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Chapter 03. Informing Our Decisions:. Assessment and Single-Digit Addition. Mathematical Routine: How many squares are not shaded?. Conversation in Mathematics.
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Informing Our Decisions: Assessment and Single-Digit Addition
Conversation in Mathematics Discuss the method of assessment the teacher was using and what she was able to learn about the student’s problem solving abilities.
Assessment for Instruction Pedagogy
Why Alternative Assessment? Three components promoting systemic change: professional development, curriculum materials, & assessment. (Smith & O’Day, 1991) Assessment - least attention (Firestone and Schorr, 2004) Internationally - broad view of mathematical literacy (AAMT, 2002; NCTM, 2000) that includes a balanced acquisition of procedural proficiency and conceptual understanding
Notions from Principles and Standards for School Mathematics Assessment of instruction vs. Assessment for instruction Validity Summative and formative Accountability, stewardship Traditional and alternative Backwards Design
Backward Design Set general learning goal Design and administer a pre-instruction assessment Determine your specific learning targets. Determine acceptable evidence of learning Design an instructional plan Conduct interactive instruction/ongoing assessment
Traditional Assessment Short Answer Multiple Choice Matching Fill-in-the-blank, True-False Raw Scores, Percentages, Checklists, Rubric Scores
Item Writing Rules for Multiple Choice Questions Write a clear stem that does not require a reading of the options in order to be understood. Place most of the wording in the stem. This prevents having to select between lengthy answer options. Make sure the intended answer is clearly the best option. List options vertically.
Alternative Assessment Open-ended questions Communication Observations Interviews Journals Performance Assessments Portfolios
Open-ended Questions Answers to closed ended are predetermined and specific - # of primes between 10 & 20 Open-ended allow for a variety of correct responses and elicit different thinking Both are appropriate for assessing students' mathematical thinking Open-ended take longer to score Closed ended useful for covering broad range of topics, but . . . Don’t allow for the revealing of student thinking like open-ended
Sam’s truck has a 20-gallon gasoline tank. Sam looked at his gauge and saw the reading below. What would be a reasonable estimate for how many gallons of gas Sam had used since he last filled the tank? Explain how you determined your estimate. Example of an Open-ended Question
Communication Communicate with and about math (NCTM, 1989) through: Oral discourse (conversations, discussion, debates), writing (essays, journals), modeling and representing (manipulatives, pictures, constructions), performance (acting out, modeling)
Observations Observe with a specific goal in mind Each child does not need be observed every day Assume role of a participant-observer; be part of learning community, but also external to the environment.
Interviews By conducting 1-1 interviews, we can assess: Cognitive and affective development How children model and communicate mathematical concepts and skills We conduct these interviews by: Asking probing questions that guide them toward more complex ideas Asking prompting questions to help children attend to misunderstandings and to scaffold success to the degree required
Journals Through journal writing, we can: Assess children's reflections of their own capabilities, attitudes & dispositions, Evaluate their ability to communicate mathematically, through writing
Performance Assessments Students perform, create, construct, or produce Assess deep understanding/ reasoning Involve sustained work Call on students to explain, justify, & defend Performance is directly observable Involve engaging ideas of importance & substance (worthwhile math task) Reliance on trained assessor’s judgments Multiple criteria and standards are pre-specified and public (rubrics) There is no single correct answer (or solution strategy) Performance is grounded in real-world contexts and constraints
Portfolios Portfolios are a collection of children’s work in which: Children should be given the opportunity to provide input regarding the portfolio contents The type of items selected for the portfolio can be varied, to reflect a real sense of the "whole" child
Its contents are developed over time, allowing teachers to obtain information about children's learning patterns Items chosen by children - insight into their interpretation of their work, their dispositions toward mathematics, and their mathematical understanding
Recording Assessment Data for Alternative Assessments Rubric Scores Checklists Anecdotal Notes
Quick and Dirty Rubric 5 - Child really gets it, no errors 4 - Child gets it, minimal errors 3 - Child sort of gets it, inconsistent error pattern 2 - Child doesn’t get it, consistent errors 1 - Child is lost (sorry)
Operation Sense Developing meanings for operations Gaining a sense for the relationships among operations Determining which operation to use in a given situation Recognizing that the same operation can be applied in problem situations that seem quite different Developing a sense for the operations’ effects on numbers Realizing that operation effects depend upon the types of numbers involved
How do Children Develop? Problem Types • Join • Separate • Part-part-whole • Compare • Problem-solving Strategies • Direct Modeling • Counting • Known Facts • Derived Facts
Analyzing Problem Types Semantic versus Computational
Analyzing Solution Strategies Direct Modeling Joining all / counting all Joining to Matching Counting Counting on from first Counting on from larger Separating from Counting down Counting on to Trial and error
Generalizations One More/One Less Ten More/Ten Less Combinations of numbers to ten Commutativity Doubles and near doubles Making a ten
Steps in Which Generalizations are Developed Concrete, hands-on experiences Using a model as a visual Using symbols as a visual Making mental calculations with the model in the head Making mental calculations using a generalized rule, or known fact
Practice for Quick Recall Meaningful practice Games Music Timed tests?
