The random variable X has the PDF fX(x) = { 1/4 -3<=x<=1 { 0 otherwise If...

Let X be a continuous random variable with a PDF of the form fX(x)={c(1−x),0,if x∈[0,1],otherwise. Find...

Let X be a continuous random variable with a PDF of the form fX(x)={c(1−x),0,if x∈[0,1],otherwise. Find the following values. 1. c= 2. P(X=1/2)= 3. P(X∈{1/k:k integer, k≥2})= 4. P(X≤1/2)=

1. A random variable X has pdf fx(x) = c(x-1)      for 1 < x < 4....

1. A random variable X has pdf fx(x) = c(x-1)      for 1 < x < 4. a. find c. b. find the pdf of Y =  

Let X be a continuous random variable with a PDF of the form fX(x)={c(1−x),0,if x∈[0,1],otherwise. c=...

Let X be a continuous random variable with a PDF of the form fX(x)={c(1−x),0,if x∈[0,1],otherwise. c= P(X=1/2)= P(X∈{1/k:k integer, k≥2})= P(X≤1/2)=

Question 3 Suppose the random variable X has the uniform distribution, fX(x) = 1, 0 <...

Question 3 Suppose the random variable X has the uniform distribution, fX(x) = 1, 0 < x < 1. Suppose the random variable Y is related to X via Y = (-ln(1 - X))^1/3. (a) Demonstrate that the pdf of Y is fY (y) = 3y^2 e^-y^3, y>0. (Hint: Work out FY (y)) (b) Determine E[Y ]. (Hint: Use Wolfram Alpha to undertake the integration.)

3. Let X be a continuous random variable with PDF fX(x) = c / x^1/2, 0...

3. Let X be a continuous random variable with PDF fX(x) = c / x^1/2, 0 < x < 1. (a) Find the value of c such that fX(x) is indeed a PDF. Is this PDF bounded? (b) Determine and sketch the graph of the CDF of X. (c) Compute each of the following: (i) P(X > 0.5). (ii) P(X = 0). (ii) The median of X. (ii) The mean of X.

Let X be a random variable with pdf given by fX(x) = Cx2(1−x)1(0 < x <...

Let X be a random variable with pdf given by fX(x) = Cx2(1−x)1(0 < x < 1), where C > 0 and 1(·) is the indicator function. (a) Find the value of the constant C such that fX is a valid pdf. (b) Find P(1/2 ≤ X < 1). (c) Find P(X ≤ 1/2). (d) Find P(X = 1/2). (e) Find P(1 ≤ X ≤ 2). (f) Find EX.

A random variable X has the pdf given by fx(x) = cx^-3, x .> 2 with...

A random variable X has the pdf given by fx(x) = cx^-3, x .> 2 with a constant c. Find a) the value of c b) the probability P(3<X<5) c) the mean E(X)

2. Random variables X and Y have a joint PDF fX,Y (x, y) = 2 for...

2. Random variables X and Y have a joint PDF fX,Y (x, y) = 2 for 0 ≤ y ≤ x ≤ 1. Determine (a) E[X] and Var[X]. (b) E[Y ] and Var[Y ]. (c) Cov(X, Y ). (d) E[X + Y ]. (e) Var[X + Y ].

A random variable X has the following pdf f(x)=2x^-3, if x ≥1 0, Otherwise (a) Find...

A random variable X has the following pdf f(x)=2x^-3, if x ≥1 0, Otherwise (a) Find the cdf of X (b) Give a formula for the pth quantile of X and use it to find the median of X. (c) Find the mean and variance of X

4. Consider a continuous random variable X which has pdf fX(x) = 1/7, 0 < x...

4. Consider a continuous random variable X which has pdf fX(x) = 1/7, 0 < x < 7. (a) Find the values of µ and σ^ 2 . (You may recognize the model above, and if you do, it is OK to simply write down the answers if you know them.) (b) A random sample of size n = 28 is taken from the above distribution. Find, approximately, IP(3.3 ≤ X ≤ 3.51). Hint: use the CLT.