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Energy. Adapted From. Exploring Engineering. Chapter 4, Part 1 Energy. Energy. Energy is the capability to do work Work = force x distance Distance over which the force is applied Energy Units: SI: joules Mixed SI units: Watt-hours (= 3.6 kJ) English: ft-lbf “foot pound force”.
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Adapted From Exploring Engineering Chapter 4, Part 1 Energy
Energy • Energy is the capability to do work • Work = force x distance • Distance over which the force is applied • Energy Units: • SI: joules • Mixed SI units: Watt-hours (= 3.6 kJ) • English: ft-lbf “foot pound force”
Energy • Mixed SI units: Watt-hours (= 3.6 kJ)
Power • How fast work is done or how rapidly the amount of energy possessed by an object changed • “Power is defined as time rate of doing work or time rate of change of energy” • Power = work/time • Power Units: • SI: watts (joules/sec) • English: Horsepower
Kinds of Energy • Kinetic Energy • Potential Energy • Some other forms of energy: • Magnetic energy • Electrical energy • Surface energy • Chemical energy (a form of potential energy) • Internal energy etc. Often mechanical energy
Kinetic Energy • Also known as “Translational Kinetic Energy” (TKE) TKE = ½ mv2 (SI units) = ½mv2/gc (English units) m = mass, v = speed, gc = 32.2 lbm.ft/lbf.s2 Units: ???
Kinetic Energy: Example • What is the translational kinetic energy of an automobile with a mass of 1X103 kg traveling at a speed of 65 miles per hour (29 m/sec)? • Need: TKE of the vehicle • Know: Mass: 1X103 kg, speed: 29 m/sec • How: TKE= ½mv2 • SOLVE: TKE = 4.2 x 105 J Anything that has mass and is moving in a line has TKE.
Gravitational Potential Energy • GPE is the energy acquired by an object by virtue of its position in a gravitational field-- typically by being raised above the surface of the Earth. • In SI, GPE = mgh in units of joules • In Engineering English units, • GPE = mgh/gc in units of ft.lbf
GPE & Power: Example • A person takes 2.0 seconds to lift a 1. kg book a height of 1. meter above the surface of Earth. Calculate the power expended by that person or calculate the energy spent by the person per unit time. • Work done =Force x distance = mgx h = 1. x 1. x 9.81 [kg][m/s2][m] = 9.81 [J][m] = 1. x 101 J • Power expended = Work done/time = 1. x 101/2.0 [J/s] = 5 Watts
Gravitational Potential Energy • Mt. Everest is 29, 035 ft high. If a climber has to haul him/herself weighing 200. lbm (including equipment) to the top, what is his/her potential energy above sea level when on the summit. Give your answer in both in joules and in ft.lbf.
Gravitational Potential Energy • Need: GPE in English and SI units • Know: • m = 200. lbm = 90.7 kg (“Convert”); h = 29, 035 ft. = 8850. m (“Convert”); g = 32.2 ft/s2 = 9.81 m/s2 & gc = 32.2 lbm ft/s2 lbf (English) and gc = 1 [0] in SI • How: GPE = mgh/gc English GPE = mgh SI
Gravitational Potential Energy • Solve: English … GPE = mgh/gc = 200. 32.2 29,035/32.2 [lbm][ft/s2][ft][lbf.s2 /lbm.ft] = 5.81 106 ft.lbf (3 significant figures) • SI … GPE = mgh = 90.7 9.81 8850. = 7.87 106 J • A check direct from the units converter: 5.81 106 ft.lbf = 7.88 106 J …OK
Potential Energy • GPE is NOT the only form of PE. • Chemical, nuclear and electromagnetic are other forms of PE • For us, chemical and electrical energy are so important that we will reserve extra chapters and lectures to them for later presentation.
Thermal Energy • Thermal energy, often referred to as heat,is a very special form of kinetic energy because it is the random motion of trillions and trillions of atoms and molecules that leads to the perception of temperature • All higher forms of energy dissipate to thermal energy, the ultimate energy sink. • The laws of thermodynamics state 1) all energy is conserved and 2) that the thermal energy in the universe, corrected for temperature, always increases.
Energy • We have defined energy is the capability to do work • But energy comes in different guises • Potential, translational kinetic, rotational kinetic, thermal and others • Energy can be converted from one form to another • The energy in the Universe is conserved • A “control volume” is a subset of the Universe you construct to isolate the problem of interest. It exchanges energy with the rest of the Universe
: Energy exchanges : Energy exchanges “The Universe” “The Universe” System System ¹ ¹ System energy changes System energy changes 0 0 Universe energy changes = 0 Universe energy changes = 0 Energy Conservation • Energy = F distance is generic equation for energy • Energy is conserved (although it may change form) Example of a book lying on a table and then falling on ground
C.V. boundary C.V. boundary This class room This class room Insulated walls Insulated walls Door Door Control volume Control volume example example Energy Conservation • Example of a control volume • The energy in the room is constant unless we allow exchange with the Universe • E.g., a person could walk through the door and add energy • A heating duct could also add thermal energy • On a winter day, a window could break and the c.v. would lose thermal energy
Application of Control Volumes • The TKE of the vehicle, RKE of the wheels, electrical energy in the lights, thermal energy lost from the radiator, etc. • We deduce that the source of all these energies is exactly equal to the loss in chemical (potential) energy in the fuel.
Summary: Energy • We specifically identified gravitational, potential, and thermal energy • We learned that energy is conserved in the Universe, but not necessarily in a control volume. • Deficiencies within a control volume mean that energy in leaking in or out of the control volume at an exactly compensating amount.
