Toward Better Understanding of the Fundamental Theorem of Calculus

Juan David Yepes; Daniel Raviv

Download Paper | Permalink

Conference: 2024 ASEE Annual Conference & Exposition
Location: Portland, Oregon
Publication Date: June 23, 2024
Start Date: June 23, 2024
End Date: June 26, 2024
Conference Session: Mathematics Division (MATH) Technical Session 2
Tagged Division: Mathematics Division (MATH)
Page Count: 28
DOI: 10.18260/1-2--48162
Permanent URL: https://peer.asee.org/48162
Download Count: 76

Dr. Raviv is a Professor of Computer & Electrical Engineering and Computer Science at Florida Atlantic University. In December 2009 he was named Assistant Provost for Innovation and Entrepreneurship.

With more than 30 years of combined experience in th

visit author page

Download Paper | Permalink

Abstract

In teaching calculus, there's often insufficient emphasis on the profound connection between integration and differentiation, as illuminated by the Fundamental Theorem of Calculus (FTOC). All too frequently, students view integration simply as the inverse operation of differentiation without fully understanding the foundational logic behind this relationship. This shallow comprehension encourages a formula-driven mindset, where learners only apply predetermined rules for both operations, diminishing their grasp of the theorem's importance. In this paper, we attempt to elucidate the FTOC using a visual and intuitive approach. Our primary goal is to promote a foundational understanding of the FTOC. The theorem's explanation is segmented into two distinct parts. The first part of the FTOC asserts that if you take the derivative of an integral with a variable upper limit, you return to the original function. Put more simply, it links the processes of differentiation and integration, illustrating that they are inverse operations. The second part underscores the profound relationship between integration and antiderivatives, especially in the context of definite integrals. In this paper, we review the concept of inverse functions and provide a brief historical overview of the FTOC. A pivotal aspect of our presentation is visualizing the FTOC, a cornerstone in the realm of mathematical analysis. We delve into the relationship between differentiation and integration, highlighting why these two operations are frequently regarded as inverses of one another. Through this exploration, we aim to offer readers a comprehensive understanding of how these foundational mathematical processes are intertwined. This discussion is supplemented by a step-by-step visual and graphical explanation of the concept, accompanied by real-life examples. We introduced the new approach to students in a classroom setting and gathered their feedback for a deeper understanding. To ensure honest and unbiased feedback, we used anonymous questionnaires. This method gave us detailed insights into the effectiveness and reception of the new approach. Our evaluation of this novel technique shows its potential in boosting student understanding. Using this strategy, students not only intuitively understand the FTOC but also indicate a favorability towards visual learning modalities. Based on feedback from 58 students, 69% deem the comprehension of the FTOC as "important" or "very important", and 81% prefer visual learning approaches.

It's crucial to highlight that this project is still a work in progress. It is not intended to replace traditional textbook chapters or topics; instead, it serves as a supplementary tool for both educators and learners. Our goal is to assist instructors in conveying knowledge and to help students grasp the FTOC concept in a more comprehensible and relevant manner. This project is part of a broader initiative. Our experience in assessing STEM-related subjects, such as Control Systems, Digital Signal Processing, Computer Algorithms, and Physics, underscores the potential of this approach.

Citation
Format

Yepes, J. D., & Raviv, D. (2024, June), Toward Better Understanding of the Fundamental Theorem of Calculus Paper presented at 2024 ASEE Annual Conference & Exposition, Portland, Oregon. 10.18260/1-2--48162

TY - CPAPER
AB - In teaching calculus, there&#39;s often insufficient emphasis on the profound connection between integration and differentiation, as illuminated by the Fundamental Theorem of Calculus (FTOC). All too frequently, students view integration simply as the inverse operation of differentiation without fully understanding the foundational logic behind this relationship. This shallow comprehension encourages a formula-driven mindset, where learners only apply predetermined rules for both operations, diminishing their grasp of the theorem&#39;s importance.
In this paper, we attempt to elucidate the FTOC using a visual and intuitive approach. Our primary goal is to promote a foundational understanding of the FTOC. The theorem&#39;s explanation is segmented into two distinct parts. The first part of the FTOC asserts that if you take the derivative of an integral with a variable upper limit, you return to the original function. Put more simply, it links the processes of differentiation and integration, illustrating that they are inverse operations. The second part underscores the profound relationship between integration and antiderivatives, especially in the context of definite integrals.
In this paper, we review the concept of inverse functions and provide a brief historical overview of the FTOC. A pivotal aspect of our presentation is visualizing the FTOC, a cornerstone in the realm of mathematical analysis. We delve into the relationship between differentiation and integration, highlighting why these two operations are frequently regarded as inverses of one another. Through this exploration, we aim to offer readers a comprehensive understanding of how these foundational mathematical processes are intertwined. This discussion is supplemented by a step-by-step visual and graphical explanation of the concept, accompanied by real-life examples.
We introduced the new approach to students in a classroom setting and gathered their feedback for a deeper understanding. To ensure honest and unbiased feedback, we used anonymous questionnaires. This method gave us detailed insights into the effectiveness and reception of the new approach. Our evaluation of this novel technique shows its potential in boosting student understanding. Using this strategy, students not only intuitively understand the FTOC but also indicate a favorability towards visual learning modalities. Based on feedback from 58 students, 69% deem the comprehension of the FTOC as &quot;important&quot; or &quot;very important&quot;, and 81% prefer visual learning approaches.

It&#39;s crucial to highlight that this project is still a work in progress. It is not intended to replace traditional textbook chapters or topics; instead, it serves as a supplementary tool for both educators and learners. Our goal is to assist instructors in conveying knowledge and to help students grasp the FTOC concept in a more comprehensible and relevant manner. This project is part of a broader initiative. Our experience in assessing STEM-related subjects, such as Control Systems, Digital Signal Processing, Computer Algorithms, and Physics, underscores the potential of this approach.

AU - Juan David Yepes
AU - Daniel Raviv
CY - Portland, Oregon
DA - 2024/06/23
PB - ASEE Conferences
TI - Toward Better Understanding of the Fundamental Theorem of Calculus
UR - https://peer.asee.org/48162
DO - 10.18260/1-2--48162
ER -

Toward Better Understanding of the Fundamental Theorem of Calculus

Paper Authors

Juan David Yepes Florida Atlantic University

Daniel Raviv Florida Atlantic University

Abstract

Citation

APA

APA - LaTeX bibitem

MLA

MLA - LaTeX bibitem

Bibtex

EndNote - RIS