Depois de muita luta conseguir responder :
Solução:
= ( b,b),( b,P), (P,P), (p,b)
EXTRAÇÕES PROBABILIDADE
PP 2/4 . 2/4 4/16
PB 2/4 . 2/4 4/16
BP 2/4 . 2/5 4/20
BB 2/4 . 3/5
6/20
X = Nº DE BOLAS BRANCAS
x = 0 = p p = 1/4
x= 1 = p b b p = 9/20
x = 2 = b b = 3/10
f_x( 0 ) = p ( x=0 ) = 4/16 = 1/4
f_(x )( 1 ) = p ( x=1) = 4/20 + 4/16 = 9/20
f_x ( 2 ) = p ( x=2 ) = 6/20 = 3/10
x 0 1 2
P_x(x) 4/16 4/16 + 4/20 6/20
E( x ) = ∑_1^3▒X . P_X(x) = 1. ( 4/16 + 4/20 ) + 2. ( 6/20 )
= 21/20
Y = Nº DE BOLAS PRETAS
y = 0 = bb
y = 1 = pb ∪ bp
Y = 2 = pp
y 0 1 2
P_(y(Y)) 6/20 4/(16 ) +4/20 4/16
E( y ) = ∑_1^3▒X . P_y(y) = 1. ( 4/16 + 4/20 ) + 2. ( 4/( 16) )
= 36/80 + 8/(16 ) = 76/80 = 19/20
Var(x) = = ∑_( i=1)^3▒ . ( x_i- E x )² . p ( x= x_i )
= ( 0 – E (x) ² . p ( x = 0 ) + ( 1 – E (x) )² . p (x = 1 ) + ( 2 – E(X) )² . p ( x= 2 )
Var ( y ) = ( 0 – E (y) ² . p ( y = 0 ) + ( 1 – E (y) )² . p (y = 1 ) + ( 2 – E(y) )² . p ( y= 2 )
E( x + y ) = ( 21/20 + 19/20 ) = 40/20 = 2
Var ( x + y) = ( 0 – 21/20 )² . 1/4 + ( 1 - 21/20 )² . 1/9 +( 2. 21/20 )² . 3/10 +
( 0 – 19/20 )² . 3/10 + ( 1 - 19/20 )² . 1/9 +( 2.19/20 )² . 1/( 4) =
361/400 . 3/10 + ( (1 )/20 )² . 1/9 +( ( 38 )/20 )² . 1/( 4)
1083/4000 + (1 )/400 . 1/9 + ( 1444 )/400 . 1/( 4)
1083/4000 + (1 )/( 3600) + ( 1444 )/1600
( 38988+40+129960 )/( 144000) = 1,18
Cov(X,Y) = E [ ( X- E(X) ) (Y- E(Y) ) ]
= E [ ( 2- 21/20 ) (2- 19/20 ) ]
= E [ ( 40/20- 21/20 ) ((40 )/20- 19/20 ) ]
= E [ ( 19/20) ( 21/20 ) ]
= E [ 399/400]
= E = 0,9975 = 1
|
