Given the joint pdf of the continuous RVs X and Y: fxy(x, y) = c for...
Given the joint pdf of the continuous RVs X and Y: fxy(x, y) = c for the region {0 sxs y,0 s y < 1} and zero elsewhere.Where “c” is a constant. Determine if the RV X and Y are independent. (30 Marks)
Given the joint pdf of the continuous RVs X and Y: fxy(x, y) = c for the region {0 sxs yo sy s 1} and zero elsewhere.Where “c” is a constant. Determine if the RV X and Y are independent.
a) Given the joint pdf of the continuous RVs X and Y: fxy(x, y) = c for the region {0 sxs y,0 s y s 1} and zero elsewhere.Where “c” is a constant. Determine if the RV X and Y are independent. (30 Marks) b) Given the following information. For a certain form of illness, (call the illness “A”), the likelihood of having the illness is 0.1 if the person is a smoker and 0.005 if the person is not...
a) Given the joint pdf of the continuous RVs X and Y:fxy(x, y) = c for the region {0 sxs y, 0 sy s 1} and zero elsewhere.Where "c" is a constant. Determine if the RV X and Y are independent. (30 Marks)
Given the joint pdf of the continuous RVs X and Y: fxy(x,y)=c for the region {0sxsy,Osys1} and zero elsewhere.Where "c" is a constant. Determine if the RV X and Y are independent I
Question 1) (60 Marks) a) Given the joint pdf of the continuous RVS X and Y: fxy(x, y) = c for the region {0 sxs y,o sy s 1} and zero elsewhere.Where “c” is a constant. Determine if the RV X and Y are independent. (30 Marks) b) Given the following information. For a certain form of illness, (call the illness “A”), the likelihood of having the illness is 0.1 if the person is a smoker and 0.005 if the...
Question 1) (60 Marks) a) Given the joint pdf of the continuous RVs X and Y: fxy(x,y) = c for the region {0 Sxs y,o s y s 1} and zero elsewhere.Where “c” is a constant. Determine if the RV X and Y are independent. (30 Marks) b) Given the following information. For a certain form of illness, (call the illness “A”), the likelihood of having the illness is 0.1 if the person is a smoker and 0.005 if the...
a) Given the joint pdf of the continuous RVs X and Y:fxy(x,y) = c for the region {0 sxs y, o sy s 1} and zero elsewhere. Where “c” is a constant. Determine if the RV X and Y are independent. (30 Marks) b) Given the following information. For a certain form of illness, (call the illness “A”), the likelihood of having the illness is 0.1 if the person is a smoker and 0.005 if the person is not a...
4. Two RVs with a joint pdf given as follows fx.x ), 0<x< 1,0 <y<1 otherwise (a) Find fr ). (6 point) (b) Find fxy(x[y). (6 points) (c) Are X and Y independent? (clearly show justification for credit) (6 points)
The joint pdf of two continuous RVs X and Y is given by (4e-22–24 0 < x,y< f(x, y) = { otherwise Then cov(X,Y) equals Hint – Think of the exponent identity eath = eeb and how this can be used to factorize or simplify joint pdf. OO 0.28 0 -0.46 O 0.83 1