1 / 16

Lessons Learned from scoring student work in math and science

Lessons Learned from scoring student work in math and science. Run-On Equations. Students are using run-on equations to support work. Run-on equations give “false information” and do not earn points for supporting work. Example of a run-on equation: 10 + 17 = 27 – 3 = 24

allie
Télécharger la présentation

Lessons Learned from scoring student work in math and science

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Lessons Learnedfrom scoring student work in math and science

  2. Run-On Equations • Students are using run-on equations to support work. Run-on equations give “false information” and do not earn points for supporting work. • Example of a run-on equation: 10 + 17 = 27 – 3 = 24 • Remedy: Have students use only one equal sign per equation.

  3. Showing Work • Examples of ways to help students earn points: • Have students show all mathematical decisions. • Encourage students to record any conversion factor that they use. • “Show work using words, numbers, and/or pictures” does not mean all of the ways. -Students who write a narrative of “how” they solved a problem have added no additional information and may include a contradiction in the narrative.

  4. Showing Work • When students provide more than one answer, scorers will not choose which one is correct. • When students write over an answer, they are not making their answers clear enough to score. • Students can earn points for work that is crossed out if it is correct and supports their answer. • Students should cross out work, rather than erase. When students erase work, they show no evidence of strategy or procedure.

  5. Labels • Missing and/or incorrect labels are a common reason students lose points. • Money: $1.80 (One dollar and eighty cents) is mislabeled in the following ways: 180 1.80 $1.80¢ 1.80$ $1.8 • When students are given inches in a prompt, their answers are mislabeled feet.

  6. Conclusion and Support • Students need practice drawing conclusions and giving quantitative support for their conclusions. • Valid conclusions are based on the data or describe the data. • Support uses the specific data and/or information specific from the item.

  7. Number Sense • Students have difficulties labeling fractional parts. • Examples of mislabels:

  8. Number Sense • Students do not know how to represent a remainder in decimal form. • Student writes an answer as 12.3 instead of 12 ¾ on the answer line. • Students do not understand the meaning of the “remainder” in division problems.

  9. Measurement • Students have difficulty computing with time and representing the answers. • 12:10 means 12 hours ten minutes elapsed time. • 12.1 hours means 12 hours 6 minutes. • 12:10 P.M. means 10 minutes after 12 noon. • Students continue to use 100 minutes for one hour instead of sixty minutes for one hour, when computing elapsed time.

  10. Algebraic Sense • Students need practice writing expressions and equations that represent a situation. • They can solve a problem, but do not write an equation or expression that represents what they have done. • Students need to understand the difference between expressions and equations and a correct way to represent expressions and equations using variables. • Examples of expressions: 4x3, t+2, 20t • Examples of equations: 4x3=12, c=20t

  11. 5 4 3 2 1 0 1 2 3 4 5 Geometric Sense • When plotting points on a coordinate grid, students are showing the tracking lines that help them locate the points.

  12. Geometric Sense • Students need practice sorting figures using more than one attribute: i.e. four-sided figures with exactly one line of symmetry. • When sorting figures with specific attributes, students mistakenly assume that there is an equal number of figures for each attribute. • Students need to use a ruler or straight edge when drawing figures.

  13. Probability and Statistics • Students need to understand measures of central tendency: mean, median, and mode. • Students do not make lists of all possible outcomes. • Students have difficulty determining the probabilities of events.

  14. Solves Problems/Reasons Logically • Students should answer the question that is being asked! See page 4

  15. IT Communication • Students have difficulty writing questions that can be answered from given information. • When students write: “The cost of a milkshake and a donut = ” They do not receive credit because it is not a question. • They should write: “What is the cost of a milkshake and a donut?”

  16. In Summary:To Increase Math Scores • Answer the question being asked. • Show work to show how you got your answer. • Peace, Love, and Joy!

More Related