Respuesta :
Answer:
1) Expected total amount of money that the ten people = $24.2
2) probability that the total amount of money the ten people spent is at least $25 = 0.3817
Step-by-step explanation:
Mean Price of a two liter bottle of soda, E(x₁) = $1.50
Standard Deviation of two litre bottle of soda, [tex]\sigma_1 = \$ 0.20[/tex]
Mean price of one gallon of milk, E(x₂) = $3.80
Standard deviation of one gallon of milk, [tex]\sigma_2 = \$0.30[/tex]
Six people bought two liter bottle of soda each and four bought one gallon of milk each
Expected total amount of money that the ten people spent
[tex]E(X) = E(6x_{1} + 4x_{2}) \\E(X) = 6E(x_{1}) + 4E(x_{2})[/tex]
E(X) = (6*1.50) + (4*3.80)
E(X) = $24.2
b) probability that the total amount of money the ten people spent is at least $25
Let us calculate the net standard deviation:
[tex]V(X) = V(6x_{1} + 4x_{2}) \\V(X) = 6^{2} V(x_{1}) + 4^2V(x_{2})\\V(X) = 36 V(x_{1}) + 16V(x_{2})[/tex]
[tex]V(x_{1}) = \sigma_1^{2} = 0.2^2 = 0.04\\V(x_{2}) = \sigma_2^{2} = 0.3^2 = 0.09[/tex]
V(X) = (36*0.04) + (16*0.09)
V(X) = 1.44 + 1.44 = 2.88
[tex]\sigma = \sqrt{V(X)} \\\sigma = \sqrt{2.88} \\\sigma = 1.697[/tex]
[tex]P( X\geq 25) = P(Z \geq \frac{x - \mu}{\sigma} )\\P( X\geq 25) = P(Z \geq \frac{25 - 24.2}{1.697} )\\P( X\geq 25) = P(Z \geq 0.4714)\\P( X\geq 25) = 0.3817[/tex]
