Mathematical attribute is the measurable attribute of anything, that is, mathematical attribute is the most basic attribute of things. The existence of measurable attributes has nothing to do with parameters, but its result depends on the choice of parameters. For example, time is measured in years, months, days or hours, minutes and seconds; Space, whether measured in meters, microns, inches or light years, always has their measurable properties, but the accuracy of the results is related to these reference coefficients.
Mathematics is a science that studies quantitative relations and spatial forms in the real world. In short, it is a science that studies numbers and shapes. Due to the needs of life and labor, even the most primitive people know simple counting, and it has developed from counting with fingers or objects to counting with numbers.
The knowledge and application of basic mathematics will always be an indispensable part of individual and group life. The refinement of its basic concepts can be seen in ancient mathematical classics of ancient Egypt, Mesopotamia and ancient India. Since then, its development has made small progress, until the Renaissance in16th century, and the mathematical innovation generated by the interaction with new scientific discoveries accelerated the knowledge until today.
Today, mathematics is used in different fields of the world, including science, engineering, medicine and economics. The application of mathematics in these fields is usually called applied mathematics, which sometimes leads to new mathematical discoveries and the development of new disciplines. Mathematicians also study pure mathematics with no practical application value, even though its application is often discovered later.
The French Bourbaki School, founded in 1930s, believes that mathematics, at least pure mathematics, is a theory to study abstract structures. Structure is a deductive system based on initial concepts and axioms. According to the Bourbaki school, there are three basic abstract structures: algebraic structure (group, ring, domain ...), ordered structure (partial order, total order ...) and topological structure (neighborhood, limit and topological structure.