Thus you will see no change in the shear diagram at the point of application of a concentrated moment.ġ) Under the shear diagram, drop vertical lines at every point of interest including every time the shear diagram crosses the axis, and at concentrated moments.Ģ) Starting at the left end of the figure, do whatever the shears tell you to do. They influence it by changing the reactions, which in turn influences the shear diagram. That does not mean that they do not influence the shear diagram, because they do. If you see big loads, they should “turn into” big slopes on the shear diagram.Ħ) Since concentrated moments have no “up and down” forces, they do not cause any change in the magnitude of the shear diagram at their points of application. If you see small loads, they should “turn into” shear diagrams with “small” slopes. Thus if you see a zero magnitude load anywhere on a beam, you should see a zero magnitude slope on the shear diagram at this same point. If the load diagram is a parabola, the shear diagram will be a cubic.ĥ) You can tell if a triangular load diagram should “turn into” a “skinny” parabola or a “fat” parabola by using the calculus: The value at any point on any diagram “turns into” (integrates into) the slope of the next diagram. Thus if the load is a straight horizontal line, the shape of the shear diagram will be a straight sloping line. The shape of the load diagram always turns into the next shape shown in the “Areas and Centroids” table above. Distributed loads that point down drive the shear diagram down, and vise versa.Ĥ) The shape of the load diagram will determine the shape of the shear diagram directly below. (Replace DOWN with UP when appropriate.) Thus after you finish passing over the width of a distributed load, the value of the shear diagram will have changed by the magnitude of the distributed load, and in the direction that load is pointing. (Replace DOWN with UP when appropriate.) Thus after passing a concentrated load, the value of the shear diagram should instantaneously change by the magnitude of the load, and in the direction that the load is pointing.ģ) If you cross a distributed load going DOWN, the magnitude under that distributed load (it’s area) will drive the shear diagram DOWN by that amount, over the base dimension of the distributed load. If you cross a zero width load (a concentrated load) going DOWN, the area under that load (it’s magnitude) will drive the shear diagram DOWN by the magnitude of that load, over the zero width distance. To Construct A Shear Diagramġ) Under the first load diagram, drop vertical lines at every concentrated load, at every concentrated moment, and at both ends of every distributed load.Ģ) Starting at the left end of the figure, do whatever the loads tell you to do. It is used only to solve for the reactions. Then sum forces vertical to check the results.Ĥ) Erase the second load diagram with the distributed loads replaced. Then sum moments about the right reaction to determine the other reaction. the shape starts with a zero slope.) The areas are not listed for any other conditions.ģ) Sum moments about the left reaction to determine the right reaction. Thus the area for 3x 2 + 2x is not listed! Also, the zero ends of the parabolas, cubics, etc. Note that the areas shown are for the equations listed only. The magnitude of the loads can be computed from their areas and placed at their centroids, as listed in the table below. 1) Draw a free body of the beam showing any actual distributed loads.Ģ) Draw a second free body, replacing any distributed loads with their equivalent concentrated loads.
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