*Throughout history, equations have been pulling the strings of society. Tucked away behind the scenes, to be sure – but the influence was there, whether it was noticed or not.*

## What is the book about?

“__In Pursuit of the Unknown__” is written by Ian Stewart, a professor Emeritus of Mathematics and author of a number of books on Mathematics.

“In Pursuit of the Unknown” is a book about 17 seminal equations in Mathematics and Physics. Their origin, meaning, influence and application are described in this book

## What does this book cover?

The equations covered in this book fall into two categories – the first being “universal truths” and the second being models of the real world. These equations are

Pythagoras Theorem

Logarithms

Calculus

Gravity

Complex numbers

Euler’s formula for Polyhedra

Normal Distribution

Wave equation

Fourier Transforms

Navier-Stokes Equation

Maxwell’s Equations

Second Law of Thermodynamics

Relativity

Schrodinger’s Equation

Information Theory

Chaos Theory

Black-Scholes Equation

A chapter is devoted to each equation where its meaning, importance, history and influence is explored in detail.

## What did I like?

“In Pursuit of the Unknown” is reasonably comprehensive. We get to spend quite a bit of time with each equation and at the end of each chapter, we get to have an introductory understanding of it. The exploration of the history behind the equation and events that followed it gives us a feel for how this equation has changed this society.

The equations are also arranged in an ascending scale of complexity roughly. I also liked the fact that most of the equations had their derivations explained well.

## What did I not like?

I noticed that as the topics got more complex, the explanations started to lag. For example, the Pythagoras theorem is explained in a greater detail than Chaos theory. This is unfortunate since the more complex equations obviously require more explanation due to the higher degree of knowledge needed as well as the fact we have been exposed to older theorems during our school or college.

A lesser problem but one which I need to point out is that there were some equations which were not covered in this book. For example – the Bayes Theorem or Fermat’s Last Theorem were also equally influential as the others but did not even get a mention in the book. A mention of such topics would have enabled us to go out and research these on our own.

## My Recommendation

This is one of the best books on introductory Mathematics. For the most part, it has a great set of equations which will give us an appreciation for the changes that they have wrought in this world. Less advanced readers will need to put in some effort to understand the more complex topics but this is well worth it.

I strongly recommend this book.