, MTE1501
Assignment 2 2023
Unique Number:
Due Date: 1 June 2023
Answer: Composite numbers
Extra information for better understanding:
Composite numbers are positive integers greater than one that have
more than two distinct positive divisors. In other words, they can be
divided evenly by numbers other than 1 and themselves. The term
"composite" is used to differentiate these numbers from prime numbers,
which only have two distinct positive divisors (1 and the number itself).
Composite numbers have a long history in mathematics and have been
studied in various civilizations across the world. The concept of
composite numbers dates back to ancient times, and different
civilizations had their own ways of understanding and working with these
numbers…………………………………………………………………….
, MTE1501
Assignment 2 2023
Unique Number:
Due Date: 1 June 2023
QUESTION 1: THE HISTORY, VIEWS AND USES OF MATHEMATICS IN
VARIOUS
CIVILISATIONS ACROSS THE WORLD.
1.1. What name is attached to the numbers crossed except one?
Composite numbers are positive integers greater than one that have more than two
distinct positive divisors. In other words, they can be divided evenly by numbers
other than 1 and themselves. The term "composite" is used to differentiate these
numbers from prime numbers, which only have two distinct positive divisors (1 and
the number itself).
Composite numbers have a long history in mathematics and have been studied in
various civilizations across the world. The concept of composite numbers dates back
to ancient times, and different civilizations had their own ways of understanding and
working with these numbers.
In ancient Mesopotamia, around 1800 BCE, the Babylonians developed a
sophisticated number system based on a base-60 system. They had knowledge of
composite numbers and understood their properties. The ancient Egyptians also had
a number system and were familiar with composite numbers, as evidenced by their
mathematical texts and records.
In ancient Greece, renowned mathematicians such as Euclid and Pythagoras
explored the properties of composite numbers. Euclid, in his work "Elements,"
provided a detailed study of prime and composite numbers, proving fundamental
theorems about them.
Assignment 2 2023
Unique Number:
Due Date: 1 June 2023
Answer: Composite numbers
Extra information for better understanding:
Composite numbers are positive integers greater than one that have
more than two distinct positive divisors. In other words, they can be
divided evenly by numbers other than 1 and themselves. The term
"composite" is used to differentiate these numbers from prime numbers,
which only have two distinct positive divisors (1 and the number itself).
Composite numbers have a long history in mathematics and have been
studied in various civilizations across the world. The concept of
composite numbers dates back to ancient times, and different
civilizations had their own ways of understanding and working with these
numbers…………………………………………………………………….
, MTE1501
Assignment 2 2023
Unique Number:
Due Date: 1 June 2023
QUESTION 1: THE HISTORY, VIEWS AND USES OF MATHEMATICS IN
VARIOUS
CIVILISATIONS ACROSS THE WORLD.
1.1. What name is attached to the numbers crossed except one?
Composite numbers are positive integers greater than one that have more than two
distinct positive divisors. In other words, they can be divided evenly by numbers
other than 1 and themselves. The term "composite" is used to differentiate these
numbers from prime numbers, which only have two distinct positive divisors (1 and
the number itself).
Composite numbers have a long history in mathematics and have been studied in
various civilizations across the world. The concept of composite numbers dates back
to ancient times, and different civilizations had their own ways of understanding and
working with these numbers.
In ancient Mesopotamia, around 1800 BCE, the Babylonians developed a
sophisticated number system based on a base-60 system. They had knowledge of
composite numbers and understood their properties. The ancient Egyptians also had
a number system and were familiar with composite numbers, as evidenced by their
mathematical texts and records.
In ancient Greece, renowned mathematicians such as Euclid and Pythagoras
explored the properties of composite numbers. Euclid, in his work "Elements,"
provided a detailed study of prime and composite numbers, proving fundamental
theorems about them.
