Respuesta :
Answer:
(a) The PMF of X is: [tex]P(X=k)=(1-0.20)^{k-1}0.20;\ k=0, 1, 2, 3....[/tex]
(b) The probability that a player defeats at least two opponents in a game is 0.64.
(c) The expected number of opponents contested in a game is 5.
(d) The probability that a player contests four or more opponents in a game is 0.512.
(e) The expected number of game plays until a player contests four or more opponents is 2.
Step-by-step explanation:
Let X = number of games played.
It is provided that the player continues to contest opponents until defeated.
(a)
The random variable X follows a Geometric distribution.
The probability mass function of X is:
[tex]P(X=k)=(1-p)^{k-1}p;\ p>0, k=0, 1, 2, 3....[/tex]
It is provided that the player has a probability of 0.80 to defeat each opponent. This implies that there is 0.20 probability that the player will be defeated by each opponent.
Then the PMF of X is:
[tex]P(X=k)=(1-0.20)^{k-1}0.20;\ k=0, 1, 2, 3....[/tex]
(b)
Compute the probability that a player defeats at least two opponents in a game as follows:
P (X ≥ 2) = 1 - P (X ≤ 2)
= 1 - P (X = 1) - P (X = 2)
[tex]=1-(1-0.20)^{1-1}0.20-(1-0.20)^{2-1}0.20\\=1-0.20-0.16\\=0.64[/tex]
Thus, the probability that a player defeats at least two opponents in a game is 0.64.
(c)
The expected value of a Geometric distribution is given by,
[tex]E(X)=\frac{1}{p}[/tex]
Compute the expected number of opponents contested in a game as follows:
[tex]E(X)=\frac{1}{p}=\frac{1}{0.20}=5[/tex]
Thus, the expected number of opponents contested in a game is 5.
(d)
Compute the probability that a player contests four or more opponents in a game as follows:
P (X ≥ 4) = 1 - P (X ≤ 3)
= 1 - P (X = 1) - P (X = 2) - P (X = 3)
[tex]=1-(1-0.20)^{1-1}0.20-(1-0.20)^{2-1}0.20-(1-0.20)^{3-1}0.20\\=1-0.20-0.16-0.128\\=0.512[/tex]
Thus, the probability that a player contests four or more opponents in a game is 0.512.
(e)
Compute the expected number of game plays until a player contests four or more opponents as follows:
[tex]E(X\geq 4)=\frac{1}{P(X\geq 4)}=\frac{1}{0.512}=1.953125\approx 2[/tex]
Thus, the expected number of game plays until a player contests four or more opponents is 2.
