1, Mathematical Thinking: Mathematical core literacy emphasizes the cultivation of students' mathematical thinking ability. Including abstract thinking, logical thinking and creative thinking. Students need to be able to understand and apply mathematical concepts, analyze and solve problems, reason and prove propositions, and cultivate flexible mathematical thinking modes.
2. Mathematical methods: The core literacy of mathematics requires students to master and flexibly use a series of mathematical methods and skills. Including the use of mathematical symbols and representations, the skills of mathematical calculation and operation, the establishment of mathematical models and images. Students need to have the ability to explore, verify and reason, and be able to choose and apply appropriate mathematical methods to solve practical problems.
3. Mathematical application: The core literacy of mathematics requires students to combine mathematical knowledge with practical problems and apply mathematics to solve problems in real life and other disciplines. Students need to have the ability to turn mathematical knowledge into practical application, understand the application significance of mathematics, and be able to think and solve problems across disciplines.
These three basic characteristics are interrelated, and the isomorphism of * * * becomes the basis of mathematics core literacy. The cultivation of mathematics core literacy aims at cultivating students' all-round mathematical ability, applying mathematics to practical problems and promoting students' innovative thinking and problem-solving ability.
The significance of mathematics
1, Abstract Language and Symbol System: Mathematics uses symbols and formulas to express and describe mathematical concepts and relationships. Mathematical symbolic language can simplify complex problems into forms that are easy to understand and handle, thus providing a universal way of communication and expression.
2. Logical reasoning and proof: Mathematics relies on logical reasoning and proof to establish and verify mathematical propositions and conclusions. Mathematics can get accurate and reliable results through rigorous reasoning process, and it is repeatable and verifiable.
3. Practical tools and methods: Mathematics provides a series of practical tools and methods, which can be applied to solving problems and analyzing phenomena. Mathematics plays an important role in science, engineering, economy, computer science and other fields, helping people understand and solve practical problems.