Three cards are drawn without replacement from the 12 face cards (jacks, queens, and kings) of an ordinary deck of 52 playing cards. Let X be the number of kings selected and Y the number of jacks. a) Find the joint probability distribution of X and Y; b) Find the marginal probability distributions of X and Y. c) P[(X,Y)∈A], where A is the region given by {(x,y)∣x+y≥2}.

Question

Three cards are drawn without replacement from the 12 face cards (jacks, queens, and kings) of an ordinary deck of 52 playing cards. Let X be the number of kings selected and Y the number of jacks.   a) Find the joint probability distribution of X and Y;   b) Find the marginal probability distributions of X and Y.  c) P[(X,Y)∈A], where A is the region given by {(x,y)∣x+y≥2}.

Novembruuo · Accepted Answer

Step 1  Total number of cards =52  Total number of face cards =12  In a pack of 52 cards, there are total 4 Kings and 4 Jacks. It is given that 3 cards are drawn. So, the possible values of X and Y are: 0, 1, 2 and 3.  Now, the probability of drawing x kings and y Jacks can be calculated using the formula.  P(X=x,Y=y)=(4x)×(4y)×(43−x−y)(123)  After drawing x kings, y jacks, (3−x−y) would be left. Here, (x+y) should be always less than equal to 3.  Step 2  a) The joint probability distribution of X and Y:  Y/x0123Total Y01/556/556/551/5514/5516/5516/556/55028/5526/556/550012/5531/550001/55Total X14/5528/5512/551/551  Step 3  b) The marginal Probability distribution of X and y are  Marginal Distribution of X  XMarginal Distribution014/55128/55212/5531/55  Marginal distribution of Y  YMarginal Distribution014/55128/55212/5531/55  Step 4  c) To find: P[X,Y)∈A] where A is the region given by {(x,y)∣x+y≥2}  That is P(X,Y∈A)=P(x+y≥2)  Now, P=1−P(x+y≤1)  =1−[[P(X=0,Y=0]+[P(X=0,Y=1]+[P(X=1,Y=0]]  =1−[155+655+655]  =1−1355  =4255

Three cards are drawn without replacement from the 12 face cards (jack

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