Answer:
The expected number of tickets is 1.273
Step-by-step explanation:
Expected Value of a Discrete Probability Distribution
Given a discrete distribution with values
x={x1,x2,x3,...,xn}
And respective probabilities
p={p1,p2,p3,...pn}
The expected value EX of the entire distribution is
[tex]EX=\sum_{i}x_i.p_i[/tex]
The recent study of American males provides an approximate distribution of probabilities based on the number of tickets they had past year, according to the following data:
237 had 1 ticket
112 had 2 tickets
17 had 3 tickets
5 had 4 tickets
1 had 5 tickets
The total number of tickets is 237+112+17+5+1=372
Taking the number of tickets as the independent variable, then
x={1,2,3,4,5}
Each probability can be found as the relative frequency of the number of tickets as follows:
[tex]\displaystyle p_1=\frac{237}{372}=0.637[/tex]
[tex]\displaystyle p_2=\frac{112}{372}=0.301[/tex]
[tex]\displaystyle p_1=\frac{17}{372}=0.046[/tex]
[tex]\displaystyle p_1=\frac{5}{372}=0.013[/tex]
[tex]\displaystyle p_1=\frac{1}{372}=0.003[/tex]
Therefore
p={0.637,0.301,0.046,0.013,0.003}
Compute EX
[tex]EX=1*0.637+2*0.301+3*0.046+4*0.013+5*0.003[/tex]
[tex]\boxed{EX=1.273}[/tex]
The expected number of tickets is 1.273
