If x and y are upper limit of median class and lower limit of modal class respectively in the following distribution, then what is the value of (2x + y) ?

Marks	Below 10	Below 20	Below 30	Below 40	Below 50	Below 60
No. of students	3	22	35	47	55	80

 

Formula used:

For median class: Calculate N/2. The class whose cumulative frequency is greater than and nearest to N/2 is the median class. The upper limit of this class is x.

For modal class: Convert the cumulative frequency distribution to a simple frequency distribution. The class with the highest frequency is the modal class. The lower limit of this class is y.

Calculation:

First, create a frequency distribution table from the given cumulative frequency distribution:

Total number of students (N) = 80

Median Class = N/2 = 80/2 = 40

The cumulative frequency just greater than 40 is 47, which corresponds to the class interval 30-40.

So, the median class is 30-40.

The upper limit of the median class (x) = 40.

Modal Class: The highest frequency in the frequency column is 25, which corresponds to the class interval 50-60.

So, the modal class is 50-60.

The lower limit of the modal class (y) = 50.

Calculating (2x + y):

2x + y = 2 × 40 + 50

⇒ 2x + y = 80 + 50

⇒ 2x + y = 130