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Question

If ¯¯¯x1 and ¯¯¯x2 are the means of two distributions such that ¯¯¯x1<¯¯¯x2 and ¯¯¯x is the mean of the combined distribution, then

A
¯¯¯x<¯¯¯x1
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B
¯¯¯x>¯¯¯x2
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C
¯¯¯x=¯¯¯x1+¯¯¯x22
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D
¯¯¯x1<¯¯¯x<¯¯¯x2
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Solution

The correct option is D ¯¯¯x1<¯¯¯x<¯¯¯x2
Let n1,n2 be the number of observations in distributions having means ¯¯¯x1,¯¯¯x2 respectively.
Now, combined mean
¯¯¯x=n1¯¯¯x1+n2¯¯¯x2n1+n2
¯¯¯x1<¯¯¯x2
n1¯¯¯x1<n1¯¯¯x2
So,n1¯¯¯x1+n2¯¯¯x2n1+n2<n1¯¯¯x2+n2¯¯¯x2n1+n2
¯¯¯x<¯¯¯x2(n1+n2n1+n2)
¯¯¯x<¯¯¯x2...........(i)
Also, ¯¯¯x2>¯¯¯x1
n2¯¯¯x2>n2¯¯¯x1
So, n1¯¯¯x1+n2¯¯¯x2n1+n2>n1¯¯¯x1+n2¯¯¯x1n1+n2
¯¯¯x>¯¯¯x1(n1+n2n1+n2)
¯¯¯x>¯¯¯x1...........(ii)
From (i) and (ii)
¯¯¯x1<¯¯¯x<¯¯¯x2

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