Answer:
Column A: 102+18=120
Group 1:
102/120=0.85
Group 2:
18/120=0.15
Column B: 34+14=48
Group 1:
34/48=0.71
Group 2:
14/48=0.29
Hope this helps. :)
Answer: The relative frequencies to the nearest hundredth of the columns of the two-way table is given by :-
A B
Group 1 0.85 0.71
Group 2 0.15 0.29
Step-by-step explanation:
Given two-way table : A B
Group 1 10 34
Group 2 18 14
Total data value in column A = [tex]102+18=120[/tex]
Total data value in column B = [tex]34+14=48[/tex]
Now, the relative frequency for Group 1 with column A =[tex]\frac{102}{120}=0.85[/tex]
The relative frequency for Group 1 with column B =[tex]\frac{34}{48}=0.708333333..\approx0.71[/tex]
Now, the relative frequency for Group 2 with column A =[tex]\frac{18}{120}=0.15[/tex]
The relative frequency for Group 2 with column B =[tex]\frac{14}{48}=0.2916666666..\approx0.29[/tex]
