Introduction to Work. Energy and Work A body experiences a change in energy when one or more forces do work on it. A body must move under the influence.

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Presentation transcript:

Introduction to Work

Energy and Work A body experiences a change in energy when one or more forces do work on it. A body must move under the influence of a force or forces to say work was done. A force does positive work on a body when the force and the displacement are at least partially aligned. Maximum positive work is done when a force and a displacement are in exactly the same direction. If a force causes no displacement, it does zero work. Forces can do negative work if they are pointed opposite the direction of the displacement.

Calculating Work in Physics B If a force on an object is at least partially aligned with the displacement of the object, positive work is done by the force. The amount of work done depends on the magnitude of the force, the magnitude of the displacement, and the degree of alignment. W= F r cos  r F  F 

Forces can do positive or negative work. When the load goes up, gravity does negative work and the crane does positive work. When the load goes down, gravity does positive work and the crane does negative work. Ranking Task 11 mgmg F

Units of Work SI System:  Joule (N m) British System:  foot-pound cgs System:  erg (dyne-cm) Atomic Level:  electron-Volt (eV)

Problem: A droplet of water of mass 50 mg falls at constant speed under the influence of gravity and air resistance. After the drop has fallen 1.0 km, what is the work done by a) gravity and b) air resistance?

Problem: A sled loaded with bricks has a mass of 20.0 kg. It is pulled at constant speed by a rope inclined at 25 o above the horizontal, and it moves a distance of 100 m on a horizontal surface. If the coefficient of kinetic friction between the sled and the ground is 0.40, calculate a)The tension in the rope. b)The work done by the rope on the sled c)The work done by friction on the sled.

Work and a Pulley System A pulley system, which has at least one pulley attached to the load, can be used to reduce the force necessary to lift a load. Amount of work done in lifting the load is not changed. The distance the force is applied over is increased, thus the force is reduced, since W = Fd. F m

Work as a “Dot Product”

Calculating Work a Different Way Work is a scalar resulting from the multiplication of two vectors. We say work is the “dot product” of force and displacement. W = F r  dot product representation W= F r cos   useful if given magnitudes and directions of vectors W = F x r x + F y r y + F z r z  useful if given unit vectors

The “scalar product” of two vectors is called the “dot product” The “dot product” is one way to multiply two vectors. (The other way is called the “cross product”.) Applications of the dot product  WorkW = F  d  PowerP = F  v  Magnetic FluxΦ B = B  A The quantities shown above are biggest when the vectors are completely aligned and there is a zero angle between them.

Why is work a dot product? s W = F r W = F r cos  Only the component of force aligned with displacement does work. F 

Problem: Vector A has a magnitude of 8.0 and vector B has a magnitude of The two vectors make an angle of 40 o with each other. Find AB.

Problem: A force F = (5.0i + 6.0j – 2.0k)N acts on an object that undergoes a displacement of r = (4.0i – 9.0j + 3.0k)m. How much work was done on the object by the force?

Problem: A force F = (5.0i – 3.0j) N acts upon a body which undergoes a displacement d = (2.0i – j) m. How much work is performed, and what is the angle between the vectors?

Work by Variable Forces

Work and Variable Forces For constant forces  W = F r For variable forces, you can’t move far until the force changes. The force is only constant over an infinitesimal displacement.  dW = F dr To calculate work for a larger displacement, you have to take an integral  W =  dW =  F dr

Work and variable force The area under the curve of a graph of force vs displacement gives the work done by the force. F(x) x xaxa xbxb W =  F(x) dx xaxa xbxb

Problem: Determine the work done by the force as the particle moves from x = 2 m to x = 8 m. F (N) x (m)

Problem: A force acting on a particle is F x = (4x – x 2 )N. Find the work done by the force on the particle when the particle moves along the x-axis from x= 0 to x = 2.0 m.

Problem: Derive an expression for the work done by a spring as it is stretched from its equilibrium position

Problem: How much work does an applied force do when it stretches a nonlinear spring where the force varies according to the expressions F = (300 N/m) x – (25 N/m 2 ) x 2 from its equilibrium length to 20 cm?

Work Energy Theorem

Net Work or Total Work An object can be subject to many forces at the same time, and if the object is moving, the work done by each force can be individually determined. At the same time one force does positive work on the object, another force may be doing negative work, and yet another force may be doing no work at all. The net work, or total, work done on the object (W net or W tot ) is the scalar sum of the work done on an object by all forces acting upon the object. W net = ΣW i

The Work-Energy Theorem W net = ΔK  When net work due to all forces acting upon an object is positive, the kinetic energy of the object will increase.  When net work due to all forces acting upon an object is negative, the kinetic energy of the object will decrease.  When there is no net work acting upon an object, the kinetic energy of the object will be unchanged.  (Note this says nothing about the kinetic energy.)

Kinetic Energy Kinetic energy is one form of mechanical energy, which is energy we can easily see and characterize. Kinetic energy is due to the motion of an object. K = ½ m v 2  K: Kinetic Energy in Joules.  m: mass in kg  v: speed in m/s In vector form, K = ½ m vv Ranking Tasks

Problem: A net force of 320 N acts over 1.3 m on a 0.4 kg particle moving at 2.0 m/s. What is the speed of this particle after this interaction?

Problem: Calculate the kinetic energy change of a 3.0 kg object that changes its velocity from (2.0 i j -1.0 k) m/s to (-1.0 i j k) m/s. How much net work done on this object?

Problem: A force of F 1 = (4.0 i + j) N and another of F 2 = -4.0 j N act upon a 1 kg object at rest at the origin. What is the speed of the object after it has moved a distance of 3.0 m?

Power Power is the rate of which work is done. No matter how fast we get up the stairs, our work is the same.  When we run upstairs, power demands on our body are high.  When we walk upstairs, power demands on our body are lower. P ave = W / t P inst = dW/dt P = F v

Units of Power Watt = J/s ft lb / s horsepower 550 ft lb / s 746 Watts

Problem: A 1000-kg space probe lifts straight upward off the planet Zombie, which is without an atmosphere, at a constant speed of 3.0 m/s. What is the power expended by the probe’s engines? The acceleration due to gravity of Zombie is ½ that of earth’s.

Problem: Develop an expression for the power output of an airplane cruising at constant speed v in level flight. Assume that the aerodynamic drag force is given by F D = bv 2. By what factor must the power be increased to increase airspeed by 25%?

How We Buy Energy… The kilowatt-hour is a commonly used unit by the electrical power company. Power companies charge you by the kilowatt- hour (kWh), but this not power, it is really energy consumed.

Problem: Using what you know about units, calculate how many Joules is in a kilowatt-hour.

Workday

Conservative and Non- Conservative Forces

More about force types Conservative forces:  Work in moving an object is path independent.  Work in moving an object along a closed path is zero.  Work is directly related to a negative change in potential energy  Ex: gravity, electrostatic, magnetostatic, springs Non-conservative forces:  Work is path dependent.  Work along a closed path is NOT zero.  Work may be related to a change in mechanical energy, or thermal energy  Ex: friction, drag, magnetodynamic

Potential Energy A type of mechanical energy possessed by an object by virtue of its position or configuration. Represented by the letter U. Examples:  Gravitational potential energy, U g.  Electrical potential energy, U e.  Spring potential energy, U s. The work done by conservative forces is the negative of the potential energy change.  W = -ΔU

Gravitational Potential Energy (U g ) The change in gravitational potential energy is the negative of the work done by gravitational force on an object when it is moved. For objects near the earth’s surface, the gravitational pull of the earth is roughly constant, so the force necessary to lift an object at constant velocity is equal to the weight, so we can say ΔU g = -W g = mgh Note that this means we have defined the point at which U g = 0, which we can do arbitrarily in any given problem close to the earth’s surface. mgmg F app h

Spring Potential Energy, U s Springs obey Hooke’s Law. F s (x) = -kx  F s is restoring force exerted BY the spring. W s =  F s (x)dx = -k  xdx  W s is the work done BY the spring. U s = ½ k x 2 Unlike gravitational potential energy, we know where the zero potential energy point is for a spring.

Problem: Three identical springs (X, Y, and Z) are hung as shown. When a 5.0-kg mass is hung on X, the mass descends 4.0 cm from its initial point. When a 7.0-kg mass is hung on Z, how far does the mass descend? XY Z

Sample problem: Gravitational potential energy for a body a large distance r from the center of the earth is defined as shown below. Derive this equation from the Universal Law of Gravity. Hint 1: dW = F(r)dr Hint 2: ΔU = -W c (and gravity is conservative!) Hint 3: U g is zero at infinite separation of the masses.

Conservation of Mechanical Energy

System Boundary

Law of Conservation of Energy E = U + K + E int = Constant No mass can enter or leave! No energy can enter or leave! Energy is constant, or conserved! The system is isolated and boundary allows no exchange with the environment.

Law of Conservation of Mechanical Energy E = U + K = Constant We only allow U and K to interchange. We ignore E int (thermal energy)

Law of Conservation of Mechanical Energy E = U + K = C or  E =  U +  K = 0 for gravity   U g = mgh f - mgh i   K = ½ mv f 2 - ½ mv i 2  (What assumptions are we making here?) for springs   U s = ½ kx f 2 - ½ kx i 2   K = ½ mv f 2 - ½ mv i 2  (What assumptions are we making here?) Ranking Tasks 11

h Pendulum Energy ½mv mgh 1 = ½mv mgh 2 For any points two points in the pendulum’s swing

Spring Energy mm -x m x 0 ½ kx ½ mv 1 2 = ½ kx ½ mv 2 2 For any two points in a spring’s oscillation

Problem: A single conservative force of F = (3i + 5j) N acts on a 4.0 kg particle. Calculate the work done if the particle if the moves from the origin to r = (2i - 3j) m. Does the result depend on path? What is the speed of the particle at r if the speed at the origin was 4.0 m/s? What is the change in potential energy of the system?

Sample Problem: A bead slides on the loop-the-loop shown. If it is released from height h = 3.5 R, what is the speed at point A? How great is the normal force at A if the mass is 5.0 g?

Non-conservative Forces and Conservation of Energy

Non-conservative forces Non-conservative forces change the mechanical energy of a system. Examples: friction and drag W tot = W nc + W c =  K W nc =  K – W c W nc =  K +  U

Sample Problem: A 2,000 kg car starts from rest and coasts down from the top of a 5.00 m long driveway that is sloped at an angel of 20 o with the horizontal. If an average friction force of 4,000 N impedes the motion of the car, find the speed of the car at the bottom of the driveway.

Problem: A parachutist of mass 50 kg jumps out of a hot air balloon 1,000 meters above the ground and lands on the ground with a speed of 5.00 m/s. How much energy was lost to friction during the descent?

Conservation of Energy Lab

Force and Potential Energy In order to discuss the relationships between potential energy and force, we need to review a couple of relationships. W c = F  x (if force is constant) W c =  Fdx = -  dU = -  U (if force varies)  Fdx = -  dU Fdx = -dU F = -dU/dx

Stable Equilibrium – 1 st and 2 nd Derivatives U x

Unstable Equilibrium – 1 st and 2 nd Derivatives U x

Neutral Equilibrium – 1 st and 2 nd Derivatives U x

More on Potential Energy and Force In multiple dimensions, you can take derivatives of each dimension separately. F(r) = -dU(r)/dr  F x = -  U/  x  F y = -  U/  y  F z = -  U/  z F = F x i + F y j + F z k

Molecular potential energy diagrams R U

Problem: The potential energy of a two-particle system separated by a distance r is given by U(r) = A/r, where A is a constant. Find the radial force F that each particle exerts on the other.

Problem: A potential energy function for a two-dimensional force is of the form U = 3x 3 y – 7x. Find the force acting at a point (x,y).