The hazard rate is 0 at time 0 and linearly increases ?(? > 0) as time...

The hazard function of a system is given by: h(?) = ? ∗ ? , ?...

The hazard function of a system is given by: h(?) = ? ∗ ? , ? > 0 , ? ≥ 0 Find the expressions of probability density function, median time to failure, and mode

3. Suppose that h(x) is the hazard function of X, and h(x)= λ for all x....

3. Suppose that h(x) is the hazard function of X, and h(x)= λ for all x. (a) Calculate the survival function S(x). (b) Derive the mean life E(X) and the mean residual life E(X-x|X>x), where E(X) is a special case of mean residual life with x=0. (c) Based on your answer in (b), do you think h(x) can be used to model human lifespan?

Suppose that the time to death X has an exponential distribution with hazard rate and that...

Suppose that the time to death X has an exponential distribution with hazard rate and that the right-censoring time C is exponential with hazard rate . LetT min(X,C) and 1 ifX C;0 ,if X C. Assume that X and C are independent. (a) Find P( 1) (b) Find the distribution of T. (c) Show that and T are independent. (d) Let (T1, 1),...,(Tn, n) be a random sample from this model. Show that the maximum likelihood estimator of is n...

Suppose a random variable has the following probability density function: f(x)=3cx^2 (1-x) 0≤x≤1 a) What must...

Suppose a random variable has the following probability density function: f(x)=3cx^2 (1-x) 0≤x≤1 a) What must c be equal to for this to be a valid density function? b) Determine the mean of x, μ_x c) Determine the median of x, μ ̃_x d) Determine: P(0≤x≤0.5) ?

In the CPM time-cost trade-off function Select one: a. the cost at normal time is zero....

In the CPM time-cost trade-off function Select one: a. the cost at normal time is zero. b. in the range of feasible times, the activity cost increases linearly as time increases. c. cost deceases linearly as time increases. d. none of the above. e. All of the above.

A continuous random variable X has the following probability density function F(x) = cx^3, 0<x<2 and...

A continuous random variable X has the following probability density function F(x) = cx^3, 0<x<2 and 0 otherwise (a) Find the value c such that f(x) is indeed a density function. (b) Write out the cumulative distribution function of X. (c) P(1 < X < 3) =? (d) Write out the mean and variance of X. (e) Let Y be another continuous random variable such that  when 0 < X < 2, and 0 otherwise. Calculate the mean of Y.

1. Let the random variable X denote the time (in hours) required to upgrade a computer...

1. Let the random variable X denote the time (in hours) required to upgrade a computer system. Assume that the probability density function for X is given by: p(x) = Ce^-2x for 0 < x < infinity (and p(x) = 0 otherwise). a) Find the numerical value of C that makes this a valid probability density function. b) Find the probability that it will take at most 45 minutes to upgrade a given system. c) Use the definition of the...

The length of time it takes a baseball player to swing a bat (in seconds) is...

The length of time it takes a baseball player to swing a bat (in seconds) is a continuous random variable X with probability density function (p.d.f) f(x) = ax+ 8/9 for 0<= x <= b and f(x) = 0 otherwise. a) determine the unique values of a and b necessary to ensure that the function f(x) is a valid p.d.f with mean equal to 2/3. b) calculate the median and standard deviation of X

Let X be a continuous random variable with probability density function (pdf) ?(?) = ??^3, 0...

Let X be a continuous random variable with probability density function (pdf) ?(?) = ??^3, 0 < ? < 2. (a) Find the constant c. (b) Find the cumulative distribution function (CDF) of X. (c) Find P(X < 0.5), and P(X > 1.0). (d) Find E(X), Var(X) and E(X5 ).

Let X be a random variable with probability density function f(x) = {3/10x(3-x) if 0<=x<=2 .........{0...

Let X be a random variable with probability density function f(x) = {3/10x(3-x) if 0<=x<=2 .........{0 otherwise a) Find the standard deviation of X to four decimal places. b) Find the mean of X to four decimal places. c) Let y=x2 find the probability density function fy of Y.