Respuesta :
Answer:
We can approximate to normal.
The parameters of the approximate normal distribution are:
[tex]\mu=np=40*0.5=20\\\\ \sigma=\sqrt{npq} =\sqrt{40*0.5*0.5} =\sqrt{10} =3.16[/tex]
[tex]P_B(r>23)\approx 0.314[/tex]
It is not unusual to have 23 or more successes. The probabiltity of this event happening is 13.4%.
Step-by-step explanation:
To approximate the binomial distribution to a normal distribution, we can calculate n*p and n*q and if both are bigger than 5 we can do the approximation.
[tex]n*p=n*q=0.5*40=20[/tex]
We can approximate to normal.
The parameters of the approximate normal distribution are:
[tex]\mu=np=40*0.5=20\\\\ \sigma=\sqrt{npq} =\sqrt{40*0.5*0.5} =\sqrt{10} =3.16[/tex]
The continuity correction factor is used because the binomial is a discrete function and the normal a continous function.
The probability of 23 successes must be expressed in the normal distribution as:
[tex]P_B(r>23)=P_N(r>23+0.5)=P_N(r>23.5)\\\\z=(23.5-20)/3.16=1.1076\\\\P(r>23.5)=P(z>1.1076)=0.134\\\\P_B(r>23)\approx 0.314[/tex]
It is not unusual to have 23 or more successes. The probabiltity of this event happening is 13.4%.
