Visual Real Analysis : Real Numbers & Real Sequences
A visual and brain-friendly course that makes real analysis fun and easy for college and university students
Description
If you’re a college/university student in a STEM field and you’re taking a course on real sequences, this is for you. This course contains visual and brain-friendly videos that will help you better understand concepts related to real numbers and real sequences.
This course is hands-on. You will have to pause several times during the videos and answer some questions that will help you make progress. Hopefully, at the end of this course, assignments and exams will look a lot easier for you.
The first section of this course deals with real numbers. It defines real numbers and presents concepts related to the set ℝ of real numbers. These concepts are the floor and ceiling of a real number, the absolute value, the density of a subset of ℝ, the supremum, the upper bound, and the greatest element.
The second section of this course is about real sequences. It starts with the definition and the different ways to visualize a real sequence. Then it clarifies several concepts related to real sequences: mathematical induction, convergence, divergence, monotonicity, and subsequences. Further, it presents tools and theorems related to real sequences: adjacent sequences, squeeze theorem, fixed point theorem, etc. And finally, it discusses particular sequences you will see a lot during your academic journey: arithmetic and geometric sequences, first- and second-order recursive sequences, and general recursive sequences.
What You Will Learn!
- Understand and have a mental representation of concepts related to real numbers (definition, density, supremum, upper bound, etc.)
- Learn three ways to represent sequences in a visual way: on a line, as a mapping and using a function’s graph
- Understand an be able to manipulate concepts related to real sequences (induction, convergence, divergence, subsequence, monotonicity, etc.)
- Understand and have a mental representation of tools and theorems related to real sequences (adjacent sequences, squeeze theorem, fixed point theorem, etc.)
Who Should Attend!
- This course is for college and university students who take math courses dealing with sequences.