# What kind of math did Euclid write a book on?

## What kind of math did Euclid write a book on?

geometry

Quick Info. Euclid was a Greek mathematician best known for his treatise on geometry: The Elements. This influenced the development of Western mathematics for more than 2000 years.

## Who wrote Euclid’s Elements?

EuclidEuclid’s Elements / AuthorEuclid, sometimes called Euclid of Alexandria to distinguish him from Euclid of Megara, was a Greek mathematician, often referred to as the “founder of geometry” or the “father of geometry”. He was active in Alexandria during the reign of Ptolemy I. Wikipedia

**What are the 13 books of Elements?**

The thirteen books of Euclid’s Elements

BOOK I | Triangles, parallels, and area |
---|---|

BOOK X | Classification of incommensurables |

BOOK XI | Solid geometry |

BOOK XII | Measurement of figures |

BOOK XIII | Regular solids |

**Who is Recognised as the Queen of math?**

Carl Friedrich Gauss one of the greatest mathematicians, is said to have claimed: “Mathematics is the queen of the sciences and number theory is the queen of mathematics.” The properties of primes play a crucial part in number theory. An intriguing question is how they are distributed among the other integers.

### What is Euclid’s Elements used for?

Euclid’s Elements (c. 300 bce), which presented a set of formal logical arguments based on a few basic terms and axioms, provided a systematic method of rational exploration that guided mathematicians, philosophers, and scientists well into the 19th century.

### Where is the original Euclid’s Elements?

300 BC), as they appear in the “Bodleian Euclid.” This is MS D’Orville 301, copied by Stephen the Clerk for Arethas of Patras, in Constantinople in 888 AD. The manuscript now resides in the Bodleian Library, Oxford University….The thirteen books of Euclid’s Elements.

BOOK I | Triangles, parallels, and area |
---|---|

BOOK XIII | Regular solids |

**How has Euclid’s Elements survived?**

The success of the Elements is due primarily to its logical presentation of most of the mathematical knowledge available to Euclid. Much of the material is not original to him, although many of the proofs are his.