assume a poisson distribution
1. if lamba = 2.5, find P(X=3)
2. if lamba = 8.0, find P(X=0)
3. if lamba = 0.5, find P(X=4)
4. if lamba = 3.7, find P(X=7)
assume a poisson distribution 1. if lamba = 2.5, find P(X=3) 2. if lamba = 8.0,...
Assume a Poisson distribution. a. If a = 2.5, find P(X = 9). c. If a = 0.5, find P(X = 4). b. If 2 = 8.0, find P(X= 5). d. If a = 3.7, find P(X = 7). a. P(X= 9) = (Round to four decimal places as needed.)
Assume a Poisson distribution. a. If A 2.5, find P(X-5) c. If λ-0.5, find P(X-0). b. IfX-8.0, find P(X-4) d. If 3.7, find P(X-6) a. P(X 5)- Round to four decimal places as needed.)
5.18 Assume a Poisson distribution. a. Ifl = 2.5,findP1X = 22. b. Ifl = 8.0,findP1X = 82. c. Ifl = 0.5,findP1X = 12. d. Ifl = 3.7,findP1X = 02.
3. Assume a Poisson distribution (Remember u 1) A. If μ-2.0, then what is P(X B. If μ 8.0, then what is P(X C. If μ = 0.5, then what is P(X D. If μ-4.0, then what is P(X E. If μ = 1.0, then what is P(X 3)? 4)? 2)? 2)? 5)?
Assume a random variable XX follows a Poisson distribution with a mean μ=3.7μ=3.7. Find P(X≤4) P(X≤4)=
1) Suppose x has a Poisson probability distribution with mean 4.84. Find standard deviation. 2)Assume that x has a Poisson probability distribution. Find P(x = 6) when population mean is 1.0. 3)Assume that x has a Poisson probability distribution. Find P(x < 3) when population mean is 4.5
(a) Find P{X=2} (b) Find P{X<2} (c) Find P{2 <= X < 2.5} The cumulative distribution of a random variable X is given as 0 x < 0 0<x<2 4 Fx(x) = 2<x<3 4 x 3 x + 1
> 0, that is 7. Let X has a Poisson distribution with parameter P(X = x) = e- Tendte 7. x = 0, 1, 2, .... Find the variance of X.
1. Find P(X=4) if X has a Poisson distribution such that 3P(X=1) = P(X=2). 2. A communication system consists of three components, each of which will, independently function. In each component, there are many parts – where the number of malfunction in these parts follows a has a Poisson distribution with mean 1. The entire system will operate effectively if at least two of its components has no malfunction. What is the probability that this system will be effective?
Assume a Poisson distribution. Find the following probabilities a. Let λ = 2.0, find P(X≥3). b. Let λ = 0.6, find P(X≤1) c. Let λ = 2.0, find P(X≤2)