Removed bad warm-up

Misc/Warm-Ups/parking.tex

@@ -1,84 +0,0 @@
-\documentclass[
-	solutions,
-	shortwarning,
-	singlenumbering,
-	nopagenumber,
-	nowarning
-]{../../resources/ormc_handout}
-\usepackage{../../resources/macros}
-\geometry{top = 20mm}
-
-\title{Warm-Up: Parking Problems}
-\subtitle{Prepared by \githref{Mark} on \today.}
-
-\begin{document}
-
-	\maketitle
-
-
-
-	\problem{A Minor Inconvenience}
-	A group of eight friends goes out to dinner. Each drives his own car, checking it in with valet upon arrival.
-	Unfortunately, the valet attendant forgot to tag the friends' keys. Thus, when the group leaves the restaurant,
-	each friend is handed a random key.
-	\begin{itemize}
-		\item What is the probability that everyone gets the correct set of keys?
-		\item What is the probability that each friend gets the wrong set?
-	\end{itemize}
-
-	\vfill
-
-
-	\problem{Bimmer Parking}
-	A parking lot has a row of 16 spaces, of which a random 12 are taken. \par
-	Ivan drives a BMW, and thus needs two adjacent spaces to park. \par
-	What is the probability he'll find a spot?
-
-	\vfill
-	\pagebreak
-
-
-	\problem{Petty Bruins in Westwood}
-	Suppose 6 students live on a one-way street which features six parallel parking spaces.
-	Each student has their favorite spot, and will always check if that spot is free.
-	If it is, they will park there. If it isn't, they will take the next free spot.
-	Backing up is not an option.
-
-	If each student chooses a \say{favorite} spot independently and at random...\par
-	\begin{itemize}
-		\item what is the probability that each student has a different favorite spot?
-		\item what is the probability that all six people will park successfully?
-	\end{itemize}
-
-
-
-	\vfill
-
-
-
-	\problem{Ship Packing}
-	A certain harbor services ships that are exactly 10 meters long.
-	These ships are equipped with transverse thrusters, and thus have
-	no problem parking in parallel (a ship may fit in any gap that is
-	at least 10 meters long).
-
-	\vspace{2mm}
-
-	There is an empty 100-meter span where these ships may be parked in parallel.
-	Parking spaces are not marked---ships may pick a parking spot anywhere on this
-	continuous 100-meter length.
-
-	\vspace{2mm}
-
-	As ships arrive, they pick a random available spot along this span. \par
-	How many ships do we expect to fit on this 100-meter region?
-
-	\hint{This problem is difficult, start with simpler cases.}
-
-
-
-	\vfill
-	\pagebreak
-
-
-\end{document}