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New answer posted

10 months ago

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V
Vishal Baghel

Contributor-Level 10

Mean = (6+10+7+13+a+12+b+12)/8 = (60+a+b)/8 = 9 ⇒ a+b=12.
Variance = (Σx? ²/n) - (mean)² = 37/4.
Σx? ²/8 - 81 = 37/4.
Σx? ² = 8 (81+9.25) = 8 (90.25) = 722.
Σx? ² = 36+100+49+169+a²+144+b²+144 = 642+a²+b².
642+a²+b²=722 ⇒ a²+b²=80.
(a+b)²=144 ⇒ a²+b²+2ab=144 ⇒ 80+2ab=144 ⇒ 2ab=64.
(a-b)² = a²+b²-2ab = 80-64 = 16.

New question posted

10 months ago

0 Follower 4 Views

New answer posted

10 months ago

0 Follower 2 Views

V
Vishal Baghel

Contributor-Level 10

Given   i = 1 1 8 ( x i α ) = 3 6 i . e i = 1 1 8 x i 1 8 α = 3 6 . . . . . . . . . . ( i )

&       i = 1 1 8 ( x i β ) 2 = 9 0 i . e i = 1 1 8 x i 2 2 β x i + 1 8 β 2 = 9 0 . . . . . . . . . . . . . ( i i )         

(i) & (ii)  i = 1 1 8 x i 2 = 9 0 1 8 β + 3 6 β ( α + 2 ) . . . . . . . . . . . . . ( i i i )

Now variance σ 2 = x i 2 n ( x i n ) 2 = 1 given

=> (α - β) (α - β + 4) = 0

Since   α β s o | α β | = 4

New answer posted

10 months ago

0 Follower 10 Views

A
alok kumar singh

Contributor-Level 10

Class

Frequency

xi

xifi

 

0 - 6

6 – 12

12 – 18

18 – 24

24 – 30

a

b

12

9

5

a + b + 26 = N

3

9

15

21

27

3a

9b

180

189

135

-> 81a + 37b = 1018    

                                            -(i)

F o r M e d i a n = L + N 2 c , f x h

1 4 = 1 2 + a + b 2 + 1 3 ( a + b ) 1 2 * 6              

->a + b = 18                                   -(ii)

Solving (i) & (ii) a = 8 & b = 10

->(a – b)2 = 4

New answer posted

11 months ago

0 Follower 7 Views

A
alok kumar singh

Contributor-Level 10

For every a, there  must be a2 – 2. So, there will be infinitely many pairs (a, b)

New answer posted

11 months ago

0 Follower 9 Views

V
Vishal Baghel

Contributor-Level 10

Variance = ( x i x ¯ ) 2 n = ( x i 2 + x ¯ 2 2 x ¯ x i ) n  

= x i 2 + x ¯ 2 1 2 x ¯ x i n

= n ( n + 1 ) ( 2 n + 1 ) 6 + ( n ( n + 1 ) 2 n ) 2 . n 2 ( n + 1 ) 2 n . n ( n + 1 ) 2 n = n 2 1 1 2

Now, n 2 1 1 2 = 1 4 s o n = 1 3

New answer posted

11 months ago

0 Follower 3 Views

V
Vishal Baghel

Contributor-Level 10

X = 2 0 0

x 2 = 2 1 2 5

For new data

x = 2 0 0 2 5 + 3 5 = 2 1 0

x ¯ = 1 0 . 5

x 2 = 2 7 2 5

σ 2 = 2 7 2 5 2 0 ( 1 0 . 5 ) 2 = 2 6

New answer posted

11 months ago

0 Follower 3 Views

A
alok kumar singh

Contributor-Level 10

3 + 7 + x + y 4 = 5              

x + y = 1 0 . . . . . . . . . ( i )

1 4 ( 9 + 4 9 + x 2 + y 2 ) 2 5 = 1 0              

x2 + y2 = 82 .(ii)

x ¯ = ( 3 + 2 x ) + ( 7 + 2 y ) + ( x + y ) + ( x y ) 4              

= 1 0 + 4 x + 2 y 4              

Solving (i) & (ii), x = 9, y = 1

x ¯ = 4 8 4 = 1 2          

New answer posted

11 months ago

0 Follower 18 Views

A
alok kumar singh

Contributor-Level 10

m e a n = n ( n + 1 ) / 2 n           

  = n + 1 2            For n = 2k – 1, k   N

mean = k

mean deviation = avg. of deviations

= 2 ( 1 0 + + 2 + . . . ( k 1 ) ) 2 k 1 = ( k 1 ) k 2 k 1

= 5 ( 2 k ) k 1 k = 1 1 n = 2 k 1 = 2 1            

               

 

New answer posted

11 months ago

0 Follower 5 Views

A
alok kumar singh

Contributor-Level 10

x ¯ = i = 1 1 0 x i 1 0 = 1 5 ; i = 1 1 0 x i 2 1 0 ( x ¯ ) 2 = 1 5

Σ x i = 1 5 0 ; Σ x i 2 = 2 4 0 0

Actual mean x ¯ = Σ x i + 1 5 2 5 1 0 = 1 4 0 1 0 = 1 4

Actual variance =  Σ x i 2 + 1 5 2 2 5 2 1 0 ( 1 4 ) 2

= 2 4 0 0 4 0 0 1 0 1 9 6

σ 2 = 4 σ = 2

 

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