A visual tour via the Definite Integration ∫ab1xdx
Abstract
Geometrically, ∫ab1xdx means the area under the curve 1x from a to b, where 0<a<b, and this area gives a positive number. Using this area argument, in this expository note, we present some visual representations of some classical results. For examples, we demonstrate an area argument on a generalization of Euler's limit (n∞((n+1)n)n=e). Also, in this note, we provide an area argument of the inequality ba < ab, where e ≤ a< b, as well as we provide a visual representation of an infinite geometric progression. Moreover, we prove that the Euler's constant γ∈ [12, 1) and the value of e is near to 2.7. Some parts of this expository article has been accepted for publication in Resonance - Journal of Science Education, The Mathematical Gazette, and International Journal of Mathematical Education in Science and Technology.
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