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Roll one fair 6-sided die. The sample space is {1, 2, 3, 4, 5, 6} . Let event A = a face is odd. Then A = {1, 3, 5} . Let event B = a face is even. Then B = {2, 4, 6} .

  • Find the complement of A , A' . The complement of A , A' , is B because A and B together make up the sample space. P(A) + P(B) = P(A) + P(A') = 1 . Also, P(A) = 3 6 and P(B) = 3 6
  • Let event C = odd faces larger than 2. Then C = { 3 , 5 } . Let event D = all even faces smaller than 5. Then D = { 2 , 4 } . P(C and D) = 0 because you cannot have an odd and even face at the same time. Therefore, C and D are mutually exclusive events.
  • Let event E = all faces less than 5. E = { 1 , 2 , 3 , 4 } .

    Are C and E mutually exclusive events? (Answer yes or no.) Why or why not?

    No. C = {3, 5} and E = {1, 2, 3, 4} . P(C AND E) = 1 6 . To be mutually exclusive, P(C AND E) must be 0.

  • Find P(C|A) . This is a conditional. Recall that the event C is {3, 5} and event A is {1, 3, 5} . To find P(C|A) , find the probability of C using the sample space A . You have reduced the sample space from the original sample space {1, 2, 3, 4, 5, 6} to {1, 3, 5} . So, P(C|A) = 2 3

Let event G = taking a math class. Let event H = taking a science class. Then, G AND H = taking a math class and a science class. Suppose P(G) = 0.6 , P(H) = 0.5 , and P(G AND H) = 0.3 . Are G and H independent?

If G and H are independent, then you must show ONE of the following:

  • P(G|H) = P(G)
  • P(H|G) = P(H)
  • P(G AND H) = P(G) P(H)
The choice you make depends on the information you have. You could choose any of the methods here because you have the necessary information.

Show that P(G|H) = P(G) .

P(G|H) = P(G AND H) P(H) = 0.3 0.5 = 0.6 = P(G)

Show P(G AND H) = P(G) P(H) .

P(G) P(H)  =  0.6 0.5  =  0.3  =  P(G AND H)

Since G and H are independent, then, knowing that a person is taking a science class does not change the chance that he/she is taking math. If the two events had not beenindependent (that is, they are dependent) then knowing that a person is taking a science class would change the chance he/she is taking math. For practice, show that P(H|G) = P(H) to show that G and H are independent events.

In a box there are 3 red cards and 5 blue cards. The red cards are marked with the numbers 1, 2, and 3, and the blue cards are marked with the numbers 1, 2, 3,4, and 5. The cards are well-shuffled. You reach into the box (you cannot see into it) and draw one card.

Let R = red card is drawn, B = blue card is drawn, E = even-numbered card is drawn.

The sample space S  =  R1, R2, R3, B1, B2, B3, B4, B5 . S has 8 outcomes.

  • P(R) = 3 8 . P(B) = 5 8 . P(R AND B) = 0 . (You cannot draw one card that is both red and blue.)
  • P(E) = 3 8 . (There are 3 even-numbered cards, R2 , B2 , and B4 .)
  • P(E|B) = 2 5 . (There are 5 blue cards: B1 , B2 , B3 , B4 , and B5 . Out of the blue cards, there are 2 even cards: B2 and B4 .)
  • P(B|E) = 2 3 . (There are 3 even-numbered cards: R2 , B2 , and B4 . Out of the even-numbered cards, 2 are blue: B2 and B4 .)
  • The events R and B are mutually exclusive because P(R AND B) = 0 .
  • Let G = card with a number greater than 3. G = { B4 , B5 } . P(G) = 2 8 . Let H = blue card numbered between 1 and 4, inclusive. H = { B1 , B2 , B3 , B4 } . P(G|H) = 1 4 . (The only card in H that has a number greater than 3 is B4 .) Since 2 8 = 1 4 , P(G) = P(G|H) which means that G and H are independent.

In a particular college class, 60% of the students are female. 50 % of all students in the class have long hair. 45% of the students are female and have long hair. Of the female students, 75% have long hair. Let F be the event that the student is female. Let L be the event that the student has long hair. One student is picked randomly.Are the events of being female and having long hair independent?

  • The following probabilities are given in this example:
  • P(F ) = 0.60 ; P(L ) = 0.50
  • P(F AND L) = 0.45
  • P(L|F) = 0.75
The choice you make depends on the information you have. You could use the first or last condition on the list for this example. You do not know P(F|L) yet, so you can not use the second condition.

Solution 1

Check whether P(F and L) = P(F)P(L): We are given that P(F and L) = 0.45 ; but P(F)P(L) = (0.60)(0.50)= 0.30 The events of being female and having long hair are not independent because P(F and L) does not equal P(F)P(L).

Solution 2

check whether P(L|F) equals P(L): We are given that P(L|F) = 0.75 but P(L) = 0.50; they are not equal. The events of being female and having long hair are not independent.

Interpretation of results

The events of being female and having long hair are not independent; knowing that a student is female changes the probability that a student has long hair.

**Example 5 contributed by Roberta Bloom

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Source:  OpenStax, Elementary statistics. OpenStax CNX. Dec 30, 2013 Download for free at http://cnx.org/content/col10966/1.4
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