A couple just had twin boys, but they can’t decide between the names Mike, Mark, Peter, Paul, Sam, and Sonny. If the couple randomly chooses names for the 2 boys from the names listed, what is the probability that the first boy born will be named Sam and the second boy born will be named Mark? Assume that the boys will not have the same name.

Answer:The probability is 1/30 or 0.0333Step-by-step explanation:For calculating the probability we need to make a division between the number of ways in which the first boy born is named Sam and the second boy born is named Mark and the total number of ways in which the couple can name their children. To calculate the total number of  ways in which the couple can name their children, we can use the rule of multiplication as:          6             *              5                   =    30           First boy Born       2nd Boy BornBecause we have 6 options for the name of the first boy and 5 options for the name of the second boy.Additionally, In just one option from this 30, the first boy is named Sam and the second is named Mark.So, the probability is calculate as the division between 1 and 30 as:[tex]P=\frac{1}{30} = 0.0333[/tex]