Difference between revisions of "Electric Potential"
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[https://openstax.org/books/university-physics-volume-2/pages/7-introduction University Physics Volume 2: Chapter 7] | [https://openstax.org/books/university-physics-volume-2/pages/7-introduction University Physics Volume 2: Chapter 7] | ||
= | = Theory = | ||
== Background: The Electric Force is a Conservative Force == | |||
The electric force is classified as a conservative force, meaning that the work done by or against the electric force depends only on the initial and final positions, not on the path taken. This property allows us to define the electric potential energy in an electric field as the negative of the work done by the electric force. | |||
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<youtube>1XwxKKcn0ks</youtube> | <youtube>1XwxKKcn0ks</youtube> | ||
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== Introduction to Electric Potential and Energy == | |||
Electric potential energy is the energy stored in a system of charges due to their positions in an electric field. The electric potential <math> V </math> at a point is defined as the electric potential energy per unit charge: | |||
<math> V = \frac{U}{q} </math> | |||
where <math> U </math> is the electric potential energy and <math> q </math> is the charge. | |||
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<youtube>1L5iolQj9KA</youtube> | <youtube>1L5iolQj9KA</youtube> | ||
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== Electric Potential Energy == | |||
Electric potential energy between two point charges <math> q_1 </math> and <math> q_2 </math> separated by a distance <math> r </math> is given by: | |||
<math> U = k_e \frac{q_1 q_2}{r} </math> | |||
where <math> k_e </math> is the electrostatic constant. | |||
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<youtube>FMJXGoVIQ7c</youtube> | <youtube>FMJXGoVIQ7c</youtube> | ||
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== Electric Potential - Joules per Coulomb - Voltage == | |||
Electric potential, also known as voltage, is measured in joules per coulomb (J/C). It represents the potential energy per unit charge at a point in an electric field. | |||
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<youtube>j3GrOKre__0</youtube> | <youtube>j3GrOKre__0</youtube> | ||
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== Electric Potential due to a Point Charge at Rest == | |||
The electric potential <math> V </math> at a distance <math> r </math> from a point charge <math> Q </math> is given by: | |||
<math> V = k_e \frac{Q}{r} </math> | |||
where <math> k_e </math> is the electrostatic constant. | |||
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<youtube>KzKsMZED1B4</youtube> | <youtube>KzKsMZED1B4</youtube> | ||
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=== Electric Potential and the Electric Field - Equipotential Lines === | == Potential Energy of a System of Charged Particles == | ||
The total electric potential energy of a system of charges is the sum of the potential energies between all pairs of charges in the system. For example, for three charges, <math> q_1, q_2, </math> and <math> q_3 </math>, the potential energy is: | |||
<math> U = k_e \left( \frac{q_1 q_2}{r_{12}} + \frac{q_1 q_3}{r_{13}} + \frac{q_2 q_3}{r_{23}} \right) </math> | |||
== Electric Potential and the Electric Field - Equipotential Lines == | |||
Equipotential lines represent points of equal electric potential in an electric field. They are always perpendicular to electric field lines. Moving along an equipotential line requires no work, as the electric potential remains constant. | |||
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<youtube>xwaPxhmocdQ</youtube> | <youtube>xwaPxhmocdQ</youtube> | ||
<youtube>6F6mh4R00rI</youtube> | <youtube>6F6mh4R00rI</youtube> | ||
<youtube>vmW7h5YgZL8</youtube> | <youtube>vmW7h5YgZL8</youtube> | ||
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== Electric Potential, Current and Power == | |||
Electric potential difference, or voltage, causes current to flow in a conductor. The power <math> P </math> delivered by an electric current <math> I </math> due to a potential difference <math> V </math> is: | |||
<math> P = V \cdot I </math> | |||
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<youtube>FViTaHwLgxo</youtube> | <youtube>FViTaHwLgxo</youtube> | ||
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== Example Problems == | == Example Problems == | ||
=== Projectile Motion === | |||
Projectile motion problems involve analyzing the effects of gravity and may also consider electric forces in certain cases where charged particles move in an electric field. | |||
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<youtube>zC7D6FtMPwk</youtube> | <youtube>zC7D6FtMPwk</youtube> | ||
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Revision as of 11:44, 5 November 2024
Back to Electricity_and_Magnetism
Textbook
University Physics Volume 2: Chapter 7
Theory
Background: The Electric Force is a Conservative Force
The electric force is classified as a conservative force, meaning that the work done by or against the electric force depends only on the initial and final positions, not on the path taken. This property allows us to define the electric potential energy in an electric field as the negative of the work done by the electric force.
Introduction to Electric Potential and Energy
Electric potential energy is the energy stored in a system of charges due to their positions in an electric field. The electric potential at a point is defined as the electric potential energy per unit charge:
where is the electric potential energy and is the charge.
Electric Potential Energy
Electric potential energy between two point charges and separated by a distance is given by:
where is the electrostatic constant.
Electric Potential - Joules per Coulomb - Voltage
Electric potential, also known as voltage, is measured in joules per coulomb (J/C). It represents the potential energy per unit charge at a point in an electric field.
Electric Potential due to a Point Charge at Rest
The electric potential at a distance from a point charge is given by:
where is the electrostatic constant.
Potential Energy of a System of Charged Particles
The total electric potential energy of a system of charges is the sum of the potential energies between all pairs of charges in the system. For example, for three charges, and , the potential energy is:
Electric Potential and the Electric Field - Equipotential Lines
Equipotential lines represent points of equal electric potential in an electric field. They are always perpendicular to electric field lines. Moving along an equipotential line requires no work, as the electric potential remains constant.
Electric Potential, Current and Power
Electric potential difference, or voltage, causes current to flow in a conductor. The power delivered by an electric current due to a potential difference is:
Example Problems
Projectile Motion
Projectile motion problems involve analyzing the effects of gravity and may also consider electric forces in certain cases where charged particles move in an electric field.
Electric Potential Simulations
Other Links
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