This brief lecture explains how to move (better to say “translate”) forces from one point to another. This is a useful technique for analyzing the static equilibrium of rigid bodies. The YouTube video accompanying this post is given below.
Basically, to make a long story short, a force acting at a certain point can be moved (without rotating the line of action of the force) to an arbitrary chosen point X if a couple is added whose moment is equal to the moment of the force around point X (X is the symbol for the point).
The main idea is to replace the force, with a force and a moment whose action on the body is equivalent to the action of the original force.
Equivalence of two force systems: Two force systems are equivalent if they result in the identical resultant force and the identical resulting moment.
So let us see how this works in practice.
Consider the figure shown below. The goal is to “move” the force 
Now, we add two forces whose intensities are equal to the intensity of
Now, it should be observed that the original force 
So, we have demonstrated the procedure for moving forces from one point to another. Under the condition that we add an additional moment of a couple, we can “safely” translate forces from one point to another.
What should be observed is that from the mechanics point of view, the situations in Figs. 1., 2., and 3. are equivalent. That is, the system of forces in Figs. 1, 2, and 3, are equivalent. This is symbolically illustrated by the following graph.
