supposing that the weight is a point weight that act on the table at a given point and since the table is static (balanced) then you can find the sum of the moments about each point of intersection between the legs and the ground and equating it with zero to find the reaction at each leg.for example if the legs of the table intersect the ground at the points [(1,0,1)(-1,0,1);(-1,0,-1);(1,0,-1)] ,the weight of the table=100N acting in its middle and the added weight is 100N acting at the point (1,1,1).the reactions are R1,R2,R3,R4 for the legs 1,2,3,4 respectively then we will find that from the symmetry of the figure that R2 and R4 are equal in magnitude.the weight of the table and the added weight both of them equal (0,-100,0).since the body is static then the sum of forces acting on it is zero ,you have the equation R1+R2+R3+R4=200N .since R2 and R4 are equal then R1+2*R2+R3=200N.Then find the moment about the first and second points using the vector product and equate it with zero.so you have 3 equations in 3 Unknowns so you can find R1,R2 and R3.


[edited by - mohamed adel on September 2, 2003 3:01:24 PM]