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Calculus students' understandings of...
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Kimani, Patrick M.
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Calculus students' understandings of the concepts of function transformation, function composition, function inverse and the relationships among the three concepts.
紀錄類型:
書目-電子資源 : Monograph/item
正題名/作者:
Calculus students' understandings of the concepts of function transformation, function composition, function inverse and the relationships among the three concepts./
作者:
Kimani, Patrick M.
出版者:
Ann Arbor : ProQuest Dissertations & Theses, : 2008,
面頁冊數:
335 p.
附註:
Source: Dissertations Abstracts International, Volume: 70-07, Section: A.
Contained By:
Dissertations Abstracts International70-07A.
標題:
Mathematics education. -
電子資源:
http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=3333570
ISBN:
9780549861287
Calculus students' understandings of the concepts of function transformation, function composition, function inverse and the relationships among the three concepts.
Kimani, Patrick M.
Calculus students' understandings of the concepts of function transformation, function composition, function inverse and the relationships among the three concepts.
- Ann Arbor : ProQuest Dissertations & Theses, 2008 - 335 p.
Source: Dissertations Abstracts International, Volume: 70-07, Section: A.
Thesis (Ph.D.)--Syracuse University, 2008.
Researchers investigating students' understanding of functions have found that many students, including pre-service teachers, have a limited understanding of functions. While much research has been conducted on students' understanding of functions, little attention has been paid to students' understanding of function transformation, function composition, function inverse, and the students' perceptions of how these three concepts are related. This study sought to extend prior research on students' understanding of function ideas by investigating calculus students' understandings of the related concepts of function transformation, function inverse, and function composition, and the students' perceptions of the relationships among the three concepts. This study employed both qualitative and quantitative methods, and was influenced by a constructivist theory of learning and a framework of flexibility. In the first phase of the study, I administered a 20-question questionnaire to 70 students in the first course of the calculus sequence -40 AP Calculus students in high school and 30 college students taking Calculus I. The questionnaire gathered data about the students' mathematical background, demographic information, as well as their understanding of the concept of function. Summary statistics of the students' scores in the questionnaire were used to select 17 of the 70 respondents to participate in individual task-based interviews. The participants' work, including transcripts of the interview, was collected and analyzed inductively using a combination of grounded theory and a framework of flexibility. The results of this study confirmed findings of other studies before it that showed students' limited understandings about the three concepts. Most of the students exhibited an understanding of the inverse of a function, as a reversal of the correspondence that defines the original function. On the other hand, the participants had a limited understanding of function composition and function transformation with many treating compositions or transformations as processes that produced new functions with no ties to the original function(s). These students' understandings of the three concepts seemed to be affected by factors such as function representation, wording used in the item/task presentation, and the students' function schema. In addition, a major contribution of this study was in the students' perception of the relationships among the three concepts. I found that there were differences in the abilities of the participants to see relationships among the three concepts. As expected, the students' abilities to perceive the relationships among the three concepts seemed to depend on a good understanding of each of the three concepts. Most of the participants responded to the items/tasks using memorized formulas or strategies that were called upon whenever the participants encountered the concept words (or notation for) transformation, composition, or inverse. This seemed to inhibit the students from seeing relationships among the three concepts. There were some exceptions to this pattern with a few students showing great insight about their understanding of the three concepts in any of the three representations used, and exhibiting an understanding of relationships among the three concepts through their responses.
ISBN: 9780549861287Subjects--Topical Terms:
641129
Mathematics education.
Subjects--Index Terms:
Calculus
Calculus students' understandings of the concepts of function transformation, function composition, function inverse and the relationships among the three concepts.
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Researchers investigating students' understanding of functions have found that many students, including pre-service teachers, have a limited understanding of functions. While much research has been conducted on students' understanding of functions, little attention has been paid to students' understanding of function transformation, function composition, function inverse, and the students' perceptions of how these three concepts are related. This study sought to extend prior research on students' understanding of function ideas by investigating calculus students' understandings of the related concepts of function transformation, function inverse, and function composition, and the students' perceptions of the relationships among the three concepts. This study employed both qualitative and quantitative methods, and was influenced by a constructivist theory of learning and a framework of flexibility. In the first phase of the study, I administered a 20-question questionnaire to 70 students in the first course of the calculus sequence -40 AP Calculus students in high school and 30 college students taking Calculus I. The questionnaire gathered data about the students' mathematical background, demographic information, as well as their understanding of the concept of function. Summary statistics of the students' scores in the questionnaire were used to select 17 of the 70 respondents to participate in individual task-based interviews. The participants' work, including transcripts of the interview, was collected and analyzed inductively using a combination of grounded theory and a framework of flexibility. The results of this study confirmed findings of other studies before it that showed students' limited understandings about the three concepts. Most of the students exhibited an understanding of the inverse of a function, as a reversal of the correspondence that defines the original function. On the other hand, the participants had a limited understanding of function composition and function transformation with many treating compositions or transformations as processes that produced new functions with no ties to the original function(s). These students' understandings of the three concepts seemed to be affected by factors such as function representation, wording used in the item/task presentation, and the students' function schema. In addition, a major contribution of this study was in the students' perception of the relationships among the three concepts. I found that there were differences in the abilities of the participants to see relationships among the three concepts. As expected, the students' abilities to perceive the relationships among the three concepts seemed to depend on a good understanding of each of the three concepts. Most of the participants responded to the items/tasks using memorized formulas or strategies that were called upon whenever the participants encountered the concept words (or notation for) transformation, composition, or inverse. This seemed to inhibit the students from seeing relationships among the three concepts. There were some exceptions to this pattern with a few students showing great insight about their understanding of the three concepts in any of the three representations used, and exhibiting an understanding of relationships among the three concepts through their responses.
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