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| Overview: |
| This course serves as an introduction to analysis (real analysis), an important branch of mathematics which provides a foundation for numerical analysis, functional analysis, harmonic analysis, differential equations, differential geometry, complex analysis and many other areas of specialization within mathematics. Students will advance their ability from their mostly computational knowledge to prove anything themselves mathematically with proper reasoning and justification in Real System. This course develops the theory of calculus carefully and rigorously from basic principles and gives the students a chance to learn how to construct their own proofs. |
| Prerequisites: |
| Any one who are interested to Learn Real Analysis I, Prerequisite for Graduate or PhD Programs. |
| Additional Information: |
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