Energy of particle in a box

$E_n = ( n ^2*h^2)/(8* m * L ^2)$

$(n)"energy level"$

$(m)"mass of particle"$

$(L)"length of the box"$

The Math / Science

The Energy of a particle in a box is found using the particle in a box model which describes a particle free to move in a small space surrounded by impenetrable barriers. The model is mainly used as a a hypothetical example to illustrate the differences between classical and quantum systems. The energy is found using the following formula:

$E_n=(n^2h^2)/(8mL^2)$

where:

E_n = Energy in a Box
n = Energy level
h = Planck's constant
m = mass of particle
L = Length of the box

Energy Calculators

Kinetic Energy: $KE= 1/2 *m * v^2$
Kinetic Energy (change of velocity): $KE = 1/2*m*(V_1-V_2)^2$
Relativistic Kinetic Energy: $E_K = (m*c^2)/sqrt(1 - v^2"/"c^2") - m*c^2$
Potential Energy: $U(y) = m*g*y$
Potential Energy of Gravity (two bodies): $U(G) = - (G*m1*m2)/r$
Nuclear Binding Energy: $E = m*c^2$
Quantum Energy (Planck's Equation): $E = h*f$
Energy of a Particle in a Box: $E_n=(n^2h^2)/(8mL^2)$
Molecular Kinetic Energy: $KE = 3/2 * k_B *T$
Electrostatic Potential Energy: $E_(el) = k_e * (Q_1*Q_2)/d$
Photon Energy from Wavelength: $E = (h*c)/lambda$
Heat Energy to Change Material Temperature: $Q = C * m *DeltaT$

References

The formula and definition are from Wikipedia (https://en.wikipedia.org/wiki/Particle_in_a_box).