In a large human population, cranial length is approximately normally distributed with a mean of 185.6 mm and a standard deviation of 12.7 mm. What is the probability that a ran…

Question

asked Jul 27, 2021 79.1k views

1 Answer

Zachzurn · Answer 1 · 2021-07-30T23:01:40+0000

Answer:

The correct option is c

Explanation:

From the question we are told that

The mean is
$\mu = 185.6 \ mm$

The standard deviation is
$\sigma = 12.7 \ mm$

The sample size is n = 10

Generally the standard error of the mean is mathematically represented as

$\sigma_(x) = (\sigma)/(√(n) )$

=>
$\sigma_(x) = ( 12.7)/(√( 10 ) )$

=>
$\sigma_(x) = 4.016$

Generally the probability that a random sample of size 10 from this population will have a mean less than than 180 is mathematically represented as

$P(X < 180 ) = P(( X - \mu )/(\sigma_(x) ) < (180 - 185.6)/(4.016) )$

$(X -\mu)/(\sigma )  =  Z (The  \ standardized \  value\  of  \ X )$

P(X < 180 ) = P(Z < - 1.394 )

From the z table the area under the normal curve to the left corresponding to -1.394 is

P(X < 180 ) = P(Z < - 1.394 ) = 0.081659

=>
P(X < 180 ) = 0.0823