

Hardcover ISBN: | 978-0-88385-566-9 |
Product Code: | SPEC/58 |
List Price: | $65.00 |
MAA Member Price: | $48.75 |
AMS Member Price: | $48.75 |
eBook ISBN: | 978-1-4704-5862-1 |
Product Code: | SPEC/58.E |
List Price: | $50.00 |
MAA Member Price: | $37.50 |
AMS Member Price: | $37.50 |
Hardcover ISBN: | 978-0-88385-566-9 |
eBook: ISBN: | 978-1-4704-5862-1 |
Product Code: | SPEC/58.B |
List Price: | $115.00 $90.00 |
MAA Member Price: | $86.25 $67.50 |
AMS Member Price: | $86.25 $67.50 |


Hardcover ISBN: | 978-0-88385-566-9 |
Product Code: | SPEC/58 |
List Price: | $65.00 |
MAA Member Price: | $48.75 |
AMS Member Price: | $48.75 |
eBook ISBN: | 978-1-4704-5862-1 |
Product Code: | SPEC/58.E |
List Price: | $50.00 |
MAA Member Price: | $37.50 |
AMS Member Price: | $37.50 |
Hardcover ISBN: | 978-0-88385-566-9 |
eBook ISBN: | 978-1-4704-5862-1 |
Product Code: | SPEC/58.B |
List Price: | $115.00 $90.00 |
MAA Member Price: | $86.25 $67.50 |
AMS Member Price: | $86.25 $67.50 |
-
Book DetailsSpectrumVolume: 58; 2008; 325 pp
This is a collection of gems from the literature of mathematics that shine as brightly today as when they first appeared in print. They deserve to be seen and admired. The selections include two opposing views on the purpose of mathematics, The Strong Law of Small Numbers, the treatment of calculus in the 1771 Encyclopaedia Britannica, several proofs that the number of legs on a horse is infinite, a deserved refutation of the ridiculous Euler-Diderot anecdote, the real story of pi and the Indiana Legislature, the reason why Theodorus stopped proving that square roots were irrational when he got to the square root of 17, an excerpt from Mathematics Made Difficult; a glimpse into the mind of a calculating prodigy. There will be something of interest here for almost anyone interested in mathematics.
-
Table of Contents
-
Articles
-
Dieudonné on Mathematics
-
Why Is Mathematics?
-
Is Mathematics Inevitable?
-
A Defense of Quadratic Equations
-
Obtuse Triangles
-
A Small Paradox
-
Applied Mathematics
-
The Law of Small Numbers
-
The Parallel Postulate
-
Arithmetic in the United States
-
The Moore Method
-
Early Calculus
-
Problems
-
A Tangled Tale
-
A Brief Life
-
Cardano
-
Boole and Finite Differences
-
Calculating Prodigies
-
James Smith, Circle-Squarer
-
Legislating $\pi $
-
Mathematics and Music
-
Mathematics Books
-
Irrational Square Roots
-
The Euler-Diderot Anecdote
-
Mathematics Made Difficult
-
Mathematical Humor
-
-
Reviews
-
A more accurate question to appear as the title would be "Is All Mathematics Inevitable?" It is clear that given the development of human-level intelligence some mathematics is inevitable. For example, counting is clearly inevitable and there have been experiments that demonstrate that human babies can count at a very early age and that many animals can perform rudimentary counting. However, it is uncertain whether some of the more abstract areas of mathematics were inevitable, it is a very interesting point of philosophical debate, being rooted in the Greek mathematics of Plato. "Is Mathematics Inevitable?" by Nathan Altshiller Court is just one of the articles. The book is a collection of articles about mathematics, the people that pushed it forward and the context in which they lived their lives. All of the papers are expository, while some of the topics are philosophically deep; the level of mathematics never gets to the point where it would overwhelm an intelligent undergraduate that is beyond calculus.
...Some mathematics books are fun to read, this one is fun, nearly always interesting and could be useful as a text in survey or capstone courses.
Charles Ashbacher, Journal of Recreational Mathematics
-
-
RequestsReview Copy – for publishers of book reviewsAccessibility – to request an alternate format of an AMS title
- Book Details
- Table of Contents
- Reviews
- Requests
This is a collection of gems from the literature of mathematics that shine as brightly today as when they first appeared in print. They deserve to be seen and admired. The selections include two opposing views on the purpose of mathematics, The Strong Law of Small Numbers, the treatment of calculus in the 1771 Encyclopaedia Britannica, several proofs that the number of legs on a horse is infinite, a deserved refutation of the ridiculous Euler-Diderot anecdote, the real story of pi and the Indiana Legislature, the reason why Theodorus stopped proving that square roots were irrational when he got to the square root of 17, an excerpt from Mathematics Made Difficult; a glimpse into the mind of a calculating prodigy. There will be something of interest here for almost anyone interested in mathematics.
-
Articles
-
Dieudonné on Mathematics
-
Why Is Mathematics?
-
Is Mathematics Inevitable?
-
A Defense of Quadratic Equations
-
Obtuse Triangles
-
A Small Paradox
-
Applied Mathematics
-
The Law of Small Numbers
-
The Parallel Postulate
-
Arithmetic in the United States
-
The Moore Method
-
Early Calculus
-
Problems
-
A Tangled Tale
-
A Brief Life
-
Cardano
-
Boole and Finite Differences
-
Calculating Prodigies
-
James Smith, Circle-Squarer
-
Legislating $\pi $
-
Mathematics and Music
-
Mathematics Books
-
Irrational Square Roots
-
The Euler-Diderot Anecdote
-
Mathematics Made Difficult
-
Mathematical Humor
-
A more accurate question to appear as the title would be "Is All Mathematics Inevitable?" It is clear that given the development of human-level intelligence some mathematics is inevitable. For example, counting is clearly inevitable and there have been experiments that demonstrate that human babies can count at a very early age and that many animals can perform rudimentary counting. However, it is uncertain whether some of the more abstract areas of mathematics were inevitable, it is a very interesting point of philosophical debate, being rooted in the Greek mathematics of Plato. "Is Mathematics Inevitable?" by Nathan Altshiller Court is just one of the articles. The book is a collection of articles about mathematics, the people that pushed it forward and the context in which they lived their lives. All of the papers are expository, while some of the topics are philosophically deep; the level of mathematics never gets to the point where it would overwhelm an intelligent undergraduate that is beyond calculus.
...Some mathematics books are fun to read, this one is fun, nearly always interesting and could be useful as a text in survey or capstone courses.
Charles Ashbacher, Journal of Recreational Mathematics