How to work out probability from a frequency polygon?

2 Views|Posted 6 months ago

Asked by Shiksha User

1 Answer

Sort by:

Answered by

6 months ago

Since a frequency polygon represents the data distribution, by interpreting the areas under curve, it is possible to infer probabilities for some range and interval. Let us take a look at it:

Understanding the Data: You must be able to comprehend the data represented by frequency polygon. In most cas

Upvote

Similar Questions for you

Given data 60, 60, 44, 58, 68, α, β, 56 has mean 58, variance = 66.2 then find α² + β²

Alok Kumar Singh

Variance = $\frac{\sum x^{2}}{n} - {(\bar{x})}^{2}$

$\frac{6 0^{2} + 6 0^{2} + 4 4^{2} + 5 8^{2} + 6 8^{2} + α^{2} + β^{2} + 5 6^{2}}{8} = {(58)}^{2} = 66.2$

$\frac{7200 + 1936 + 3364 + 4624 + 3136 + α^{2} + β^{2}}{8} = 3364 = 66.2$

$2532.5 + \frac{α^{2} + β^{2}}{8} - 3364 = 66.2$

α² + β² = 897.7 × 8

= 7181.6

For the following data table

x_i

f_i

0 – 4

4 – 8

8 – 12

12 – 16

16 – 20

2

4

7

8

6

Find the value of 20 M (where M is median of the data)

Alok Kumar Singh

x_i

f_i

c.f.

0 – 4

4 – 8

8 – 12

12 – 16

16 – 20

$N = \sum_{}^{} f = 27$

$(\frac{N}{2}) = \frac{27}{2} = 13.5$

So, we have median lies in the class 12 – 16

I₁ = 12, f = 8, h = 4, c.f. = 13

So, here we apply formula

$M = I_{1} + \frac{\frac{N}{2} - c . f .}{f} \times h = 12 + \frac{13.5 - 13}{8} \times 4$

$= 12 + \frac{5}{2}$

$M = \frac{24.5}{2} = 12.25$

20 M = 20 × 12.25

= 245

Alok Kumar Singh

$\frac{a + b + 68 + 44 + 40 + 60}{6} = 55$

212 + a + b = 330

⇒ a + b = 118

$\frac{\sum_{}^{} x_{i}^{2}}{n} - {(\bar{x})}^{2} = 194$

$\frac{a^{2} + b^{2} + {(68)}^{2} + {(44)}^{2} + {(40)}^{2} + {(60)}^{2}}{6} = {(55)}^{2} = 194$

= 3219

11760 + a² + b² = 19314

⇒ a² + b² = 19314 – 11760

= 7554

(a + b)² –2ab = 7554

From here b = 41.795

a + b = 118

⇒ a + b + 2b = 118 + 83.59

= 201.59

Alok Kumar Singh

Kindly go throuigh the solution

Given $\sum_{i = 1}^{18} (x_{i} - α) = 36 i . e \sum_{i = 1}^{18} x_{i} - 18 α = 36 . . . . . . . . . . (i)$

& $\sum_{i = 1}^{18} {(x_{i} - β)}^{2} = 90 i . e \sum_{i = 1}^{18} {x_{i}}^{2} - 2 β \sum_{}^{} x_{i} + 18 β^{2} = 90 . . . . . . . . . . . . . (i i)$

(i) & (ii) $\sum_{i = 1}^{18} {x_{i}}^{2} = 90 - 18 β + 36 β (α + 2) . . . . . . . . . . . . . (i i i)$

Now variance $σ^{2} = \frac{\sum {x_{i}}^{2}}{n} - {(\frac{\sum x_{i}}{n})}^{2}$ = 1 given

->(a - b) (a - b + 4) = 0

Since $α \neq β s o | α - β | = 4$

Vishal Baghel

$M e a n = \frac{3 + 12 + 7 + a + (43 - a)}{5} = 13$

Variance = $\frac{3^{2} + 1 2^{2} + 7^{2} + a^{2} + {(43 - a)}^{2}}{5} - {(13)}^{2}$

$\Rightarrow \frac{2 a^{2} - a + 1}{5} \to N a t u r a l n u m b e r$

Let 2a² – a + 1 = 5x

D = 1 – 4 (2) (1 – 5n)

= 40n – 7, which is not $4 λ o r 4 λ + 1 f r o m .$

As each square form is $4 λ o r 4 λ + 1$

Taking an Exam? Selecting a College?

Get authentic answers from experts, students and alumni that you won't find anywhere else.

On Shiksha, get access to

66K

Colleges

1.2K

Exams

6.9L

Reviews

1.8M

Answers

Learn more about...

Maths Statistics 2021

View Exam Details

Share Your College Life Experience

Didn't find the answer you were looking for?

Search from Shiksha's 1 lakh+ Topics

Ask Current Students, Alumni & our Experts

Quick Actions

Community GuidelinesUser Points System

QuestionsDiscussionsTags

Have a question related to your career & education?

See what others like you are asking & answering