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Electric forces and electric fields. 1. Proprieties of electric charges Electric charge can be + or – Like charges repel one another; and unlike charges attract one another Electric charge is always conserved.
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1. Proprieties of electric charges • Electric charge can be + or – • Like charges repel one another; and unlike charges attract one another • Electric charge is always conserved
The object become charged because – charge is transferred from one object to another • An object may have charge of ±e, ±2e, ±3e • e = 1.60219x10-19C • SI unit: C (Coulomb) 2 Insulators and conductors • In conductors, electric charges move freely in response to an electric force. All other materials are called insulators (give an ex. of each) • Semiconductors are between conductors and insulators.
An object connected to a conducting wire buried in the Earth is said to be grounded. • Induction – charging of a conductor • Charging an object by induction requires no contact with the object inducing the charge.
3. Coulomb’s Law • An electric force has the following properties: • It is directing along a line joining the two particles and is inversely proportional to the square of the separation distance r, between them • It is proportional to the product of the magnitudes of the charges, |q1|and |q2|, of the 2 particles • It is attractive if the charges are of the opposite sign, and repulsive if the charges have the same sign
The magnitude of the electric force: • F=ke (|q1||q2|/r2) • ke – Coulomb constant ke = 8.9875x109N m2/C2
4. Electric Field • The electric field E produced by a charge Q at the location of a small “test” charge qo is defined as the electric force F exerted by Q and qo divided by the charge qo . • E=F/qo • E=ke (|q|/r2) • Si unit : N/C
Pb. Strategies: • 1. Draw a diagram of the charges • 2. Identify the charge of interest • 3. Convert all units in SI • 4. Apply Coulomb’s Law • 5. Sum all the x- components of the resulting electric force • 6. Sum all the y-components of the resulting electric force • 7. Use Pythagorean theorem to find the magnitude and the direction of the force
5. Electric field lines • 1. The electric field E is tangent to the electric field lines at each point • 2. The number of lines per unit area through a surface perpendicular to the lines is proportional to the strength of the electric field in a given region
Rules for drawing electric field lines: • -The lines for a group of point charges must begin on + charge and end on – charge • - The number of lines drawn leaving a + charge or ending a – charge is proportional to the magnitude of the charge • - No two field lines can cross each other
6. Conductors in electrostatic equilibrium • When no net motion of charge occurs within a conductor, the conductor is in electrostatic equilibrium • Proprieties of an isolated conductor: 1. the electric field is zero inside of the material 2. any excess charge on an isolated conductor resides entirely on its surface 3. the electric field just outside a charge conductor is perpendicular to the conductor’s surface 4. On an irregularly shaped conductor , the charge accumulates at sharp points, where the radius of curvature of the surface is smallest
7.electric flux and Gauss’s Law • The electric flux ( the number of the field lines) is proportional to the product of the electric field and surface of the area • ΦE =EA • ΦE =EA cosθ
For a close surface, the flux line passing into the interior of the volume are negative, and those passing out of the interior of the volume are positive
Gauss’s Law: • E= ke q|/r2 • A= 4πr2 • ΦE =EA=4πke q • ΦE =q/ εo • Permittivity of free space: εo=1/(4πke )=8.85x10-12C2/Nm2 • The electric flux through any closed surface is equal to the net charge inside the surface divided by the permittivity
8. Potential difference and electrical potential Work and potential energy: Potential energy is a scalar quantity with change to the negative of the work done by the conservative force ΔPE=Pef-Pei =- Wf Coulomb force is conservative If imagine a small + charge placed in a uniform electric field E. As the charge moves from A to B, the work done on the charge by the electric field: W=FxΔx =q Ex (xf-xi)
Work –energy theorem W=q Ex Δx =ΔKE But the work done by a conservative force can be reinterpreted as the negative of the charge in a potential energy associated with that force ΔPE of a system consisting on an object of charge q through a displacement Δx in a constant electric field E is given by: ΔPE =-WAB= -q Ex Δx SI unit J (Joule)
Δ KE + ΔPE el = ΔKE +(0-ΙqΙ E d) =0 ΔKE = ΙqΙ E d Similarly , KE equal in magnitude to the loss of gravitational potential energy: ΔKE +ΔPEg =ΔKE +(0 –mgd) =0 ΔKE=mgd
Electric Potential F = qE The electric potential difference between points A and B is the charge in electric potential energy as a charge q moves from A to B, divided by the charge q: ΔV =VA-VB = ΔPE/q SI unit J/C or V (Joule/Coulomb or Volt) Electric potential is a scalar quantity
9.Electric potential and potential energy due to point charges The electric field of a point charge extends throughout space, so its electrical potential also Electric potential created by a point charge: V=ke q/r The electric potential of two or more charges is obtained by applying the superposition principle: the total electric potential at some point P due to several point charges is the algebraic sum of the V due to the individual charges
10.Potentials and charged conductors The electric potential at all points on a charged conductor W= -ΔPE =-q( VB-VA) No net work is required to move a charge between two points that are at the same electric potential All points on the surface of a charged conductor in electrostatic equilibrium are at the same potential
The electric potential is a constant everywhere on the surface of a charged conductor The electric potential is constant everywhere inside a conductor and equal to the same value at the surface The electron voltis defined as KE that an electron gains when accelerated through a potential difference of 1V 1eV =1.6x 10-19 C V =1.6x10-19 J
Equipotential surface is a surface on which all points are at the same potential The electric field at every point of an equipotential surface is perpendicular to the surface.
11.Capacitance A capacitor- is a device used in variety of electric circuits The capacitance Cof a capacitor is the ratio of the magnitude of the charge on either conductor (plate) to the magnitude of the potential difference between conductors (plates) C=Q/ΔV SI unit F (Farad)=C/V
12.The parallel-plate capacitor C=q/ΔV ΔV=Ed; E=σ/ε0 ; q=σA C=σA/Ed=σA/(σε0)d C= ε0A/d
Capacitors in parallel both have the same potential difference across them Q=Q1+Q2 Q1= C1ΔV Q2 = C2ΔV Q= CeqΔV CeqΔV=C1ΔV+C2ΔV Ceq=C1+C2 (parallel combination)
Electrical Energy and Capacitance For a series combination of capacitors, the magnitude of the charge must be the same on all the plates ΔV=Q/Ceq ΔV1=Q/C1; ΔV2=Q/C2; ΔV=ΔV1+ΔV2 Q/C= Q/C1+Q/C2 1/C= 1/C1+1/C2 (series combination)
A Dielectric- is an insulating material (rubber, plastic, waxed paper) • If a dielectric is inserted between the plates, the voltage across the plates is reduced by a factor k (dielectric constant) to the value: • ΔV =ΔV0/k • C=k C0 • C=kε0 A/d • The maximum electric field is called dielectric strength
