The value of P ( C ′ ) if P ( C ) = 0.039 , P ( M ∩ C ) = 0.035 , P ( M ∪ C ) = 0.491 where M represents male and C represents red-green color blindness.
The value of P ( C ′ ) if P ( C ) = 0.039 , P ( M ∩ C ) = 0.035 , P ( M ∪ C ) = 0.491 where M represents male and C represents red-green color blindness.
Solution Summary: The author calculates the value of P(Cprime ) if M represents male and C represents red-green color blindness.
Definition Definition For any random event or experiment, the set that is formed with all the possible outcomes is called a sample space. When any random event takes place that has multiple outcomes, the possible outcomes are grouped together in a set. The sample space can be anything, from a set of vectors to real numbers.
Chapter 7.4, Problem 53E
(a)
To determine
To find: The value of
P(C′) if
P(C)=0.039,P(M∩C)=0.035,P(M∪C)=0.491 where M represents male and C represents red-green color blindness.
(b)
To determine
To find: The value of
P(M) if
P(C)=0.039,P(M∩C)=0.035,P(M∪C)=0.491 where M represents male and C represents red-green color blindness.
(c)
To determine
To find: The value of
P(M′) if
P(C)=0.039,P(M∩C)=0.035,P(M∪C)=0.491 where M represents male and C represents red-green color blindness.
(d)
To determine
To find: The value of
P(M′∩C′) if
P(C)=0.039,P(M∩C)=0.035,P(M∪C)=0.491 where M represents male and C represents red-green color blindness.
(e)
To determine
To find: The value of
P(C∩M′) if
P(C)=0.039,P(M∩C)=0.035,P(M∪C)=0.491 where M represents male and C represents red-green color blindness.
(f)
To determine
To find: The value of
P(C∪M′) if
P(C)=0.039,P(M∩C)=0.035,P(M∪C)=0.491 where M represents male and C represents red-green color blindness.
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