Question

The lower and upper quartiles of a symmetrical distribution are 40 and 60 respectively. The value of
median is​

Answer 1

Answer:

hey mate here is your answer....

Explanation:

▶️Median =

$\frac{40 + 60}{02}$

$\frac{100}{?2}$

Answer is 50

Answer 2

Given,

The lower and upper quartiles of a symmetrical distribution are 40 and 60 respectively.

To Find,

The value of the median =?

Solution,

We can solve the question as follows:

It is given that the lower and upper quartiles of a symmetrical distribution are 40 and 60 respectively. We have to find the median.

$Lower\: quartile = 40$

$Upper\: symmetrical = 60$

The formula for finding the median is given as:

$Median = \frac{lower\: quartile + upper\: quartile}{2}$

Substituting the values in the above formula,

$Median = \frac{40+60}{2}$

             $= \frac{100}{2}$

             $= 50$

Hence, the median is equal to 50.