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Introduction to Statistics

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Construct a 98% confidence interval for the driving distance. ... Use a T-Interval to construct a 95% confidence interval and determine the point estimate. ... – PowerPoint PPT presentation

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Title: Introduction to Statistics


1
Introduction to Statistics
  • Lecture Notes
  • March 3, 2009
  • Dr. Sinn

2
Estimation Chapter 14
  • Wish
  • To estimate the population mean
  • Process
  • Calculate the Sample Mean
  • Predict Population Mean
  • Give Confidence Level

3
Defining Symbols
4
Graphically Pop. Vs. Sample
Estimated
Known
Population µ mean s std dev
Sample mean s std dev
5
Z- vs. T-Test Comparisons
  • Theory
  • If we know s (population std. dev.)
  • Use Z-Test or Z-Interval
  • Examples
  • SAT ACT
  • Incomes (IRS)
  • If we dont know s
  • Use T-Test or T-Interval
  • Estimate s by using s
  • Example Biology
  • Medical Research (blood pressure, heart rate,
    etc)
  • Practice
  • Always use t-tests or t-intervals

6
Assumptions
  • We may only use z-tests and t-tests when the
    following assumptions are met
  • Independence
  • All measure variables are independent for each
    subject studied
  • Can be a problem in educational research (Why?)
  • Normality
  • The distribution of each sample approximately
    bell-shaped
  • Homogeneity of the Variances
  • All standard deviations of the samples and
    population are approximately equal

7
Verifying the Assumptions
  • Normality
  • This is the most important assumption to check
  • Use data analysis techniques from 1st part of the
    course
  • Check for bell-shaped distributions
  • Check for outliers
  • Outliers badly skew results for small data sets
  • Homogeneity
  • Nearly impossible to check (ignored in basic
    stats)
  • Independence
  • Verify in the research methodolgy

8
Verifying the Normality Assumption
  • We must verify the sample data is normally
    distributed.
  • For n 25, No Worries!
  • Law of large numbers takes over
  • We can assume normality
  • If n lt 25, Must Perform 2 Checks
  • Histogram
  • Should see roughly normal (bell-shaped)
    distribution
  • Box-and-Whisker Plot (outliers on)
  • No outliers detected
  • Other methods can be used
  • Stem-plots, z-scores
  • For this course, use Histogram and Box Plot

9
Example 1
  • Dan wants to determine the average distance he
    drives the ball with a new driver. He uses a
    range-finder to discover the distance of 12
    drives (in yards).

10
Example 1 Questions
  • Since sample size is less than 25, test the data.
    Is a Z- or T-Test appropriate?
  • Histogram
  • Box-and-Whisker Plot
  • Construct a 98 confidence interval for the
    driving distance.
  • Interpret the output.

11
Flow Chart Conf. Intervals
Almost never used!!
12
Accuracy of Estimate
  • Narrow intervals Better estimates
  • How do get better?
  • Increase n
  • Larger sample size
  • Decrease confidence
  • Example Reduce from 95 to 90 confidence.
  • Idea Wider strike-zone means more strikes.
  • Only 1st option improves the estimate. Why?

13
Example 2
  • A Gallup poll conducted in 1999 asked 1031
    randomly selected Americans how often they
    bathed. Results indicated an N(6.9,2.8)
    distribution.
  • Should we use a Z- or T-Interval?
  • Construct a 99 confidence interval.
  • Interpret the interval.

14
Clicker Question 1
  • A Gallup poll conducted in 1999 asked 1031
    randomly selected Americans how often they
    bathed. Results indicated an N(6.9,2.8)
    distribution. We should use
  • a Z-Interval
  • or T-Interval
  • Neither

15
Clicker Question 2
  • A Gallup poll conducted in 1999 asked 1031
    randomly selected Americans how often they
    bathed. Results indicated an N(6.9,2.8)
    distribution. Construct a 95 confidence interval
    based on these findings.
  • ( 6.7291 , 7.0709 )
  • ( 6.7289 , 7.0711 )
  • ( 6.6968 , 7.1032 )
  • ( 6.7566 , 7.0434 )

16
Example 3
  • Motorola wishes to estimate the average talk
    time before batteries are recharged. For a
    random sample of 40 phones, the sample mean was
    315 minutes. The standard deviation (based on
    prior research) is estimated to be 24 minutes.
  • Use a T-Interval to construct a 95 confidence
    interval and determine the point estimate.
  • Note about which test to use in this case
  • Interpret the interval.

17
Clicker Question 3
  • What is the effect of changing the confidence
    level from 90 to 95?
  • Two confidence intervals were generated based
    upon the same data set (sample size exactly the
    same for both calculations), one using a 90
    level of confidence, the other using a 95 level.
    The one that was generated using the 95 level
    must have been
  • ( 5.1 , 6.5 )
  • ( 5.0 , 6.6 )
  • Not enough information

18
Thats All, Folks!!
  • This is all there is to Confidence Intervals
  • Key Points
  • Z vs. T
  • Same as Hypothesis Testing (coming next!)
  • Population vs. Sample
  • s vs. s
  • Estimation
  • Point Estimate vs. Interval
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