find the mean mode and median of 5,20,20,25,30,50,70,100
Answers
Answer:
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Step-by-step explanation:
Answer:
Median = 50
Step-by-step explanation:
We are given the following frequency distribution below;
Classes Frequency (f) Cumulative frequency (cf)
20 - 30 5 5
30 - 40 15 20
40 - 50 25 45
50 - 60 20 65
60 - 70 7 72
70 - 80 8 80
80 - 90 10 90
∑f = 90
Firstly, we will calculate \frac{N}{2}2N , (where N = ∑f), \frac{N}{2}2N = \frac{90}{2}290 = 45.
So, the value of cumulative frequency just greater than or equal to 45 is 45.
Therefore, median class is 40 - 50 .
Now, Median formula = x_L + \frac{\frac{N}{2} -cf}{f_m}*cxL+fm2N−cf∗c
where, x_LxL = lower limit of median class = 40
N = ∑f = 90
f_mfm = frequency of median class = 25
cf = cumulative frequency just above the median class = 20
c = width of class interval = 10
So, Median = 40 + \frac{\frac{90}{2} -20}{25}*1040+25290−20∗10
= 40 + 10 = 50 .
Therefore, Median of given distribution is 50 .