fixed main

final stuff
stuff circuits blah
2025-10-14 14:49:17 -05:00 · 2025-05-20 23:13:19 -05:00 · 2025-02-24 22:40:48 -06:00
3 changed files with 185 additions and 4 deletions
--- a/content/index.md
+++ b/content/index.md
@@ -3,7 +3,3 @@ title: Welcome to the Warehouse
 ---
 Welcome to the warehouse of the Thoughts of 0x6d617273756c746f72, Prime of the Faith, ranked Hacker on HTB, and the founder of a bunch of defunct projects on github. Average internet nerd/sysadmin/programmer. Move on, to either his cursed musings or with your day.
 # Socials
 - Matrix: [@lanre:envs.net](https://matrix.to/#/@lanre:envs.net)
 - Bluesky: [krishna.ayyalasomayajula.net](https://bsky.app/profile/krishna.ayyalasomayajula.net)
--- a/content/physics/CrazyStuff.md
+++ b/content/physics/CrazyStuff.md
@@ -104,5 +104,89 @@ $$
 Just as the potential energy of a raised ball does not depend on the gravitational field of the ball, the electric potential of the test charge $q$ doesn't depend on the magnitude of the charge itself. This quantity is given the unit **Volt**, or $1\text{ V}=1\;\text{J}/\mathrm{C}$ 
 # Circuits
 ### Ohm’s Law:
 $$
 V = IR
 $$
 - Voltage $V$ = Current $I$ × Resistance $R$
 ### Power in Circuits:
 $$
 P = IV
 $$
 - Power $P$ = Current $I$ × Voltage $V$
 $$
 P = I^2R
 $$
 - Power $P$ = Current squared $I^2$ × Resistance $R$
 $$
 P = \frac{V^2}{R}
 $$
 - Power $P$ = Voltage squared $V^2$ / Resistance $R$
 ### Series Circuits:
 $$
 R_{\text{total}} = R_1 + R_2 + \dots + R_n
 $$
 - Total Resistance $R_{\text{total}}$ = Sum of Individual Resistances
 $$
 V_{\text{total}} = V_1 + V_2 + \dots + V_n
 $$
 - Total Voltage $V_{\text{total}}$ = Sum of Individual Voltages
 $$
 I_{\text{total}} = I_1 = I_2 = \dots = I_n
 $$
 - Current $I_{\text{total}}$ is the same across all components
 ### Parallel Circuits:
 $$
 \frac{1}{R_{\text{total}}} = \frac{1}{R_1} + \frac{1}{R_2} + \dots + \frac{1}{R_n}
 $$
 - Total Resistance $R_{\text{total}}$ = Reciprocal Sum of Individual Resistances
 $$
 V_{\text{total}} = V_1 = V_2 = \dots = V_n
 $$
 - Voltage $V_{\text{total}}$ is the same across all components
 $$
 I_{\text{total}} = I_1 + I_2 + \dots + I_n
 $$
 - Total Current $I_{\text{total}}$ is the sum of individual currents
 ### Capacitance:
 $$
 Q = CV
 $$
 - Charge $Q$ = Capacitance $C$ × Voltage $V$
 $$
 C = \frac{\epsilon_0 A}{d}
 $$
 - Capacitance $C$ of a parallel plate capacitor: $\epsilon_0$ = permittivity of free space, $A$ = area of plates, $d$ = distance between plates
 ### Inductance:
 $$
 V = L \frac{di}{dt}
 $$
 - Voltage across an inductor $V$ = Inductance $L$ × Rate of change of current $\frac{di}{dt}$
 ### RL Time Constant:
 $$
 \tau = \frac{L}{R}
 $$
 - Time constant $\tau$ for an RL circuit
 ### Kirchhoff’s Laws:
 - **Kirchhoff’s Current Law (KCL):** The sum of currents entering a junction equals the sum of currents leaving.
 - **Kirchhoff’s Voltage Law (KVL):** The sum of voltages around any closed loop equals zero.
 ---
 #physics
--- a/content/physics/final.md
+++ b/content/physics/final.md
@@ -0,0 +1,101 @@
 > [!NOTE] A mass $m$ attached to a spring with constant $k$ oscillates on a frictionless surface. Derive an expression for the velocity $v$ as a function of displacement $x$.
 >
 > [!INFO]-
 > Total mechanical energy in SHM is conserved:
 > $$
 > E = \frac{1}{2}mv^2 + \frac{1}{2}kx^2 = \frac{1}{2}kA^2
 > $$
 > Solving for $v$:
 > $$
 > v = \pm \sqrt{\frac{k}{m}(A^2 - x^2)}
 > $$
 > [!NOTE] A wave traveling along a rope is represented by $y(x,t) = 0.02\cos(40x - 600t)$. Determine the amplitude, wavelength, frequency, and speed of the wave.
 >
 > [!INFO]-
 > The general wave form is $y = A\cos(kx - \omega t)$:
 > - Amplitude $A = 0.02\ \mathrm{m}$
 > - Wave number $k = 40 \Rightarrow \lambda = \frac{2\pi}{k} = \frac{2\pi}{40} = 0.157\ \mathrm{m}$
 > - Angular frequency $\omega = 600 \Rightarrow f = \frac{\omega}{2\pi} = \frac{600}{2\pi} \approx 95.5\ \mathrm{Hz}$
 > - Wave speed $v = f\lambda = 95.5 \times 0.157 \approx 15\ \mathrm{m/s}$
 > [!NOTE] In Young's double slit experiment, fringes are formed on a screen 1.2 m away using light of wavelength $600\ \text{nm}$. The slits are separated by $0.2\ \text{mm}$. Calculate the distance between adjacent bright fringes.
 >
 > [!INFO]-
 > Fringe spacing is given by:
 > $$
 > y = \frac{\lambda D}{d} = \frac{600 \times 10^{-9} \times 1.2}{0.2 \times 10^{-3}} = 3.6\ \text{mm}
 > $$
 > [!NOTE] A pendulum of length $0.5\ \mathrm{m}$ is displaced by a small angle. Determine its period and explain why amplitude does not affect the result.
 >
 > [!INFO]-
 > The period is:
 > $$
 > T = 2\pi\sqrt{\frac{L}{g}} = 2\pi\sqrt{\frac{0.5}{9.8}} \approx 1.41\ \mathrm{s}
 > $$
 > In the small-angle approximation ($\theta < 10^\circ$), motion is independent of amplitude.
 > [!NOTE] A charged particle $q$ moves through a uniform electric field $E$. Derive the expression for the work done on the charge and its change in potential energy.
 >
 > [!INFO]-
 > Work done:
 > $$
 > W = qEd
 > $$
 > Change in potential energy:
 > $$
 > \Delta U = -qEd
 > $$
 > since electric potential energy decreases when the charge moves in the direction of the field.
 > [!NOTE] A capacitor of $10\ \mu\mathrm{F}$ is charged to $5\ \mathrm{V}$. Calculate the energy stored in it.
 >
 > [!INFO]-
 > $$
 > E = \frac{1}{2}CV^2 = \frac{1}{2} \cdot 10 \times 10^{-6} \cdot 25 = 1.25 \times 10^{-4}\ \mathrm{J}
 > $$
 > [!NOTE] A coil of wire rotates in a magnetic field. Use Faraday’s law to derive the expression for the induced emf.
 >
 > [!INFO]-
 > Faraday’s law:
 > $$
 > \mathcal{E} = -\frac{d\Phi}{dt}
 > $$
 > Magnetic flux $\Phi = B A \cos(\omega t)$, so:
 > $$
 > \mathcal{E} = B A \omega \sin(\omega t)
 > $$
 > [!NOTE] A wire carries a current of $3\ \mathrm{A}$ through a magnetic field of $0.5\ \mathrm{T}$ perpendicular to its length. The wire is $0.4\ \mathrm{m}$ long. Find the magnetic force.
 >
 > [!INFO]-
 > $$
 > F = ILB\sin\theta = 3 \cdot 0.4 \cdot 0.5 \cdot 1 = 0.6\ \mathrm{N}
 > $$
 > [!NOTE] Explain the effect of damping on the amplitude-frequency graph of a driven harmonic oscillator.
 >
 > [!INFO]-
 > Damping reduces the peak amplitude and shifts the resonant frequency slightly lower. Greater damping broadens the curve and lowers the quality factor $Q$.
 > [!NOTE] A mass-spring oscillator experiences light damping. Write the differential equation and general solution.
 >
 > [!INFO]-
 > Equation:
 > $$
 > m\ddot{x} + b\dot{x} + kx = 0
 > $$
 > Solution:
 > $$
 > x(t) = A e^{-\gamma t} \cos(\omega' t + \phi)
 > $$
 > where $\gamma = \frac{b}{2m}$ and $\omega' = \sqrt{\omega_0^2 - \gamma^2}$.
 > [!NOTE] A $0.2\ \mathrm{kg}$ object experiences a force due to gravity from Earth at a distance of $6.4 \times 10^6\ \mathrm{m}$. Calculate the force.
 >
 > [!INFO]-
 > $$
 > F = G\frac{Mm}{r^2} = 6.67 \times 10^{-11} \cdot \frac{5.97 \times 10^{24} \cdot 0.2}{(6.4 \times 10^6)^2} \approx 1.96\ \mathrm{N}
 > $$
Author	SHA1	Message	Date
Mars Ultor	b3354522b2	fixed main Some checks failed Build and Test / build-and-test (macos-latest) (push) Has been cancelled Details Build and Test / build-and-test (ubuntu-latest) (push) Has been cancelled Details Build and Test / build-and-test (windows-latest) (push) Has been cancelled Details Build and Test / publish-tag (push) Has been cancelled Details	2025-10-14 14:49:17 -05:00
Mars Ultor	c4e9ae358c	final stuff	2025-05-20 23:13:19 -05:00
Mars Ultor	7f66b01d1d	stuff circuits blah	2025-02-24 22:40:48 -06:00