Why Jiskha Is Full of Crap
 👍
 👎
 👁

 👍
 👎

 👍
 👎

 👍
 👎
👤Ms. Sue 
 👍
 👎

 👍
 👎

 👍
 👎
👤Writeacher 
 👍
 👎

 👍
 👎

 👍
 👎

 👍
 👎

 👍
 👎

 👍
 👎
Respond to this Question
Similar Questions

probability
Let X and Y be independent random variables, each uniformly distributed on the interval [0,1]. Let Z=max{X,Y}. Find the PDF of Z. Express your answer in terms of z using standard notation. For 0

Probability
The random variable X is uniformly distributed over the interval [θ,2θ]. The parameter θ is unknown and is modeled as the value of a continuous random variable Θ, uniformly distributed between zero and one. Given an

Math
An exam consists of six trueorfalse questions. Assuming that every question is answered, in how many different ways can a student complete the exam? In how many ways may the exam be completed if a penalty is imposed for each

biology
(b) Is this pedigree consistent with autosomal dominant inheritance? Yes No If you chose "yes", answer questions (i) and (ii) and leave parts (iii) and (iv) blank. If you chose "no", leave parts (i) and (ii) blank and answer

probability
t the discrete random variable X be uniform on {0,1,2} and let the discrete random variable Y be uniform on {3,4}. Assume that X and Y are independent. Find the PMF of X+Y using convolution. Determine the values of the constants

math
A test consists of 120 questions. Each correct answer, each wrong answer and unanswered question in the test carry 1 Mark, 0.5 Mark and 0.25 Mark respectively. Find the maximum number of questions that the candidate could have

Physics
A point charge Q1=2µC is located at x=0, and a point charge Q2=8µC is placed at on the x axis of a cartesian coordinate system.The goal of this problem is to determine the electric field,E(x)=E(x)x^ , at various points along

math
yeah so what's 2+2 because my bruddah over here saying it's fish but i think it's 5 but I genuinely don't know because my teacher thinks she's all that in a bad of chips mhm ong so help a bro out and... yeah

Probability
Let A and B be independent random variables with means 1, and variances 1 and 2, respectively. Let X=A−B and Y=A+B. Find the coefficients c1 and c2 of the Linear Least Mean Squares (LLMS) estimator YˆLLMS=c1X+c2 of Y based on

probability
Let Sn be the number of successes in n independent Bernoulli trials, where the probability of success for each trial is 1/2. Provide a numerical value, to a precision of 3 decimal places, for each of the following limits. You may

probability
Let X be a random variable with PDF fX. Find the PDF of the random variable Y=eX for each of the following cases: For general fX, when y>0, fY(y)=  unanswered fX(eyy) fX(ln yy) fX(ln y)y none of the above When fX(x) = {1/3,0,if

probability
Problem 4. Gaussian Random Variables Let X be a standard normal random variable. Let Y be a continuous random variable such that fYX(yx)=12π−−√exp(−(y+2x)22). Find E[YX=x] (as a function of x , in standard notation)
You can view more similar questions or ask a new question.