F(k) = P(X <= k)
= P(X < k) + P(X = k)
= 3/4 + 1/m
->
When t tends to infinity, F(t) = 1
Thus, 1 = nA
-> A = 1/n = 1/4
So,
-> B = 343.194
Thus, B = 343.194
k=42, m=18 n=4 11. Let F:R → R be a function such that (t+m)(n+1) (n+ m...
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The probability mass function of a random variable X is given by Px(n)r n- (a) Find c (Hint: use the relationship that Ση_0 n-e) (b) Now assume λ = 2, find P(X = 0) (c) Find P(X>3)