A two-way frequency table is used to approximate conditional probabilities by writing the ratio of the intersection of the two conditions with the given condition in the denominator and the preference in the numerator. This effectively calculates the conditional probability \( P(A | B) \) as the ratio \( P(A \cap B) / P(B) \), where \( P(A \cap B) \) is the frequency count for both conditions intersecting (where both conditions are satisfied), and \( P(B) \) is the total frequency count for the condition being conditioned upon.
How is a two-way frequency table used to approximate conditional probabilities?(1 point) Responses by writing the ratio of the intersection of the two conditions with the given condition in the denominator and the preference in the numerator by writing the ratio of the intersection of the two conditions with the given condition in the denominator and the preference in the numerator by finding the average of the two conditions by finding the average of the two conditions by writing the totals for the two conditions from the table as a fraction, decimal, or percentage by writing the totals for the two conditions from the table as a fraction, decimal, or percentage by adding the two conditions and dividing by the total for the entire two-way frequency table
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