Question

Problem 3 Suppose that we have a random variable with pdf given by f(1) = exp(-2) - 1 € (0,0) Part A Find the CDF, F(2). Part B Find the inverse cdf, F (2) Part C Write psuedo-code to outline how to generate a random sample from the pdf f(2). Part D Using the software of your choice, generate 10,000 random samples from f(2). Overlay the density of f(:D) and confirm that we have generated random samples from the desired pdf. Are these exact samples?

Answer 1

fhen cdf is F (x) . 247 /2 dt: -(e-- I-e F(x) 1-C ) Now, we will defermime F'lo) FN): 1-e -> (-Fix) %3D 2.

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F = runif(10000) (log(1/(1 summary (x) F)))^2 Min. 1st Qu. 0.0851 Mean 3rd Qu. Median Max. 0.5014 0.0000 2.0287 1.9716 68.8257 # as we can see that observations lies between e to infinfity as in range of pdf # it verifies that it belongs to the given pdf

R code for sample generation and output is given