Energy Energy and Friction Lana Sheridan De Anza College Oct 31, 2017
Last time energy conservation isolated and nonisolated systems
Overview Isolated system example Kinetic friction and energy Practice with friction and energy
Isolated Systems l Isolated System (Energy) e System m boundary nd Kinetic energy Potential energy stem Internal energy gy can m in etic, The total amount of energy tera Energy transforms among in the system is constant. h no the three possible types. e sysod. Then, the system is isolated; energy transforms Exam p e f t D w t t e
of thermodynamics, DE int 5 W 1 Q (Chapter 20) : DE int 5 T ET 1 T ER (Chapter 27) Isolated Systems DK 1 DU 5 Pick a system such that energy does not flow across the system boundary. eg. consider a book-earth system: solated System (Energy) ry common scenario in physics problems: a syscrosses the system boundary by any method. We l situation. Think about the book Earth system pter. After we have lifted the book, there is gravthe system, which can be calculated from the n the system, using W 5 DU g. (Check to see that ore, is contained within Eq. 8.2 above.) work done on the book alone by the gravitational ck to its original height. As the book falls from y i ional force on the book is 12mg j^2? 31y f 2 y i 2j^4 5 mgy i 2 mgy f (8.3) rem of Chapter 7, the work done on the book is energy of the book: on book 5 DK book ns for the work done on the book: ook 5 mgy i 2 mgy f (8.4) quation to the system of the book and the Earth. y i y f r S The book is held at rest here and then released. Physics Physics At a lower position, the book is moving and has kinetic energy K. Figure 8.2 A book is released from rest and falls due to work done by the gravitational force on the book. The Earth s gravitational force does work on the book. 2(mgy f 2 mgy i ) 5 2DU g potential energy of the system. For the left-hand ook is the only part of the system that is moving, K book = U g
Isolated Systems In that case we have K book + U g = 0 and the mechanical energy is conserved: E mech = 0 This holds when only conservative forces act in an isolated system. If non-conservative forces are allowed to act in an isolated system, we must include the internal degrees of freedom in our system and E mech 0 ; E system = 0
Question Quick Quiz 8.3 1 A rock of mass m is dropped to the ground from a height h. A second rock, with mass 2m, is dropped from the same height. When the second rock strikes the ground, what is its kinetic energy? (A) twice that of the first rock (B) four times that of the first rock (C) the same as that of the first rock (D) half as much as that of the first rock 2 Serway & Jewett, page 216.
Question Quick Quiz 8.3 1 A rock of mass m is dropped to the ground from a height h. A second rock, with mass 2m, is dropped from the same height. When the second rock strikes the ground, what is its kinetic energy? (A) twice that of the first rock (B) four times that of the first rock (C) the same as that of the first rock (D) half as much as that of the first rock 2 Serway & Jewett, page 216.
Energy of an Isolated System For the gravitational situation of the falling book, Equa 1 2mv f 2 1 mgy f 5 1 2mv i 2 1 mgy i As the book falls to the Earth, the book Earth system gains kinetic energy such that the total of the two type Quick Quiz 8.4 2 Three identical balls are thrown from the top of a building, all with the same constant: initial speed. E total,i 5 As E total,f shown,. the first is thrown horizontally, the second at some angle above the horizontal, and the third at some angle below the horizontal. Neglecting air resistance, rank the speeds of the balls at the energy of the system as instant each hits the ground, from largest to smallest. The total energy of an isolated system is conserved. 2 1 If there are nonconservative forces acting within the is transformed to internal energy as discussed in Sect forces act in an isolated system, the total energy of the sy the mechanical energy is not. In that case, we can e DE system 5 0 where E system includes all kinetic, potential, and interna the most general statement of the energy version of the equivalent to Equation 8.2 with all terms on the right-ha 3 (A) 2, 1, 3 (B) 3, 1, 2 Q uick Quiz 8.3 A rock of mass m is dropped to the gro second rock, with mass 2m, is dropped from the same rock strikes (C) 1, the 2, ground, 3 what is its kinetic energy? (a) (b) four times that of the first rock (c) the same as tha as much (D) as that all the of the same first rock (e) impossible to dete Q uick Quiz 8.4 Three identical balls are thrown from with the same initial speed. As shown in Figure 8.3, t Figure 8.3 (Quick Quiz 8.4) zontally, the second at some angle above the horizont 2 Three identical balls are thrown Adapted from Serway & Jewett, angle page below 216. the horizontal. Neglecting air resistance,
Energy of an Isolated System For the gravitational situation of the falling book, Equa 1 2mv f 2 1 mgy f 5 1 2mv i 2 1 mgy i As the book falls to the Earth, the book Earth system gains kinetic energy such that the total of the two type Quick Quiz 8.4 2 Three identical balls are thrown from the top of a building, all with the same constant: initial speed. E total,i 5 As E total,f shown,. the first is thrown horizontally, the second at some angle above the horizontal, and the third at some angle below the horizontal. Neglecting air resistance, rank the speeds of the balls at the energy of the system as instant each hits the ground, from largest to smallest. The total energy of an isolated system is conserved. 2 1 If there are nonconservative forces acting within the is transformed to internal energy as discussed in Sect forces act in an isolated system, the total energy of the sy the mechanical energy is not. In that case, we can e DE system 5 0 where E system includes all kinetic, potential, and interna the most general statement of the energy version of the equivalent to Equation 8.2 with all terms on the right-ha 3 (A) 2, 1, 3 (B) 3, 1, 2 Q uick Quiz 8.3 A rock of mass m is dropped to the gro second rock, with mass 2m, is dropped from the same rock strikes (C) 1, the 2, ground, 3 what is its kinetic energy? (a) (b) four times that of the first rock (c) the same as tha as much as that of the first rock (e) impossible to dete (D) all the same Q uick Quiz 8.4 Three identical balls are thrown from with the same initial speed. As shown in Figure 8.3, t Figure 8.3 (Quick Quiz 8.4) zontally, the second at some angle above the horizont 2 Three identical balls are thrown Adapted from Serway & Jewett, angle page below 216. the horizontal. Neglecting air resistance,
Tracking Energy in a System In general we can express the conservation of energy for our system as: W = K + U + E int where W is the net work done by all external forces on the system K is the change in kinetic energy of the system U is the change in potential energy of the system E int is the change in internal energy of the system
Tracking Energy in a System where W = K + U + E int W covers energy transfers into or out of the system K is the change in motion of parts of the system U is the change configuration of the system E int is energy converted to heating effects from friction in the system (or other non-conservative effects)
Internal Energy and Kinetic Friction When E int is energy converted to heating effects from friction in the system only: E int = f k s where f k is the magnitude of the friction force and s is the total path length that the object travels with this friction force acting. The longer the path, the larger s, the larger E int.
g along a freeway at 65 mi/h. Your car has kinetic stop Kinetic because Friction: of congestion Twoin Views traffic. Where is ce had? Consider (a) It block is all sliding in internal on a surface. energy in the road. in the tires. (c) Some of it has transformed to View 1: The system is the only mass of the block, modeled as a t transferred away by mechanical waves. (d) It is all point particle. r by various mechanisms. The internal degrees of freedom are part of the environment. AM S n S v f ntal surface by a S f k S F faces in contact x mg S a Suppose there is one applied force F app : W S S F S net = F app dr + f v f n k dr + 0 n dr + mg 0 dr S
Kinetic Friction: Two Views View 1: W net = F app dr + f k dr
Kinetic Friction: Two Views View 1: W net = F app dr + f k dr Net work equals to the sum of the work done by the applied force and the work done by friction. So, swapping the LHS for the RHS: W app + W fric = W net = K Then, W app + W fric = K where W fric = f k ds = f k s because the friction force points opposite to the direction of motion.
Kinetic Friction: Two Views View 1: In general the single applied force could be replaced by a collection of applied forces, to give: (Wother-ext-forces ) + W fric = K where W fric = f k s Translation: input work becomes kinetic energy of the system, or is lost to the environment as work done against friction.
g along a freeway at 65 mi/h. Your car has kinetic Kinetic Friction: Two Views stop because of congestion in traffic. Where is ce had? (a) It is all in internal energy in the road. in the View tires. 2: (c) TheSome systemof isit the has mass transformed of the block, to modeled as a point t transferred particle, plus away the by internal mechanical degrees waves. of freedom (d) It of is the all block and the r by various surface. mechanisms. (But not the mass of the surface.) The internal degrees of freedom are part of the system. AM S n S v f ntal surface by a S f k S F faces in contact a mg S x S n S F S v f
Kinetic Friction: Two Views View 2: For the system (the moving object and the surface): F net dr = F app dr + f k dr
Kinetic Friction: Two Views View 2: For the system (the moving object and the surface): F net dr = F app dr + f k dr On the LHS we have the net work. This will equal to the sum of the work done by the applied force and the work done by friction. So, swapping the LHS for the RHS: W app + f k dr = W net W app f k s = K
Kinetic Friction: Two Views View 2: In general the single applied force could be replaced by a collection of applied forces, to give: (Wext-forces ) f k s = K and since E int = f k s: (Wext-forces ) = K + E int
Internal Energy and Friction Summary View 1: W + W fric = K where W fric = f k s View 2 (Textbook s view): where E int = f k s. W = K + E int These give equivalent results.
Internal Energy and Friction Summary View 1: W + W fric = K where W fric = f k s View 2 (Textbook s view): where E int = f k s. W = K + E int These give equivalent results. If no other work is being done on the system: K = f k s
Question Example 8.5 3 A car traveling at an initial speed v slides a distance d to a halt after its brakes lock. (This means the car is in a skid.) If the car s initial speed is instead 2v at the moment the brakes lock, what is the distance it slides? (A) d (B) 2d (C) 4d (D) 8d 1 Drawn from Serway and Jewett, page 225.
Question Example 8.5 3 A car traveling at an initial speed v slides a distance d to a halt after its brakes lock. (This means the car is in a skid.) If the car s initial speed is instead 2v at the moment the brakes lock, what is the distance it slides? (A) d (B) 2d (C) 4d (D) 8d 1 Drawn from Serway and Jewett, page 225.
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Mechanical Energy Decreasing due to Nonconservative Forces E int is always positive or zero. (E int increases with time!) A system s mechanical energy can increase only if work is done on it by an external force. If no work is done (isolated system) the system s mechanical energy decreases (or stays the same) over time.
Summary Friction and kinetic energy Friction and mechanical energy Next Test Friday, Nov 3, Chapters 6-8, and friction/pulleys from Ch 5. (Uncollected) Homework Serway & Jewett, Read Chapter 8. Look at Example 8.6. PREV: Ch 8, onward from page 236. Probs: 5, 9, 13, 15, 17 Ch 8, onward from page 236. Probs: 21, 23, 29, 31, 41