Let Z be a random variable where P(X<0) = 0:
a) If
, what is
?
b) If
, what is P = [Z = E(Z)] ?
c) If
, what is
?
for any query, comment.
1. Let X be a discrete random variable with a cumulative distribution function: a. Use this cdf to fin the limiting distribution of the random variable when with , as n increases. Use the fact b. What kind of random variable is for large value of n? We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imagep= We were unable to transcribe this imageWe were unable to transcribe this imageWe were...
Let A be a continuous random variable with probability
density function
Random variable D is given by
----------------------------------------------------------------------------------------------------------------
(a) What is the probability density function of D?
specify the domain of D.
Answer is
-
-
(b) Find E(D) and Var(D).
fa(a) = -a? 9 0<A<3 We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this image
Suppose that Z is a continuous random variable. Let
denote
the unnormalized PDF of Z ―the function
satisfies all properties of a PDF except that it is not
normalized. Now suppose we use to compute
something like the moment generating function (MGF), i.e., we
compute the function
What is ? How
can we use to
normalize the PDF?
b(2) We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageWe were unable...
Let X1, X2, ..., Xn be a random
sample from X which has pdf
depending on a parameter
and
(i)
(ii)
where
< x <
. In both these two cases
a) write down the log-likelihood function and find a
1-dimensional sufficient statistic for
b) find the score function and the maximum likelihood estimator
of
c) find the observed information and evaluate the Fisher
information at
= 1.
f(20) We were unable to transcribe this image((z(0 – 2) - )dxəz(47)...
Continuous random variable X has pdf for , where is symmetric about x = 0. Evaluate where is the cumulative distribution function of X and k > 0. fr) We were unable to transcribe this imagefr) We were unable to transcribe this imageFr(r
Let
be a simple random sample of a random variable X with density
function
, .
Given the statistic :
Calculate a statistic ( function of ) such that its espected
value is equal to
.
Thank you for your explanations
We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageに! We were unable to transcribe this imageWe were unable to transcribe this image
Let
be a sequence of random variables, and let Y be a random
variable on the same sample space. Let An(ϵ) be the
event that |Yn − Y | > ϵ. It can be shown that a
sufficient condition for Yn to converge to Y w.p.1 as
n → ∞ is that for every ϵ > 0,
(a) Let
be independent uniformly distributed random variables on [0, 1],
and let Yn = min(X1, . . . , Xn).
In class,...
X Y Z iid
Suppose for random variable X, P(X > a) - exp( random variable Y, P(Y > y) exp(-0y) for y > 0, and for random variable , P(Z > z)--exp(-фа) for z > 0. (a) Obtain the moment generating functions of X, Y and Z. (b) Evaluate E(X2IX > 1) and show it is equal to a quadratic function of λ. (c) Calculate P(X > Y Z) if λ-1, θ--2 and φ--3. -λα) for x > 0,...
STATISTICS Let a random simple sample of a random variable with density function , Calculate, for , a maximum likelihood estimator , and determine if it is a consistent estimator. Thank you for your explanations. We were unable to transcribe this imagef (x | θ) = e--(1-9) We were unable to transcribe this imageWe were unable to transcribe this image f (x | θ) = e--(1-9)
Let X ~ Poisson(). Show that as , converges in distribution to a random variable Y and find the distribution of Y. We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this image