Skeletal muscle mechanics: implications for rehabilitation.Skeletal muscle biomechanical properties have been widely studied since the 1600s. Because the primary purpose of skeletal muscle is to generate force and movement, it is important to understand the mechanical basis of these properties. When muscle force or movement is lost due to disease, trauma, or disuse dis·use n. The state of not being used or of being no longer in use. disuse Noun the state of being neglected or no longer used; neglect Noun 1. , an understanding of muscle properties can improve our ability to restore function. Ideally, muscle contraction Noun 1. muscle contraction - (physiology) a shortening or tensing of a part or organ (especially of a muscle or muscle fiber) contraction, muscular contraction shortening - act of decreasing in length; "the dress needs shortening" would be studied during normal movement, that is, under conditions of physiological activation, experiencing physiological loads, and contracting at physiological velocities. Clearly, this is technically not possible in humans. Thus, descriptions of muscle biomechanical properties have relied on experimental studies in model systems. In this review, we describe muscle contractile contractile /con·trac·tile/ (kon-trak´til) able to contract in response to a suitable stimulus. con·trac·tile adj. Capable of contracting or causing contraction, as a tissue. properties during either constant-length (isometric isometric /iso·met·ric/ (-met´rik) maintaining, or pertaining to, the same measure of length; of equal dimensions. i·so·met·ric adj. 1. ) or constant-force (isotonic isotonic /iso·ton·ic/ (-ton´ik) 1. denoting a solution in which body cells can be bathed without net flow of water across the semipermeable cell membrane. 2. ) contractions. We will then use this information to speculate as to how muscles operate in vivo in vivo /in vi·vo/ (ve´vo) [L.] within the living body. in vi·vo adj. Within a living organism. in vivo adv. . Length-Tension Relationship: Isometric Muscle Contraction isometric muscle contraction (ī´sōmet´rik), n See contraction, muscle, isometric. The original biological experiments performed by Blix[1] demonstrated that the force developed by a muscle during isometric contraction (ie, when the muscle is not allowed to shorten) varies with the muscle's length. Experimentally, isometric contractions are performed at different lengths (Fig. 1), and peak isometric tension is measured at each length. These tensions are then plotted against length, and a relationship such as that shown in Figure 2 is obtained. It has thus been demonstrated that at very long and very short lengths, muscles generate low tension, whereas at intermediate or "optimal" lengths, muscles generate higher tension. Although a general description of this relationship was presented in the 1800s, the precise structural basis for the length-tension relationship in skeletal muscle was not elucidated until the sophisticated mechanical experiments of the early 1960s were performed.[2,3] It was these experiments that defined the precise relationship between myofilament myofilament /myo·fila·ment/ (-fil´ah-ment) any of the ultramicroscopic threadlike structures composing the myofibrils of striated muscle fibers; thick ones contain myosin, thin ones contain actin, and intermediate ones contain desmin and overlap and tension generation, which we refer to today as the sarcomere sarcomere /sar·co·mere/ (sahr´ko-mer) the contractile unit of a myofibril; sarcomeres are repeating units, delimited by the Z bands, along the length of the myofibril. sar·co·mere n. length-tension relationship. In its most basic form, the length-tension relationship illustrates that tension generation in skeletal muscle is a direct function of the magnitude of overlap between the actin and myosin filaments. Sarcomere Length-Tension Relationship Sophisticated experiments by Gordon et al[2] defined what might be one of the most explicit structure-function relationships in all of biology. In these experiments, a small segment of muscle fiber was held at a constant length (and therefore a region of the fiber was held at a constant sarcomere length). The results of these experiments[2] are summarized in Figure 2. In this figure, muscle relative tetanic tetanic /te·tan·ic/ (te-tan´ik) pertaining to tetanus. te·tan·ic adj. 1. Of or causing tetanus or tetany. 2. Marked by sustained muscular contractions. n. tension (as a percentage of maximum) is plotted as a function of sarcomere length (in micrometers). This was one instance in which anatomy met physiology in dramatic fashion, because knowledge of the precise anatomic lengths of the myosin myosin (mī`əsĭn), one of the two major protein constituents responsible for contraction of muscle. In muscle cells myosin is arranged in long filaments called thick filaments that lie parallel to the microfilaments of actin. and actin filaments was crucial for understanding the basis of the sarcomere length-tension relationship. Descending Limb of the Length-Tension Curve As a muscle was highly stretched by the investigators[2] to a sarcomere length of 3.65 [mu]m, the muscle developed no active tension. Why? The answer lay in the observation that, as the myosin filament was 1.65-[mu]m long and the actin filament was 2.0 [mu]m in length, at a sarcomere length of 3.65 [mu]m, there was no overlap (interdigitation) between the actin and myosin filaments. Therefore, although fiber excitation might permit actin-myosin interaction by removing the inhibition of the actin filament, because no myosin cross-bridges are in the vicinity of the actin active sites, no tension generation occurred. As muscle length decreased, overlap between actin and myosin was possible, and the amount of tension generated by the muscle increased as sarcomere length decreased. Increasing tension with decreasing sarcomere length occurred until the muscle reached a sarcomere length of 2.2 [mu]m, because, as sarcomere length decreased, the number of cross-bridge connections between actin and myosin increased, resulting in increased tension. This region of the length-tension curve is known as the descending limb. Plateau Region of the Length-Tension Curve As sarcomere length changed from 2.0 [mu]m to 2.2 [mu]m, muscle tension remained constant. Again, this was a direct result of thick filament filament, in astronomy: see chromosphere. structure. Because the myosin filament is a polymeric arrangement of myosin molecules arranged in an antiparallel antiparallel /an·ti·par·al·lel/ (-par´ah-lel) denoting molecules arranged side by side but in opposite directions. fashion, many myosin "backbones" come together in the center of the myosin filament. Thus, there exists a bare region of the myosin molecule that is devoid of cross-bridges. The length of this bare region was 0.2 [mu]m. Even though sarcomere shortening over the range of 2.2 to 2.0 [mu]m resulted in greater filament overlap, it did not result in increased tension generation because no additional cross-bridge connections were made. The region of the length-tension curve over which length change results in no change in tension is known as the plateau region. The muscle length at which the maximum tetanic tension ([P.sub.o]) is attained is known as optimal length ([L.sub.o]). Ascending Limb of the Length-Tension Curve At a sarcomere length of 2.0 [mu]m, the actin filaments from one side of the sarcomere juxtapose jux·ta·pose tr.v. jux·ta·posed, jux·ta·pos·ing, jux·ta·pos·es To place side by side, especially for comparison or contrast. the actin filaments from the opposite side of the sarcomere (Fig. 2). It might be predicted that shortening past this point would be impossible. As sarcomere length decreases below the plateau region, however, actin filaments from one side of the sarcomere overlap with the actin filaments on the opposite side of the sarcomere. That is, at these lengths, actin filaments overlap both with the opposing actin filament and with the myosin filament. Under these conditions, the actin filament from one side of the sarcomere interferes with cross-bridge formation on the other side of the sarcomere, resulting in decreased muscle force output. This decrease occurs from 2.0 to 1.87 [mu]m, and this region is known as the shallow ascending limb of the length-tension curve. The word "shallow" distinguishes this region from the next portion of the length-tension curve, which is known as the steep ascending limb, because at these very short lengths, the myosin filament actually begins to interfere with shortening as it abuts the sarcomere Z-disk, reducing force precipitously. The length-tension relationship illustrates that muscle force varies as a function of sarcomere length (myofilament overlap). This is a physiologic property of the force-generating system and should not simply be viewed as an anatomic artifact. Structural Basis of the Passive Length-Tension Curve The thin line in Figure 2 represents the tension recorded if a muscle is stretched to various lengths without stimulation. Note that near the optimal length, passive tension is almost zero. As the muscle is stretched to longer lengths, however, passive tension increases dramatically. These relatively long lengths can be attained physiologically, and therefore, passive tension can play a role in providing resistive force In physics, a resistive force is a force that acts on a body due to its motion relative to other bodies with which it is in contact, whose direction is opposite to the velocity of the body (or in static friction, opposite to the sum of the other forces). even in the absence of muscle activity. The structure(s) responsible for passive tension are obviously outside of the cross-bridge itself, because muscle activation is not required. Recent studies have shown that the origin of passive muscle tension is actually within the myofibrils themselves.[4] Interestingly, a new structural protein has been identified that is the source of this passive tension. The very large protein, creatively named "titin" (and formerly termed "connectin") connects the thick myosin filaments end to end (Fig. 3). This very large protein is also relatively fragile and thus has probably been missed in earlier studies because laboratory techniques Laboratory techniques are the sum of procedures used on natural sciences such as chemistry, biology, physics in order to conduct an experiment, all of them follow scientific method; while some of them involves the use of complex laboratory equipment from laboratory glassware to destroyed the protein. Experiments have now been performed in which isolated fibers were bathed in a solution that selectively extracted the titin molecule.[5] Under these conditions, the time course of loss in muscle passive tension is exactly correlated with the time course of appearance of titin protein in the extracting solution. In addition to passively supporting the sarcomere, titin stabilizes the myosin lattice so that high muscle forces do not disrupt the orderly hexagonal hex·ag·o·nal adj. 1. Having six sides. 2. Containing a hexagon or shaped like one. 3. Mineralogy array. If titin is selectively destroyed, normal muscle contraction causes significant myofibrillar disruption.[6] Finally, it appears that titin may act as sort of a "molecular ruler" during the formation of sarcomeres (sarcomerogenesis), which occurs during development and following chronic muscle stretch during immobilization Immobilization Definition Immobilization refers to the process of holding a joint or bone in place with a splint, cast, or brace. This is done to prevent an injured area from moving while it heals. .[7] Force-Velocity Relationship: Isotonic Muscle Contraction In contrast to the sarcomere length-tension relationship, the force-velocity relationship does not have a precise, anatomically identifiable basis. The force-velocity relationship illustrates that the maximum force generated by a muscle is a function of its velocity. This relationship can also be stated in the reverse; that is, muscle contraction velocity is dependent on the force resisting the muscle. Historically, the force-velocity relationship was used to define the kinetic properties of the cross-bridges as well as the precise form of the force-velocity relationship itself. The form of this relationship has been shown to explain the behavior of whole muscle[8,9] and isolated single muscle fibers.[10] Experimental elucidation of the force-velocity relationship was first presented by Hill[8] and Katz,[9] but the current description of the force-velocity relationship has been ascribed to Hill.[11] The force-velocity relationship, like the length-tension relationship, is a curve that actually represents the results of many experiments plotted on the same graph. Experimentally, a muscle is stimulated maximally and allowed to shorten (or lengthen) against a constant load (Fig. 4A). The muscle velocity during shortening (or lengthening) is measured and then plotted against the resistive force. The general form of this relationship is plotted in Figure 4B. On the horizontal axis, we have plotted muscle velocity relative to maximum contraction velocity ([V.sub.max]), and on the vertical axis, we have plotted muscle force relative to maximum force ([P.sub.o]). Concentric Contractions--Muscle Actively Shortening When a muscle is maximally electrically activated and required to lift a load that is less than its maximum tetanic tension, the muscle begins to shorten. Contractions that permit the muscle to shorten are known as concentric contractions. In concentric contractions, the force generated by the muscle is always less than the muscle's maximum force ([P.sub.o]). As the load the muscle is required to lift decreases, contraction velocity increases. This occurs until the muscle finally reaches its [V.sub.max] at which force generation is zero. Maximum contraction velocity is a parameter we can use to characterize muscle that is related to both fiber type distribution and architecture. The force-velocity relationship is characterized by a rectangular hyperbola hyperbola (hīpûr`bələ), plane curve consisting of all points such that the difference between the distances from any point on the curve to two fixed points (foci) is the same for all points. and is expressed mathematically as (1) (P + a)v = b([P.sub.o] - P) where a and b are constants derived experimentally (usually about 0.25), P is muscle force, and v is muscle velocity. This equation can be used to determine the relative muscle force that occurs as a muscle is allowed to shorten. Some of these values are presented in the Table. The force-velocity relationship is a steep rectangular hyperbola. In other words Adv. 1. in other words - otherwise stated; "in other words, we are broke" put differently , force drops off rapidly as velocity increases. For example, in a muscle that is shortening at only 1% of its maximum contraction velocity (extremely slow), tension drops by 5% relative to maximum isometric tension (Table). Similarly, as contraction velocity increases to only 10% of maximum (easily attainable physiologically), muscle force drops by 35%. Even when muscle force is only 50% of maximum, muscle velocity is only 17% of [V.sub.max] As shortening speed increases, force drops precipitously. Eccentric Contractions-Muscle Actively Lengthening As the load imposed on the muscle increases, it reaches a point at which the external load is greater than the load the muscle can generate. Thus, the muscle is activated, but it is forced to lengthen due to the high external load. This is referred to as an eccentric contraction eccentric contraction Negative contraction Sports medicine Muscle contraction that occurs while the muscle is lengthening as it develops tension and contracts to control motion by an outside force. Cf Concentric contraction. (contraction in this context does not necessarily imply shortening). There are two main features to note regarding eccentric contractions. First, the absolute muscle tensions are very high relative to the muscle's [P.sub.o]. Second, unlike concentric contractions, the absolute tension is relatively independent of lengthening velocity.[9] This suggests that skeletal muscles Skeletal muscles Muscles that move the skeleton. All of the muscles under voluntary control are skeletal muscles. Mentioned in: Creatine Kinase Test are very resistant to lengthening, a property that comes in very handy for many normal movement patterns in which muscles function as "brakes" to decelerate de·cel·er·ate v. de·cel·er·at·ed, de·cel·er·at·ing, de·cel·er·ates v.tr. 1. To decrease the velocity of. 2. a limb (for example, the hamstring muscles "brake" the tibia tibia: see leg. during the swing phase of gait) or to absorb the momentum of the body during stance (for example, the quadriceps femoris muscles absorb body momentum during heel-strike). Eccentric contractions are currently a subject of great interest for two main reasons. First, much of a muscle's normal activity occurs while it is actively lengthening; thus, eccentric contractions are physiologically common. Second, muscle injury and soreness are thought to be associated more with eccentric contractions. The Cross-Bridge Cycle We alluded to cyclic interaction between actin and myosin in explaining the force-velocity curve. Much of our understanding of the mechanism of muscle contraction has come from excellent biochemical studies performed from the 1950s to the mid-1970s.[12] It was during this period that methods for isolating specific muscle proteins were developed as well as the methods for measuring their physicochemical physicochemical /phys·i·co·chem·i·cal/ (fiz?i-ko-kem´ik-il) pertaining to both physics and chemistry. phys·i·co·chem·i·cal adj. 1. Relating to both physical and chemical properties. and biochemical properties. In its simplest form, biochemical experiments on muscle contractile proteins have shown that during the cross-bridge cycle, actin (A) combines with myosin (M) and adenosine adenosine /aden·o·sine/ (ah-den´o-sen) a purine nucleoside consisting of adenine and ribose; a component of RNA. It is also a cardiac depressant and vasodilator used as an antiarrhythmic and as an adjunct in myocardial perfusion imaging triphosphate triphosphate /tri·phos·phate/ (tri-fos´fat) a salt containing three phosphate radicals. tri·phos·phate n. A salt or ester containing three phosphate groups. (ATP ATP: see adenosine triphosphate. ATP in full adenosine triphosphate Organic compound, substrate in many enzyme-catalyzed reactions (see catalysis) in the cells of animals, plants, and microorganisms. ) to produce force, adenosine diphosphate adenosine diphosphate: see adenine; adenosine triphosphate. Adenosine diphosphate (ADP) A coenzyme and an important intermediate in cellular metabolism as the partially dephosphorylated form of adenosine triphosphate. (ADP (1) (Automatic Data Processing) Synonymous with data processing (DP), electronic data processing (EDP) and information processing. (2) (Automatic Data Processing, Inc., Roseland, NJ, www.adp. ), and inorganic phosphate ([P.sub.i]). This can be represented as a chemical reaction in the form: (2) A + M + ATP [arrow right] A + M + ADP + [P.sub.i] + Force However, we also know that death of a muscle produces a rigor rigor /rig·or/ (rig´er) [L.] chill; rigidity. rigor mor´tis the stiffening of a dead body accompanying depletion of adenosine triphosphate in the muscle fibers. state whereby actin and myosin interact to form a very stiff connection. This connection can be represented as (3) A + M [arrow right] A [multiplied by] M "rigor" complex If actin and myosin can interact by themselves, where does ATP come into the picture during contraction? Experiments have demonstrated that the myosin molecule can hydrolyze hydrolyze to performance hydrolysis. ATP into ADP and [P.sub.i]. In other words, (4) M + ATP [arrow right] M + ADP + [P.sub.i] Scientists now agree that ATP serves at least two functions in skeletal muscle systems. First, ATP disconnects actin from myosin. Second, ATP is hydrolyzed by the myosin molecule to produce the energy required for muscle contraction. This description of the different biochemical steps involved in muscle contraction is referred to as the Lymn-Taylor actomyosin actomyosin /ac·to·my·o·sin/ (ak?to-mi´o-sin) the complex of actin and myosin occurring in muscle fibers. ac·to·my·o·sin n. adenosine triphophatase hydrolysis hydrolysis (hīdrŏl`ĭsĭs), chemical reaction of a compound with water, usually resulting in the formation of one or more new compounds. mechanism.[12,13] The relationship between the Lymn-Taylor kinetic scheme and the mechanical cross-bridge cycle is not fully known. Lymn and Taylor,[13] however, proposed that their biochemical data could be incorporated into a four-step cross-bridge cycle that could be envisioned as follows (Fig. 5): 1. The actin-myosin bridge very rapidly dissociates due to ATP binding to myosin. 2. The free myosin bridge moves into position to attach to actin, during which ATP is hydrolyzed. 3. The free myosin bridge along with its hydrolysis products rebinds to the actin filament. 4. The cross-bridge generates force, and actin displaces the reaction products (ADP and [P.sub.i]) from the myosin cross-bridge. This is the rate-limiting step of contraction. The actin-myosin cross-bridge is now ready for the ATP binding of step 1. This is currently an active area of muscle biophysical research.[12] One might imagine the difficulty in confirming these elementary mechanical and biophysical reactions. A recent advance in biochemistry, however, has allowed direct testing and manipulation of this scheme. The advance involves the development of "caged" compounds--compounds that are inactive in their caged form and become active when the cage is instantaneously removed by a pulse of high-energy laser light.[14] Using caged ATP, single muscle fibers have been subjected to experiments such as those described earlier and found to behave much as predicted based on the biochemical data.[15] Skeletal Muscle Architecture All muscles are made of similar contractile units (sarcomeres), but the arrangement of these sarcomeres dramatically affects whole muscle contractile properties. The fundamental relationship between muscle architecture and muscle function is that muscle velocity and excursion are proportional to the number of sarcomeres in series, whereas muscle force is proportional to the total cross-sectional area of sarcomeres.[16,17] In practice, it is difficult to determine these values precisely, so we often say that muscle velocity and excursion are proportional to muscle fiber length, whereas muscle force is proportional to total fiber cross-sectional area (PCSA PCSA Primary Care Service Area PCSA Personal Computing Systems Architecture PCSA Power Crane and Shovel Association PCSA Peel Committee on Sexual Assault (Canada) PCSA Presbyterian Church of Southern Africa ). Physiological cross-sectional area is a calculated variable[18] that estimates the total muscle fiber cross-sectional area. It is not necessarily the same as any area calculated in one of the traditional anatomical planes as would be obtained, for example, from computed tomography Computed tomography (CT scan) X rays are aimed at slices of the body (by rotating equipment) and results are assembled with a computer to give a three-dimensional picture of a structure. or magnetic resonance imaging magnetic resonance imaging (MRI), noninvasive diagnostic technique that uses nuclear magnetic resonance to produce cross-sectional images of organs and other internal body structures. . This is because the PCSA is a calculated amount that attempts to sum the entire muscle fiber cross-sectional area. Depending on the architecture of a particular muscle, all fibers will not be present in a given anatomical plane. Muscle fiber length must be determined experimentally by microdissection of isolated skeletal muscles. Such microdissection has been performed for numerous animal and human muscles.[19,20] As architecture is a major determinant of muscle function, it helps to have a "feel" for the architectural properties of various human muscles. These properties have been measured in the lower extremity lower extremity n. The hip, thigh, leg, ankle, or foot. Also called inferior limb, pelvic limb. [21,22] and upper extremity upper extremity n. The shoulder, arm, forearm, wrist, or hand. Also called superior limb, thoracic limb. [23-26] and are presented in graphical form in Figure 6. Because muscle fiber length is proportional to muscle excursion and muscle PCSA is proportional to [P.sub.o], the architectural specialization shown in Figure 6 suggests a wide range of forces and excursions that can be produced by the various skeletal muscles. This range of forces and excursions indicates that muscles are constructed of various designs, which enable them to produce high forces and/or high excursions. For example, the vastus muscles, with their relatively short, pennated fibers, appear to be specialized for high force production, whereas the sartorius muscle sar·to·ri·us muscle n. A muscle with origin from the anterior superior spine of the ilium, with insertion into the medial border of the tuberosity of the tibia, with nerve supply from the femoral nerve, and whose action flexes the thigh and leg and , with its longer fibers and smaller cross-sectional area, appears to be better suited for high excursions and low force. Such specialization is not necessarily an either/or proposition, as some muscles generate large forces (due to large size) and produce high excursion. In the lower limb, inspection of functional muscle groups (eg, hamstrings, quadriceps femoris Noun 1. quadriceps femoris - a muscle of the thigh that extends the leg musculus quadriceps femoris, quadriceps, quad extensor, extensor muscle - a skeletal muscle whose contraction extends or stretches a body part , dorsiflexors, plantar plantar /plan·tar/ (plan´tar) pertaining to the sole of the foot. plan·tar adj. Of, relating to, or occurring on the sole. flexors) permits a number of generalizations to be made (Fig. 7). The quadriceps femoris muscles are characterized by their relatively high pennation angles, large PCSAs, and short fibers. In terms of design, these muscles appear suited for the generation of large forces. The hamstring muscles, however, by virtue of their relatively long fibers and intermediate PCSAs, appear to be designed for large excursions (because excursions are proportional to fiber length). The same appears to be true of the plantar flexors and dorsiflexors. Force-Generating Properties of Muscles With Different Architectures If we had two muscles with dramatically different designs but identical muscle mass, as illustrated in Figure 8, both muscles would have the same amount of contractile material (mass), but the arrangements would be quite different. The muscle in Figure 8B has relatively long fibers that extend almost the entire length of the muscle and are parallel to the muscle's force-generating axis (ie, the axis formed by connecting the line from muscle origin to insertion). This is the classic parallel-fibered muscle. The muscle shown in Figure 8A has relatively short fibers that extend a very short length relative to the muscle and are tilted by about 30 degrees to the muscle's force-generating axis. This is the classic pennated muscle. In Figure 9A, we have plotted the length-tension curves of the two muscles. Note that the muscle with the longer fibers has a greater absolute working range than the muscle with the shorter fibers. This is because, for a given length change, each sarcomere in the long-fibered muscle lengthens less, the length change being distributed over a greater number of sarcomeres. However, note also that the long-fibered muscle generates a lower tension than the short-fibered muscle because the muscle with the shorter fibers contains a much greater PCSA. Generally, muscles with short fibers and a large PCSA are designed for force production, whereas muscles with long fibers are designed for excursion. This concept is well illustrated by the force-velocity curves plotted in Figure 9B. Note that the muscle with long fibers has a [V.sub.max] that is much greater than that of the muscle with short fibers. Each sarcomere within the fiber contracts at the same velocity, regardless of fiber length. However, by placing more sarcomeres in series in the muscle with long fibers, the overall muscle velocity is greater. Again, note that the P, for the muscle with short fibers is much greater than that observed for the muscle with long fibers due to its greater PCSA Torque Definition We have discussed isolated muscle properties, but in the musculoskeletal system Noun 1. musculoskeletal system - the system of muscles and tendons and ligaments and bones and joints and associated tissues that move the body and maintain its form , muscles generate force and transmit the force, via tendons, to the bones. If muscles generate sufficient force, bones rotate about joint axes. We thus have a mechanical system that can be quantitatively described using the equation for torque ([tau]): (5) [Mathematical Expression A group of characters or symbols representing a quantity or an operation. See arithmetic expression. Omitted] where r is the moment arm, F is the applied force (due to muscle tension), and x represents the vector cross-product of the two quantities Fig. 10A). Thus, a force (F) is applied a distance (r) away from an axis (open circle, Fig. 10A) that is free to rotate. The arrows above the moment arm and force variables signify that they are vector quantities. That is, both have magnitude as well as direction. Ibis ibis (ī`bĭs), common name for wading birds with long, slender, decurved bills, found in the warmer regions of both hemispheres. The body is usually about 2 ft (61 cm) long. Most ibises nest in colonies. is another way of saying that the orientation between r and F is important. If we expand this equation, we can express torque as (6) [tau] = ~r~ [multiplied by] ~F~ [multiplied by] sin[theta Theta A measure of the rate of decline in the value of an option due to the passage of time. Theta can also be referred to as the time decay on the value of an option. If everything is held constant, then the option will lose value as time moves closer to the maturity of the option. ] where the vertical bars around r and F represent the vector magnitudes, and [theta] is the angle between the direction of force application and the axis of rotation Noun 1. axis of rotation - the center around which something rotates axis mechanism - device consisting of a piece of machinery; has moving parts that perform some function . The basis for this expression can be seen in Figure 10B, where the line of force (F) is applied at an angle ([theta]) relative to the axis of the the diameter of the sphere which is perpendicular to the plane of the circle. See also: Axis moment arm. The component of force that causes rotation is the short side of the triangle (F [multiplied by] sin[theta]). The moment arm is measured in distance units such as meters. Because the sin[theta] term is dimensionless, torque has units of newton-meters (force-distance units). Another common unit of torque is foot-pounds (such as are used in the automobile industry automobile industry, the business of producing and selling self-powered vehicles, including passenger cars, trucks, farm equipment, and other commercial vehicles. and, interestingly, on many isokinetic isokinetic /iso·ki·net·ic/ (-ki-net´ik) maintaining constant torque or tension as muscles shorten or lengthen; see isokinetic exercise, under exercise. dynamometers used in rehabilitation). The word "strength," as we use it, clinically actually represents torque. All real-world performance (eg, sprinting, lifting weights, getting out of bed, writing) represents manifestations of torque by the musculoskeletal system. If we grasp the implications of this statement, it is clearly incorrect to conclude that a person is strong only because his or her muscles generate large forces. It would be just as ridiculous to conclude that a person is strong only because that person has large moment arms. Based on this discussion, it is clear that at least three strategies exist for changing torque: (1) changing force magnitude (tension-producing capability of a muscle), (2) changing moment arm magnitude (changing the insertion of a muscle), and (3) changing the angle between force magnitude and moment arm magnitude. Two of these strategies require surgical changes, whereas the third (changing tension) is amenable to training. Muscle Force Producing the Moment Determination of the muscle force that produces a joint moment is simple in principle but extremely difficult in practice. As discussed previously, if muscle is fully activated, muscle force varies with muscle length (length-tension relationship) and muscle velocity (force-velocity relationship). If we know the muscle's length and velocity, we theoretically can predict muscle force. Moment Arm Producing the Moment Determination of joint moment arm requires an understanding of the anatomy and movement (kinematics kinematics: see dynamics. kinematics Branch of physics concerned with the geometrically possible motion of a body or system of bodies, without consideration of the forces involved. ) of the joint of interest. For example, some joints can be considered to rotate about a fixed point. A good example of such a joint is the elbow.[27] At the elbow very near; at hand. See also: Elbow joint, where the humerus humerus: see arm. and ulna ulna: see arm. articulate, the resulting rotation occurs primarily about a fixed point, referred to as the center of rotation center of rotation, n a point or line around which all other points in a body move. . In the case of the elbow joint elbow joint n. A compound hinge joint between the humerus and the bones of the forearm. Also called cubital joint. , this center of rotation is relatively constant throughout the joint's range of motion (ROM).[27] In other joints (eg, the knee), however, the center of rotation moves in space as the knee joint rotates, because the articulating surfaces are not perfect circles.[28] In the case of the knee, it is not appropriate to discuss a single center of rotation--rather, we must speak of a center of rotation corresponding to a particular joint angle, or, using the terminology of joint kinematics, we must speak of the instant center of rotation (ICR (Intelligent Character Recognition or Image Character Recognition) The machine recognition of hand-printed characters as well as machine printing that is difficult to recognize. ), that is, the center of rotation at any "instant" in time or space. Having defined a joint ICR, the moment arm is defined as the perpendicular distance In geometry, perpendicular distance distance from a point  to the line  is given byn. A uniaxial joint in which a broad, transversely cylindrical convexity on one bone fits into a corresponding concavity on the other, allowing motion in one plane only, as in the elbow. Also called ginglymoid joint. (a joint with a fixed ICR), the maximum moment arm is attained at [theta]=90 degrees, If we plotted moment arm versus joint angle for this simple hinge joint, we would obtain a simple sine function that has a maximum of 5 cm occurring at [theta]=90 degrees. Such a curve can be generated for any joint. In general, the experimental curves are not quite as simple as the one previously discussed. Joint Angle Corresponding to Maximum Muscle Force Examination of current physiology texts reveals a good deal of uncertainty regarding the definition of the joint angle that corresponds to maximum muscle force. Recent studies of torque generation in animals and humans have generally agreed that the joint angle at which the muscle generates maximal force is not the same angle at which the moment arm is maximum. Thus, during normal joint rotation, both the moment arm and muscle force are constantly changing, which results in the "shape" of the strength or torque curve. This concept has recently been addressed in detail by experimental and theoretical modeling.[29-31] Range of Motion as a Function of Architecture We can now "combine" the muscle architectural discussion with the joint moment arm concept. We stated that muscles with longer fibers have a longer functional ROM than muscles with shorter fibers. Does this imply that muscles with longer fibers are associated with joints that have larger ROMs? No! A muscle with longer fibers does have a longer working ROM. The amount of muscle length change that occurs as a joint rotates, however, is very strongly dependent on the muscle's moment arm (the perpendicular distance from the muscle insertion to the axis of joint rotation). Ibis idea is illustrated in Figure 12, in which we have attached a simulated "muscle" using two different moment arms. In Figure 12A, the moment arm is much less than in Figure. 12B. This means that in Figure 12A, the muscle will change length much less for a given change in joint angle compared with the same change in joint angle in Figure 12B. As a result, the active ROM for the muscle-joint system shown in Figure 12A will be much greater than that shown in Figure 12B in spite of the fact that their muscular properties are identical. In this example, increasing the moment arm decreased the ROM from 40 degrees (Fig. 12A) to only 25 degrees (Fig. 12B). We should now qualify the previous statement about muscle design and architecture. Muscles that are, for example, designed for speed because of their very long fibers may not actually produce large velocities of contraction if they are placed in position with a very large moment arm. The increased moment arm causes a greater joint moment, and the muscle is actually best suited for torque production. Similarly, a muscle that appears to be designed for force production due to the large PCSA, if placed in position with a very small moment arm, may actually produce high joint excursions or angular velocities. Thus, muscle design may or may not be a reflection of its actual use in the physiologic muscle-joint torque-generating system. In general, muscle fiber length and muscle moment arm are positively correlated.32 Thus, muscles with long fibers tend to have long moment arms, but this is not necessarily the case. Muscle architectural features may represent muscle adaptation to kinematic kin·e·mat·ics n. (used with a sing. verb) The branch of mechanics that studies the motion of a body or a system of bodies without consideration given to its mass or the forces acting on it. criteria. Summary Skeletal muscles represent a clear example of a structure function relationship. Isometric contractile properties result from the relative overlap of actin and myosin contractile filaments. Isotonic force results from the timing of the interaction between actin and myosin during the cross-bridge cycle. Sarcomere arrangement in whole muscles dramatically affects contractile properties and is termed "architecture." Muscle architecture is highly specialized for the various upper- and lower-extremity muscles. The interaction between these muscles and the joint provides flexibility and specialization, which are required for normal movement. it can now be seen that normal movement represents the culmination of complex interaction between the nervous system, muscles, and joints. Evaluation of a phenomenon as complex as "movement" or "strength" requires an understanding of the role of each component of this system in producing the movement or the force. As diagnostic procedures improve in their specificity, rehabilitation may be directed toward the particular physiological component that does not function as desired. In this way, treatments can be developed that have a rational physiological basis and that result in measurable physiological changes. Acknowledgment We thank Becky Chamberlain for her artistic work. References [1] Blix M. Die lange und die spannung des muskels. Vierte Abbandlung Skand Arch Physiol. 1895;5:173-206. [2] Gordon AM, Huxley AF, Julian FJ. The variation in isometric tension with sarcomere length in vertebrate muscle fibers. J Physiol (Lond). 1966;184:170-192. [3] Edman KAP. The velocity of unloaded shortening and its relation to sarcomere length and isometric force in vertebrate muscle fibres. J Physiol (Lond). 1979;246:255-275. [4] Magid A, Law DJ. Myofibrils bear most of the resting tension in frog skeletal muscle. Science. 1985;230:1280-1282. [5] Funatsu T, Higuchi H, Ishiwata S. Elastic filaments in skeletal muscle revealed by selective removal of thin filaments with plasma gelsolin gel·sol·in n. A calcium-dependent actin-binding protein that modulates actin filament length and gelation and thus influences the structure of the cytoskeleton and plays a key role in cellular motility and differentiation. . J Cell Biol. 1990;110:53-62. [6] Horowits R, Podolsky RJ. The positional stability of thick filaments in activated skeletal muscle depends on sarcomere length: evidence for the role of titin filaments. J Cell Biol. 1987;105:2217-2223. [7] Williams P, Goldspink G. The effect of immobilization on the longitudinal growth of striated muscle striated muscle n. Skeletal, voluntary, and cardiac muscle, distinguished from smooth muscle by transverse striations of the fibers. Striated muscle fibers. J Anat. 1973;116:45-55. [8] Hill AV. The heat of shortening and the dynamic constants of muscle. Proc R Soc Lond [Biol]. 1938;126:136-195. [9] Katz B. The relation between force and speed in muscular contraction Noun 1. muscular contraction - (physiology) a shortening or tensing of a part or organ (especially of a muscle or muscle fiber) contraction, muscle contraction shortening - act of decreasing in length; "the dress needs shortening" . J Physiol (Lond). 1939;96:45-64. [10] Edman KAP. The velocity of unloaded shortening and its relation to sarcomere length and isometric force in vertebrate muscle fibres. J Physiol (Lond). 1979;246:255-275. [11] Hill AV. First and Last Experiments in Muscle Mechanics. New York New York, state, United States New York, Middle Atlantic state of the United States. It is bordered by Vermont, Massachusetts, Connecticut, and the Atlantic Ocean (E), New Jersey and Pennsylvania (S), Lakes Erie and Ontario and the Canadian province of , NY: Cambridge University Press Cambridge University Press (known colloquially as CUP) is a publisher given a Royal Charter by Henry VIII in 1534, and one of the two privileged presses (the other being Oxford University Press). ; 1970. [12] Webb MR, Trentham DR. Chemical mechanism of myosin-catalyzed ATP hydrolysis ATP hydrolysis is the reaction by which chemical energy that has been stored and transported in the high-energy phosphoanhydridic bonds in ATP (Adenosine triphosphate) is released, for example in the muscles, to produce work. . In: Peachy peach·y adj. peach·i·er, peach·i·est 1. Resembling a peach, especially in color or texture. 2. Informal Splendid; fine. ID, Adrian RH, Geiger SR, eds. Handbook of Physiology. Bethesda, Md: American Physiological Society; 1983:237-255. [13] Lymn RW, Taylor EW. Mechanism of adenosine triphosphate hydrolysis by actomyosin. Biochemistry. 1971;10:4617-4624. [14] McCray JA, Herbette L, Kihara T, Trentham DR. A new approach to time-resolved studies of ATP-requiring biological systems: laser flash photolysis flash photolysis n. A method of investigating fast photochemical reactions in gases in which a gas is exposed to very brief, intense flashes of light and the resulting products are analyzed spectroscopically. of caged ATP. Proc Natl Acad Sci USA 1980;77:7237-7241. [15] Goldman YE. Kinetics of the actomyosin ATPase in muscle fibers. Annu Rev Physiol. 1987;49:637-654. [16] Powell PL, Roy RR, Kanim P, et al. Predictability of skeletal tension from architectural determinations in guinea hindlimbs. J Appl Physiol. 1984;57:1715-1721. [17] Bodine SC, Roy RR, Meadows DA, et al. Architectural, histochemical, and contractile characteristics of a unique biarticular muscle Biarticular muscles are muscles that work on two joints rather than just one, such as the hamstrings which both extend the hip and flex the knee. : the cat semitendinosus. J Neurophysiol. 1982; 48:192-201. [18] Lieber RL. Skeletal Muscle Structure and Function. Baltimore, Md: Williams & Wilkins; 1992. [19] Sacks RD, Roy RR. Architecture of the hind limb muscles of cats: functional significance. J Morphol. 1982;173:185-195. [20] Roy RR, Medows ID, Baldwin KM, Edgerton VR. Functional significance of compensatory overloaded rat fast muscle. J Appl Physiol. 1982;52:473-478. [21] Wickiewicz TL, Roy RR, Powell PL, Edgerton VR. Muscle architecture of the human lower limb. Clin Orthop. 1983;179:275-283. [22] Friedrich JA, Brand RA. Muscle fiber architecture in the human lower limb. J Biomech. 1990;23:91-95. [23] Brand PW, Beach RB, Thompson DE. Relative tension and potential excursion of muscles in the forearm and hand. J Hand Surg [Am]. 1981;3:209-219. [24] An KN, Hui FC, Morrey BF, et al. Muscles across the elbow joint: a biomechanical analysis J Biomech. 1981;14:659-669. [25] Lieber RL, Fazeli BM, Botte MJ. Architecture of selected wrist flexor flexor /flex·or/ (flek´ser) 1. causing flexion. 2. a muscle that flexes a joint. flexor retina´culum see entries under retinaculum. and extensor muscles Extensor muscles A group of muscles in the forearm that serve to lift or extend the wrist and hand. Tennis elbow results from overuse and inflammation of the tendons that attach these muscles to the outside of the elbow. Mentioned in: Tennis Elbow . J Hand Surg [Am]. 1990; 15:244-250. [26] Lieber RL, Jacobson MD, Fazeli BM. Architecture of selected muscles of the arm and forearm: anatomy and implications for tendon transfer. J Hand Surg [Am]. 1992; 17:787-798. [27] London JT. Kinematics of the elbow. J Bone Joint Surg[Am]. 1981;63:529-535. [28] Nisell R. Mechanics of the knee. Acta Orthop Scand. 1985;56:1-42. [29] Lieber RL, Boakes JL. Sarcomere length and joint kinematics during torque production in the frog hindlimb hindlimb the pelvic limb; back leg. . Am J Physiol. 1988;254: C759-C768. [30] Hoy MG, Zajac FE, Gordon ME. A musculoskeletal musculoskeletal /mus·cu·lo·skel·e·tal/ (-skel´e-t'l) pertaining to or comprising the skeleton and muscles. mus·cu·lo·skel·e·tal adj. Relating to or involving the muscles and the skeleton. model of the human lower extremity: the effect of muscle, tendon, and moment arm on the moment-angle relationship of musculotendon actuators at the hip, knee, and ankle. J Biomech. 1990;23:157-169. [31] Lieber RL, Shoemaker SD. Muscle, joint, and tendon contributions to the torque profile of frog hip joint. Am J Physiol. 1992;263:R586-R590. [32] McClearn D. Anatomy of raccoon raccoon, nocturnal New World mammal of the genus Procyon. The common raccoon of North America, Procyon lotor, also called coon, is found from S Canada to South America, except in parts of the Rocky Mts. and in deserts. (Procyon lotor Procyon lotor see raccoon. ) and caoti (Nasua narica and N nasua) forearm and leg muscles: relations between fiber length, moment-arm length, and joint excursion. J Morphol. 1985;183:87-115. RL Lieber, PhD, is Associate Professor, Department of Orthopaedics, Biomedical Sciences Graduate Group, University of California The University of California has a combined student body of more than 191,000 students, over 1,340,000 living alumni, and a combined systemwide and campus endowment of just over $7.3 billion (8th largest in the United States). at San Diego San Diego (săn dēā`gō), city (1990 pop. 1,110,549), seat of San Diego co., S Calif., on San Diego Bay; inc. 1850. San Diego includes the unincorporated communities of La Jolla and Spring Valley. Coronado is across the bay. School of Medicine and Veterans Administration Medical Center, 3350 La Jolla La Jolla (lə hoi`yə), on the Pacific Ocean, S Calif., an uninc. district within the confines of San Diego; founded 1869. The beautiful ocean beaches, in particular La Jolla shores and Black's Beach, and sea-washed caves attract visitors and Village Dr, San Diego, CA 92161 (USA). Address all correspondence to Dr Lieber. SC Bodine-Fowler, PhD, is Assistant Professor, Department of Orthopaedics, Biomedical Sciences Graduate Group, University of California at San Diego School of Medicine and Veterans Administration Medical Center. This work was supported by the Veterans Administration and National Institutes of Health Grants AR34192 and AR40050. |
|
||||||||||||||||
Printer friendly
Cite/link
Email
Feedback
Reader Opinion