Mechanism (engineering)

(Redirected from Planar mechanisms)

In engineering, a mechanism is a device that transforms input forces and movement into a desired set of output forces and movement. Mechanisms generally consist of moving components which may include Gears and gear trains; Belts and chain drives; cams and followers; Linkages; Friction devices, such as brakes or clutches; Structural components such as a frame, fasteners, bearings, springs, or lubricants; Various machine elements, such as splines, pins, or keys.

Schematic of the actuator mechanism for an aircraft landing gear

German scientist Franz Reuleaux defines machine as "a combination of resistant bodies so arranged that by their means the mechanical forces of nature can be compelled to do work accompanied by certain determinate motion". In this context, his use of machine is generally interpreted to mean mechanism.

The combination of force and movement defines power, and a mechanism manages power to achieve a desired set of forces and movement.

A mechanism is usually a piece of a larger process, known as a mechanical system or machine. Sometimes an entire machine may be referred to as a mechanism; examples are the steering mechanism in a car, or the winding mechanism of a wristwatch. However, typically, a set of multiple mechanisms is called a machine.

Kinematic pairs

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From the time of Archimedes to the Renaissance, mechanisms were viewed as constructed from simple machines, such as the lever, pulley, screw, wheel and axle, wedge, and inclined plane. Reuleaux focused on bodies, called links, and the connections between these bodies, called kinematic pairs, or joints.

To use geometry to study the movement of a mechanism, its links are modelled as rigid bodies. This means that distances between points in a link are assumed to not change as the mechanism moves—that is, the link does not flex. Thus, the relative movement between points in two connected links is considered to result from the kinematic pair that joins them.

Kinematic pairs, or joints, are considered to provide ideal constraints between two links, such as the constraint of a single point for pure rotation, or the constraint of a line for pure sliding, as well as pure rolling without slipping and point contact with slipping. A mechanism is modelled as an assembly of rigid links and kinematic pairs.

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Revolute pair cutaway view

Reuleaux called the ideal connections between links kinematic pairs. He distinguished between higher pairs, with line contact between the two links, and lower pairs, with area contact between the links. J. Phillips[clarification needed] shows that there are many ways to construct pairs that do not fit this simple model.

Lower pair: A lower pair is an ideal joint that has surface contact between the pair of elements, as in the following cases:

  • A revolute pair, or hinged joint, requires that a line in the moving body remain co-linear with a line in the fixed body, and a plane perpendicular to this line in the moving body must maintain contact with a similar perpendicular plane in the fixed body. This imposes five constraints on the relative movement of the links, which therefore gives the pair one degree of freedom.
  • A prismatic joint, or slider, requires that a line in the moving body remain co-linear with a line in the fixed body, and a plane parallel to this line in the moving body must maintain contact with a similar parallel plane in the fixed body. This imposes five constraints on the relative movement of the links, which therefore gives the pair one degree of freedom.
  • A cylindrical joint requires that a line in the moving body remain co-linear with a line in the fixed body. It combines a revolute joint and a sliding joint. This joint has two degrees of freedom.
  • A spherical joint, or ball joint, requires that a point in the moving body maintain contact with a point in the fixed body. This joint has three degrees of freedom.
  • A planar joint requires that a plane in the moving body maintain contact with a plane in a fixed body. This joint has three degrees of freedom.
  • A screw joint, or helical joint, has only one degree of freedom because the sliding and rotational motions are related by the helix angle of the thread.

Higher pairs: Generally, a higher pair is a constraint that requires a line or point contact between the elemental surfaces. For example, the contact between a cam and its follower is a higher pair called a cam joint. Similarly, the contact between the involute curves that form the meshing teeth of two gears are cam joints.

Kinematic diagram

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Dimensioned drawing of a slider-crank (left) and its kinematic diagram (right)

A kinematic diagram reduces machine components to a skeleton diagram that emphasises the joints and reduces the links to simple geometric elements. This diagram can also be formulated as a graph by representing the links of the mechanism as edges and the joints as vertices of the graph. This version of the kinematic diagram has proven effective in enumerating kinematic structures in the process of machine design.[1]

An important consideration in this design process is the degree of freedom of the system of links and joints, which is determined using the Chebychev–Grübler–Kutzbach criterion.

Planar mechanisms

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Theo Jansen's Strandbeest, a group of planar walking mechanisms

While all mechanisms in a mechanical system are three-dimensional, they can be analysed using plane geometry if the movement of the individual components is constrained so that all point trajectories are parallel or in a series connection to a plane. In this case the system is called a planar mechanism. The kinematic analysis of planar mechanisms uses the subset of Special Euclidean group SE, consisting of planar rotations and translations, denoted by SE.

The group SE is three-dimensional, which means that every position of a body in the plane is defined by three parameters. The parameters are often the x and y coordinates of the origin of a coordinate frame in M,[clarification needed] measured from the origin of a coordinate frame in F, and the angle measured from the x-axis in F to the x-axis in M.[clarification needed] This is often described saying a body in the plane has three degrees of freedom.

The pure rotation of a hinge and the linear translation of a slider can be identified with subgroups of SE, and define the two joints as one degree-of-freedom joints of planar mechanisms.[incomprehensible] The cam joint formed by two surfaces in sliding and rotating contact is a two degree-of-freedom joint.

Spherical mechanisms

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An example of a spherical deployable mechanism

It is possible to construct a mechanism such that the point trajectories in all components lie in concentric spherical shells around a fixed point. An example is the gimbaled gyroscope. These devices are called spherical mechanisms.[2] Spherical mechanisms are constructed by connecting links with hinged joints such that the axes of each hinge pass through the same point. This point becomes centre of the concentric spherical shells. The movement of these mechanisms is characterised by the group SO(3)[clarification needed] of rotations in three-dimensional space. Other examples of spherical mechanisms are the automotive differential and the robotic wrist.

The rotation group SO(3) is three-dimensional. An example of the three parameters that specify a spatial rotation are the roll, pitch and yaw angles used to define the orientation of an aircraft.

Spatial mechanisms

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An example of a Stewart Platform, a spatial mechanism

A mechanism in which a body moves through a general spatial movement is called a spatial mechanism. An example is the RSSR linkage, which can be viewed as a four-bar linkage in which the hinged joints of the coupler link are replaced by rod ends, also called spherical joints or ball joints. The rod ends let the input and output cranks of the RSSR linkage be misaligned to the point that they lie in different planes, which causes the coupler link to move in a general spatial movement. Robot arms, Stewart platforms, and humanoid robotic systems are also examples of spatial mechanisms.

Bennett's linkage is an example of a spatial overconstrained mechanism, which is constructed from four hinged joints.

The group SE(3)[clarification needed] is six-dimensional, which means the position of a body in space is defined by six parameters. Three of the parameters define the origin of the moving reference frame relative to the fixed frame. Three other parameters define the orientation of the moving frame relative to the fixed frame.

Linkages

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Theo Jansen's kinetic sculpture Strandbeest, a wind-driven walking machine

A linkage is a collection of links connected by joints. Generally, the links are the structural elements and the joints allow movement. Perhaps the single most useful example is the planar four-bar linkage. There are, however, many more special linkages:

  • Watt's linkage is a four-bar linkage that generates an approximate straight line. It was critical to the operation of his design for the steam engine. This linkage also appears in vehicle suspensions to prevent side-to-side movement of the body relative to the wheels.
  • The success of Watt's linkage led to the design of similar approximate straight-line linkages, such as Hoeken's linkage and Chebyshev's linkage.
  • The Peaucellier linkage generates a true straight-line output from a rotary input.
  • The Sarrus linkage is a spatial linkage that generates straight-line movement from a rotary input.
  • The Klann linkage and the Jansen linkage are recent inventions that provide interesting walking movements. They are respectively a six-bar and an eight-bar linkage.

Compliant mechanisms

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A compliant mechanism is a series of rigid bodies connected by compliant elements. These mechanisms have many advantages, including reduced part-count, reduced "slop" between joints (no parasitic motion because of gaps between parts[3]), energy storage, low maintenance (they don't require lubrication and there is low mechanical wear), and ease of manufacture.[4]

Flexure bearings (also known as flexure joints) are a subset of compliant mechanisms that produce a geometrically well-defined motion (rotation) on application of a force.

Cam and follower mechanisms

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Cam and follower mechanism: force is applied from the follower to the cam

A cam and follower mechanism is formed by the direct contact of two specially shaped links. The driving link is called the cam and the link that is driven through the direct contact of their surfaces is called the follower. The shape of the contacting surfaces of the cam and follower determines the movement of the mechanism. In general a cam and follower mechanism's energy is transferred from cam to follower. The camshaft is rotated and, according to the cam profile, the follower moves up and down. Nowadays, slightly different types of eccentric cam followers are also available, in which energy is transferred from the follower to the cam. The main benefit of this type of cam and follower mechanism is that the follower moves slightly and helps to rotate the cam six times more circumference length with 70% of the force.

Gears and gear trains

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Gears, a type of mechanism

The transmission of rotation between contacting toothed wheels can be traced back to the Antikythera mechanism of Greece and the south-pointing chariot of China. Illustrations by the Renaissance scientist Georgius Agricola show gear trains with cylindrical teeth. The implementation of the involute tooth yielded a standard gear design that provides a constant speed ratio. Some important features of gears and gear trains are:

Mechanism synthesis

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The design of mechanisms to achieve a particular movement and force transmission is known as the kinematic synthesis of mechanisms.[5] This is a set of geometric techniques which yield the dimensions of linkages, cam and follower mechanisms, and gears and gear trains to perform a required mechanical movement and power transmission.[6]

See also

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References

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  1. ^ Lung-Wen Tsai, 2001, Mechanism design: enumeration of kinematic structures according to function Archived 6 April 2023 at the Wayback Machine, CRC Press
  2. ^ McCarthy, J. Michael; Soh, Gim Song (11 November 2010). Geometric Design of Linkages. Springer Science & Business Media. ISBN 978-1-4419-7892-9. Archived from the original on 6 April 2023. Retrieved 15 March 2023 – via Google Books.
  3. ^ Nigatu, Hassen; Yihun, Yimesker (2020), Larochelle, Pierre; McCarthy, J. Michael (eds.), "Algebraic Insight on the Concomitant Motion of 3RPS and 3PRS PKMs" (PDF), Proceedings of the 2020 USCToMM Symposium on Mechanical Systems and Robotics, vol. 83, Cham: Springer International Publishing, pp. 242–252, doi:10.1007/978-3-030-43929-3_22, ISBN 978-3-030-43928-6, S2CID 218789290, archived (PDF) from the original on 28 May 2022, retrieved 14 December 2020
  4. ^ "Compliant Mechanisms | About Compliant Mechanisms". compliantmechanisms. Archived from the original on 22 January 2021. Retrieved 8 February 2019.
  5. ^ Hartenberg, R.S. and J. Denavit (1964) Kinematic synthesis of linkages Archived 24 January 2021 at the Wayback Machine, New York: McGraw-Hill — Online link from Cornell University.
  6. ^ J. J. Uicker, G. R. Pennock, and J. E. Shigley, Theory of Machines and Mechanisms, Fifth Ed., Archived 19 May 2022 at the Wayback Machine Oxford University Press, 2016.
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