Question

If mean and mode in a frequency distribution are 6 and 3 respectively, then their median is

Answer 1

||✪✪ QUESTION ✪✪||

If mean and mode in a frequency distribution are 6 and 3 respectively, then their median is ?

|| ★★ FORMULA USED ★★ ||

The relationship between the mean, median and mode is :-

☛ 3 * Median = Mode + 2 * Mean

|| ✰✰ ANSWER ✰✰ ||

we Have Given That :-

⇒ Mean of frequency distribution = 6

⇒ Mode of frequency distribution = 3

Putting Values in Above Told Formula :-

➾ 3 * Median = 3 + 2*6

➾ 3 * Median = 3 + 12

➾ 3 * Median = 15

Dividing both sides by 3,

➾ Median = 5 .

∴ Required Median of frequency distribution is 5.

Answer 2

$\huge\bold\green{Question}$

If mean and mode in a frequency distribution are 6 and 3 respectively, then their median is

$\huge\bold\green{Answer}$

According to the question we have given :-

°•° Mean of frequency distrib. are = 6

•°• Mode of frequency distrib. are = 3

Now, by using this relation we can get the answer

The relationship bw . the mean, median and mode is :-

= 3 × Median = Mode + 2 × Mean

Simply , by susituting the known values in this relation :-

= 3 × Median = 3 + 2×6

= 3 × Median = 3 + 12

= 3 × Median = 15

Now by Dividing by 3 both sides.

We get Median = 5

Hence , the Required value of Median of frequency distribution is 5