Solution: A distribution consists of three components with frequencies 45 ,40 and 15 having their means 2,2.5 and 2 respectively . find combined mean
Answer: Let [tex]\bar{x_{1}}[/tex] be the mean of first component and [tex]n_{1}[/tex] be the frequency of first component
Let [tex]\bar{x_{2}}[/tex] be the mean of second component and [tex]n_{2}[/tex] be the frequency of second component
Let [tex]\bar{x_{3}}[/tex] be the mean of third component and [tex]n_{3}[/tex] be the frequency of third component
Then we have:
[tex]\bar{x_{1}} = 2, n_{1} = 45[/tex]
[tex]\bar{x_{2}} = 2.5, n_{2} = 40[/tex]
[tex]\bar{x_{3}} = 2, n_{3} = 15[/tex]
Now the combined mean is:
Combined mean [tex]=\frac{\bar{x_{1}} \times n_{1}+\bar{x_{2}} \times n_{2}+\bar{x_{3}} \times n_{3}}{n_{1} +n_{2} +n_{3}}[/tex]
[tex]=\frac{2 \times 45 +2.5 \times 40 +2 \times 15}{45+40+15}[/tex]
[tex]=\frac{90 + 100 + 30}{100}[/tex]
[tex]=\frac{220}{100}=2.2[/tex]
Therefore, the combined mean is 2.2
