THE CONCEPT OF ACCUMULATION IN CALCULUS

The concept of accumulation is central to the idea of integration, and therefore is at the core of understanding many ideas and applications in calculus. On one hand, the idea of accumulation is trivial. You accumulate a quantity by getting more of it. We accumulate injuries as we exercise. We accumulate junk as we grow older. We accumulate wealth by gaining more of it. There are some details to consider, such as whether it makes sense to think of accumulating a negative amount of a quantity, but the main idea is straightforward. On the other hand, the idea of accumulation is anything but straightforward. First, students find it is hard to think of something accumulating when they cannot conceptualize the “bits” that accumulate. To understand the idea of accomplished work, for example, as accruing incrementally means that one must think of each momentary total amount of work as the sum of past increments, and of every additional incremental bit of work as being composed of a force applied through a distance. Second, the mathematical idea of an accumulation function,

[1]  R. B. Davis,et al.  The Notion of Limit: Some Seemingly Unavoidable Misconception Stages. , 1986 .

[2]  Patrick W Thompson,et al.  The development of the concept of speed and its relationship to concepts of rate , 1994 .

[3]  Patrick W Thompson,et al.  Talking about Rates Conceptually, Part I: A Teacher's Struggle. , 1994 .

[4]  Ed Dubinsky,et al.  The Concept of Function: Aspects of Epistemology and Pedagogy [MAA Notes, Volume 25] , 1992 .

[5]  David Tall,et al.  Concept image and concept definition in mathematics with particular reference to limits and continuity , 1981 .

[6]  Patrick W Thompson,et al.  Talking about rates conceptually, Part II: Mathematical knowledge for teaching , 1996 .

[7]  Michael Oehrtman,et al.  Collapsing dimensions, physical limitation, and other student metaphors for limit concepts : an instrumentalist investigation into calculus students' spontaneous reasoning , 2009 .

[8]  P. W. Thompson,et al.  Students, functions, and the undergraduate mathematics curriculum. In E. Dubinsky, A. H. Schoenfeld, & J. J. Kaput (Eds.) , 1994 .

[9]  Shlomo Vinner The Pseudo-Conceptual and the Pseudo-Analytical Thought Processes in Mathematics Learning , 1997 .

[10]  Marilyn P. Carlson,et al.  Developing and Connecting Calculus Students' Notions of Rate-of Change and Accumulation: The Fundamental Theorem of Calculus. , 2003 .

[11]  P. W. Thompson,et al.  RE-THINKING COVARIATION FROM A QUANTITATIVE PERSPECTIVE: SIMULTANEOUS CONTINUOUS VARIATION , 1998 .

[12]  Marilyn P. Carlson,et al.  Applying Covariational Reasoning While Modeling Dynamic Events: A Framework and a Study. , 2002 .

[13]  David Tall,et al.  Ambiguity and flexibility: A proceptual view of simple arithmetic , 1983 .

[14]  Steven R. Williams Models of Limit Held by College Calculus Students. , 1991 .

[15]  Ed Dubinsky,et al.  Development of the process conception of function , 1992 .

[16]  Patrick W Thompson,et al.  Images of rate and operational understanding of the fundamental theorem of calculus , 1994 .