Electric Charges and Forces

Useful References:

https://openstax.org/books/physics/pages/18-introduction

The Charge Model

There are two types of charges: positive and negative
Objects are charged by adding/removing electrons
Amount of charge $q = (N_p-N_e)e$
Object electrically neutral iff $q=0$
Charge is conserved; it is neither created nor destroyed

Charge and Electrons

Charge is quantized; it exists only in discrete (i.e. non-continuous) amounts
Elementary charge $e$ is the fundamental unit of electric charge
$e$ is approximately equal to $1.60217663\times 10^{-19} Coulombs$
Charge of any object is an integer multiple of e, that is: $q=ne$ where $q$ is the total charge, $n$ an integer, and $e$ the elementary charge
Objects acquire positive charge by loss of electrons; this process is ionization

Charge Relationships

Like charges exert repulsive force; opposites exert attractive force
Force varies directly according to the magnitude of charge
Force varies inversely according to the distance between charged objects

Bands

Bands are closely spaced orbitals approximately indistinguishable in energy level
Extension of molecular orbital theory; recall HOMO and LUMO

Valence Band

The valence band is the highest occupied energy band in a material
Electrons in the valence band are strongly associated with their individual atoms and are typically involved in bonding

Conduction Band

The conductive band is the lowest unoccupied energy band in a material
It lies directly above the valence band
Electrons in the conduction band often are “excited” electrons; through a thermal process, these electrons gain energy and make the jump from the valence band to the conduction band

Band Gap

The difference in energy between the valence band and conduction band is the band gap
The greater the band gap, the less likely electrons are to be found in the conduction band; they lack the energy to make the jump to the conduction band

Conductivity

Materials with electrons in the conduction band are good conductors of electricity, because these “free” electrons are able to to move easily through the subtrate
In highly conductive materials, such as metals, the band gap overlaps; electrons therefore readily jump between the two bands
Insulators are characterized by a prohibitively large band gap, resulting in an impossibly high amount of energy being required to move electrons into the conduction band to form a current

Charging

Charging may occur via direct contact, whereby electrons are directly transferred between a neutral and a charged object

Charge Transfer by Rubbing

Rubbing objects breaks intramolecular bonds in otherwise neutral molecules, resulting in the formation of polar ions.

Discharging

Discharging is a process whereby a system is neutralized
An object may be discharged by direct contact with the ground, into which excess electrons flow

Polarization

Polarization is the displacement of charges in an object that remains neutral, resulting in an induced dipole moment
Polarization is the result of the application of an external electric field

Electric Dipoles

The electric dipole is a measure of a system’s overall polarity
It comprises two electric charges of equal magnitude q and opposite sign, separated by some distance
The vector form of the electric dipole moment is expressed as $\mathbf{p}=q\mathbf{d}$ where $q$ is the magnitude of the dipole’s charge and $\mathbf{d}$ is the vector pointing from the negative charge to the positive charge

Coulomb’s Law

If two charged particles having charges $q_1$ and $q_2$ are separated by distance $r$, the magnitude of the forces they exert on each other is

\[|F|=F_\textrm{1 on 2}=F_\textrm{2 on 1}=\frac{k|q_1||q_2|}{r^2}\]

where $k$ is Coulomb’s constant. In SI units, $k\approx 8.99\times 10^9\textrm{ N}\cdot\textrm{m}^2/\textrm{C}^2$

The forces are directed along the line joining the two particles
Like forces repel, opposites attract
The forces are attractive for like charges, repulsive for opposite charges

Coulomb’s law may be rewritten using the permittivity constant $\epsilon_0$:

\[F=\frac{1}{4\pi\epsilon_0}\frac{|q_1||q_2|}{r^2}\]

where $\epsilon_0 = \frac{1}{4\pi K}$.

Electric Fields

The spatial forces exerted by charges on the objects around them constitute a vector field. The magnitude of the force exerted by an electric field on an object with charge $q$ is

\[\vec F=q\vec E\]

where $\vec E$ is the force per unit charge ratio (in $\textrm{N}/\textrm{C}$) corresponding to

\[\vec E = \frac{\vec F}{q}\]

Electric Field of Point Charges

Given a single point charge $q$, we can calculate its electric field using a probe $q’$:

\[\vec E = \frac{\vec F_{\textrm{on }q'}}{q'}\]

Assuming both charges are positive, the direction of $\vec E$ will be away from $q$.