1 Answer

Narender · Answer 1 · 2022-05-20T19:14:02+0000

Answer:

$\bar x_(girls) = 46.25$

Explanation:

Given

$Boys = 7\\Girls = 16$

$\bar x = 49$

Required

Mean of girls

The mean of the boys and girls is calculated as:

$\bar x = (\sum x)/(n)$

This gives:

$\bar x = (\sum(boys) + \sum(girls))/(boys + girls)$

So, we have:

$49= (42+85+47+29+58+54+ 72 + \sum(girls))/(7 + 16)$

$49= (387 + \sum(girls))/(23)$

Cross multiply

$23 * 49=387 + \sum(girls)$

$1127=387 + \sum(girls)$

Subtract by 387

$1127-387 = \sum(girls)$

$740= \sum(girls)$

$\sum(girls) = 740$

The mean of girls is:

$\bar x_(girls) = (\sum(girls))/(girls)$

$\bar x_(girls) = (740)/(16)$

$\bar x_(girls) = 46.25$

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