A bar of a uniform cross-section is rigidly fixed at one end and loaded by an off-centre tensile point load F = 1.7 kN at the other end, see Fig. Q1a. The Figure Q1b presents the view of the beam from the free end where the point of application of the load Fis indicated as A. The allowable stress [0]=2 50 MPa The geometrical parameters are given as follow h=25 mm, b=45 mm Z A b Figure Q1a Figure Q1b h F Xx
Design Against Fluctuating Loads
Machine elements are subjected to varieties of loads, some components are subjected to static loads, while some machine components are subjected to fluctuating loads, whose load magnitude tends to fluctuate. The components of a machine, when rotating at a high speed, are subjected to a high degree of load, which fluctuates from a high value to a low value. For the machine elements under the action of static loads, static failure theories are applied to know the safe and hazardous working conditions and regions. However, most of the machine elements are subjected to variable or fluctuating stresses, due to the nature of load that fluctuates from high magnitude to low magnitude. Also, the nature of the loads is repetitive. For instance, shafts, bearings, cams and followers, and so on.
Design Against Fluctuating Load
Stress is defined as force per unit area. When there is localization of huge stresses in mechanical components, due to irregularities present in components and sudden changes in cross-section is known as stress concentration. For example, groves, keyways, screw threads, oil holes, splines etc. are irregularities.
How can I find:
- The bending moment relative to both the z and y axis Mz on the cross section as N.mm
- The second moment area relative to both the z and y axis as mm4
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