Question: 2. Let F1 and F2 be distribution functions whose density functions are f1 and f2, respectively. Let F(a:) = CF1(.'L') + (1 c)F2(9:), 0 g

2. Let F1 and F2 be distribution functions whose density functions

2. Let F1 and F2 be distribution functions whose density functions are f1 and f2, respectively. Let F(a:) = CF1(.'L') + (1 c)F2(9:), 0 g c g 1. Let f be the density function of F. Show that K93) = Cf1(93) + (1 C)f2($)

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