Have you ever wondered what kind of mechanism causes the wind shield wiper on the front widow of car to oscillate ( Figure 5-1a)? The mechanism, shown in Figure 5-1b, transforms the rotary motion of the motor into an oscillating motion of the windshield wiper.
Let's make a simple mechanism with similar behavior. Take some cardboard and make four strips as shown in Figure 5-2a.
Take 4 pins and assemble them as shown in Figure 5-2b.
Now, hold the 6in. strip so it can't move and turn the 3in. strip. You will see that the 4in. strip oscillates.
The four bar linkage is the simplest and often times, the most useful mechanism. As we mentioned before, a mechanism composed of rigid bodies and lower pairs is called a linkage (Hunt 78). In planar mechanisms, there are only two kinds of lower pairs --- revolute pairs and prismatic pairs.
This mechanism has three moving links. Two of the links are pinned to the frame which is not shown in this picture. In SimDesign, links can be nailed to the background thereby making them into the frame.
How many DOF does this mechanism have? If we want it to have just one, we can impose one constraint on the linkage and it will have a definite motion. The four bar linkage is the simplest and the most useful mechanism.
In a parallelogram four-bar linkage, the orientation of the coupler does not change during the motion. The figure illustrates a loader. Obvioulsy the behavior of maintaining parallelism is important in a loader. The bucket should not rotate as it is raised and lowered. The corresponding SimDesign file is simdesign/loader.sim .
The four-bar mechanism has some special configurations created by making one or more links infinite in length. The slider-crank (or crank and slider) mechanism shown below is a four-bar linkage with the slider replacing an infinitely long output link. The corresponding SimDesign file is simdesign/slider.crank.sim .
This configuration translates a rotational motion into a translational one. Most mechanisms are driven by motors, and slider-cranks are often used to transform rotary motion into linear motion.
Crank and Piston
You can also use the slider as the input link and the crank as the output link. In this case, the mechanism transfers translational motion into rotary motion. The pistons and crank in an internal combustion engine are an example of this type of mechanism. The corresponding SimDesign file is simdesign/combustion.sim .
You might wonder why there is another slider and a link on the left. This mechanism has two dead points. The slider and link on the left help the mechanism to overcome these dead points.
One interesting application of slider-crank is the block feeder. The SimDesign file can be found in simdesign/block-feeder.sim
The link opposite the frame is called the coupler link , and the links whick are hinged to the frame are called side links . A link which is free to rotate through 360 degree with respect to a second link will be said to revolve relative to the second link (not necessarily a frame). If it is possible for all four bars to become simultaneously aligned, such a state is called a change point .
Before classifying four-bar linkages, we need to introduce some basic nomenclature.
Grashof's theorem states that a four-bar mechanism has at least one revolving link if s + l
and all three mobile links will rock if s + l > p + q
The inequality 5-1 is Grashof's criterion .
All four-bar mechanisms fall into one of the four categories listed in Table 5-1:
Table 5-1 Classification of Four-Bar MechanismsIn Figure 5-11, if AB is the input link, the force applied to the output link, CD , is transmitted through the coupler link BC . (That is, pushing on the link CD imposes a force on the link AB , which is transmitted through the link BC .) For sufficiently slow motions (negligible inertia forces), the force in the coupler link is pure tension or compression (negligible bending action) and is directed along BC . For a given force in the coupler link, the torque transmitted to the output bar (about point D ) is maximum when the angle between coupler bar BC and output bar CD is /2. Therefore, angle BCD is called transmission angle .
When the transmission angle deviates significantly from /2, the torque on the output bar decreases and may not be sufficient to overcome the friction in the system. For this reason, the deviation angle =| /2- | should not be too great. In practice, there is no definite upper limit for , because the existence of the inertia forces may eliminate the undesirable force relationships that is present under static conditions. Nevertheless, the following criterion can be followed.
When a side link such as AB in Figure 5-10, becomes aligned with the coupler link BC , it can only be compressed or extended by the coupler. In this configuration, a torque applied to the link on the other side, CD , cannot induce rotation in link AB . This link is therefore said to be at a dead point (sometimes called a toggle point ).
In Figure 5-11, if AB is a crank, it can become aligned with BC in full extension along the line AB 1 C 1 or in flexion with AB 2 folded over B 2 C 2 . We denote the angle ADC by and the angle DAB by . We use the subscript 1 to denote the extended state and 2 to denote the flexed state of links AB and BC . In the extended state, link CD cannot rotate clockwise without stretching or compressing the theoretically rigid line AC 1 . Therefore, link CD cannot move into the forbidden zone below C 1 D , and must be at one of its two extreme positions; in other words, link CD is at an extremum. A second extremum of link CD occurs with = 1 .
Note that the extreme positions of a side link occur simultaneously with the dead points of the opposite link.
In some cases, the dead point can be useful for tasks such as work fixturing (Figure 5-11).
In other cases, dead point should be and can be overcome with the moment of inertia of links or with the asymmetrical deployment of the mechanism (Figure 5-12).
Inversion is a term used in kinematics for a reversal or interchange of form or function as applied to kinematic chains and mechanisms. For example, taking a different link as the fixed link, the slider-crank mechanism shown in Figure 5-14a can be inverted into the mechanisms shown in Figure 5-14b, c, and d. Different examples can be found in the application of these mechanisms. For example, the mechanism of the pump device in Figure 5-15 is the same as that in Figure 5-14b.
Keep in mind that the inversion of a mechanism does not change the motions of its links relative to each other but does change their absolute motions.