6-2 Standard Units Areas under Normal Distributions - PowerPoint PPT Presentation

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6-2 Standard Units Areas under Normal Distributions

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Title: 6-2 Standard Units Areas under Normal Distributions


1
6-2 Standard Units Areas under Normal
Distributions
2
What is a z score?
  • A common statistical way of standardizing data
    on one scale so a comparison can take place is
    using a z-score. The z-score is like a common
    yard stick for all types of data. Each z-score
    corresponds to a point in a normal distribution
    and as such is sometimes called a normal deviate
    since a z-score will describe how much a point
    deviates from a mean or specification point.
  • http//www.measuringusability.com/z.htm
  • The z score for an item, indicates how far and
    in what direction, that item deviates from its
    distribution's mean, expressed in units of its
    distribution's standard deviation.
  • http//www.sysurvey.com/tips/statistics/zscore.htm

3
Z score
  • Is a way to standardize scores based on the mean.
  • Tables are used to describe the areas under
    normal curves, associated with particular z
    scores.
  • For instance, if Physics period 1 has an average
    test score of 74 and Physics period 7 had an
    average of 78
  • How does someone who had an 83 in period 1
    compare with someone who had an average of 87 in
    period 7?
  • Do they deserve the same grade? Both were
    substantially above average, although the grades
    were obviously quite different.
  • Would the standard deviations of the two classes
    make a difference to you??

4
Z Score (cont)
  • The conversion formula of a score to a z score is
    based on the mean and standard deviation.
  • So what is the z score for someone whose score
    the average?

5
Z score (cont)
  • What about a z score for an x above the mean?
  • What about a z score for an x below the mean?

6
Raw Score
  • If you know the z score, it can be translated
    into the appropriate raw score by
  • x zs µ

7
Standard Normal Distribution
  • Standardizing a z score makes the center µ 0.
  • Standardizing a z score makes the spread s 1.
  • The z distribution will be normal if the x
    distribution is normal.
  • Areas still correspond as they did in 6-1.
  • 68 of the area under the curve is 1 standard
    deviation from the mean.
  • 95 of the area under the curve is 2 standard
    deviations from the mean
  • 99.7 will be 3 standard deviations from the
    mean.

This is sometimes called the 68-95-99.7 rule or
The Empirical Rule
8
  • The college you want to apply to says that while
    there is no minimum SAT score required, the
    middle 50 of their students have combined SAT
    scores between 1530 and 1850. What would be a
    minimum acceptable ACT score that could be
    correlated to that same range of SAT scores?
  • For college bound seniors, the average combine
    SAT is 1500 and standard deviation is 250. The
    ACT average is 20.8 with a standard deviation of
    4.8

9
Why convert?
  • If you can convert the raw score to a z score,
    you can use tables in the back to determine the
    area under the curve. Why?
  • The areas under the curve is equal to the
    probability that the measurement falls in this
    interval.
  • The textbook has a left tailed table. That is,
    the z score will correspond to a given cumulative
    area to the left of z.
  • Therefore, what would be the area to the right of
    z?
  • 1 area left of z.
  • (It could also be the opposite of the area to the
    left of z)

10
What does this area stuff mean?
  • Essentially if you have a z score, you can make
    an assumption about the of scores (i.e. the
    probability) that fall at that number or below.

11
Some notes
  • A z score of 6 or 7 would be highly interesting.
    Why?
  • Calculator
  • normalcdf (zleft, zright) calculates the score
    between two z scores.
  • If you need to do left or right of a z score,
    some books suggest using 3.49 for the end, some
    suggest 99. Use what you want.

12
ADD BVD PROBLEM
  • Pg. 113
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