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Econ 240A. Power Three. Summary: Week One. Descriptive Statistics measures of central tendency measures of dispersion Distributions of observation values Histograms: frequency(number) Vs. value Exploratory data Analysis stem and leaf diagram box and whiskers diagram. Probability.
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Econ 240A Power Three
Summary: Week One • Descriptive Statistics • measures of central tendency • measures of dispersion • Distributions of observation values • Histograms: frequency(number) Vs. value • Exploratory data Analysis • stem and leaf diagram • box and whiskers diagram
Probability The Gambler Kenny Rogers 20 Great Years
Outline • Why study probability? • Random Experiments and Elementary Outcomes • Notion of a fair game • Properties of probabilities • Combining elementary outcomes into events • probability statements • probability trees
Outline continued • conditional probability • independence of two events
Perspectives About Probability • Logical Discipline (like economics) • Axiomatic: conclusions follow from assumptions • Easier to Understand with Examples • I will use words, symbols and pictures • Test Your Understanding By Working Problems
Why study probability? • Understand the concept behind a random sample and why sampling is important • independence of two or more events • understand a Bernoulli event • example; flipping a coin • understand an experiment or a sequence of independent Bernoulli trials
Cont. • Understand the derivation of the binomial distribution, i.e. the distribution of the number of successes, k, in n Bernoulli trials • understand the normal distribution as a continuous approximation to the discrete binomial • understand the likelihood function, i.e. the probability of a random sample of observations
Uncertainty in Life • Demography • Death rates • Marriage • divorce
Concepts • Random experiments • Elementary outcomes • example: flipping a coin is a random experiment • the elementary outcomes are heads, tails • example: throwing a die is a random experiment • the elementary outcomes are one, two, three, four, five, six
Axiomatic Basis or Concepts H • Elementary outcomes have non-negative probabilities: P(H)>=0, P(T)>=0 • The sum of the probabilities over all elementary outcomes equals one: P(H) + P(T) = 1 H Flip a coin T
Axiomatic Basis or Concepts II • The probability of two mutually exculsive events is zero: P(H and T) = P(H^T) = 0 • The probability of one outcome or the other is the sum of the probabilities of each minus any double counting: P(H or T) = P(H U T) = P(H) + P(T) – P(H^T) • The probability of the event not happening is one minus the probability of the event happening:
Axiomatic Basis or Concepts III • Conditional probability of heads given tails equals the joint probability divided by the probability of tails: P(H/T) = P(H^T)/P(T)
Concept • A fair game • example: the probability of heads, p(h), equals the probability of tails, p(t): p(h) = p(t) =1/2 • example: the probability of any face of the die is the same, p(one) = p(two) = p(three) = p(four) =p(five) = p(six) = 1/6
Properties of probabilities • Nonnegative • example: p(h) • probabilities of elementary events sum to one • example p(h) + p(t) = 1
Another Example: Toss Two Coins H2 H, H H1 T2 H, T H2 T, H T1 T2 T, T
Flipping a coin twice: 4 elementary outcomes heads h, h heads tails h, t heads t, h tails t, t tails
Axiomatic Basis or Concepts H • Elementary outcomes have non-negative probabilities: P(H, H)>=0, P(H, T)>=0, P(T, H)>=0, P(T, T) >=0 • The sum of the probabilities over all elementary outcomes equals one: P(H, H) + P(H, T) + P(T, H) + P(T, T) = 1 • The probability of two mutually exculsive events is zero: P[(H, H)^(H, T)] = 0
Axiomatic Basis or Concepts II • The probability of one outcome or the other is the sum of the probabilities of each minus any double counting: P[(H, H) U (H,T)] = P(H, H) + P(H, T) – P[(H, H)^(H, T)] = P(H, H) + P(H, T) • The probability of the event not happening is one minus the probability of the event happening:
Axiomatic Basis or Concepts III • Conditional probability of heads, heads given heads, tails equals the joint probability divided by the probability of heads, tails: P[(H, H)/(H, T)] = P[(H, H)^(H, T)]/P(H, T)
Larry Gonick and Woollcott Smith, The Cartoon Guide to Statistics
Combining Elementary Outcomes Into Events • Example: throw two dice: event is white die equals one • example: throw two dice and red die equals one • example: throw two dice and the sum is three
Event: white die equals one is the bottom row Event: red die equals one is the right hand column
Combining Elementary Outcomes Into Events • Example: throw two dice: event is white die equals one P(W1) =P(W1^R1) + P(W1^R2) + P(W1^R3) + P(W1^R4) + P(W1^R5) + P(W1^R6) = 6/36 • example: throw two dice and red die equals one • example: throw two dice and the sum is three
Event: 2 dice sum to three is lower diagonal
Operations on events • The event A and the event B both occur: • Either the event A or the event B occurs or both do: • The event A does not occur, i.e.not A:
Probability statements • Probability of either event A or event B • if the events are mutually exclusive, then • probability of event B
Probability of a white one or a red one: p(W1) + p(R1) double counts
Two dice are thrown: probability of the white die showing one and the red die showing one
Probability 2 dice add to 6 or add to 3 are mutually exclusive events Probability of not rolling snake eyes is easier to calculate as one minus the probability of rolling snake eyes
Problem • What is the probability of rolling at least one six in two rolls of a single die? • At least one six is one or two sixes • easier to calculate the probability of rolling zero sixes: (5/36 + 5/36 + 5/36 + 5/36 + 5/36) = 25/36 • and then calculate the probability of rolling at least one six: 1- 25/36 = 11/36
Probability tree 1 2 1 3 4 2 5 2 rolls of a die: 36 elementary outcomes, of which 11 involve one or more sixes 3 6 4 5 6
Conditional Probability • Example: in rolling two dice, what is the probability of getting a red one given that you rolled a white one? • P(R1/W1) ?
In rolling two dice, what is the probability of getting a red one given that you rolled a white one?
Conditional Probability • Example: in rolling two dice, what is the probability of getting a red one given that you rolled a white one? • P(R1/W1) ?
Independence of two events • p(A/B) = p(A) • i.e. if event A is not conditional on event B • then
Concept • Bernoulli Trial • two outcomes, e.g. success or failure • successive independent trials • probability of success is the same in each trial • Example: flipping a coin multiple times
Problem 6.28 Distribution of a retail store purchases classified by amount and method of payment
Problem (Cont.) • A. What proportion of purchases was paid by debit card? • B. Find the probability a credit card purchase was over $100 • C. Determine the proportion of purchases made by credit card or debit card
Problem (Cont.) • A. What proportion of purchases was paid by debit card? 0.36 • B. Find the probability a credit card purchase was over $100 • C. Determine the proportion of purchases made by credit card or debit card
Problem (Cont.) • A. What proportion of purchases was paid by debit card? • B. Find the probability a credit card purchase was over $100 p(>$100/credit card) = 0.23/0.47 = 0.489 • C. Determine the proportion of purchases made by credit card or debit card
Problem (Cont.) • A. What proportion of purchases was paid by debit card? • B. Find the probability a credit card purchase was over $100 • C. Determine the proportion of purchases made by credit card or debit card • note: credit card and debit card purchases are mutually exclusive • p(credit or debit) = p(credit) + p (debit) = 0.47 + 0.36
Problem 6.61 • A survey of middle aged men reveals that 28% of them are balding at the crown of their head. Moreover, it is known that such men have an 18% probability of suffering a heart attack in the next ten years. Men who are not balding in this way have an 11% probability of a heart attack. Find the probability that a middle aged man will suffer a heart attack in the next ten years.
