Using the Poisson tables (or formula, or Excel...), find P(X = 5) if the mean is 3.6.
a. 0.4319 b. 0.8441 c. 0.2114 d. 0.1377 e. 0.5132
Using the Poisson tables (or formula, or Excel...), find P(X = 5) if the mean is...
Let X be a Poisson (mean = 5) and Let Y be a Poisson (mean = 4). Let Z = X + Y. Find P( X = 3 | Z = 6). Assume X and Y are independent. Show answers for P(A), P(B), P(AB), and and hence P(A|B). Here A = [X = 3], B = [Z = 6]
44. Consider a Poisson distribution with u= 3. PLEASE SHOW ANSWER AND FORMULA IN EXCEL a. Write the appropriate Poisson probability function. b. Compute f(2). c. Compute f(1). d. Compute P(x $2).
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.)
6. Let X have a N(1,2) distribution. Using only the tables, find: a) P(X 1.5) b) P(-1.1 X < 3.3) c) P(X-.9) d) A point c such that P(X > c) = 01 e) A point d such that P(X < d) 005
a. P(X=3)=
b. P(X=3)=
c. P(X=0)=
d. P(X=3)=
Please include Excel formula.
Determine the following probabilities. a. If n 4, N 12, and A 5, find P(X 3). b. If n 4, N 6, and A 3, find P(X 3) c. If n 6, N 11, and A 5, find P(X 0) d. If n 3, N10, and A 3, find P(X 3)
10. For a Poisson Random Variable (X) with a mean of 3.3; P(X>11) = ? a. 1.0000 b. 0.1736 c. 0.0020 d. 0.0001 11. Referring to #10 above; if the mean is 6.6; P(X ≤1) = ? a. 0.0000 b. 0.0104 c. 0.3030 d. 0.9896
2,Let X be a Poisson (mean-5) and Let Ybe a Poisson (mean-4). Let Z-X+Y.Find P(X-312-6) Assume X and Y are independent. 1 like to see answers for P(A), (B), P(AB), and and hence P(A B). Here A You can work out the probabilities (P(A).P(B),P(AB), and P(AIB) using your calculator, or Minitab or Mathematica. I dont need to see your commands.I just like to see the answers for the probabilities of ABABAIB You do item 1 lf your FSU id ends...
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 the Poisson distribution applies. Use the given mean to find the indicated probability. Find P(5) when u = 8. P(5) = (Round to the nearest thousandth as needed.)
Assume a random variable XX follows a Poisson distribution with a mean μ=3.7μ=3.7. Find P(X≤4) P(X≤4)=