Question

Calculate Q₁, D_6, and P₁₅ for the following data:

Mid value	25	75	125	175	225	275
Frequency	10	70	80	100	150	90

Answer 1

Since the difference between any two consecutive mid values is 50, the width of each class interval is 50.
∴ the class intervals will be 0 – 50, 50 – 100, etc.
We construct the less than cumulative frequency table as given below:

Class interval	Frequency (f)	Less than cumulative frequency (c.f.)
0 – 50	10	10
50 – 100	70	80 ← P15
100 – 150	80	160 ← Q1
150 – 200	100	260
200 – 250	150	410 ← D6
250 – 300	90	500
Total	500

Here, N = 500

Q₁ class = class containing `("N"/4)^"th"` observation

∴ `"N"/4 = 500/4` = 125
Cumulative frequency which is just greater than (or equal) to 125 is 160.
∴ Q₁ lies in the class 100 – 150.
∴ L = 100, h = 50, f = 80, c.f. = 80

∴ Q₁ = `"L"+"h"/"f"("N"/4-"c.f.")`

= `100 + 50/80 (125 - 80)`

= `100 + 5/8 (45)`

= 100 + 28.125
= 128.125

D₆ class = class containing `((6"N")/10)^"th"` observation

∴ `(6"N")/10=(6xx500)/10` = 300

Cumulative frequency which is just greater than (or equal) to 300 is 410.
∴ D₆ lies in the class 200 – 250
∴ L = 200, h = 50, f = 150, c.f. = 260

∴ D₆ = `"L"+"h"/"f"((6"N")/10-"c.f.")`

= `200 + 50/150 (300 - 260)`

= `200 + 1/3 (40)`

= 200 + 13.33
= 213.33

∴ P₁₅ class = class containing `((15"N")/100)^"th"` observation

∴ `(15"N")/100 =(15 xx 500)/100` = 75
Cumulative frequency which is just greater than (or equal) to 75 is 80.
∴ P₁₅ lies in the class 50 – 100
∴ L = 50, h = 50, f = 70, c.f. = 10

∴ P₁₅ = `"L"+"h"/"f"((15"N")/100-"c.f.")`

= `50 + 50/70 (75 - 10)`

= `50 + 5/7 (65)`

= `50 + 325/7`

= 50 + 46.4286
= 96.4286
∴ Q₁ = 128.125, D₆ = 213.33, P₁₅ = 96.4286