Answer:
a) [tex]\frac{364}{365}[/tex]
b) [tex]\frac{353}{365}[/tex]
c) [tex]\frac{358}{365}[/tex]
d) [tex]\frac{334}{365}[/tex]
Step-by-step explanation:
(a) Compute the probability that a randomly selected person does not have a birthday on October 3
if p = Probability that a randomly selected person has a birthday on October 3, then
the probability that a randomly selected person does not have a birthday on October 3 = 1-p
There are 365 days in a year, therefore p=[tex]\frac{1}{365}[/tex]
then 1-p= [tex]\frac{364}{365}[/tex]
(b) Compute the probability that a randomly selected person does not have a birthday on the 4th day of a month.
similarly, if p = Probability that a randomly selected person has a birthday on the 4th day of a month, then
Probability that a randomly selected person does not have a birthday on the 4th day of a month is 1-p
Since a year has 12 months,
p = [tex]\frac{12}{365}[/tex]
1-p= [tex]\frac{353}{365}[/tex]
(c) Compute the probability that a randomly selected person does not have a birthday on the 31st day of a month
p=probability that a randomly selected person has a birthday on the 31st day of a month
1-p =probability that a randomly selected person does not have a birthday on the 31st day of a month
Since a year has 7 months having 31 day,
p= [tex]\frac{7}{365}[/tex]
1-p=[tex]\frac{358}{365}[/tex]
(d) Compute the probability that a randomly selected person was not born in March
p= the probability that a randomly selected person was born in March
1-p = the probability that a randomly selected person was not born in March
Since March has 31 days,
p= [tex]\frac{31}{365}[/tex]
1-p=[tex]\frac{334}{365}[/tex]