Complete Question
A local country club has a membership of 600 and operates facilities that include an 18-hole championship golf course and 12 tennis courts. Before deciding whether to accept new members, the club president would like to know how many members use each facility. A survey of the membership indicates that 70% use the golf course, 50% use the tennis courts, and 5% use neither of these facilities. One club member is chosen at random. What is the probability that the member uses either the golf or the tennis facilities?
Answer:
The value is [tex]f = 0.45[/tex]
Step-by-step explanation:
From the question we are told that
The number of members is n = 600
The proportion of those that use the golf course is p = 0.70
The proportion of those that use the tennis courts is q = 0.50
The proportion of those that use neither of these facilities is k = 0.05
Generally the probability that a member use the golf course or the tennis court is
[tex]c = 1 - q[/tex]
=> [tex]c = 1 - 0.05[/tex]
=> [tex]c = 0.95[/tex]
Generally the probability that a member use the golf course or the tennis court can also be represented as
[tex]c = p + q - z[/tex]
Here z represent the probability that a member uses golf course and tennis court
So
[tex]0.95= 0.7 +0.50 - z[/tex]
=> [tex]z = 0.25[/tex]
Generally the probability that the member uses the golf course but not the tennis courts is mathematically represented as
[tex]f = p -z[/tex]
=> [tex]f = 0.70 -0.25[/tex]
=> [tex]f = 0.70 -0.25[/tex]
=> [tex]f = 0.45[/tex]
