Answer:
Expected Winnings = 2.6
Step-by-step explanation:
Since the probability of rolling a 1 is 0.22 and the probability of rolling either a 1 or a 2 is 0.42, the probability of rolling only a 2 can be determined as:
[tex]P_{1,2} = P_{1}+P_{2}\\P_{2} = 0.42 - 0.22 = 0.20[/tex]
The same logic can be applied to find the probability of rolling a 3
[tex]P_{2,3} = P_{2}+P_{3}\\P_{3} = 0.54 - 0.20 = 0.34[/tex]
The sum of all probabilities must equal 1.00, so the probability of rolling a 4 is:
[tex]P_{4} =1- P_{1}+P_{2}+P_{3} = 1-0.22+0.20+0.34\\P_{4}=0.24[/tex]
The expected winnings (EW) is found by adding the product of each value by its likelihood:
[tex]EW=1*P_{1}+2*P_{2}+ 3*P_{3}+ 4*P_{4} \\EW=1*0.22+2*0.20+ 3*0.34+ 4*0.24\\EW=2.6[/tex]
Expected Winnings = 2.6
