If the mean and variance of the frequency distribution:

are and respectively, then the value of is:
If the mean and variance of the frequency distribution:

are and respectively, then the value of is:
Correct answer:25
Standard Method
Given: The mean is and the variance is for the given frequency distribution.
Find: The value of .
Using the table,
Mean is:
So,
Hence,
Now use the variance formula:
Substituting the given values,
Since ,
This gives
Solving, we get and . Therefore,
So, the required value is .
Using Mean First, Then Variance
Given: The frequency distribution has unknown frequencies and , with mean and variance .
Find: .
From the distribution,
Using the mean,
Cross-multiplying,
Now apply variance:
So,
Using ,
Now solve this linear equation to obtain . Hence . Finally,
Therefore, the required numerical value is .
Using the mean formula incorrectly by taking instead of the weighted mean . This ignores the frequencies. Always use the frequency-weighted formula for a distribution table.
Applying the variance formula as instead of . The mean must be squared in the second term.
Not forming and correctly for the unknown-frequency columns. Terms like , , , and must be included carefully from the table.
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