Answer to Question #154559 in Statistics and Probability for 75ed86

There are three colors and all are equally likely so each of three times subject can chose one out of three colors. So, possible number of outcomes in the sample space is

"3 \\times 3 \\times 3 = 27"

Since x shows the number of times subject chose red out of three. Here x can take values 0, 1, 2, and 3. When x=0, then subjects chose either yellow or blue color. There number of outcomes in favor of this event is

"2 \\times 2 \\times 2 = 8"

The required probability is

"P(X=0) = \\frac{8}{27}"

When x=1, then subject chose either yellow or blue color 2 times, red color one time. Number of ways of selecting red color is "C^3_1 = 3" . The possible number of outcomes in favor of this event is

"3 \\times 2 \\times 2 = 12"

The required probability is

"P(X=1) = \\frac{12}{27}"

When x=2, then subject chose either yellow or blue color 1 times, red color 2 times. Number of ways of selecting red color is "C^3_2=3" . then subject chose either yellow or blue color 1 times, red color 2 times. Number of ways of selecting red color is

"3 \\times 2 = 6"

The required probability is

"P(X=2) = \\frac{6}{27}"

When x=3, then subject chose red color 3 times. The possible number of outcomes in favor of this event is

"1 \\times 1 \\times 1 = 1"

The required probability is

"P(X=3) = \\frac{1}{27}"

The probability distribution of X: