How to find the probabilty in this question?
At a convention there are 7 maths instructors and 5 computer science
instructors. The probability of randomly selecting a maths instructor or
a computer science instructor is 1112. Determine the probability of randomly
selecting an instructor that teaches both maths and computer science.
should i use addition rule? or what shud i do?
At a convention there are 7 maths instructors and 5 computer science
instructors. The probability of randomly selecting a maths instructor or
a computer science instructor is 1112. Determine the probability of randomly
selecting an instructor that teaches both maths and computer science.
should i use addition rule? or what shud i do?
1 Answer
Explanation:
We will use the rule
#P(A uu B) = P(A) + P(B) - P(A nn B)#
Let A be the event that a person selected is a math teacher.
Let B be the event that a person selected is a computer science teacher.
Of the 12 people at the convention, 11 of them teach at least one of math or computer science. Meaning
#P(A uu B) = 11/12#
We also know 7 of the people are math teachers, so
#P(A) = 7/12#
And since 5 of the people are computer science teachers, we know
#P(B) = 5/12#
Plugging these all into the first equation gives us
#11/12 = 7/12 + 5/12 - P(A nn B)#
Now we just solve for
#P(A nn B) = 7/12 + 5/12 - 11/12 = 1/12#
So the probability of choosing someone who teaches both math and computer science is
