Answer:
6
Step-by-step explanation:
The mean of a list of test scores is 80
Adding an additional test score of 92 caused the mean to rise to 82
To find:
After this additional, how many total test are in the list ?
Solution:
Let the total number of test at first = [tex]n[/tex]
And sum of total score = [tex]S[/tex]
As we know, mean = [tex]\frac{sum \ of \ total \ observation}{number\ of \ total\ observation}[/tex]
[tex]80= \frac{S}{n} \\[/tex]
Multiplying both sides by [tex]n[/tex]
[tex]80n=S[/tex]
Now, as adding an additional test score of 92 caused the mean to rise to 82,
[tex]S+92=82\times(n+1)\\80n +92 = 82n+82 \ (given \ S =80n)[/tex]
[tex]80n-82n =82-92\\-2n=-10[/tex]
By dividing both sides by minus ( - )
[tex]2n =10[/tex]
By dividing both sides by 2
[tex]n =5[/tex]
Thus, total number of test at first = [tex]n[/tex] = 5
And, after this additional score added, total number of tests are [tex]n+1=6[/tex]
