% +++++++++++++++++++++++
\section{Motion}
- $\operatorname{m/s} \times 3.6 = \operatorname{km/h}$
+ $\operatorname{m/s} \, \times \, 3.6 = \operatorname{km/h}$
\subsection*{Inclined planes}
- $F = m g \sin\theta F_{frict} = m a$
+ $F = m g \sin\theta - F_{\text{frict}} = m a$
% -----------------------
\subsection*{Banked tracks}
\includegraphics[height=4cm]{graphics/banked-track.png}
- $$\theta = \tan^{-1} {{v^2} \over rg}$$
+ $\theta = \tan^{-1} {{v^2} \over rg}$
$\Sigma F$ always acts towards centre, but not necessarily horizontally
Design speed $v = \sqrt{gr\tan\theta}$
+ $n\sin \theta = {mv^2 \div r}, \quad n\cos \theta = mg$
+
% -----------------------
\subsection*{Work and energy}
$F=-kx$
- $E_{elastic} = {1 \over 2}kx^2$
+ $\text{elastic potential energy} = {1 \over 2}kx^2$
% -----------------------
\subsection*{Motion equations}
\begin{tabular}{ l r }
+ & no \\
$v=u+at$ & $x$ \\
$x = {1 \over 2}(v+u)t$ & $a$ \\
$x=ut+{1 \over 2}at^2$ & $v$ \\
2. Speed of light $c$ is the same to all observers (Michelson-Morley)
- $\therefore , t$ must dilate as speed changes
+ $\therefore \, t$ must dilate as speed changes
{\bf Inertial reference frame} $a=0$
\end{itemize}
\includegraphics[height=2cm]{graphics/field-lines.png}
+ % \includegraphics[height=2cm]{graphics/bar-magnet-fields-rotated.png}
% -----------------------
\subsection*{Gravity}
\textbf{Right hand grip:} thumb points to $I$ (single wire) or N (solenoid / coil)
- \textbf{Right hand slap:} $B \perp I \perp F$
+ \includegraphics[height=2cm]{graphics/slap-2.jpeg}
+ \includegraphics[height=3cm]{graphics/grip.png}
+
+ % \textbf{Right hand slap:} $B \perp I \perp F$ \\
+ % ($I$ = thumb)
\textbf{Flux-time graphs:} $m \times n = \operatorname{emf}$
% \end{wrapfigure}
\textbf{AC:} slip ring (separate rings with constant contact)
+% \pagebreak
+
% +++++++++++++++++++++++
\section{Waves}
- \textbf{nodes:} fixed on graph
- \textbf{amplitude:} max displacement from $y=0$
- \textbf{rarefactions} (expansions) / \textbf{compressions}
- \textbf{mechanical:} transfer of energy without net transfer of matter
-
+ \textbf{nodes:} fixed on graph \\
+ \textbf{amplitude:} max disp. from $y=0$ \\
+ \textbf{rarefactions} and \textbf{compressions} \\
+ \textbf{mechanical:} transfer of energy without net transfer of matter \\
+
\textbf{Longitudinal (motion $||$ wave)}
\includegraphics[width=6cm]{graphics/longitudinal-waves.png}
\includegraphics[width=6cm]{graphics/transverse-waves.png}
% -----------------------
- \subsection*{Motors}
$T={1 \over f}\quad$(period: time for one cycle)
$v=f \lambda \quad$(speed: displacement / sec)
% -----------------------
\subsection*{Interference}
- When a medium changes character, energy is reflected, absorbed, and transmitted
+
+
+
+ \textbf{Standing waves} - constructive int. at resonant freq
+
+ \subsection*{Harmonics}
+
+
+ \(\lambda = {{al} \div n}\quad\) (\(\lambda\) for \(n^{th}\) harmonic)\\
+ \(f = {nv \div al}\quad\) (\(f\) for \(n_{th}\) harmonic at length
+ \(l\) and speed \(v\)) \\
+ where \(a=2\) for antinodes at both ends, \(a=4\) for antinodes at one end
% -----------------------
\subsection*{Polarisation}
\includegraphics[height=3.5cm]{graphics/polarisation.png}
+ % -----------------------
+ \subsection*{Diffraction}
+ \includegraphics[width=6cm]{graphics/diffraction.jpg}
+ \includegraphics[width=6cm]{graphics/diffraction-2.png}
+ \begin{itemize}
+ \item \(pd = |S_1P-S_2P|\) for \(p\) on screen
+ \item Constructive: \(pd = n\lambda, n \in \mathbb{Z}\)
+ \item Destructive: \(pd = (n-{1 \over 2})\lambda, n \in \mathbb{Z}\)
+ \item Fringe separation: \(\Delta x = {{\lambda l }\over d}\) where \\
+ \(\Delta x\) = fringe spacing \\
+ \(l\) = distance from slits to screen\\
+ \(d\) = slit separation (\(=S_1-S_2\))
+ \item significant diffraction when ${\lambda \over \Delta x} \ge 1$
+ \end{itemize}
+
+
+
% -----------------------
\subsection*{Refraction}
\includegraphics[height=3.5cm]{graphics/refraction.png}
- Angle of incidence $\theta_i =$ angle of reflection $\theta_r$
+ When a medium changes character, energy is \emph{reflected}, \emph{absorbed}, and \emph{transmitted}
+
+ angle of incidence $\theta_i =$ angle of reflection $\theta_r$
Critical angle $\theta_c = \sin^-1{n_2 \over n_1}$
Snell's law $n_1 \sin \theta_1=n_2 \sin \theta_2$
+
% +++++++++++++++++++++++
\section{Light and Matter}
$V=h_{\text{eV}}(f-f_0)$
- \columnbreak
+ % \columnbreak
\subsection*{De Broglie's theory}
\item No. of lines - include all possible states
\end{itemize}
- \subsection{Uncertainty principle}
+ \subsection*{Uncertainty principle}
measuring location of an e- requires hitting it with a photon, but this causes $\rho$ to be transferred to electron, moving it.
- \subsection{Wave-particle duaity}
+ \subsection*{Wave-particle duaity}
- wave model:
+ \subsubsection*{wave model}
\begin{itemize}
\item cannot explain photoelectric effect
\item $f$ is irrelevant to photocurrent
\item speed depends on medium
\end{itemize}
- particle model:
+ \subsubsection*{particle model}
\begin{itemize}
\item explains photoelectric effect
\item double slit: photons interact. interference pattern still appears when a dim light source is used so that only one photon can pass at a time
\item light exerts force
\item light bent by gravity
+ \item quantised energy
\end{itemize}
% +++++++++++++++++++++++
- \section{Uncertainty}
+ \section{Experimental \\ design}
- \textbf{Absolute uncertainty} - $\Delta$ - same units as quantity.
+ \textbf{Absolute uncertainty} $\Delta$ \\
+ (same units as quantity)
\[ \Delta(m) = {{\mathcal{E}(m)} \over 100} \cdot m \]
-
\[ (A \pm \Delta A) + (B \pm \Delta A) = (A+B) \pm (\Delta A + \Delta B) \]
\[ (A \pm \Delta A) - (B \pm \Delta A) = (A-B) \pm (\Delta A + \Delta B) \]
\[ c(A \pm \Delta A) = cA \pm c \Delta A \]
- \textbf{Relative uncertainty} - $\mathcal{E}$ - unitless.
- \[ \mathcal{E}(m) = {{\Delta(m)} \over m} \cdot 100} \]
+ \textbf{Relative uncertainty} $\mathcal{E}$ (unitless)
+ \[ \mathcal{E}(m) = {{\Delta(m)} \over m} \cdot 100 \]
\[ (A \pm \mathcal{E} A) \cdot (B \pm \mathcal{E} B) = (A \cdot B) \pm (\mathcal{E} A + \mathcal{E} B) \]
\[ (A \pm \mathcal{E} A) \div (B \pm \mathcal{E} B) = (A \div B) \pm (\mathcal{E} A + \mathcal{E} B) \]
\[ (A \pm \mathcal{E} A)^n = (A^n \pm n \mathcal{E} A) \]
\textbf{Precision} - concordance of values \\
\textbf{Accuracy} - closeness to actual value
+ \columnbreak
-
+ \quad
\end{multicols}
+
+% \includegraphics[height=5cm]{graphics/em-spectrum.png}
+
\end{document}