1. Chapter 12:�The Conditions of �Linear Motion Nature of Force, Newton’s Laws, Forces The modify Motion, Free Body Diagrams, Work, Power, and Energy, The Analysis of Linear Motion,
2. Objectives 1. Name, define, and use the terms of linear motion
2. Define magnitude, direction, and point of application of force and use terms properly
3. Explain changes magnitude, direction, and point of application of force on the motion state of a body
4. Define and give examples of linear forces, concurrent forces, and parallel forces
5. Determine magnitude, direction, and point of application of muscles forces
6. State Newton’s laws as they apply to linear motion
3. Objectives 7. Explain cause and effect relationship between forces of linear motion and objects experiencing the motion
8. Name & define basic external forces that modify motion
9. Draw and analyze a 2D free-body diagrams
10. Explain work-energy relationship applied to a body experiencing linear motion
11. Define and use properly the terms work, power, kinetic energy, and potential energy
12. Perform a mechanical analysis of a motor skill
4. THE NATURE OF FORCE Force is that which pushes or pulls through direct mechanical contact or through the force of gravity to alter the motion of an object
Internal forces are muscle forces that act on various structure of the body
External forces are those outside the body
Weight, gravity, air or water resistance, friction, or forces of other objects acting on the body
5. Aspects of Force Force is a vector quantity
Magnitude, and Direction
Also a Point of Application
All three characteristics must be identified
For a weight lifter to lift a 250 N barbell
Lifter must apply a force greater than 250 N, in an upward direction, through the center of gravity of the barbell
6. Magnitude Amount of force being applied
Force exerted by the barbell had a magnitude of 250 N
This force was the result of gravity acting on the mass of the barbell
In this since, force is referred to as weight
Weight is mass times acceleration due to gravity
7. Magnitude of Muscular Force Direct proportion to the number & size of fibers contracting in a muscle
Muscles normally act in groups
Their force or strength is measured collectively
Maximum muscular strength is measured by a dynamometer
Measures force applied by a group of muscle through an anatomical lever
8. Point of Application Point at which force is applied to an object
Where gravity is concerned this point is always through the center of gravity
For muscular force, that point is assumed to be the muscle’s attachment to a bony lever
Technically, it is the point of intersection of
line of force and
mechanical axis of the bone
9. Direction Direction of a force is along its action line
Direction of gravity is vertically downward
Gravity is a downward-directed vector starting at the center of gravity of the object
Direction of muscular force vector is the direction of line of pull of the muscle
10. Direction of Muscular �Force Vector Muscle angle of pull: angle between line of pull and the portion of mechanical axis between the point of application and the joint
11. Resolution of �Forces Magnitude is line A
Point of application is at point B
Direction is represented by the arrowhead and the angle ?
12. Angle of Pull Force may be resolved into a vertical and a horizontal component
Size of each depends on angle of pull
A muscle’s angle of pull changes with every degree of joint motion
So do the horizontal & vertical components
The larger the angle (00 - 900), the greater the vertical and less the horizontal components
13. Angle of Pull Vertical component is perpendicular to the lever, called rotary component
Horizontal component is parallel to the lever and is the nonrotary component
Most resting muscles have an angle of pull < 900
14. Rotary vs. Nonrotary Components Angle of pull < 900
Nonrotary force is directed toward fulcrum
Stabilizing effect
Helps maintain integrity of the joint
15. Rotary vs. Nonrotary Components Angle of pull > 900
Nonrotary force is directed away fulcrum
Dislocating component
Does not occur often
Muscle is at limit of shortening range and not exerting much force
16. Rotary vs. Nonrotary Components Angle of pull = 900
Force is all rotary
Angle of pull = 450
Rotary & nonrotary components are equal
Muscular force functions:
Movement
Stabilization
17. Anatomical Pulley Changes the angle of pull of the muscle providing the force
This increase in angle of pull increases the rotary component
Patella for the quadriceps
18. Resolution of External Forces Accomplished in the same manner as muscular forces applied at oblique angle
Only horizontal force will move table
Vertical force serves to increase friction
19. Composite Effects of �Two or More Forces Two or more forces can be applied to objects
A punted ball’s path is the result of force of the kick, force or gravity, and force of wind
A muscle rarely act by itself
Usually muscle work in combination
Composite forces on the body may be classified according to their direction and application as linear, concurrent, or parallel
20. Linear Forces Forces applied in the same direction, the resultant is the sum of the forces
a + b = c
Forces applied in the opposite direction, the resultant is the sum of the forces
a + (-b) = c
21. Concurrent Forces Acting at the same point of application at different angles
Resultant of Two or more concurrent forces depends on both the magnitude of each force and the angle of application
22. Parallel Forces Forces not in the same action line, but parallel to each other
Three parallel forces
two upward
one downward
23. Parallel Forces 10 N weight at 900
Gravity at points B & C
A is the force of biceps
Effect of parallel forces on an object depends on magnitude, direction & application point of each force
24. NEWTONS’ LAWS OF MOTION�Law of Inertia A body continues in its state of rest or of uniform
motion unless an unbalanced force acts on it
An object at rest remains at rest
An object in motion remains in same motion
Unless acted on by a force
Friction & air resistance effect objects in motion
25. Law of Inertia A body continues in its state of rest or of uniform motion unless an unbalanced force acts on it
26. Law of Acceleration F = ma The acceleration of an object is directly proportional to the force causing it and inversely proportional to the mass of the object
What is the force needed to produce a given linear acceleration?
Since m = w/g, F = (w/g) x a
Force to accelerate a 300 N object 2 m/sec2
F = (300 N / 9.8m/s2) x 2 m/s2 = 61 N
27. Impulse Ft = m(v – u) The product of force and the time it is applied
F = ma
Substitute (v – u) / t for a
F= M(v – u) / t
Multiply both sides by time
Ft = m(u – v)
28. Momentum Ft = mv - mu The product of mass and velocity
20 N force falling for 5 sec has equal momentum as 100 N force falling for 1 sec
Any change in momentum, is equal to the impulse that produces it
Force applied in direction of motion will increase momentum
Force applied opposite to direction of motion will decrease momentum
29. Law of Reaction For every action there is an equal and opposite reaction
30. Conservation of Momentum In any system where forces act on each other the momentum is constant
An equal and opposite momentum change must occur to object producing reactive force
Therefore:
m1v1 – m1v1 = m2v2 – m2v2
31. Summation of Forces Force generated by muscle may be summated form one segment to another
Typical throwing pattern
Force from legs is transferred to the trunk
Further muscular force ? momentum, and is transferred to upper arm
Mainly as an ? velocity because mass is ?
Sequential transfer of momentum continues with mass decreasing and velocity increasing
Until momentum is transferred to thrown ball
32. FORCES THAT MODIFY MOTION�Weight The force of gravity is measured as the weight of the body applied through the center of gravity of the body and directed toward the earth’s axis
W = mg
33. Contact Forces:�Normal Reaction For every action there is an equal and opposite reaction
The jumper pushes off the ground and the ground pushes back
34. Contact Forces:�Friction Friction is the force that opposes efforts to slide or rill one body over another
Some cases we try to increase friction for a more effective performance
Other cases we try to decrease friction for a more effective performance
The amount of friction depends on the nature of the surface and the forces pressing them together
35. Friction Friction is proportional to the force pressing two surface together
Force of friction acts parallel to the surfaces and opposite to the direction of motion
36. Coefficient of friction, ? The ratio of force needed to overcome the friction, P, to the force holding the surface together, W
? = P / W
Large coefficient surfaces cling together
Small coefficient surfaces slide easily
Coefficient of 0.0 = frictionless surface
37. Coefficient of Friction May be found by
Placing one object on a second and tilt the second until first begins to slide
The tangent of the angle with horizontal is the coefficient of friction
38. Elasticity and Rebound Objects rebound is a predictable manner
The nature of rebound is governed by elasticity, mass, and velocity of rebounding surface, friction between surface, and angle of contact
Elasticity is the ability to resist distorting influences and to return to its original size and shape
39. Elasticity and Rebound Stress is the force that acts to distort
Strain is the distortion that occurs
Stress may take the form of tension, compression, bending, or torsion
40. Coefficient of Elasticity Is defined as the stress divided by the strain
Most commonly determined in the compression of balls by comparing drop height with the bounce height
The closer to 1.0 the more perfect the elasticity
41. Coefficient of Elasticity Also may be found using the Law of Conservation of Momentum
Using the change in velocity of the two objects, assuming masses remain constant
Where v2 and v1 are velocities after impact, and u1 and u2 are velocities before impact
42. Angle of Rebound For a perfectly elastic object,
The angle of incidence (striking) is equal to the angle of reflection (rebound)
As coefficient of elasticity varies variations will occur
43. Effects of Spin on Bounce A ball with topspin will rebound form horizontal surface lower and with more horizontal velocity
A ball with backspin will rebound higher and with less horizontal velocity
A ball with no spin will develop topspin
A ball with topspin will gain more topspin
A ball with backspin may be stopped or reversed
Spinning balls hitting vertical surface will react in the same manner, as with horizontal surfaces, but in relation to the vertical surface
44. Fluid Forces Water and air are both fluids and as such are subject to many of the same laws and principles
The fluid forces of buoyancy, drag, and lift apply in both mediums and have considerable effect on the movements of the human body
45. Buoyancy Archimedes’ Principle states: a body immersed in a liquid is buoyed up by a force equal to the weight of the liquid displaced
This explains why something float and something sink
Density is a ratio of the weight of an object and its volume
46. Specific gravity Ratio of the density of an object and density of water
An object the same weight and volume as water has a specific gravity of 1.0
An object with specific gravity > 1.0 will sink
An object with specific gravity < 1.0 will float
47. Lift and Drag Drag is the resistance to forward motion
Result of
fluid pressure on the leading edge of the object
amount of backward pull produced by turbulence on the trailing edge
48. Lift and Drag Laminar flow is a smooth, unbroken flow of fluid around an object
A smooth surface will have better laminar flow than a rough surface, resulting in less drag
49. Lift and Drag Lift is the result of changes in fluid pressure as the result of difference in air flow velocities
Bernoulli’s Principle states: the pressure in a moving fluid decreases as the speed increases
50. Ball Spin Bernoulli’s Principle applies here also
A ball will move in the direction of least air pressure
A ball spinning drags a boundary layer of air with it, causing air to move faster, reducing pressure on one side
51. FREE BODY DIAGRAMS In analyzing any technique, one should consider all external forces, by accounting for effect of each one of the body
The isolated body is considered a separate mechanical system
Easier to identify forces & represent as vectors
Can help determine the application and direction of forces acting on the body
52. Direction & Point of Application of External Forces
53. Free Body Diagram Magnitude
arrow length
Direction
arrow head
Point of application
arrow tail
Weight (W)
Reactive force (R)
Friction (F)
54. Free Body Diagram Weight (W)
Buoyancy (B)
Lift (L)
Drag (D)
State of motion or rest of the body depends on the vector sum of all these forces
55. Free Body �Diagram Also used to show forces on a body segment
Thigh isolated
Weight of thigh (W)
Muscle force Hip (MH)
Reactive Forces
Hip (Hx & Hy)
Knee (Kx & Ky))
56. WORK, POWER, AND ENERGY�Work Work is the product of force expended and the distance force is applied
W = Fs
Work (W), Force (F), Distance (s)
Units any combination of force & distance
foot/pounds,
joule = 107 x 1 gram / 1 centimeter
57. Work 20N suitcase place on a shelf 2m high
Work = 40Nm
Same suitcase lifted along a 4m incline is still 40Nm of work
Horizontal distance not included
58. Positive & Negative Work Positive work – work done in the same direction that the body moves
overcoming gravity is more work
Negative work – in the opposite direction
resisting gravity is less work
One performs more work walking up a mountain than walking back down
59. Mechanical Muscular Work Example: a rectangular muscle 10 cm x 3 cm, that exerts 240N of force
Average muscle fiber shortens ½ its length
W = Fs
W = 240N x 5cm
W = 1200N-cm or 120 Nm
60. Force per Muscle Cross Section IF force of the muscle is not known, it is computed form the muscle’s cross section
Example: Assume same muscle is 1cm thick
Cross section = width x thickness
3cm X 1 cm = 3 sq cm
Average force = 360 N per sq cm
F = 360 x 3 = 1080N
W = Fs
W = 1080N x 5cm = 5400 N cm or 540 Nm
61. Muscular Work Internal structure of the muscle is rectangular
A simple geometric cross-sectional measure could be used
For penniform & bipenniform muscle, physiological cross section must be determined
s - represents ½ the length of average fiber
Force per square inch depends on whose research the student accepts
62. Muscle Work by �Physiological Cross Section (PCS) W = Average force x PCS (sq cm) x ½ length of fibers (cm)
Divide by 100 to convert N-cm to Nm
W (Nm) = 360 x PCS (sq cm) x ½ fiber length (cm)
100
63. Power The rate at which work is done
P = Fs / t or P = W / t or P = Fv
P = Power t = time
W = work v = velocity = s / t
64. Energy The capacity to do work
Law of Conservation of Energy:
The total amount of energy possessed by a body or an isolated system remains constant
65. Potential Energy Potential energy is the product of the force an object has and the distance over which it can act
PE = mgh
m = mass, g = gravity, h = height
66. Kinetic Energy The energy due to its motion
KE = ½ mv2
m = mass, v = velocity
Work done is equal to the kinetic energy acquired, or
Fs = ½ mv2
67. ANALYSIS OF LINEAR MOTION First identify the nature of the force involved in the motion of interest
Weight, Propulsive forces, Normal reaction, Friction, Buoyancy, Drag, & Lift
68. ANALYSIS OF LINEAR MOTION The principles that govern the mechanical aspect of a movement performance can be summarized by examining some of the basic concepts involved in the kinetic of linear motion
Inertia, Impulse, Work, & Kinetic Energy
