theory as the design basis. The von Mises stress, as in the previous example, is

σ′ =\left (σ^{2}_{x} + 3τ^{2}_{zx} \right)^{1/2}               (3)

On the basis of the given design factor, the goal for σ′ is

σ′ ≤\frac {S_{y}}{n_{d}} =\frac {0.276}{4} = 0.0690  GPa              (4)

where we have used gigapascals in this relation to agree with Eqs. (1) and (2).
Programming Eqs. (1) to (3) on a spreadsheet and entering metric sizes from Table A–8 reveals that a 42- × 5-mm tube is satisfactory. The von Mises stress is found to be σ′ = 0.06043 GPa for this size. Thus the realized factor of safety is

n =\frac {S_{y}}{σ′} =\frac {0.276}{0.06043} = 4.57

For the next size smaller, a 42- × 4-mm tube, σ′ = 0.07105 GPa giving a factor of safety of

n =\frac {S_{y}}{σ′} =\frac {0.276}{0.07105} = 43.88