Definitions [2]
In a grouped frequency distribution, the modal class is the class interval that has the highest frequency.
The cumulative frequency of a class interval is the sum of the frequencies of all the classes up to this class interval.
Formulae [4]
Direct Method:
\[\bar{x}=\frac{\sum f_ix_i}{\sum f_i}\]
where xi = class mark, fi = frequency
Short-cut (Assumed Mean) Method:
\[\bar{x} = A+\frac{\sum f_id_i}{\sum f_i}\]
where di = xi - A
A is the assumed mean
Step-deviation Method:
\[\bar{x}=a+h\frac{\sum f_iu_i}{\sum f_i}\]
where \[u_i=\frac{x_i-a}{h}\]
h is the class width / common factor
\[\mathrm{Mode}=l+\left(\frac{f_1-f_0}{2f_1-f_0-f_2}\right)\times h\]
l = lower limit of the modal class,
h = size of the class interval (assuming all class sizes to be equal),
f1 = frequency of the modal class,
f0 = frequency of the class preceding the modal class,
f2 = frequency of the class succeeding the modal class.
If n is odd:
Median =\[\left(\frac{n+1}{2}\right)\]th observation
If n is even:
Median average of =\[\frac{n}{2}\mathrm{th}\] and \[\left(\frac{n}{2}+1\right)\mathrm{th}\]observations
\[\mathrm{Median}=l+\frac{\left(\frac{n}{2}-cf\right)}{f}\times h\]
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l = lower limit of median class
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n = total frequency
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cf = cumulative frequency of class before median class
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f = frequency of median class
Classes must be continuous before applying the median formula.
