Back to Exercise: Develop an empirical probability distribution

Exercises: Develop an Empirical Probability Distribution and Find Its Expected Value

Work through each section in order. To turn a frequency table into a probability distribution, estimate each probability as a RELATIVE FREQUENCY: count divided by total (or percent divided by 100). Every probability must be between 0 and 1, and they should sum to about 1. Compute the expected value as $E(X) = \sum x \cdot P(X = x)$, and scale to a population total with $n \cdot E(X)$. State any modeling choice you make for an open-ended category. Round as directed.

Grade 11·23 problems·~38 min·Common Core Math - HS Statistics and Probability·group·hss-md-a-4
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A

Warm-Up: Relative Frequency and Reading Tables

These problems review relative frequency and reading frequency tables.

1.

A survey records how many pets each of 200 households owns. In the survey, 50 households own exactly 1 pet. The relative frequency of "1 pet" is which of the following?

2.

A survey of 400 households records the number of cars per household. Exactly 120 households own 2 cars. Estimate P(X=2)P(X = 2) as a relative frequency, written as a decimal.

3.

A survey reports the number of TV sets per household as percentages: 0 sets 5%, 1 set 30%, 2 sets 40%, 3 sets 25%. Convert each percentage to a probability (percent divided by 100). Write P(X=1)P(X = 1):   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   and P(X=2)P(X = 2):   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   as decimals.

P(X = 1):
P(X = 2):
B

Fluency Practice

Build distributions, check the sum, and compute expected values.

1.

A survey of 250 households records the number of children. The table gives raw counts.

Children0123
Count507510025

Estimate P(X=2)P(X = 2) as a relative frequency, written as a decimal.

2.

An empirical distribution for the number of pets per household is:

Pets0123
Probability0.200.350.300.15

Add the probabilities. What is the sum?

3.

A reported empirical distribution lists 0 sets 2%, 1 set 35%, 2 sets 33%, 3 sets 18%, 4 or more 11%. Adding the probabilities gives 0.02+0.35+0.33+0.18+0.11=0.990.02 + 0.35 + 0.33 + 0.18 + 0.11 = 0.99. What is the best explanation?

4.

A distribution for the number of TVs per household has an open-ended top category "4 or more" with probability 0.12. To compute E(X)E(X), the class decides to treat "4 or more" as the representative value 4. Using that decision, what is the contribution of the "4 or more" category to E(X)E(X) (that is, the value times its probability)?

5.

A small empirical distribution is:

x012
Probability0.250.500.25

Compute the expected value E(X)=xP(X=x)E(X) = \sum x \cdot P(X = x).

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