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Question
Following distribution shows the marks of 230 students in a particular subject. If the median marks are 46, then find the values of x and y.
| Marks | Number of students |
| 10 – 20 | 12 |
| 20 – 30 | 30 |
| 30 – 40 | x |
| 40 – 50 | 65 |
| 50 – 60 | y |
| 60 – 70 | 25 |
| 70 – 80 | 18 |
Sum
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Solution
Median = 46
Total = 230 = n
| Marks | xi | f | c.f. |
| 10 – 20 | 15 | 12 | 12 |
| 20 – 30 | 25 | 30 | 42 |
| 30 – 40 | 35 | x | 42 + x → c.f. |
| 40 – 50 | 45 | 65 | 107 + x |
| 50 – 60 | 55 | y | 107 + x + y |
| 60 – 70 | 65 | 25 | 132 + x + y |
| 70 – 80 | 75 | 18 | 150 + x + y |
|
`sumf = 230` = 150 + x + y |
150 + x + y = 230
x + y = 230 − 150
x + y = 80 .....(i)
Median class = 40 − 50
l = 40, h = 50 − 40 = 10, f1 = 65, f0 = 42 + x
Median `=l+[n/2 - (f_0))/f_1 xx h`
`46=40+(230/2-(42+x))/65xx10`
`46=40+(115-(42+x))/65xx10`
`46 - 40 = (115-42-x)/65xx10`
`6=(73-x)/65xx10`
`(6xx65)/10=73-x`
`390/10=73-x`
39 = 73 − x
x = 73 − 39
x = 34
Now put value of x in equation (i).
x + y = 80
34 + y = 80
y = 80 − 34
y = 46
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