Defining Probabilities: Random Variables

1. Defining Probabilities: Random Variables • Examples: • Out of 100 heart catheterization procedures performed at a local hospital each year, the probability that more than five of them will result in complications is __________ • Drywall anchors are sold in packs of 50 at the local hardware store. The probability that no more than 3 will be defective is __________ • In general, ___________

2. Discrete Random Variables • Example: • Look back at problem 3, page 46. Assume someone spends $75 to buy 3 envelopes. The sample space describing the presence of $10 bills (H) vs bills that are not $10 (N) is: _____________________________ • The random variable associated with this situation, X, reflects the outcome of the choice and can take on the values: _____________________________

3. Discrete Probability Distributions • The probability that there are no $10 in the group is P(X = 0) = ___________________ (recall results from last time) • The probability distribution associated with the number of $10 bills is given by:

4. Another Example • Example 3.3, pg 66 P(X = 0) = _____________________

5. Discrete Probability Distributions • The discrete probability distribution function (pdf) • f(x) = P(X = x) ≥ 0 • Σxf(x) = 1 • The cumulative distribution,F(x) • F(x) = P(X ≤ x) = Σt ≤ xf(t)

6. Probability Distributions • From our example, the probability that no more than 2 of the envelopes contain $10 bills is P(X ≤ 2) = F(2) = _________________ • The probability that no fewer than 2 envelopes contain $10 bills is P(X ≥ 2) = 1 - P(X ≤ 1) = 1 - F(1) = ________________

7. Another View • The probability histogram

8. Your Turn … • The output of the same type of circuit board from two assembly lines is mixed into one storage tray. In a tray of 10 circuit boards, 6 are from line A and 4 from line B. If the inspector chooses 2 boards from the tray, show the probability distribution function associated with the selected boards being from line A.

9. Continuous Probability Distributions • Examples: • The probability that the average daily temperature in Georgia during the month of August falls between 90 and 95 degrees is __________ • The probability that a given part will fail before 1000 hours of use is __________ • In general, __________

10. Understanding Continuous Distributions • The probability that the average daily temperature in Georgia during the month of August falls between 90 and 95 degrees is • The probability that a given part will fail before 1000 hours of use is

11. Continuous Probability Distributions • The continuous probability density function (pdf) f(x) ≥ 0, for all x ∈R • The cumulative distribution,F(x)

12. Probability Distributions • Example: Problem 7, pg. 73 x, 0 < x < 1 f(x) = 2-x, 1 ≤ x < 2 0, elsewhere 1st – what does the function look like? • P(X < 120) = ___________________ • P(50 < X < 100) = ___________________ {

13. Your turn • Problem 14, pg. 73

14. Additional useful information* … Joint probability distributions • Example 1 (discrete): the joint probability mass function (see defn. 3.8, pg. 75) In the development of a new receiver for a digital communication system, each received bit is rated as acceptable, suspect, or unacceptable, depending on the quality of the received signal, with the following probabilities: P(acceptable) = P(x) = 0.9 P(suspect) = P(y) = 0.08 P(unacceptable) = P(z) = 0.02 * Section 3.4 in your book (Optional)

15. If we let X denote the number of acceptable bits and Y denote the number of suspect bits, then the joint probability associated with the number of acceptable and suspect bits in 4 transmitted bits is denoted by: fXY(x, y), where fXY(x, y)≥ 0 ∑x ∑yfXY(x, y) = 1 fXY(x, y) = P(X = x, Y = y) So, the probability of exactly two acceptable bits and exactly 1 suspect bit in the first 4 bits is fXY(2, 1) = P(X = 2, Y = 1) Assuming independence, we can determine the probability of a particular combination, say aasu, as: P(aasu) = P(a)*P(a)*P(s)*P(u) = 0.9*0.9*0.08*0.02 = 0.0013

16. Recognizing that aasu is just one of several possible combinations of 4 bits, we next need to determine the number of possible permutations of 2 acceptable and 1 suspect bit in 4 tested bits. That is (from theorem 2.6, pg. 36), So, fXY(2, 1) = P(X = 2, Y = 1) = 12(0.0013) = 0.0156

17. Joint probability distributions • Example 2 (continuous): the joint density function (see definition 3.9, pg. 76) If X denotes the time until a computer server connects to your machine (in milliseconds) and Y denotes the time until the server authorizes you as a valid user (in milliseconds.) Each measures the wait from a common starting time and X < Y. Assume that the joint probability density function for X and Y is given as: fXY(x, y) = 6 x 10-6exp(-0.001x – 0.002y) for x < y

18. The probability that X < 1000 and Y < 2000 is:

19. [Note: we can verify that this density function integrates to 1 as follows: ]

20. For further study … • Read section 3.4 • Solve selected problems on pp. 84-86