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Transcript
Chapter 22: Electric Charge and Electric Field Electric Charge Ancient Greeks ~ 600 BC Static electricity: electric charge via friction (Attempted) pith ball demonstration: 2 kinds of properties 2 objects with same property repel each other 2 objects with different properties attract each other both properties are always created together Benjamin Franklin: kinds of charges are positive and negative by convention, negative charge associated with amber Conservation of Charge: The algebraic sum of all the electric charges in any closed system is constant. p212c22: 1 Conductors and Insulators (Objects are usually “charged” by moving electric charge around, rather than creating or destroying charge.) Conductor: charge passes easily through the material => conductors contain charges which are free to move Insulator: charge cannot move (easily) through material Semiconductor: transition between insulator and conductor, usually of interest because of exotic electrical properties p212c22: 2 Charging by induction. - - + + + + + + - - + + + + + + p212c22: 3 Quantization and Conservation of Charge Microscopic structure of matter: Atoms Nucleus most of mass positive charge composed of protons (each has charge = +e) and neutrons (no electric charge) “orbiting” electrons (each has charge = -e) Atoms tend to be charge neutral charge quantized: e = 1.6x10-19 C Charge transfer usually in the form of addition or removal of electrons. p212c22: 4 Coulomb’s Law A description of the interaction between two (point) charges The magnitude of the Force exerted by one charge on the other is proportional to the magnitude of each of the charges is inversely proportional to the square of the distance between the charges acts along a line connecting the charges Qq F k 2 r 2 2 N m N m 9 k 8.988 109 9 10 4 0 C2 C2 1 Unit of charge is the Coulomb, a new type of quantity. How big is 1 coulomb? p212c22: 5 Another form of Coulomb’s Law the force exerted by Q (“source charge”) on q (“test charge”) Qq F k 2 rˆ r F Force on q rˆ unit vecto r, from Q to q r distance, from Q to q q Q rˆ F r p212c22: 6 Electric Charge and Electric Field (cont’d) Coulomb’s Law: the force exerted by Q on q q Qq F k 2 rˆ r Q For several Sources F F1 + F2 + k Q1q Q2 q r + k r + ˆ 2 1 2 ˆ2 r1 r2 Qi q i k 2 rˆi ri rˆ F r F F2 q Q1 r1 r2 F1 rˆ2 Q2 rˆ1 p212c22: 7 •Analyze geometry/draw diagram Qi q •calculate magnitude of each contribution Fi k 2 ri •calculate components of each contribution •add contributions as vectors (add component by component) A charge q = 5.0 nC is at the origin. A charge Q1 = 2.0 nC is located 2cm to the right on the x axis and and Q2 = -3.0 nC is located 4 cm to the right on the x axis. What is the net force on q? p212c22: 8 Q1 = 2.0 µC Geometry .3m q = 4.0 µC .4m Magnitudes .3m Q2 = 2.0 µC Components Net Force p212c22: 9 Example: Compare the electric repulsion of two electrons to their gravitational attraction Qq F k 2 r 2 2 N m Mm N m -11 k 9 109 F G G 6 . 67 10 C2 r2 kg 2 p212c22: 10 Electric Field and Electric forces Electric field is a “disturbance” in space resulting from the presence of (source) charge, which exerts a force on a (test) charge. q P F Q rˆ Q r rˆ Force of interaction r Source charge creates a disturbance in space E (at P ) F (at P ) / q q Q rˆ r F ( on q ) qE (at q ) Test charge “senses” the disturbance in space p212c22: 11 Q E k 2 rˆ r E Field at P rˆ unit vecto r, from Q to P P Q rˆ E r r distance, from Q to P Q Ek 2 r p212c22: 12 For several Sources E E1 + E2 + Q1 Q2 k 2 rˆ1 + k 2 rˆ2 + r1 r2 E E2 E1 Q1 r1 r2 rˆ2 Q2 rˆ1 Qi i k 2 rˆi ri Force Law: F = qE p212c22: 13 Elementary Electric Field Examples: •What is the electric field 30 cm from a +4nC charge? •When a 100 volt battery is connected across two parallel conducting plates 1 cm apart, the resulting charge configuration produces a nearly uniform electric field of magnitude E = 1.00 E4 N/C. •Compare the electric force on an electron in this field with its weight. What is the acceleration of the electron? The electron is released from rest at the top plate. What is the final speed of the electron as it hits the second plate? How long does it take the electron to travel this distance? p212c22: 14 Electric Field Calculations •Analyze geometry/draw diagram Electric Field Contributions are directed away from positive charges, toward negative charges •calculate magnitude of each contribution •calculate components of each contribution Qi Ei k 2 ri •add contributions as vectors (add component by component) p212c22: 15 Electric Dipole: two equal size(Q), opposite sign charges separated by a distance (l = 2a). Determine the electric field on the x-axis Geometry +Q a Magnitudes x a Components -Q Net Force p212c22: 16 Field of an electric dipole Ex 0 E y -k -k +Q a x x 2aQ 2 2 + a2 p 32 +a 2 32 p - k 3 x a x x a -Q p212c22: 17 Line of charge: uniform line of charge (charge Q, l = 2a oriented along y-axis). Determine the electric field on the x-axis Geometry dQ=ldy a y x Magnitudes a Components dQ dy Q l Q 2a 2a y x sin cos r r r x2 + y2 dQ l dy dE k 2 k 2 r x + y2 dE x dE cos k l dy x2 + y2 x x2 + y2 p212c22: 18 Add Components dE Ex x all charge y a k x y - a l dy 2 +y 2 32 2kl a kQ 2 2 x x +a x x2 + a2 Q Ex k 2 , x a x 2kl Ex , x a x infinite line of charge : Er 2kl r p212c22: 19 Next: infinite sheet of charge is composed of of a series of infinite lines of charges Look carefully at related textbook examples of a ring of charge, and a disk of charge. p212c22: 20 Electric Field due to an infinite sheet of charge sheet of charge composed of a series of infinite lines of charge s = charge per area Geometry l s dz z y sin cos r r r z2 + y2 Magnitudes y z Components 2kl 2ks dz dE 2 r z + y2 dE y dE cos 2ks dz 2 z + y2 y z2 + y2 p212c22: 21 Add Components Ey dE y all charge z 2ksydz 2 2 z + y z - y z 1 z 2ks y arctan y y z - - 2ks 2ks 2 2 s 1 k 2 0 4 0 uniform electric field!! p212c22: 22 Interaction of an electric dipole with an electric field dipole in a uniform electric field Fi 0 F=qE l y torque about center of dipole i ri Fi RHR! -q x p -q z F = F = qE F=- qE l l z F sin + F sin 2 2 lqE sin pE sin p E p212c22: 23 Work done rotating dipole in an electric field watch directions of , an d y l dW d - pE sin d 2 d x p z W - pE sin d 1 pE cos 2 - pE cos1 -U U ( ) - pE cos -pE p212c22: 24 “Lines of Force” Electric Field Lines: a means of visualizing the electric field =A line in space always tangent to the electric field at each point in space concentration give indication of field strength direction give direction of electric field •start on positive charges, end on negative charges •electric field lines never cross p212c22: 25 + + + + + + + + + + + + + + - - - - - - - - - - - - - - p212c22: 26