Updated on March 16, 2024
pure | Pure mathematics deals with the fundamental structures of mathematics such as numbers, sets, and functions. |
higher | Higher mathematics requires a strong foundation in core mathematical concepts. |
modern | Modern mathematics has revolutionized the way we approach problem-solving and data analysis. |
elementary | Elementary mathematics is the study of basic arithmetic, algebra, geometry, and statistics. |
advanced | The advanced mathematics course delved into complex concepts and challenging theorems. |
greek | Ancient Greek mathematics laid the foundations of Western mathematics and is remarkable for its beauty and brilliance. |
discrete | Discrete mathematics is the study of mathematical structures that are discrete rather than continuous. |
classical | Classical mathematics has its basis in Greek mathematics. |
general | His general mathematics skills were very weak. |
high | The study of high mathematics had always been his passion. |
simple | Two plus two equals four is a simple mathematics problem. |
basic | The student performed basic mathematics problems. |
abstract | Abstract mathematics is often seen as a purely theoretical pursuit, but it has many practical applications in fields such as computer science, physics, and engineering. |
practical | The students used practical mathematics to calculate the area of the garden. |
formal | Formal mathematics is the study of mathematical structures that are defined axiomatically. |
secondary | Secondary mathematics is an important part of a well-rounded education. |
complex | The physicist utilized advanced statistical models and complex mathematics to analyze the experimental data. |
mixed | |
contemporary | The conference will feature presentations on a wide range of topics in contemporary mathematics |
traditional | I prefer traditional mathematics over modern mathematics. |
numerical | Numerical mathematics is a branch of mathematics that uses numerical methods to solve problems in science and engineering. |
sophisticated | |
theoretical | Theoretical mathematics provides a foundation for understanding the fundamental principles of mathematics. |
constructive | Constructive mathematics is an approach to mathematics that emphasizes the need for algorithms and proofs that produce concrete, verifiable results. |
ancient | Ancient mathematics has made significant contributions to modern science and technology. |
chinese | The Chinese mathematics used the decimal system and place-value notation centuries before these methods were used in the West. |
western | Western mathematics has a long and rich history. |
computational | Computational mathematics finds applications in a variety of fields, including physics, engineering, finance, and computer science. |
grade | I found grade mathematics to be quite challenging. |
universal | Universal mathematics applies to all mathematical systems. |
egyptian | Egyptian mathematics was developed along the Nile River about 5,000 years ago. |
century | The development of century mathematics has made great contributions to human civilization. |
complicated | |
indian | Indian mathematics has a rich history that spans several millennia. |
ordinary | The ordinary mathematics of the arithmetic progression sums to infinity. |
babylonian | |
level | She scored above average on the level mathematics test. |
finite | Finite mathematics is a branch of mathematics that deals with finite sets and their properties. |
enough | I have enough mathematics for today. |
intuitionistic | Intuitionistic mathematics is a branch of mathematics that emphasizes the role of constructive proofs. |
difficult | The difficult mathematics made the students struggle during the test. |
pythagorean | |
necessary | It is important to have a solid foundation in necessary mathematics for any scientific field. |
outside | The world outside mathematics is far more complex |
rigorous | The student excelled in rigorous mathematics |
recreational | |
combinatorial | Combinatorial mathematics involves counting and arranging objects in different ways. |
junior | The students in junior mathematics class were working on their algebra problems. |
conventional | The conventional mathematics of trigonometry utilizes the definitions of trigonometric ratios. |
statistical | Statistical mathematics is used in a variety of fields to analyze and interpret data. |
japanese | Japanese mathematics has a long and rich history. |
fuzzy | The fuzzy mathematics approach provides a framework for dealing with imprecise and uncertain data. |
undergraduate | |
academic | Her academic mathematics skills were impressive. |
informal | |
continuous | Continuous mathematics is a branch of mathematics that deals with the study of continuous functions and their applications. |
relevant | The research paper does not include relevant mathematics and calculations. |
symbolic | |
analytical | Analytical mathematics is a branch of mathematics that uses analytical techniques to solve problems. |
remedial | John took a remedial mathematics class over the summer to prepare for the SAT. |
year | |
meta | |
vedic | Vedic mathematics simplifies complex mathematical calculations using ancient Indian techniques. |
linear | The complex linear mathematics problem took the student several hours. |
arabic | The Indian astronomer and mathematician Aryabhata was one of the earliest scholars to use arabic mathematics |
actuarial | Dr. Smith excels at actuarial mathematics and is a recognized guru in his field. |
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