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Section 2.1 Density Curves

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Title: Section 2.1 Density Curves and the Normal Distributions Author: ltrojan Last modified by: Windows User Created Date: 9/19/2005 1:12:58 PM Document presentation ... – PowerPoint PPT presentation

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Title: Section 2.1 Density Curves


1
Section 2.1Density Curves
2
  • Get out a coin and flip it 5 times. Count how
    many heads you get.
  • Repeat this trial 10 times.
  • Create a histogram for your data (frequency of
    how many heads you got in each of the 10 trials).
  • Put your histogram on the board.

3
Remember
  • When we explore data on a single quantitative
    variable
  • Plot your data (usually a histogram or stemplot)
  • Look for the overall pattern (center, shape, and
    spread) and for outliers
  • Calculate a numerical summary to describe center
    (median or mean) and spread (IQR or standard
    deviation)

4
From Histograms to Curves
  • Sometimes, the overall pattern from a large
    number of observations is so regular that we can
    overlay a smooth curve.

5
Mathematical Models
  • This curve is a mathematical model, or an
    idealized description, for the distribution.
  • It is easier to work with the smooth curve than
    with the histogram.

6
Density Curves
  • Density curves are always positive (meaning its
    always on or above the horizontal axis).
  • Areas under the curve represent proportions of
    the observations. The area under a density curve
    always equals 1.
  • The density curve describes the overall pattern
    of a distribution. The area under the curve,
    within a range of values, is the proportion of
    all observations that fall in that range.

7
Quartiles
  • How much area would be to the left of the first
    quartile?
  • How much area would be to the right of the first
    quartile?
  • How much area would be between the first and
    third quartiles?

8
What Does All of This Mean?
  • When a density curve is a geometric shape
    (rectangle, trapezoid, or a combination of
    shapes) we can use geometry to find areas. Those
    areas help us find the median and the quartiles.

9
  • Verify that the graph is a valid density curve.
  • For each of the following, use areas under
    density curve to find the proportion of
    observations within the given interval.
  • 0.6ltXlt0.8
  • 0ltXlt0.4
  • 0ltXlt0.2

10
  • The median of this density curve is a point
    between X 0.2 and X 0.4. Explain why.

11
Im seeing Greek!
  • In a distribution, mean is x-bar and the standard
    deviation is s.
  • When looking at a density curve, the mean is µ
    (pronounced mu) and the standard deviation is s
    (pronounced sigma).

12
Normal Distributions
  • Density curves have an area 1 and are always
    positive.
  • Normal curves are a special type of density
    curves. Normal curves are symmetrical density
    curves.
  • T/F All density curves are normal curves.
  • T/F All normal curves are density curves.

13
Characteristics of Normal Curves
  • Symmetric
  • Single-peaked (also called unimodal)
  • Bell-shaped

µ
s
The mean, µ, is located at the center of the
curve. The standard deviation, s, is located at
the inflection points of the curve.
14
Parameters of the Normal Curve
  • A normal curve is defined by its mean and
    standard deviation.
  • Notation for a normal curve is N(µ, s).

15
Why Be Normal?
  • Normal curves are good descriptions for lots of
    real data SAT test scores, IQ, heights, length
    of cockroaches (yum!).
  • Normal curves approximate random experiments,
    like tossing a coin many times.
  • Not all data is normal (or even approximately
    normal). Income data is skewed right.

16
The Empirical Rulea.k.a. 68-95-99.7 Rule
  • All normal distributions follow this rule
  • 68 of the observations are within one standard
    deviation of the mean
  • 95 of the observations are within two standard
    deviations of the mean
  • 99.7 of the observations are within three
    standard deviations of the mean

17
Yay, Math!
  • IQ scores on the WISC-IV are normally
    distributed with a mean of 100 and a standard
    deviation of 15.
  • Going up one s and down one s from 100 gives us
    the range from 85 to 115. 68 of people have an
    IQ between 85 and 115.
  • 95 of people have an IQ between ____ and ____.
  • 99.7 of people have an IQ between ____ and ____.

18
Try This
  • The heights of women aged 18 24 are
    approximately normally distributed with a mean µ
    64.5 inches and a standard deviation s 2.5
    inches.
  • Between what two heights do the middle 95 fall?
  • The tallest 2.5 of women are taller than what?
  • What is the percentile for a woman who is 64.5
    inches tall?

19
One more example
  • The army reports that the distribution of head
    circumference among male soldiers is
    approximately normal with mean 22.8 inches and
    standard deviation 1.1 inches.
  • What percent of soldiers have a head
    circumference greater than 23.9 inches?
  • What percentile is this?
  • What percent of soldiers have a head
    circumference between 21.7 inches and 23.9 inches?

20
Homework
  • Chapter 2 15a, 25, 41-45
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