Formative assessment in mathematics: opportunities and challenges

1. Formative assessment in mathematics:opportunities and challenges Dylan Wiliam (@dylanwiliam) Seminar at Teachers College, Columbia University October 2013

2. A research agenda for formative assessment • Definitional issues • Domain-specificity issues • Effectiveness issues • Communication issues • Implementation issues • Adoption issues

3. Definitional issues

4. The evidence base for formative assessment • Fuchs & Fuchs (1986) • Natriello (1987) • Crooks (1988) • Bangert-Drowns, et al. (1991) • Dempster (1991, 1992) • Elshout-Mohr (1994) • Kluger & DeNisi (1996) • Black & Wiliam (1998) • Nyquist (2003) • Brookhart (2004) • Allal & Lopez (2005) • Köller (2005) • Brookhart (2007) • Wiliam (2007) • Hattie & Timperley (2007) • Shute (2008)

5. Definitions of formative assessment We use the general term assessment to refer to all those activities undertaken by teachers—and by their students in assessing themselves—that provide information to be used as feedback to modify teaching and learning activities. Such assessment becomes formative assessment when the evidence is actually used to adapt the teaching to meet student needs” (Black & Wiliam, 1998 p. 140) “the process used by teachers and students to recognise and respond to student learning in order to enhance that learning, during the learning” (Cowie & Bell, 1999 p. 32) “assessment carried out during the instructional process for the purpose of improving teaching or learning” (Shepard et al., 2005 p. 275)

6. “Formative assessment refers to frequent, interactive assessments of students’ progress and understanding to identify learning needs and adjust teaching appropriately” (Looney, 2005, p. 21) “A formative assessment is a tool that teachers use to measure student grasp of specific topics and skills they are teaching. It’s a ‘midstream’ tool to identify specific student misconceptions and mistakes while the material is being taught” (Kahl, 2005 p. 11)

7. “Assessment for Learning is the process of seeking and interpreting evidence for use by learners and their teachers to decide where the learners are in their learning, where they need to go and how best to get there”(Assessment Reform Group, 2002 pp. 2-3) “Assessment for learning is any assessment for which the first priority in its design and practice is to serve the purpose of promoting students’ learning. It thus differs from assessment designed primarily to serve the purposes of accountability, or of ranking, or of certifying competence. An assessment activity can help learning if it provides information that teachers and their students can use as feedback in assessing themselves and one another and in modifying the teaching and learning activities in which they are engaged. Such assessment becomes “formative assessment” when the evidence is actually used to adapt the teaching work to meet learning needs.” (Black, Harrison, Lee, Marshall & Wiliam, 2004 p. 10)

8. Theoretical questions • Need for clear definitions • So that research outcomes are commensurable • Theorization and definition • Possible variables • Category (instruments, outcomes, functions) • Beneficiaries (teachers, learners) • Timescale (months, weeks, days, hours, minutes) • Consequences (outcomes, instruction, decisions) • Theory of action (what gets formed?)

9. Formative assessment: a new definition “An assessment functions formatively to the extent that evidence about student achievement elicited by the assessment is interpreted and used, by teachers, learners, or their peers, to make decisions about the next steps in instruction that are likely to be better, or better founded, than the decisions that would have been taken in the absence of that evidence.”

10. Unpacking formative assessment • Where the learner is going • Where the learner is • How to get there • Providing feedback that moves learners forward • Engineering effective discussions, tasks, and activities that elicit evidence of learning • Teacher • Clarifying, sharing and understanding learning intentions • Peer • Activating students as learning • resources for one another • Activating students as ownersof their own learning • Learner

11. Definitional issues: potential research • How can formative assessment be defined and what are the consequences of different definitions, for psychometrics, for communication, and for adoption?

12. Domain specificity issues

13. Pedagogy and didactics • Some aspects of formative assessment are generic • Some aspects of formative assessment are domain-specific • There is a continuing debate about what aspects of formative assessment are generic (pedagogy) and which are domain-specific (didactics)

14. Clarifying, sharing and understanding learning intentions

15. A standard middle school math problem… • Two farmers have adjoining fields with a common boundary that is not straight. • This is inconvenient for plowing. • How can they divide the twofields so that the boundaryis straight, but the twofields have thesame area asthey had before?

18. How many rectangles?

19. Engineering effective discussions, activities, and classroom tasks that elicit evidence of learning

20. b c A B a a c b a c C D b b c a a b E F c c b a Questioning in math: Diagnosis In which of these right-angled triangles is a2 + b2 = c2 ?

21. Diagnostic item: medians What is the median for the following data set? 38 74 22 44 96 22 19 53 • 22 • 38 and 44 • 41 • 46 • 70 • 77 • This data set has no median

22. Diagnostic item: means What can you say about the means of the following two data sets? Set 1: 10 12 13 15 Set 2: 10 12 13 15 0 • The two sets have the same mean. • The two sets have different means. • It depends on whether you choose to count the zero.

23. Providing feedback that moves learners forward

24. Getting feedback right is hard

25. Activating students:as learning resources for one anotheras owners of their own learning

26. +/–/interesting: responses for “+” • I got that ball-park estimates are supposed to be simple • I know that you have to look at it and say “OK” • I know that when I am adding the number I end up with must be bigger than the one I started at • I get most of the problems • It was easy for me because on the first one it says 328 so I took the 2 and made it a 12 • I know that we would have to regroup • I know how to do plus and minus because we have been doing it for a long time • I get it when you cross out a number and make it a new one • I know that when you can’t – from both colomes you go to the third colome and take that from it • I know that when my answer is right the ball parkestimate is close to it

27. +/–/interesting: responses for “–” • I am still a tiny bit confused about subtraction regrouping • I am a little bit confused about ball park estimates • I get confused because sometimes I don’t get the problem • I am confused when you subtract really big numbers like 1,000 something • I’m still a little bit confused about regrouping • Minus is confusing when you have to regroup twice • Minus is a little bit hard when you have to regroup • I don’t understand when you borrow which colome you borrow from when both are 0 • I am still confused about showing what I did to solve the problem • I am a little confused about when you need to subtract

28. +/–/interesting: responses for “interesting” • Carrying the number over to the next number • It’s interesting how some people go to the nearest hundred while some go to the nearest ten • It’s interesting how some have to regroup twice • It’s pretty interesting about how you have to work really hard • I am interested in borrowing because I didn’t just get it yet. I want to really get to know it • I find it weird that you could just keep going from colome to colome when you need to borrow • On the ball park estimate it is easy but sometimes hard • I really think that regrouping is pretty amazing • It is cool how addition and subtraction regrouping is just moving numbers and you could get it right easily

29. Domain-specificity issues: potential research • How much domain-specific knowledge does a teacher need in order to be able to implement high-quality formative assessment routines consistently? • Can domain-specific formative assessment tools be independent of a particular curriculum?

30. The effectiveness issue

31. Effects of formative assessment Standardized effect size: differences in means, measured in population standard deviations

32. Understanding meta-analysis:“I think you’ll find it’s a bit more complicated than that” (Goldacre, 2008)

33. Understanding meta-analysis • A technique for aggregating results from different studies by converting empirical results to a common measure (usually effect size) • Standardized effect size is defined as: • Problems with meta-analysis • The “file drawer” problem • Variation in population variability • Selection of studies • Sensitivity of outcome measures

34. The “file drawer” problem

35. The importance of statistical power • The statistical power of an experiment is the probability that the experiment will yield an effect that is large enough to be statistically significant. • In single-level designs, power depends on • significance level set • magnitude of effect • size of experiment • The power of most social studies experiments is low • Psychology: 0.4 (Sedlmeier & Gigerenzer, 1989) • Neuroscience: 0.2 (Burton et al., 2013) • Education: 0.4 • Only lucky experiments get published…

36. Variation in variability

37. Annual growth in achievement, by age A 50% increase in the rate of learning for six-year-olds is equivalent to an effect size of 0.76 A 50% increase in the rate of learning for 15-year-olds is equivalent to an effect size of 0.1 Bloom, Hill, Black, andLipsey(2008)

38. Variation in variability • Studies with younger children will produce larger effect size estimates • Studies with restricted populations (e.g., children with special needs, gifted students) will produce larger effect size estimates

39. Selection of studies

40. Feedback in STEM subjects • Review of 9000 papers on feedback in mathematics, science and technology • Only 238 papers retained • Background papers 24 • Descriptive papers 79 • Qualitative papers 24 • Quantitative papers 111 • Mathematics 60 • Science 35 • Technology 16 Ruiz-Primo and Li (2013)

41. Classification of feedback studies • Who provided the feedback (teacher, peer, self, or technology-based)? • How was the feedback delivered (individual, small group, or whole class)? • What was the role of the student in the feedback (provider or receiver)? • What was the focus of the feedback (e.g., product, process, self-regulation for cognitive feedback; or goal orientation, self-efficacy for affective feedback) • On what was the feedback based (student product or process)? • What type of feedback was provided (evaluative, descriptive, or holistic)? • How was feedback provided or presented (written, video, oral, or video)? • What was the referent of feedback (self, others, or mastery criteria)? • How, and how often was feedback given in the study (one time or multiple times; with or without pedagogical use)?

42. Main findings

43. Sensitivity to instruction

44. Sensitivity of outcome measures • Distance of assessment from the curriculum • Immediate • e.g., science journals, notebooks, and classroom tests • Close • e.g., where an immediate assessment asked about number of pendulum swings in 15 seconds, a close assessment asks about the time taken for 10 swings • Proximal • e.g., if an immediate assessment asked students to construct boats out of paper cups, the proximal assessment would ask for an explanation of what makes bottles float • Distal • e.g., where the assessment task is sampled from a different domain and where the problem, procedures, materials and measurement methods differed from those used in the original activities • Remote • standardized national achievement tests. Ruiz-Primo, Shavelson, Hamilton, and Klein (2002)

45. Impact of sensitivity to instruction Effect size Close Proximal

46. Effectiveness issues: potential research • Under what kind of conditions does the implementation of formative assessment practices in classrooms lead to student improvement? • What kinds of increases in the rate of student learning are possible?

47. Communication issues

48. Dissemination models • Gas-pump attendant • FedEx • IKEA • Sherpa • Gardener • PhD supervisor

49. So much for the easy bit… Theorization Ideas Products Evidence of impact Advocacy

50. Communication issues: potential research • How can the vision of effective formative assessment practice be communicated to teachers?