(Overall View) | (Example Oriented Approach) | (Theoretical Approach) | (Types of Problems) | (Collection of Problems)
edited by: Janine Becker / Prof. Dr. Regina Bruder
If we want to learn an teach mathematics, we are confronted with problems everywhere. The diversity of problems is overwhelming: there are hard and easy ones; obvious formal problems and problems of a practical nature. There are problems to prove a term or define an exact sum, problems to elaborate proofs of geometry and stochastics, problems of general analysis and problems of a specific discipline, such as algebra etc.. Problems can serve many differen purposes or just be a means to an end. In this they bevome of vital importance for successful learning of mathematics.
After studying this modulus you will be able to:
Please decide now if you would like to take the example-oriented or the theoretical approach.