Reconceptualizing Mathematical Objects as Mediating Discursive Metaphors Aaron Weinberg Ithaca...
-
Upload
brett-bridges -
Category
Documents
-
view
214 -
download
0
Transcript of Reconceptualizing Mathematical Objects as Mediating Discursive Metaphors Aaron Weinberg Ithaca...
Reconceptualizing Mathematical Objects as
Mediating Discursive MetaphorsAaron WeinbergIthaca College
Example
Example
Example
Example• Leslie: See, I used to think you had to flip it over the y equals x axis. What is that for? Do you know what I'm talking about?
• Tyler: Oh, that is inverse.• L: That's inverse... So if you flip it over it will be like...
• T: Oh, see… then it goes out that way, see? Yeah, it's just the opposite of this graph
• L: Like that?• T: Yeah, no... just solve for y equals... so negative square root of x, and you solve for y for this?
• L: What do you mean solve for y?• T: We could just plug in points to see. Negative square root of x?
• L: Is that possible?• T: Take the square root first, and then put the negative.
Example
• How are students thinking about functions?
• How are students thinking about representations?
• How are students participating?
• What is the relationship between–Representations–Conceptions of functions–Dialogue
• Are the students successful?
• How can we describe their activity?
Functions in APOS
• Prefunction: Does not assign much meaning
• Action: One step at a time • Process: Dynamic repeatable transformation–Think about the function as a whole –Combine several processes –Reverse individual processes
• Object: –Functions as inputs–Discuss general characteristics–Work with non-computable functions
Evaluating Encapsulation
Prefunction: The student does not have very much of a function concept at all
Action: Emphasized the act of substituting numbers for variables and calculating to get a number, but did not refer to any overall process of beginning with a value (numerical or otherwise) and doing something that resulted in a value
Process: The input, transformation, and output were present, integrated and fairly general
Breidenbach, Dubinsky, Hawks, & Nichols, 1992
Evaluating Encapsulation
Conception
Examples
Prefunction
A mathematical equation with variables.A mathematical statement that describes something.
Action A function is an equation in which a variable is manipulated so that an answer is calculated using numbers in place of that variable.A function is an expression that will evaluate something when either variables or numbers are plugged into the function.
Process A function is some sort of input being processed, a way to give some sort of output.A function is an algorithm that maps an input into a designated output.
Drawbacks and Concerns
• Is it a complete description?• Strict hierarchical ordering– Discrete categories– Linear development
• Prioritize object conception• Acquiring cognitive structures– Diminishes social, historical, and cultural lenses
– Contexts and toole– Novice-expert approach– Culturally-embedded self-description
Why APOS is Important
• Help make sense of student work
• Make pedagogical decisions
• Helps focus on concept development
• “Necessary” for some concepts
Goal: Reconceptualize developmental levels and mathematical objects
Analyzing Discourse
Mediational Toolkit
•Actions, Processes, Objects as Metaphors
•Language use
Objectified Discourse
•Semantics
•Intramental Activity
•“Aboutness”Facet (Representatio
n)
Analyzing Discourse
Mediational Toolkit
•Actions, Processes, Objects as Metaphors
•Language use
Objectified Discourse
•Semantics
• Intramental Activity
•“Aboutness”Facet (Representatio
n)
Mediation of Thought
• Examples– “Seeing” stick– Driving around New Jersey– Graphs of functions
• Symbols and language are tools• We use tools to engage in social action– Culturally and historically situated
• Discursive technology– Tools and action influence our thinking
Mediational Toolkit
• Speaker’s use of linguistic metaphor and associated actions
• Tool choice based on – Different functions
– Context
– Authority
– Addressee
• Situated in speech genre and context
Evaluating Encapsulation
Conception Examples
Prefunction
A mathematical equation with variables.A mathematical statement that describes something.
Action A function is an equation in which a variable is manipulated so that an answer is calculated using numbers in place of that variable.A function is an expression that will evaluate something when either variables or numbers are plugged into the function.
Process A function is some sort of input being processed, a way to give some sort of output.A function is an algorithm that maps an input into a designated output.
Mediating Metaphor
Action
•Describes the function using a metaphor of a series of operations or events, or as a computation without describing a systematic relationship between an input and output
•Performs computations or explicitly evaluates the function without also describing a systematic variation
•Manipulates the function by manipulating a statement that describes explicit calculation (such as a symbolic representation)
Process
•Describes the function using a metaphor of a non-explicit calculation, systematic relationship, or machine that connects an input (or input values) and output (or output values)
•Refers to the results of a computation performed on an input value without explicitly performing the computation
•Describes a systematic dependency of an output value on an input value without performing a computation. The systematicity need not be explicitly stated but can be expressed by the student referring to a rule or implied systematic relationship
•Manipulates input values as a set (e.g. describing a change that affects all input values) to produce a change in output values
•Combines the function with another function using an arithmetic operation, applying the operation pointwise (e.g. adding two functions pointwise)
Object
•Describes the function using a metaphor of a concrete or physical object
•Describes general attributes of the function•Manipulates or operates on the function as a whole without explicitly manipulating its input and output values or explicit computational process
•Uses the function as an input to an operator or another function without performing explicit computation
•Combines the function with another function using an arithmetic operation, applying the operation simultaneously to all values of the function
Mediating Metaphor
ActionPerforms computations or explicitly evaluates the function without also describing a systematic variation
Process
Describes a systematic dependency of an output value on an input value without performing a computation. The systematicity need not be explicitly stated but can be expressed by the student referring to a rule or implied systematic relationship
Object
Manipulates or operates on the function as a whole without explicitly manipulating its input and output values or explicit computational process
Mediating Metaphor
ActionPlugging in values to evaluate a function
Process
“If a function is increasing is its inverse also increasing?
“It’s increasing. Yeah, cause, think about it. The domains and the ranges switches, so if the domain is increasing, which it is, the range is increasing and if they switch spots for…”
Object Manipulating the graph as a whole
Discreteness and Granularity
• Categories not discrete or ordered– Adds flexibility without creating new categories
– Reduces predictive power
• Unit of analysis– Utterance– Task– Student
Quick Results
• Relationship between metaphor and representation
• Interviews with 15 students– 6 pairs– 3 individual
• Number of instances• No statistical significance
Metaphor and Facet
Facet Action Process ObjectColloqui
al12 76 12
Graphical
32 23 45
Notational
24 38 38
Numerical
72 28 0
Symbolic 59 22 19Verbal 21 73 6
Percent of Coded Instances by MetaphorPercent of Coded Instances by Metaphor
Process-Object Frameworks
• Help us make sense of student work
• Help guide development of instructional materials
• Metaphors allow flexibility– Non-linear– In-between metaphors– Social and cultural perspective
• Focus on participation vs. acquisition