the conditional relative frequency table below was generated by column from a frequency table comparing the…

the conditional relative frequency table below was generated by column from a frequency table comparing the color of a flower to a type of flower.\n| |daisy|rose|total|\n|--|--|--|--|\n|red|a|b|c|\n|yellow|d|e|f|\n|white|g|h|j|\n|total|1.0|1.0|1.0|\nwhich would most likely indicate an association between the categorical variables?\nthe value of g is similar to the value of h.\nthe value of b is similar to the value of e.\nthe value of g is not similar to the value of h.

the conditional relative frequency table below was generated by column from a frequency table comparing the color of a flower to a type of flower.\n| |daisy|rose|total|\n|--|--|--|--|\n|red|a|b|c|\n|yellow|d|e|f|\n|white|g|h|j|\n|total|1.0|1.0|1.0|\nwhich would most likely indicate an association between the categorical variables?\nthe value of g is similar to the value of h.\nthe value of b is similar to the value of e.\nthe value of g is not similar to the value of h.

Answer

Answer:

The value of G is not similar to the value of H.

Explanation:

Step1: Understand association in contingency tables

In a conditional - relative frequency table comparing two categorical variables (here, flower color and flower type), an association between the variables is indicated when the conditional relative frequencies for a category of one variable are different across the categories of the other variable.

Step2: Analyze the options

If the value of G (conditional relative frequency of white flowers among daisies) is not similar to the value of H (conditional relative frequency of white flowers among roses), it implies that the likelihood of a flower being white depends on whether it is a daisy or a rose. This difference in conditional relative frequencies indicates an association between the flower - type and flower - color categorical variables. If the values were similar, it would suggest that the flower color is independent of the flower type.