This is told by Carl F. Gauss: "Mathematics is the queen of the sciences and number theory is the queen of mathematics."
There are different types of numbers: prime numbers, composite numbers, real numbers, rational numbers, Irrational Numbers and so on. This study of numbers is included within the concept of maths and numbers and it is very important a study. Therefor number theory holds a greater importance too.
Carl Friedrich Gauss, a famous mathematician, said that "Mathematics is the queen of the sciences and number theory is the queen of mathematics."
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In mathematics, a field is a set on which addition, subtraction, multiplication, and division are defined and behave as the corresponding operations on rational and real numbers do. A field is thus a fundamental algebraic structure which is widely used in algebra, number theory, and many other areas of mathematics.
When you study the theory of geometry, it is pure mathematics. However, when you start using the geometry you have learned in other, more practical areas, then it becomes applied.
The set theory is a branch of mathematics that studies collections of objects called sets. The set theory explains nearly all definitions of mathematical objects.
Number Theory
Carl Friedrich Gauss, a famous mathematician, said that "Mathematics is the queen of the sciences and number theory is the queen of mathematics."
Number theory (or arithmetic) is a branch of pure mathematics devoted primarily to the study of the integers, sometimes called "The Queen of Mathematics" because of its foundation place in the discipline.en.wikipedia.org/wiki/Number_theor
the main branches of mathematics are algebra, number theory, geometry and arithmetic.
John E. Maxfield has written: 'Keys to mathematics' -- subject(s): Mathematics 'Discovering number theory' -- subject(s): Number theory
Uwe Kraeft has written: 'Galois number theory' -- subject(s): Galois theory, Mathematics, OUR Brockhaus selection 'Characters in number theory' 'Congruent numbers' -- subject(s): Mathematik, Number theory, OUR Brockhaus selection 'Applied number theory' -- subject(s): Mathematics, Number theory 'Primes in number theory' -- subject(s): Mathematics, Number theory, OUR Brockhaus selection, Prime Numbers 'Basic algebraic number theory' -- subject(s): Algebraic number theory, Mathematics, OUR Brockhaus selection
Y. Motohashi has written: 'Sieve Methods and Prime Number Theory (Lectures on Mathematics and Physics Mathematics)' 'Lectures on sieve methods and prime number theory' -- subject(s): Numbers, Prime, Prime Numbers, Sieves (Mathematics)
I am sure that there are 25 prime numbers exist in mathematics
Luogeng Hua has written: 'Hua Luogeng shi wen xuan' 'Zong Sunzi di \\' -- subject(s): Chinese Mathematics, Sunzi suan jing 'Introduction to higher mathematics' -- subject(s): Mathematics 'Introduction to number theory' -- subject(s): Number theory 'Hua Luogeng wen ji' -- subject(s): Group theory, Mathematics
Percy Alexander MacMahon has written: 'Combinatory analysis' -- subject(s): Combinatorial analysis, Combinations, Partitions (Mathematics), Permutations, Number theory 'Number theory, invariants, and applications' -- subject(s): Invariants, Number theory 'Percy Alexander MacMahon' -- subject(s): Mathematics
Pierre de Fermat was a lawyer whose hobby was mathematics. His primary mathematical interest was number theory.
Underwood Dudley has written: 'The trisectors' -- subject(s): Mathematics, Trisection of angle, Miscellanea 'A Guide to Elementary Number Theory' -- subject(s): Elementare Zahlentheorie, Number theory 'A budget of trisections' -- subject(s): Trisection of angle 'The Magic Numbers of the Professor (Spectrum)' -- subject(s): Number concept, Symbolism of numbers, Mathematics, Miscellanea, Number theory, Numeracy