Chapter 2 Probability - 2.2 Sample Spaces and the Algebra of Sets - Questions - Page 19: 9

a) The outcomes in the sample space are: \[S=\left\{ \begin{align} & (0,0,0,0),\text{ }(0,0,0,1),\text{ }(0,0,1,0),\text{ }(0,1,0,0),\text{ } \\ & (1,0,0,0),\text{ }(1,0,0,1),\text{ }(0,1,0,1),\text{ }(0,0,1,1), \\ & (1,1,1,0),\text{ }(0,1,1,0),\text{ }(1,1,0,1),\text{ }(1,0,1,1) \\ & (1,1,1,0),\text{ }(0,1,1,1),\text{ }(1,0,1,0),\text{ }(1,1,1,1) \\ \end{align} \right\}\] b)The outcomes making up the event that exactly two phones are being used is: \[A=\left\{ (1,0,0,1),\text{ }(0,1,0,1),\text{ }(0,0,1,1),\text{ (1,1,0,0), }(0,1,1,0),\text{ }(1,0,1,0) \right\}\] c) There are 1+k outcomes allowing for the possibility that at most one more call could be received.

a) The telemarketer’s “bank” is comprised of 4 telephones. Let 0 indicates that the phone is available and 1 indicates that a caller is on the line. Hence there are 16 possible combinations in the sample space. Therefore, the outcomes of the sample space S are: \[S=\left\{ \begin{align} & (0,0,0,0),\text{ }(0,0,0,1),\text{ }(0,0,1,0),\text{ }(0,1,0,0),\text{ } \\ & (1,0,0,0),\text{ }(1,0,0,1),\text{ }(0,1,0,1),\text{ }(0,0,1,1), \\ & (1,1,0,0),\text{ }(0,1,1,0),\text{ }(1,1,0,1),\text{ }(1,0,1,1) \\ & (1,1,1,0),\text{ }(0,1,1,1),\text{ }(1,0,1,0),\text{ }(1,1,1,1) \\ \end{align} \right\}\] (b) Let the event A represent that exactly two phones are being used. So we have to choose two 0’s from sample space S. We see that six of the sample outcomes in S constitute the event A. Therefore, the outcomes of the event A are: \[A=\left\{ (1,0,0,1),\text{ }(0,1,0,1),\text{ }(0,0,1,1),\text{ (1,1,0,0), }(0,1,1,0),\text{ }(1,0,1,0) \right\}\] (c) At most one more call could be received; this means that we have to choose three or four 1’s from sample space S. There are 5 sample outcomes from the sample space allowing for the possibility that at most one more call could be received. Therefore, the possible outcomes are \[\left\{ (1,1,0,1),\text{ }(1,0,1,1),\text{ }(1,1,1,0),\text{ }(0,1,1,1),\text{ }(1,1,1,1) \right\}\] In general, the telemarketer had k phones then there are 1+k outcomes allowing for the possibility that at most one more call could be received.