1 / 10

Module 8 z Scores

Module 8 z Scores. What they are Benefits Calculating them Comparing them. Standard Scores. Standard scores are scores expressed in a standardized unit of measurement Standard scores indicate the position of a score relative to the distribution (for central Tend & dispersion).

gram
Download Presentation

Module 8 z Scores

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. Module 8 z Scores • What they are • Benefits • Calculating them • Comparing them

  2. Standard Scores • Standard scores are scores expressed in a standardized unit of measurement • Standard scores indicate the position of a score relative to the distribution (for central Tend & dispersion)

  3. Z-ScoresMemorize this formula • Z-scores are raw scores converted to standard deviation units • Formula for z-score

  4. Benefits: • Z-scores can be used to determine proportions of the curve

  5. Benefits • To compare (relative to others) how a person did on two tests • with different Ms and SDs • With different number if items • (can’t do that with raw scores)

  6. To compare relative to others • Need to know… • More than the raw score • More than the % correct • More than his/her relative standing • Also need to know… • How spread out the scores around his/her are • i.e. score distribution (SD) • Where the score falls within the spread

  7. z score calculation • X = any given score • M = Mean • s = Sd of the test or measure • The distance from the M is rescaled into SD units

  8. z Scores • If the z score is above the mean…it’s positive • (+ SDs) • Raw score is above the mean • If the z Score is below the mean…it’s negative • (- SDs) • Raw score is below the mean • Check to make sure you don’t make a calculation error

  9. Comparison of scores relative to others on same test • IQ of 120 z of + 1.33 (above the mean) …means that is 90.82 % of scores(.9082) are at or below a raw score of 120 If 90.82 % have IQs below 120 Then 90.82% - 50% = 40.82% …have IQ scores between the Mean (100 and 120)

  10. Comparison Across Different Tests • Because the z score accounts for • Central tendency (Mean) • Dispersion (s) • Sample size (N) • M = ∑X/N • And has the same M of 0 and SD of 1 • We can compare someone’s scores • On different tests with which have a • Different M, s, or N

More Related