Respuesta :
Answer:
a) The probability that Jodi scores 78% or lower on a 100-question test is 4%.
b) The probability that Jodi scores 78% or lower on a 250-question test is 0.023%.
Step-by-step explanation:
a) To approximate this distribution we have to calculate the mean and the standard distribution.
The mean is the proportion p=0.85.
The standard deviation can be calculates as:
[tex]\sigma=\sqrt{\frac{p(1-p)}{n} }= \sqrt{\frac{0.85*(1-0.85)}{100} }=0.04[/tex]
To calculate the probability that Jodi scores 78% or less on a 100-question test, we first calculate the z-value:
[tex]z=\frac{p-p_0}{\sigma} =\frac{0.78-0.85}{0.04} =-1.75[/tex]
The probability for this value of z is
[tex]P(x<0.78)=P(z<-1.75)=0.04[/tex]
The probability that Jodi scores 78% or lower on a 100-question test is 4%.
b) In this case, the number of questions is 250, so the standard deviation needs to be calculated again:
[tex]\sigma=\sqrt{\frac{p(1-p)}{n} }= \sqrt{\frac{0.85*(1-0.85)}{250} }=0.02[/tex]
To calculate the probability that Jodi scores 78% or less on a 250-question test, we first calculate the z-value:
[tex]z=\frac{p-p_0}{\sigma} =\frac{0.78-0.85}{0.02} =-3.5[/tex]
The probability for this value of z is
[tex]P(x<0.78)=P(z<-3.5)=0.00023[/tex]
The probability that Jodi scores 78% or lower on a 250-question test is 0.023%.
