{"id":166,"date":"2021-03-01T08:56:34","date_gmt":"2021-03-01T13:56:34","guid":{"rendered":"http:\/\/pressbooks.library.upei.ca\/statics\/?post_type=chapter&p=166"},"modified":"2025-07-31T22:27:34","modified_gmt":"2025-08-01T02:27:34","slug":"particle-equilibrium","status":"publish","type":"chapter","link":"https:\/\/pressbooks.library.upei.ca\/statics\/chapter\/particle-equilibrium\/","title":{"raw":"2.3 Equilibrium Equations for Particles","rendered":"2.3 Equilibrium Equations for Particles"},"content":{"raw":"For a particle in static equilibrium, Newton's 2nd law can be adapted for [latex]\\vec a = 0[\/latex] and componentized in x y and z:\r\n

[latex]\\sum\\vec F=m*\\vec a[\/latex]<\/p>\r\n

[latex]\\sum\\vec F=0[\/latex]<\/p>\r\n

[latex]\\sum F_x=0\\quad\\quad\\sum F_y=0\\quad\\quad\\sum F_z=0[\/latex]<\/p>\r\nNotice that the left side of the equation says 'sum of the forces', which means add up all the forces in that direction. In statics, they will all cancel out. If you aren't sure if something is in static motion, sum the forces and see if they equal 0.\r\n

Static Equilibrium:<\/h2>\r\n
\r\n\r\nObjects in static equilibrium are objects that are not accelerating (either linear acceleration or angular acceleration). These objects may be stationary, or they may have a constant velocity.<\/span>\r\n\r\nNewton's Second Law states that the force exerted on an object is equal to the mass of the object times the acceleration it experiences. Therefore, if we know that the acceleration of an object is equal to zero, then we can assume that the sum of all forces acting on the object is zero. Individual forces acting on the object, represented by force vectors, may not have zero magnitude, but the sum of all the force vectors will always be equal to zero for objects in equilibrium.\r\n\r\nThe equations used when dealing with particles in equilibrium are:\r\n

[latex]\\sum\\vec F=0[\/latex]<\/p>\r\nWhich leads to:\r\n

[latex]\\sum F_x=0\\\\\\sum F_y=0\\\\\\sum F_z=0[\/latex]<\/p>\r\nSince it is a particle, there are no moments involved, like there are when it comes to rigid bodies.\r\n\r\nSource: Engineering Mechanics, Jacob Moore, et al. http:\/\/mechanicsmap.psu.edu\/websites\/2_equilibrium_concurrent\/2-1_static_equilibrium\/staticequilibrium.html<\/a>\r\n\r\n<\/div>\r\n

Finding the Equilibrium Equations:<\/h2>\r\n
\r\n\r\nThe first step in finding the equilibrium equations is to draw a free-body diagram<\/strong> of the body being analyzed. This diagram should show all the known and unknown force vectors acting on the body. In the free body diagram, provide values for any of the known magnitudes or directions for the force vectors and provide variable names for any unknowns (either magnitudes or directions).\r\n\r\n\"A\r\n
The first step in equilibrium analysis is drawing a free-body diagram. This is done by removing everything but the body and drawing in all forces acting on the body. Labelling all forces, key dimensions, and angles is also useful.<\/figcaption><\/figure>\r\nNext, you will need to choose the x, y, and z axes. These axes do need to be perpendicular to one another, but they do not necessarily have to be horizontal or vertical. If you choose coordinate axes that line up with some of your force vectors, you will simplify later analysis.\r\n\r\nOnce you have chosen axes, you need to break down all of the force vectors into components along the x, y and z directions (see the vectors page in Appendix 1 if you need more guidance on this). Your first equation will be the sum of the magnitudes of the components in the x direction being equal to zero, the second equation will be the sum of the magnitudes of the components in the y direction being equal to zero, and the third (if you have a 3D problem) will be the sum of the magnitudes in the z direction being equal to zero. Collectively, these are known as the equilibrium equations<\/strong>.\r\n\r\nOnce you have your equilibrium equations, you can solve them for unknowns using algebra. The number of unknowns that you will be able to solve for will be the number of equilibrium equations that you have. In instances where you have more unknowns than equations, the problem is known as a statically indeterminate problem,<\/strong> and you will need additional information to solve for the given unknowns.\r\n\r\nExample:\r\n\r\n1. Problem<\/strong>\r\n\r\n\"A\r\n\r\n
\r\n\r\n2. Draw<\/strong>\r\n\r\n\"A\r\n\r\n3. Knowns and Unknowns<\/strong>\r\n\r\nKnown:\r\n