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Two questions: (1) How to find the force, F on the electric charge, Q excreted by the field E and/or B?. (2) How fields E and/or B can be created?. Maxwell’s equations. Gauss’s law for electric field Electric charges create electric field:. Gauss’s law for magnetic field
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Two questions: (1) How to find the force, F on the electric charge, Q excreted by the field E and/or B? • (2) How fields E and/or B can be created? Maxwell’s equations Gauss’s law for electric field Electric charges create electric field: Gauss’s law for magnetic field Magnetic charges do not exist: For one not moving (v<<c) charge: Amperes law Electric current creates magnetic field: Faraday’s law (Will be discussed later) (As we will see later, this law should be extended)
7. Ampere’s law. (Sources of magnetic field) 1) Ampere’s law: Iout Iin Iin Iout 2) Applications of Ampere’s law (AL can be used to calculate the magnetic field in situations with a high degree of symmetry) a) Long straight conductor I r Example1: I = 10A r = 0.02 m B - ?
Example2: Two long parallel wires are 4.0 cm apart. Each wire carries the current 10 A in the same direction. Find the magnetic field halfway between the wires. I I r r Example3: Two long parallel wires are 4.0 cm apart. Each wire carries the current 10 A in the opposite direction. Find the magnetic field halfway between the wires. I I r r
b) Long cylindrical conductor R r B r R
c) Field inside a solenoid B N– number of loops (or turns) encircled by our path l Example 1: Example 2:The magnetic field inside an air filled solenoid is B. The area of the solenoid is doubled, keeping the current flowing through the solenoid and the number of turns per unit length unchanged. Find the magnetic field inside the new solenoid. Answer: Magnetic field inside a solenoid is independent from the area!
Example 3: A long solenoid has 100 turns/cm and carries current I. An electron moves within the solenoid in a circle of radius 2.30 cm perpendicular to the solenoid axis. The speed of the electron is 1.40*107 m/s. Find the current in the solenoid.
Magnetic field Long straight conductor Inside long cylindrical conductor (r<R) Inside solenoid Inside toroidal solenoid (toroid) Magnetic field lines always form a closed loops!
3) Force between two parallel wires I1 I2 r 4) Definition of the Ampere