the Centroid (e.g. calculate the coordinates xC and yC) with respect to the origin of the coordinate system shown in Figure 1a.
For the compound cross-section shown in Figure 1a, determine the position of the Centroid (e.g. calculate the coordinates xC and yC) with respect to the origin of the coordinate system shown in Figure 1a.
For the compound cross-section shown in Figure 1b, calculate the Second Moment of Area of this cross-section about its vertical axis Y-Y passing through the Centroid (xC, yC) determined in Q1 above.
Calculate the reactions at supports for the simply supported beam subjected to the system of point forces shown in Figure 2.
For the simply supported beam shown in Figure 3, calculate the reactions at supports.
For the simply supported beam shown in Figure 3, calculate the Axial Force (N) in the beam at the sections A, C, D, E, and B shown in this figure.
Plot the Axial Force (N) diagram by using the results obtained at Q5 above.
For the simply supported beam shown in Figure 3, calculate the Shear Force (V) in the beam at the sections A, C, D, E, and B shown in this figure.
Plot the Shear Force (V) diagram by using the results obtained at Q7 above.
For the simply supported beam shown in Figure 3, calculate the Bending Moment (M) in the beam at the sections A, C, D, E, and B shown in this figure.
Plot the Bending Moment (M) diagram by using the results obtained at Q9 above.