Campo Elettrostatico e Potenziale

F = \dfrac{1}{4\pi\varepsilon_0}\dfrac{|q_1 q_2|}{r^2}

e = 1.602\times10^{-19}\,\mathrm{C}

\varepsilon_0 = 8.85\times10^{-12}\,\mathrm{C^2/(N\cdot m^2)}

\vec{E} = \dfrac{1}{4\pi\varepsilon_0}\dfrac{q}{r^2}\hat{r}

E_{filo} = \lambda/(2\pi\varepsilon_0 r),\quad E_{piano} = \sigma/(2\varepsilon_0)

V = \dfrac{q}{4\pi\varepsilon_0 r}

\vec{E} = -\nabla V

V_{dip} = \dfrac{p\cos\theta}{4\pi\varepsilon_0 r^2}

\oint_S\vec{E}\cdot d\vec{A} = Q_{int}/\varepsilon_0

\nabla\cdot\vec{E} = \rho/\varepsilon_0

\nabla^2 V = -\rho/\varepsilon_0 \quad (\text{Poisson})

C = Q/V,\quad C_{piano} = \varepsilon_0 A/d

U = CV^2/2 = Q^2/(2C)

u = \varepsilon_0 E^2/2

\vec{D} = \varepsilon_0\varepsilon_r\vec{E}

\nabla\cdot\vec{D} = \rho_{lib}

C_{diel} = \varepsilon_r C_0

Campo Magnetico e Correnti Elettriche

I = dq/dt\;[\mathrm{A}],\quad \vec{J} = \sigma\vec{E}

R = \rho L/A,\quad V = RI

P = I^2R = V^2/R \quad (\text{Joule})

\vec{F} = q\vec{v}\times\vec{B}

d\vec{F} = I\,d\vec{l}\times\vec{B}

r = mv/(qB),\quad \omega_c = qB/m

d\vec{B} = \dfrac{\mu_0}{4\pi}\dfrac{I\,d\vec{l}\times\hat{r}}{r^2}

B_{filo} = \mu_0 I/(2\pi r),\quad B_{sol} = \mu_0 nI

\oint_C\vec{B}\cdot d\vec{l} = \mu_0 I_{enc}

\nabla\times\vec{B} = \mu_0\vec{J},\quad \nabla\cdot\vec{B} = 0

\vec{B} = \nabla\times\vec{A}

\vec{H} = \vec{B}/\mu_0 - \vec{M}

\vec{B} = \mu_0\mu_r\vec{H}

\nabla\times\vec{H} = \vec{J}_{lib}

Induzione Elettromagnetica e Equazioni di Maxwell

\mathcal{E} = -d\Phi_B/dt

\nabla\times\vec{E} = -\partial\vec{B}/\partial t

\Phi_B = \int_S\vec{B}\cdot d\vec{A}

\mathcal{E}_L = -L\,dI/dt

U_L = LI^2/2,\quad u_B = B^2/(2\mu_0)

L_{sol} = \mu_0 n^2 V

\nabla\cdot\vec{E}=\rho/\varepsilon_0,\quad \nabla\cdot\vec{B}=0

\nabla\times\vec{E}=-\partial\vec{B}/\partial t,\quad \nabla\times\vec{B}=\mu_0\vec{J}+\mu_0\varepsilon_0\partial\vec{E}/\partial t

c = 1/\sqrt{\mu_0\varepsilon_0}

\omega_0 = 1/\sqrt{LC}

Z = \sqrt{R^2+(X_L-X_C)^2}

P = V_{rms}I_{rms}\cos\phi

Onde Elettromagnetiche

c = 1/\sqrt{\mu_0\varepsilon_0} = 2.998\times10^8\,\mathrm{m/s}

\vec{E}\perp\vec{B}\perp\vec{k},\quad |E|=c|B|

\omega = ck,\quad k = 2\pi/\lambda

\vec{S} = \dfrac{1}{\mu_0}\vec{E}\times\vec{B}

I = \langle S\rangle = \dfrac{c\varepsilon_0 E_0^2}{2}

P_{rad} = I/c\;(\text{assorbimento})

n = c/v = \sqrt{\varepsilon_r\mu_r}

n_1\sin\theta_i = n_2\sin\theta_t \quad (\text{Snell})

\sin\theta_c = n_2/n_1 \quad (\text{angolo critico})

c = \lambda f = 2.998\times10^8\,\mathrm{m/s}

\delta = \sqrt{\dfrac{2}{\mu_0\sigma\omega}} \quad (\text{skin depth})

Ottica — Interferenza, Diffrazione e Ottica Geometrica

\Delta r = m\lambda \Rightarrow \text{massimo}

y_m = m\lambda L/d \quad (\text{Young})

\Delta_{lamina} = 2nt \pm \lambda/2

I = I_0(\sin\alpha/\alpha)^2,\quad \alpha=\pi a\sin\theta/\lambda

a\sin\theta = m\lambda \quad (\text{minimi})

\theta_{min} = 1.22\lambda/D \quad (\text{Rayleigh})

d\sin\theta = m\lambda \quad (\text{massimi})

\mathcal{R} = mN

2d\sin\theta = m\lambda \quad (\text{Bragg})

1/p + 1/q = 1/f = 2/R \quad (\text{specchio})

1/f=(n-1)(1/R_1-1/R_2) \quad (\text{lensmaker})

m = -q/p \quad (\text{ingrandimento})

Fisica Moderna — Quantistica e Stato Solido

P = \sigma T^4 A,\quad \sigma=5.67\times10^{-8}\,\mathrm{W/(m^2K^4)}

\lambda_{max}T = 2.898\times10^{-3}\,\mathrm{m\cdot K}

E = h\nu = hc/\lambda

KE_{max} = h\nu - \phi

\Delta\lambda = \lambda_C(1-\cos\theta)

E_{fot}=h\nu,\quad p_{fot}=h/\lambda

\lambda = h/p \quad (\text{de Broglie})

\Delta x\cdot\Delta p \geq \hbar/2

\hbar = h/(2\pi)

E_n = -13.6\,\mathrm{eV}/n^2

h\nu = E_{n_i} - E_{n_f}

1/\lambda = R_H(1/n_f^2 - 1/n_i^2)

E_g(Si)=1.1\,\mathrm{eV},\quad E_g(Ge)=0.67\,\mathrm{eV}

Formulario di Fisica 2