Multiplication%20and%20Addition%20Rules%20for%20Probability - PowerPoint PPT Presentation

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Multiplication%20and%20Addition%20Rules%20for%20Probability

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General Addition Rule. Last time, we learned the Addition Rule for Mutually Exclusive events (Disjoint Events). This was: P(A or B) = P(A) + P(B). – PowerPoint PPT presentation

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Title: Multiplication%20and%20Addition%20Rules%20for%20Probability


1
Multiplication and Addition Rules for Probability
  • Special Topics

2
General Addition Rule
  • Last time, we learned the Addition Rule for
    Mutually Exclusive events (Disjoint Events). This
    was
  • P(A or B) P(A) P(B). This is used when events
    A and B cant happen at the same time, such as
    getting a head or a tail on a single coin flip.
    You cant get both a head and a tail on the same
    coin flip!
  • There are other events which can happen at the
    same time, such as being a senior and being a
    student in Special Topics.

3
General Addition Rule
  • Lets let event A be the event that a person is a
    senior. Lets call P(A) .25
  • Lets let event B be the event that a person is
    in Special Topics. Lets call P(B) .8
  • Lets also call P(A and B) .10
  • If we go by the Addition Rule for Disjoint
    Events, then P(A 0r B) .25.8 1.05 (what is
    wrong with this?).
  • The problem here is that a person can be both a
    senior and a Special Topics student at the same
    time. When this happens, things get counted twice!

4
A Diagram to Sort This Out!
  • This is the situation in a Venn Diagram
  • Notice the intersection gets counted twice! We
    need a formula that corrects for this.

5
General Addition Rule
  • Here is the formula for the General Addition
    Rule
  • P(A or B) P(A) P(B) P(A and B). We subtract
    one version of the joint probability since it
    gets counted twice.
  • When event are disjoint, the P(A and B) part of
    the formula equals 0. That takes us back to the
    formula for disjoint events P(A or B) P(A)
    P(B).

6
Example
  • Musical styles other than rock and pop are
    becoming more popular. A survey of college
    students finds that the probability they like
    country music is .40. The probability that they
    liked jazz is .30 and that they liked both is
    .10. What is the probability that they like
    country or jazz? (Hint a joint probability is
    given, so the General Addition Rule Applies!)
  • P(C or J) .4 .3 -.1 .6

7
The Multiplication Rule
  • What do we do to calculate the probability of two
    (or more) independent events happening at the
    same time?
  • We use the Multiplication Rule for Independent
    Events. The key word is the word and.
  • The formula is P(A and B) P(A)P(B)
  • What is the probability of flipping a coin and
    getting a head, and rolling a die and getting a
    six?

8
Independence
  • Definition Two events are independent when
    knowing that one occurred does not change the
    probability that the other occurred.
  • Coin flips and dice rolls are independent.

9
Homework
  • Section 8.1 Part 2 worksheet.
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