4.2 (cont.) Expected Value of a Discrete Random Variable

1. 4.2 (cont.) Expected Value of a Discrete Random Variable A measure of the “middle” of the values of a random variable

2. Center The mean of the probability distribution is the expected value of X, denoted E(X) E(X) is also denoted by the Greek letter µ (mu)

3. Economic Scenario Profit ($ Millions) Probability X P Great 10 0.20 x1 P(X=x1) 5 Good 0.40 x2 P(X=x2) OK 1 0.25 x3 P(X=x3) Lousy -4 0.15 x4 P(X=x4) Mean orExpectedValue k = the number of possible values (k=4) E(x)= µ = x1·p(x1) + x2·p(x2) + x3·p(x3) + ... + xk·p(xk) Weighted mean

4. Mean orExpectedValue k = the number of outcomes (k=4) µ = x1·p(x1) + x2·p(x2) + x3·p(x3) + ... + xk·p(xk) Weighted mean Each outcome is weighted by its probability

5. Other Weighted Means • Stock Market: The Dow Jones Industrial Average • The “Dow” consists of 30 companies (the 30 companies in the “Dow” change periodically) • To compute the Dow Jones Industrial Average, a weight proportional to the company’s “size” is assigned to each company’s stock price

6. Economic Scenario Profit ($ Millions) Probability X P Great 10 0.20 x1 P(X=x1) 5 Good 0.40 x2 P(X=x2) OK 1 0.25 x3 P(X=x3) Lousy -4 0.15 x4 P(X=x4) Mean k = the number of outcomes (k=4) µ = x1·p(x1) + x2·p(x2) + x3·p(x3) + ... + xk·p(xk) EXAMPLE

7. Economic Scenario Profit ($ Millions) Probability X P Great 10 0.20 x1 P(X=x1) 5 Good 0.40 x2 P(X=x2) OK 1 0.25 x3 P(X=x3) Lousy -4 0.15 x4 P(X=x4) Mean k = the number of outcomes (k=4) µ = x1·p(x1) + x2·p(x2) + x3·p(x3) + ... + xk·p(xk) EXAMPLE µ = 10*.20 + 5*.40 + 1*.25 – 4*.15 = 3.65 ($ mil)

8. Mean k = the number of outcomes (k=4) µ = x1·p(x1) + x2·p(x2) + x3·p(x3) + ... + xk·p(xk) EXAMPLE µ = 10·.20 + 5·.40 + 1·.25 - 4·.15 = 3.65 ($ mil) µ=3.65

9. Interpretation • E(x) is not the value of the random variable x that you “expect” to observe if you perform the experiment once

10. Interpretation • E(x) is a “long run” average; if you perform the experiment many times and observe the random variable x each time, then the average x of these observed x-values will get closer to E(x) as you observe more and more values of the random variable x.

11. Example: Green Mountain Lottery • State of Vermont • choose 3 digits from 0 through 9; repeats allowed • win $500 x $0 $500 p(x) .999 .001 E(x)=$0(.999) + $500(.001) = $.50

12. Example (cont.) • E(x)=$.50 • On average, each ticket wins $.50. • Important for Vermont to know • E(x) is not necessarily a possible value of the random variable (values of x are $0 and $500)

13. Example: coin tossing • Suppose a fair coin is tossed 3 times and we let x=the number of heads. Find m=E(x). • First we must find the probability distribution of x.

14. Example (cont.) • Possible values of x: 0, 1, 2, 3. • p(1)? • An outcome where x = 1: THT • P(THT)? (½)(½)(½)=1/8 • How many ways can we get 1 head in 3 tosses? 3C1=3

15. Example (cont.)

16. Example (cont.) • So the probability distribution of x is: x 0 1 2 3 p(x) 1/8 3/8 3/8 1/8

17. So the probability distribution of x is: x 0 1 2 3 p(x) 1/8 3/8 3/8 1/8 Example

18. US Roulette Wheel and Table American Roulette 0 - 00(The European version has only one 0.) • The roulette wheel has alternating black and red slots numbered 1 through 36. • There are also 2 green slots numbered 0 and 00. • A bet on any one of the 38 numbers (1-36, 0, or 00) pays odds of 35:1; that is . . . • If you bet $1 on the winning number, you receive $36, so your winnings are $35

19. US Roulette Wheel: Expected Value of a $1 bet on a single number • Let x be your winnings resulting from a $1 bet on a single number; x has 2 possible values x -1 35 p(x) 37/38 1/38 • E(x)= -1(37/38)+35(1/38)= -.05 • So on average the house wins 5 cents on every such bet. A “fair” game would have E(x)=0. • The roulette wheels are spinning 24/7, winning big $$ for the house, resulting in …