Respuesta :
Let X be the birth weight for twins which is normally distributed with mean μ = 2353 and standard deviation σ =647
Any z score value below -2 and above 2 is considered to e unusual. If the z score values lies between -2 and 2 then it is said to usual.
To find unusual birth weight first we will find z score for each x value. The x value with z score less than -2 or greater than 2 is said to be unusual.
a. x=1200
z = [tex] \frac{x-mena}{standard deviation} [/tex]
z = [tex] \frac{1200-2353}{647} [/tex]
z = -1.78
Here z score is between -2 and 2 hence x=1200 is usual.
b. 2353
z = [tex] \frac{2353-2353}{647} [/tex]
z = 0
Here z=0 lies between -2 and 2 hence x=2353 is usual.
c. 2000
z = [tex] \frac{2000-2353}{647} [/tex]
z = -0.5456
The z score -0.5456 lies between -2 and 2, hence x=2000 is usual.
d. 3647
z = [tex] \frac{3647-2353}{647} [/tex]
z = 2
The z score value 2 is upper bound for unusual z score value range. Hence x=3647 is usual.
