Question 14.6: Locate the shear centre S of the following thin-walled secti...
Locate the shear centre S of the following thin-walled section shown in Figure 14.33(a) having uniform thickness.
Noting the symmetry of the given thin-walled section, we can write
\bar{I}_{ zz }=2\left(\bar{I}_{ AB }\right)_{z z}+\left(\bar{I}_{ BD }\right)_{z z}
Putting values, we get
\bar{I}_{z z}=2\left[\frac{1}{12}\left\lgroup \frac{t}{0.6} \right\rgroup (75)^3+\left\lgroup \frac{t}{0.6} \right\rgroup (75)(100)^2\right]+\frac{1}{12} t(125)^3 mm ^4
or \bar{I}_{z z}=2779947.917 t mm ^4 (1)
Let us now find the shear stress in leg BD and the shear load F_2 carried by it from Figure 14.34:
Clearly,
\left|\left(\tau_{x y}\right)_{ BD }\right|=\left|\frac{V_y Q_z}{t \bar{I}_{z z}}\right|
where Q_z is the first moment of shaded area about z-axis as shown in Figure 14.34(a). So,
Q_z=\left\lgroup\frac{t}{0.6} \right\rgroup (75)(100)+(s t)(62.5-0.5 s)
= (12500 + 62.5s − 0.5s²)t
Therefore,
\left|\left(\tau_{x y}\right)_{ BD }\right|=\frac{V_y}{\bar{I}_{z z}}\left|\left(12500+62.5 s-0.5 s^2\right)\right| ; \quad 0 \leq s \leq 125 m
By noting symmetry of the section, we conclude that force distribution in the section will be as shown in Figure 14.34(b).
F_2=\int_0^{125}\left(\tau_{x y}\right)_{ BD } t d s=\left\lgroup \frac{V_y t}{\bar{I}_{z z}} \right\rgroup\left[(12500)(125)+(31.25)(125)^2-\left\lgroup \frac{0.5}{3} \right\rgroup (125)^3\right]
F_2=1725260.417\left\lgroup \frac{V_y t}{\bar{I}_{z z}} \right\rgroup
Now, we calculate the distance of point of intersection of lines of action of F_1 in legs AB and DE on z-axis from the leg BD as (137.5 cot θ − 100) mm = 83.33 mm.
Taking moment with respect to 0 and applying Varignon’s theorem, we get
(83.33-e) V_y=83.33 F_2
From Eq. (1),
83.33-e=(83.33)(1725260.417) \frac{t}{2779947.917 t}
or e = 31.615 mm
