Previously,
Augustus De Morgan wrote in
A Budget of Paradoxes about cranks in multiple subjects, and Dudley wrote a book about
angle trisection. However, this book is the first to focus on mathematical crankery as a whole. The book consists of 57 essays, loosely organized by the most common topics in mathematics for cranks to focus their attention on. The "top ten" of these topics, as listed by reviewer
Ian Stewart, are, in order: •
squaring the circle, •
angle trisection, •
Fermat's Last Theorem, •
non-Euclidean geometry and the
parallel postulate, • the
golden ratio, •
perfect numbers, • the
four color theorem, • advocacy for
duodecimal and other non-standard number systems, •
Cantor's diagonal argument for the uncountability of the
real numbers, and •
doubling the cube. Other common topics for crankery, collected by Dudley, include calculations for the
perimeter of an
ellipse,
roots of quintic equations,
Fermat's little theorem,
Gödel's incompleteness theorems,
Goldbach's conjecture,
magic squares,
divisibility rules,
constructible polygons,
twin primes,
set theory,
statistics, and the
Van der Pol oscillator. As
David Singmaster writes, many of these topics are the subject of mainstream mathematics "and only become crankery in extreme cases". The book omits or passes lightly over other topics that apply mathematics to crankery in other areas, such as
numerology and
pyramidology. Its attitude towards the cranks it covers is one of "sympathy and understanding", and in order to keep the focus on their crankery it names them only by initials. The book also attempts to analyze the motivation and psychology behind crankery, and to provide advice to professional mathematicians on how to respond to cranks. Despite his work on the subject, which has "become enshrined in academic folklore", Dudley has stated "I've been at this for a decade and still can't pin down exactly what it is that makes a crank a crank", adding that "It's like obscenity – you can tell a crank when you see one." ==Lawsuit==