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Working with samples

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Working with samples The problem of inference How to select cases from a population Probabilities Basic concepts of probability Using probabilities – PowerPoint PPT presentation

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Title: Working with samples


1
Working with samples
  • The problem of inference
  • How to select cases from a population
  • Probabilities
  • Basic concepts of probability
  • Using probabilities

2
The problem of inference
  • We work with a sample of cases from a population
  • We are interested in the population
  • We would like to make statements about the
    population, but we only know the sample
  • Can we generalize our finding to the population?

3
We can generalize
  • Under certain conditions
  • If we make certain assumptions
  • If we follow certain procedures
  • If we dont mind being wrong a certain percentage
    of the time

4
How to select cases from a population
  • The first condition for generalization is to
    select our cases from the population in a certain
    way. What ways are possible?
  • Representative cases
  • Hap-hazard cases
  • Systematic cases
  • Random cases

5
We choose random cases
  • Because we can use probability theory to help us
    know the unknowable.
  • Representative cases are nice, but how do we know
    they are representative?
  • Hap-hazard cases are the worst and we will see
    why.
  • Systematic cases can run afoul of patterns in the
    selection criteria

6
How do we know if cases are representative?
  • To know if a case is representative of the
    population, we must already know the population!
  • But, we are trying to find out about the
    population

7
Hap-hazard cases are the worst
  • We dont know if they represent the population
  • We dont know the reasons we came to select them
  • Did we get them from some reason that would make
    them not represent the population?
  • Do they share characteristics not generally found
    in the population?

8
Systematic cases can run afoul of patterns in the
selection criteria
  • If we have a list of the members of the
    population and take every 10th case
  • What if we are sampling workers and a foreman is
    listed followed by the 9 people under them

9
Random samples are the best
  • We can use probability theory, because random is
    a probability concept
  • Probability theory is a branch of mathematics,
    and it can get very hairy
  • But, not in this class
  • Only addition, subtraction, multiplication, and
    division, as always, are used -- and you can do
    that!

10
Probabilities
  • Probabilities are hypothetical, but very helpful
  • Probabilities are numbers between 0.0 and 1.0
  • A probability is a relative frequency in the long
    run

11
Probabilities (cont.)
  • Relative frequency is like a proportion
  • A proportion is f/n expressed as a decimal number
    (e.g., .4)
  • For example, the probability it will rain today
    is .95
  • This means that on 95/100 days like this we
    expect it to rain

12
Probabilities (cont.)
  • But, do we look at 100 days?
  • Should we base this prediction on 1000 days?
  • In the long run refers to the idea that we may
    let the number of days
  • That is let the number of trials approach
    infinity, or all imaginably possible

13
Probabilities (cont.)
  • What is the probability of getting a heads on a
    fair toss of a coin?
  • What is the probability of drawing a red ball
    from a jar containing 1 red and 3 black balls?

14
Basic concepts of probability
  • Event or trial - the basic thing or process being
    counted
  • Tossing a coin
  • Dealing a card
  • Outcome of event or trial - the characteristic of
    the event that is noted
  • head vs. tails
  • ace vs. 2 vs. 3 vs. . . .

15
Events
  • Simple events
  • example, single toss of coin
  • example, drawing one card from a deck
  • Compound event
  • example, tossing three coins
  • example,drawing 5 cards from a deck

16
Outcomes of events
  • Outcomes are characteristics of events
  • Event - tossing a coin
  • outcome heads or tails
  • Event - drawing a card from a deck
  • outcome ace, 2, 3
  • outcome hearts, diamonds,
  • outcome king of spades, ...

17
Questions
  • Are the events independent?
  • Yes, if outcome of one event does not depend upon
    the outcome of another event.
  • Consider two coin tosses
  • Consider sex of two children being born
  • Consider two cards drawn from same deck

18
Independence
  • Two events are independent if p(x) -- the
    probability of x -- in the second event does not
    depend upon the p(x) in the first event
  • coins p(heads) given heads in first toss
  • children p(boy) given girl in first born
  • cards p(ace) given ace in first draw

19
Conditional probabilities
  • Drawing 2 cards (without replacement)
  • p(ace) in second card given ace in first, written
    as p(aa)
  • p(ace) in second card given king in first,
    written as p(ak)
  • Independence requires p(a) p(aa) and p(a)
    p(ak)

20
Questions (cont.)
  • Are the events mutually exclusive?
  • Yes, if the two events cannot occur together
  • Is the birth of a male first child exclusive of
    the birth of a female first child?
  • Is the birth of a male first child exclusive of
    the birth of a child with brown hair?

21
Using probabilities
  • Multiplication rule
  • p(a b) p(a) p(ba)
  • example p(h h) in two tosses of coin
  • example p(boy girl) in birth of two children
  • if events are independent? P(ba) p(b)

22
Using probabilities (cont.)
  • Addition rule
  • p(a or b) p(a) p(b) - p(ab)
  • example p(h or t) in coin toss
  • example p(girl or boy) in birth of child
  • example p(girl or blue eyes) in child
  • example p(ace or king) in card draw
  • example p(ace or heart) in card draw

23
Using probabilities (cont.)
  • Events must be random
  • Coin must be fairly tossed
  • Deck of cards must be well shuffled
  • p(red) from urn with 10 red and 90 black
  • Urn of different color marbles must be well
    shaken (not stirred)
  • These are samples of size one
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