The software attempts to resolve constraints imposed by the redundant mates automatically, and can do so easily for a four-bar linkage. This is because each side of the loop (starting from ground) constrains the connecting rod to stay in the plane of the assembly. There are three redundant mates in a four-bar linkage when all of the mates are concentric. When a mechanism has a closed loop, such as a four-bar linkage, there can be redundant mates. When you use a Motion Analysis study to calculate motion, it calculates the number of degrees of freedom in your mechanism and removes redundant mates as it determines and solves the equations of motion for your assembly. This combination of mates produces a single-degree-of-freedom joint, because it allows a single rotation between the rigid bodies. They can rotate only with respect to one another about one axis, the center line of the concentric mate. Given 0.05, with 10 degrees of freedom, calculate the right-tailed and left-tailed critical value for t Calculate right-tailed value: Since 0.05, the area under the curve is 1 - 1 - 0.05 0.95 Our critical t value is 0.0643 In Microsoft Excel or Google Sheets, you write this function as TINV(0. If each rigid body has a point on the joint on the center line of the concentric mate, those two points remain the same distance apart. Adding a distance or coincident mate to the faces removes the final translational degree of freedom. You can use mates to constrain motion by removing various degrees of freedom.įor example, a concentric mate removes two translational degrees of freedom and two rotational degrees of freedom between two rigid bodies. The two bodies remain constrained, positioned with respect to one another regardless of any motion or force in the mechanism.
When you add a constraint, such as a concentric mate, between two rigid bodies, you remove degrees of freedom between the bodies. It can move along its X, Y, and Z axes and rotate about its X, Y, and Z axes. An unconstrained rigid body in space has six degrees of freedom: three translational and three rotational.