Work&EnergyWork&Energy. 4.1 Work Done by a Constant Force.

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Presentation transcript:

Work&EnergyWork&Energy

4.1 Work Done by a Constant Force

When force and displacement are in the same direction The equation is Work Applet

4.1 Work Done by a Constant Force If Force is at an angle The more general Equation is More commonly written

4.1 Work Done by a Constant Force Work is done only if displacement is in the direction of force Two situation where no work is done

4.1 Work Done by a Constant Force Negative work is done, if the force is opposite to the direction of the displacement Force of man – positive work Force of gravity – negative work FMFM W y

4.1 Work Done by a Constant Force A car of mass m=2000 kg coasts down a hill inclined at an angle of 30 o below the horizontal. The car is acted on by three forces; (i) the normal force; (ii) a force due to air resistance (F=1000 N); (iii) the force of weight. Find work done by each force, and the total work done on the car as it travels a distance of 25 m down the slope.

4.1 Work Done by a Constant Force A car of mass m=2000 kg coasts down a hill inclined at an angle of 30 o below the horizontal. The car is acted on by three forces; (i) the normal force; (ii) a force due to air resistance (F=1000 N); (iii) the force of weight. Find work done by each force, and the total work done on the car as it travels a distance of 25 m down the slope. Work done by the Normal N F air W

4.1 Work Done by a Constant Force A car of mass m=2000 kg coasts down a hill inclined at an angle of 30 o below the horizontal. The car is acted on by three forces; (i) the normal force; (ii) a force due to air resistance (F=1000 N); (iii) the force of weight. Find work done by each force, and the total work done on the car as it travels a distance of 25 m down the slope. Work done by the Air Resistance N F air W

4.1 Work Done by a Constant Force A car of mass m=2000 kg coasts down a hill inclined at an angle of 30 o below the horizontal. The car is acted on by three forces; (i) the normal force; (ii) a force due to air resistance (F=100 N); (iii) the force of weight. Find work done by each force, and the total work done on the car as it travels a distance of 25 m down the slope. Work done by the Weight (parallel component) N F air W

4.1 Work Done by a Constant Force A car of mass m=2000 kg coasts down a hill inclined at an angle of 30 o below the horizontal. The car is acted on by three forces; (i) the normal force; (ii) a force due to air resistance (F=100 N); (iii) the force of weight. Find work done by each force, and the total work done on the car as it travels a distance of 25 m down the slope. Total Work N F air W

4.2 Work Kinetic Energy Theorem

Suppose an object falls from the side of building. The acceleration is calculated as We can also solve acceleration as related to velocity

4.2 Work Kinetic Energy Theorem Combining the two equations With a little manipulation

4.2 Work Kinetic Energy Theorem Combine with our definition of work This is the work kinetic energy theorem The quantity is called kinetic energy

4.2 Work Kinetic Energy Theorem A child is pulling a sled with a force of 11N at 29 o above the horizontal. The sled has a mass of 6.4 kg. Find the work done by the boy and the final speed of the sled after it moves 2 m. The sled starts out moving at 0.5 m/s. N B W

4.2 Work Kinetic Energy Theorem A child is pulling a sled with a force of 11N at 29 o above the horizontal. The sled has a mass of 6.4 kg. Find the work done by the boy and the final speed of the sled after it moves 2 m. The sled starts out moving at 0.5 m/s. Work done by boy Velocity N B W

4.3 Work Done by a Variable Force

If we make a graph of constant force and displacement The area under the line is work

4.3 Work Done by a Variable Force If the force varies at a constant rate The area is still work

4.3 Work Done by a Variable Force For a more complex variation The area is still work. Calculated using calculus.

4.3 Work Done by a Variable Force Springs are important cases of variable forces The force is

4.3 Work Done by a Variable Force If we graph this The equation for W is Force Displacement W=Area kx

4.3 Work Done by a Variable Force So for a spring Spring potential is greatest at maximum displacement Force is maximum at maximum displacement Velocity is greatest at equilibrium (all energy is now kinetic)

m x FsFs 4.3 Work Done by a Variable Force F = max U s = max K = 0 v = 0

m x=0 equilibrium position x=0 F s =0 4.3 Work Done by a Variable Force F = 0 U s = 0 K = max v = max

m x=0 equilibrium position x FsFs 4.3 Work Done by a Variable Force F = kx U s = ½kx 2 K = ½mv 2 v = depends on K

4.4 Power

Power How fast work is done

4.4 Power Measured in watts (j/s) 1 horsepower = 746 W

4.4 Power You are out driving in your Porsche and you want to pass a slow moving truck. The car has a mass of 1300 kg and nees to accelerate from 13.4 m/s to 17.9 m/s in 3 s. What is the minimum power needed?

4.4 Power You are out driving in your Porsche and you want to pass a slow moving truck. The car has a mass of 1300 kg and nees to accelerate from 13.4 m/s to 17.9 m/s in 3 s. What is the minimum power needed?

4.5 Conservative and Nonconservative Forces

Conservative force – energy is stored and can be released Nonconservative – energy can not be recovered as kinetic energy (loss due to friction)

4.5 Conservative and Nonconservative Forces If a slope has no friction All the energy is stored This situation is conservative

4.5 Conservative and Nonconservative Forces If a slope has friction Some energy is lost as heat It is nonconservative

4.5 Conservative and Nonconservative Forces Conservative forces are independent of the pathway Friction (nonconservative) more work as the distance increases

4.6 Potential Energy

Work is transfer of energy If an object is lifted, the work done is This energy can be converted to kinetic energy if the object is then allowed to fall back to its original position Stored Energy is called Potential Energy so

4.6 Potential Energy Using the same logic The work done by a spring is When the spring shoots out, the work is converted to kinetic energy

4.7 Conservation of Mechanical Energy

4.6 Potential Energy Law of conservation of energy – energy can not be created or destroyed, it only changes form If we only include conservative forces (mechanical energy) Expands

4.8 Work Done by Nonconservative Forces

4.7 Work Done by Nonconservative Forces Nonconservative forces take energy away from the total mechanical energy At the end, total mechanical energy decreases because of the work done by friction

4.7 Work Done by Nonconservative Forces We can think of this as energy that is used up (although it just goes into a nonmechanical form) Expand this and our working equation becomes

4.7 Work Done by Nonconservative Forces Remember that the work due to friction is still defined as

4.7 Work Done by Nonconservative Forces One other helpful concept for the energy of a pendulum How do you calculate y for potential energy? If an angle is given and the string is defined a L The height of the triangle is y L 

4.7 Work Done by Nonconservative Forces Now the change in height is Which we can rewrite as y L 