![]() This can be regarded as advanced school math. In Contemporary Mathematics, there is explicit attention to working with number systems. College-level mathematics assumes that the student has acquired this skill before college. Number Theoryīeing numerate is a life skill on par with being literate. This module involves basic set operations and everyday applications, allowing students to practice abstract mathematical modeling. By engaging with the no-frills basic units of algebra, Contemporary Mathematics students get to practice the abstract reasoning of mathematicians without confusing structures. A set is a collection of objects, and any algebra involves a set of structural constraints imposed on a set. Set theory is the basis of abstract algebra. This approach is taught without invoking distractive technicalities. In this module, the mathematician’s approach to solving a problem is the focus rather than the specifics of the situation. Key to the definition is the ability to frame relevant questions that pinpoint areas of activity needed to solve a problem and illuminate the path to solving them. Critical ThoughtĬritical thinking replaces impulsive intuitive action with systematic reasoned thought. Here, we provide an overview of modules that are typically included in a Contemporary Mathematics course. The Typical Contemporary Mathematics CurriculumĬurriculums may vary from college to college. It is a course that provides students with habits of mind that help them navigate the real world, not specialist technical careers or abstract theoretical concerns.
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