FE Review – Dynamics 1/4 Kinematicsdzhou/FE review/00 All -FE-Review.pdf · – Energy and work 2...

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1 1 FE Review – Dynamics 1/4 Kinematics By Dr. Debao Zhou Department of Mechanical & Industrial Engineering University of Minnesota Duluth References – Kinematics – Kinetics Kinetics of rotational motion Energy and work 2 FE Supplied-Reference Handbook, Page 54-61 Website: https://moodle.umn.edu/course/view.php?id=7988 Sections 14-17 Slides also Available at Kinematics http://www.d.umn.edu/~dzhou/01Kenematics1.pdf Kinetics http://www.d.umn.edu/~dzhou/02Kinetics1.pdf Kinetics of rotational motion http://www.d.umn.edu/~dzhou/03KineticsofRotational1.pdf Energy and work http://www.d.umn.edu/~dzhou/04Energy1.pdf 3 Some Tricks Only the results Unit: make the unit consistent Confused data Keep your drafts Concepts/Formula/Multi-ways, with the aid of index Try to draw a diagram, illustration, etc. – Free body diagram 4 Dynamics - Scope 5 Dynamics - Study of moving objects Kinematics: Motion (Position, velocity and acceleration), Independent of force Particle kinematics Rigid body kinematics Kinetics: Force and mass for translational motion (particle, body) Torque and moment of inertia for rotational motion (body) Energy and Work Capability of the mass to do work: All kinds of energy Translational motion Position, velocity and acceleration, mass, force, friction Momentum, impact, work, energy And change with time Rotational motion Angle, angular velocity and angular acceleration, inertia, moment (torque), friction Angular momentum, impulse, impact, work, energy And change with time Combination of translational motion and rotational motion Multi-body: Instant velocity center. etc Kinematics: Position, Velocity and Acceleration 6 International System of Units (SI): http://en.wikipedia.org/wiki/International_System_of_Units US Units (U.S.) http://en.wikipedia.org/wiki/United_States_customary_units Relationship: http://www.about.ch/various/unit_conversion.html

Transcript of FE Review – Dynamics 1/4 Kinematicsdzhou/FE review/00 All -FE-Review.pdf · – Energy and work 2...

Page 1: FE Review – Dynamics 1/4 Kinematicsdzhou/FE review/00 All -FE-Review.pdf · – Energy and work 2 FE Supplied-Reference Handbook, Page 54-61 ... 14 Example -3 • The position (in

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FE Review – Dynamics 1/4 Kinematics

By Dr. Debao Zhou

Department of Mechanical & Industrial EngineeringUniversity of Minnesota Duluth

References

– Kinematics

– Kinetics

– Kinetics of rotational motion

– Energy and work

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FE Supplied-Reference Handbook, Page 54-61

Website: https://moodle.umn.edu/course/view.php?id=7988

Sections 14-17

Slides also Available at

• Kinematics– http://www.d.umn.edu/~dzhou/01Kenematics1.pdf

• Kinetics– http://www.d.umn.edu/~dzhou/02Kinetics1.pdf

• Kinetics of rotational motion– http://www.d.umn.edu/~dzhou/03KineticsofRotational1.pdf

• Energy and work– http://www.d.umn.edu/~dzhou/04Energy1.pdf

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Some Tricks

• Only the results

• Unit: make the unit consistent

• Confused data

• Keep your drafts

• Concepts/Formula/Multi-ways, with the aid of index

• Try to draw a diagram, illustration, etc.– Free body diagram

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Dynamics - Scope

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• Dynamics - Study of moving objects

• Kinematics: Motion (Position, velocity and acceleration), Independent of force – Particle kinematics– Rigid body kinematics

• Kinetics: – Force and mass for translational motion (particle, body)– Torque and moment of inertia for rotational motion (body)

• Energy and Work– Capability of the mass to do work: All kinds of energy

• Translational motion – Position, velocity and acceleration, mass, force, friction– Momentum, impact, work, energy – And change with time

• Rotational motion – Angle, angular velocity and angular acceleration, inertia, moment (torque), friction– Angular momentum, impulse, impact, work, energy– And change with time

• Combination of translational motion and rotational motion – Multi-body: Instant velocity center. etc

Kinematics: Position, Velocity and Acceleration

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International System of Units (SI): http://en.wikipedia.org/wiki/International_System_of_Units

US Units (U.S.)http://en.wikipedia.org/wiki/United_States_customary_units

Relationship: http://www.about.ch/various/unit_conversion.html

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Kinematics: Position, Velocity and Acceleration

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Position, Velocity and Acceleration

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Constant Acceleration

Linear motion Rotational motion

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ConstantConstant

Circular motion• They have the same relationship as linear system

• Relation between linear and rotation variables

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Project Motion

• Trajectory– Vertical

acceleration

Only

• Acceleration

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Example -1

• Problems 1-2 refer to a particle whose curvilinear motion is represented by the equation s = 20t + 4t2 – 3t3.

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Example -2

• A motorist is traveling at 70 km/ h when he sees a traffic light in an intersection 250 m ahead turn red. The light 's red cycle is 15 s. The motorist wants to enter the intersection without stopping his vehicle, just as the light turns green.

What uniform deceleration of the vehicle will just put the motorist in the intersection when the light turns green?

(A) 0.18 m/s2

(B) 0.25 m/s2

(C) 0.37 m/s2

(D) 1.3 m/s2

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250 m @ Time 15 s

V0 = 70 km/ h

Example -2

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Example -3

• The position (in radians) of a car traveling around a curve is described by the following function of time (in seconds). (t) = t3 - 2t2 - 4t + 10

What is the angular velocity at t = 3 s?

(A) -16 rad/ s

(B) - 4 rad / s

(C) 11 rad/ s

(D) 15 rad/ s

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Example -4

• A flywheel rotates at 7200 rev/min when the power is suddenly cut off. The flywheel decelerates at a constant rate of 2.1 rad/s2 and comes to rest 6 min later. How many revolutions does the flywheel make before coming to rest?

(A) 18 000 rev

(B) 22 000 rev

(C) 72 000 rev

(D) 390 000 rev

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What are given?Formula?Unit? Solution

Example -4

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Example 5

• Rigid link AB is 12 m long. It rotates counterclockwise about point A at 12 rev/min. A thin disk with radius 1. 75 m is pinned at its center to the link at point B. The disk rotates counterclockwise at 60 rev/ min with respect to point B. What is the maximum tangential velocity seen by any point on the disk?

(A) 6 m/s

(B) 26 m/s

(C) 33 m/ s

(D) 45 m/s

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What are given?Formula?Unit? Solution

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Example 5

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Example -6

• A projectile is fired from a cannon with an initial velocity of 1000 m/ s and at an angle of 30° from the horizontal. What distance from the cannon will the projectile strike the ground if the point of impact is 1500 m below the point of release?

(A) 8200 m

(B) 67300 m

(C) 78200 m

(D) 90800 m

What are given?Formula?Unit? Solution

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FE Review – Dynamics 2/4Kinetics

By Dr. Debao Zhou

Department of Mechanical & Industrial EngineeringUniversity of Minnesota Duluth

Kinetics: Scope

• Kinetics: motion and force that cause motion

• Momentum– Linear momentum and angular momentum– Law of conservation of momentum

• Newton’s first and second law of motion– Acceleration is zero or not

• Weight– The force the object exerts due to its position in a gravitational field

– gc is the gravitational constant, approximately 32.2 lbm ft / lbf-sec2.

• Friction• Particles: tangential and normal components• Free Vibration

Kinetics: SI and US Units

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Kinetics: Unit Linear Momentum or Momentum

• Definition:

• Law of conservation of momentum– The linear momentum is unchanged if no

unbalanced forces act on the particle.

– This does not prohibit the mass and velocity from changing. However, only the product of mass and velocity is constant.

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?

SI: N-sec

U.S.: lbf-sec

Newton's Law of Motion

• Newton's first law of motion

– A particle will remain in a state of rest or will continue to move with constant velocity unless an unbalanced external force acts on it.

• Constant velocity unless an unbalanced external force acts on it.

• Law of conservation of momentum

• Newton's second law of motion

– The acceleration of a particle is directly proportional to the force acting on it and is inversely proportional to the particle mass.

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Kinetics of Particle

• Rectangular Coordinates

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• Tangential and Normal Components

• Radial and Transverse Components

Constant Fx

Free vibration

• Natural (or free) vibration.

• Forced vibration.

• Natural frequency

– Or angular frequency

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Internal force

Friction

• Always resists motion

• Parallel to the contacting surfaces

• Dynamic friction

• Static friction

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75%

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Example -1

• A car with a mass of 1530 kg tows a trailer (mass of 200 kg) at 100 km/ h. What is the total momentum of the car-trailer combination?

(A) 4 600 N·s

(B) 22 000 N·s

(C) 37 000 N·s

(D) 48 000 N·s

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What are given?Formula?Unit? Solution

Example -2

• A car is pulling a trailer at 100 km/ h. A 5 kg cat riding on the roof of the car jumps from the car to the trailer. What is the change in the cat's momentum (when it is on the car and trailer)?

(A) -25 N·s (loss)

(B) 0 N·s

(C) 25 N-s (gain)

(D) 1300 N- s (gain)

• The law of conservation of momentum states that the linear momentum is unchanged if no unbalanced forces act on an object. This does not prohibit the mass and velocity from changing; only the product of mass and velocity is constant. In this case, both the total mass and the velocity are constant . Thus, there is no change.

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System? What is the whole thing you are considering?

Example -3

• For which of the following situations is the net force acting on a particle necessarily equal to zero?A. The particle is travelling at constant velocity

around a circle

B. The particle has constant linear momentum

C. The particle has constant kinetic energy

D. The particle has constant angular momentum

Vector!!!

Example -4

• A 3500 kg car accelerates from rest. The constant forward tractiveforce of the car is 1000 N, and the constant drag force is 150 N. What distance will the car travel in 3s?

(A) 0.19 m

(B) 1.1 m

(C) 1.3 m

(D) 15 m

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1000N 150N

3500 kg

Example - 5

• A 5 kg block begins from rest and slides down an inclined plane. After 4s, the block has a velocity of 6 m/s.

If the angle of inclination is 45°; how far has the block traveled after 4s?

(A) 1.5 m

(B) 3 m

(C) 6 m

(D) 12 m

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Example -6

• What is the coefficient of friction between the plane and the block?

(A) 0.15

(B) 0.22

(C) 0.78

(D) 0.85

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Example -7

• A constant force of 750 N is applied through a pulley system to lift a mass of 50 kg as shown. Neglecting the mass and friction of the pulley system, what is the acceleration of the 50 kg mass?

(A) 5.20 m/s2; (B) 8.72 m/ s2; (C) 16.2 m/s2; (D) 20.2 m/s2

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Example -8• A spring has a constant of 50 N/ m. The spring is hung vertically, and

a mass is attached to its end. The spring end displaces 30 cm from its equilibrium position. The same mass is removed from the first spring and attached to the end of a second (different) spring, and the displacement is 25 cm. What is the spring constant of the second spring?

(A) 46 N/m

(B) 56 N/m

(C) 60 N/m

(D) 63 N/m

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What is the period of a pendulum that passes the center point 20 times a minute?

(A) 0.2 s(B) 0.3 s(C) 3 s(D) 6 s

Example -9

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Example -10

• A mass of 10 kg is suspended from a vertical spring with a spring constant of 10 N/ m. What is the period of vibration?

(A) 0.30 s

(B) 0.60 s

(C) 0.90 s

(D) 6.3 s

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FE Review – Dynamics 3/4Kinetics of Rotational Motion

By Dr. Debao Zhou

Department of Mechanical & Industrial EngineeringUniversity of Minnesota Duluth

Kinetics of Rotational Motion - Scope

• Mass moment of inertia– Parallel axis theorem– Radius of gyration

• Planar motion of rigid body– Angular momentum and moment (torque)– Instant center (velocity)

• Centrifugal force• Banking angle• Torsion vibration

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Mass Moment of Inertia

• Respect to the x-, y- , and z-axes

• Centroid mass moment of inertia– When the origin of the axes coincides with

the object 's center of gravity

• Parallel axis theorem

• Radius of gyrationThe distance from the rotational axis at

which the object’s entire mass could be

located without changing the mass moment of inertia.

• Table 16.1 (at the end of this chapter) lists the mass moments of inertia and radii of gyration for some standard shapes. 43

dmyxI

dmzxI

dmzyI

z

y

x

22

22

22

2 mdII caxisparallelany

mIrmrI 2

Remember the definition and formula – 3D ( 2D)

http://en.wikipedia.org/wiki/Moment_of_inertia

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Rotation About a Fixed Axis

• Rotation describes a motion in which all particles within the body move in concentric circles about the axis of rotation.

• Angular momentum taken about a point O (fixed point)

– Moment of the linear momentum vector

• Moment (torque), M

• Conservation• Similar to Newton’s first/second law

• From translational motion to rotational motion 45

Constant M

?

Instantaneous Center of Rotation

• For angular velocities, the body seems to rotate about a fixed instantaneous center

• Lines drawn perpendicular to these two velocities will intersect at the instantaneous center

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Centrifugal Force

• The force associated with the normal acceleration is known as the centripetal force– A real force

• The so-called centrifugal force is an apparent force on the body directed away from the center of rotation – Acceleration force

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Banking of Curves

• http://farside.ph.utexas.edu/teaching/301/lectures/node92.html

• For small banking angles, the maximum frictional force is

• If the roadway is banked so that friction is not required to resist the centrifugal force, the superelevation angle, , can be calculated from

48

WNF ssf

gr

vt2

)tan(

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Torsional Free Vibration

• Dynamic equation

• Solution

• Natural frequency

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02 n

LI

GJ

I

ktn 2

ttt nn

n sincos)( 0

0

• A 50 kg cylinder has a height of 3m and a radius of 50cm. The cylinder sits on the x-axis and is oriented with its major axis parallel to the y-axis. What is the mass moment of inertia about the x-axis?

(A) 4.1 kg·m2

(B) 16 kg·m2

(C) 41 kg·m2

(D) 150 kg·m2

Example - 1

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Example - 2

• A 3 kg disk with a diameter of 0.6 m is rigidly attached at point B to a 1 kg rod 1 m in length. The rod-disk combination rotates around point A. What is the mass moment of inertia about point A for the combination?(A) 0.47 kg·m2

(B) 0.56 kg ·m2

(C) 0.87 kg·m2

(D) 3.7 kg·m2

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Example -3

Why does a spinning ice skater 's angular velocity increase as she brings her arms in toward the body:

(A) Her mass moment of inertia is reduced.

(B) Her angular momentum is constant.

(C) Her radius of gyration is reduced.

(D) all of the above

As the skater brings her arms in, her radius of gyration and mass moment of inert is decrease. However, in the absence of friction, her angular momentum h, is constant . From

Since angular velocity, , is inversely proportional to the mass moment of inertia, the angular velocity increases when the mass moment of inertia decreases.

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I

h

Example -4

• A wheel with a radius of 0.75 m starts from rest and accelerates clockwise. The angular acceleration (in rad/s2) of the wheel is defined by = 6t - 4. What is the resultant linear acceleration of a point on the wheel rim at t = 2 s?

(A) 6 m/ s2

(B) 12 m/ s2

(C) 13 m/ s2

(D) 18 m/ s2

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B

Example -4

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Example -5

• A uniform rod (AB) of length L and weight W is pinned at point C and restrained by cable OA. The cable is suddenly cut. The rod starts to rotate about point C, with point A moving down and point B moving up. What is the instantaneous linear acceleration of point B?

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Free body diagram

Example -5

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• A wheel with a 0.75 m radius has a mass of 200 kg. The wheel is pinned at its center and has a radius of gyration of 0.25 m. A rope is wrapped around the wheel and supports a hanging 100 kg block. When the wheel is released, the rope begins to unwind. What is the angular acceleration of the wheel?

(A) 5.9 rad/s2

(B) 6.5 rad/s2

(C) 11 rad/s2

(D) 14 rad/s2

Example 6

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Free body diagram

mblockg

F

F

Example 6

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Example -7

• Two 2 kg blocks are linked as shown. Assuming that the surfaces are frictionless. what is the velocity of block B if block A is moving at a speed of 3 m/ s?

A) 0 m/s; (B) 1.30 m/s; (C) 1.73 m/s; (D) 5.20 m/s

• The instantaneous center of rotation for the slider rod assembly can be found by extending perpendiculars from the velocity vectors, as shown. Both blocks can be assumed to rotate about point C with angular velocity .

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Example - 8

• A disk rolls along a flat surface at a constant speed of 10 m/s. Its diameter is 0.5 m. At a particular instant, point P on the edge of the disk is 45° from the horizontal. What is the velocity of point P at that instant?

(A) 10.0 m/s, (B) 15.0 m/s; (C) 16 .2 m/s; (D) 18.5 m/s

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Example 9

• An automobile travels on a perfectly horizontal, unbanked circular track of radius r. The coefficient of friction between the tires and the track is 0.3. If the car's velocity is 10 m/s, what is the smallest radius it may travel without skidding?

• (A) 10 m; (B) 34 m; (C) 50 m; (D) 68 m

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Example 10

• Traffic travels at 100 km/ h around a banked highway curve with a radius of 1000 m. What banking angle is necessary such that friction will not be required to resist the centrifugal force?

(A) 1.4°; (B) 2.8°; (C) 4.5°; (D) 46°

• Since there is no friction force , the superelevation angle, , can be determined directly.

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A torsional pendulum consists of a 5 kg uniform disk with a diameter of 50 cm attached at its center to a rod 1.5 m in length. The torsional spring constant is 0.625 N·m/ rad. Disregarding the mass of the rod, what is thenatural frequency of the torsional pendulum?(A) 1.0 rad/ s; (B) 1.2 rad/ s; (C) 1.4 rad/ s; (D) 2.0 rad/ s

Example 11

63 64

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FE Review – Dynamics 4/4

Energy and Work

By Dr. Debao ZhouDepartment of Mechanical & Industrial Engineering

University of Minnesota Duluth

Energy and Work - Scope

• Definition of energy, work, and power– Kinetic Energy

– Potential Energy

– Elastic Potential Energy

• Energy conservation principle

• Linear impulse

• Impact

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Energy and Work

• The energy of a mass represents the capacity of the mass to do work– Mechanical

– Positive, scalar quantity

• Thermal, electrical and magnetic, etc.

• Work, W, is the act of changing the energy of a mass– Definition:

– Signed, scalar quantity

– Positive or negative 67

rF dW

Energy

• Kinetic energy is the sum of the translational and rotational forms– Linear kinetic energy

– Rotational kinetic energy

• Potential energy– A form of mechanical energy possessed by a mass due

to its relative position in a gravitational field.

• Elastic potential energy

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[SI] mghPE

)(

2

1

21

2212

2

xxkUU

kxPE

2

21

2212

2

2

1

2/)(

2/

IR

vvmTT

mvT

KE

Energy Conservation Principle

• Work-energy principle

• Energy Conservation Principle: Law of conservation of energy– Ti and Ui are, respectively, the kinetic and potential energy of a

particle at state i, if no external work has been done, then

– Energy cannot be created or destroyed

– Energy can be transformed into different forms

– The total energy of the mass is equal to the sum of the potential (gravitational and elastic) and kinetic energies

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21112212 WUTUTEEW

1122 constant UTUTE

• A vector quantity equal to the change in (linear) momentum.

• Impulse-momentum principle– The change in momentum is equal to the impulse

– Newton’s second law

• Conservation of linear impulse when F=0• Newton’s first law

Linear Impulse

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Constant F

?

Impact

• In an impact or collision, contact is very brief, and the effect of externalforces is insignificant. Therefore, momentum is conserved. Even though energy may be lost through heat generation and deforming the bodies.

– An inelastic impact if kinetic energy is lost .

– The impact is said to be perfectly inelastic or perfectly plastic if the two particles stick together and move on with the same final velocity.

– The impact is said to be an elastic impact only if kinetic energy is conserved.

• Coefficient of restitution, e:

– The ratio of relative velocity differences along a mutual straight line.

– The collision is inelastic if e < 1.0, perfectly inelastic if e = 0, and elastic if e = 1.0

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Example - 0

• A 1500 kg car traveling at 100 km/h is towing a 250 kg trailer. The coefficient of friction between the tires and the road is 0.8 for both the car and trailer.

What energy is dissipated by the brakes if the car and trailer are braked to a complete stop?

(A) 96 kJ; (B) 385 kJ; (C) 579 kJ; (D) 675 kJ;

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Problems 1-4 refer to the following situation.• The mass m in the following illustration is guided by

the frictionless rail and has a mass of 40kg.• The spring constant, k, is 3000 N/m.• The spring is compressed sufficiently and released,

such that the mass barely reaches point B.

1. What is the initial spring compression?(A) 0.96 m(B) 1.3 m(C) 1.4 m(D) 1.8 m

Example -1

73

Example -1

74

2. What is the kinetic energy of the mass at point A?(A) 19.8 J(B) 219 J(C) 392 J(D) 2350 J

Example -1

75

3. What is t he velocity of the mass at point A?(A) 3.13 m/s(B) 4.43 m/ s(C) 9.80 m/s(D) 19.6 m/ s

Example -1

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4. What is the energy stored in the spring if the spring is compressed 0.5 m?(A) 375 J(B) 750 J(C) 1500 J(D) 2100 J

Example -2

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A 3500 kg car traveling at 65 km/ h skids and hits a wall 3s later. The coefficient of friction between the tires and the road is 0.60.

Assuming that the speed of the car when it hits the wall is 0.20 m/s, what energy must the bumper absorb in order to prevent damage to the car?(A) 70 J(B) 140 J(C) 220 J(D) 360 kJ

A 12 kg aluminum box is dropped from rest onto a large wooden beam. The box travels 20 cm before contacting the beam. After impact, the box bounces 5 cm above the beam's surface. What impulse does the beam impart on the box?

(A) 8.6 N·s(B) 12 N·s(C) 36 N·s(D) 42 N·s

Example -3

78

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A 3500 kg car traveling at 65 km/ h skids and hits a wall 3 s later. The coefficient of friction between the tires and the road is 0.60.

What is the speed of the car when it hits the wall?(A) 0.14 m/s; (B) 0.40 m/s; (C) 5.1 m/ s; (D) 6.2 m/ s

Example -4

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A 60000 kg railcar moving at 1 km/h is instantaneously coupled to a stationary 40000 kg railcar. What is the speed of the coupled cars?(A) 0.40 km/ h(B) 0.60 km/ h(C) 0.88 km/ h(D) 1.0 km/ h

Example -5

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A hockey puck traveling at 30 km/h hits a massive wall at an angle of 30° from the wall. What are its final velocity and deflection angle if the coefficient of restitution is 0.63?(A) 9.5 km/ h at 30°(B) 19 km/h at 30°(C) 28 km/h at 20°(D) 30 km/ h at 20°

Example -6

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