Back to Exercise: Define a random variable and graph its distribution

Exercises: Define a Random Variable and Graph Its Probability Distribution

Work through each section in order. A random variable X is a rule that assigns a NUMBER to each outcome in a sample space. To build its probability distribution, group the outcomes by the value of X and add the probabilities in each group; the probabilities of all values must sum to 1. Write probabilities as fractions or decimals. For explanation problems, use complete sentences. Do NOT compute expected value — that comes next lesson.

Grade 11·19 problems·~35 min·Common Core Math - HS Statistics and Probability·group·hss-md-a-1
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A

Warm-Up: Sample Spaces and Probabilities

These problems review sample-space ideas you already know.

1.

Two fair coins are tossed, with sample space {\{HH, HT, TH, TT}\}. Let $X = $ the number of heads. Which statement correctly describes what XX does?

2.

A fair die is rolled and the sample space is {1,2,3,4,5,6}\{1, 2, 3, 4, 5, 6\}, each outcome equally likely. What must be true of the probabilities of all six outcomes?

3.

Two fair coins are tossed; the sample space is {\{HH, HT, TH, TT}\} with each outcome equally likely. Let $X = $ the number of heads. Give XX for each outcome: $X(\text{HH}) = $   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   , $X(\text{HT}) = $   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   , $X(\text{TT}) = $   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   .

X(HH):
X(HT):
X(TT):
B

Fluency Practice

Build distributions by grouping outcomes by value and summing probabilities.

1.

Two fair coins are tossed; each of the four outcomes {\{HH, HT, TH, TT}\} has probability 14\frac{1}{4}. Let $X = $ the number of heads. List the possible VALUES of XX from least to greatest:   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   ,   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   ,   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   .

least value:
middle value:
greatest value:
2.

Two fair coins are tossed; each outcome {\{HH, HT, TH, TT}\} has probability 14\frac{1}{4}. Let $X = $ the number of heads. The value X=0X = 0 comes only from the outcome TT. What is P(X=0)P(X = 0)? Enter your answer as a fraction.

3.

Two fair coins are tossed; each outcome {\{HH, HT, TH, TT}\} has probability 14\frac{1}{4}. Let $X = $ the number of heads. The value X=1X = 1 comes from BOTH HT and TH. What is P(X=1)P(X = 1)? Enter your answer as a fraction.

4.

A family has three children; the eight equally likely outcomes give the number of girls XX this distribution:

Value xx0123
P(X=x)P(X = x)18\frac{1}{8}38\frac{3}{8}38\frac{3}{8}18\frac{1}{8}

Which check confirms this is a valid probability distribution?

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