When given a general continuous distribution, be able to determine probabilities, and calculate the mean and standard deviation through the use of basic calculus techniques.
Given: f(x) = (.4)(x + 2) for 0 < x < 1, and 0 otherwise
1. Show that the total area is 1
Find P(0 < x < .5)
Calculate E(x)
Calculate the standard deviation of x.
When given a general continuous distribution, be able to determine probabilities, and calculate the mean and...
A random variable follows the continuous uniform distribution between 15 and 35. a) Calculate the probabilities below for the distribution. 1) P(x≤30) 2) P(x=33) b) What are the mean and standard deviation of this distribution?
A random variable follows the continuous uniform distribution between 20 and 50 a) Calculate the probabilities below for the distribution. 1) P(x≤40) 2) P(x=39) b) What are the mean and standard deviation of this distribution?
A random variable follows the continuous uniform distribution between 30 and 70 . a) Calculate the probabilities below for the distribution. 1) P(xless than or equals 55 ) 2) P(xequals 61 ) b) What are the mean and standard deviation of this distribution?
A continuous random variable is uniformly distributed between 20 and 120. Find the following probabilities – P(X<70) P(X>50) P(X=50) P(30<X<90) What are the mean and standard deviation of this distribution?
22. Given a continuous random variable X with probability density function f(x) = {2x, if :05451 otherwise a. Find P(0.3< X< 0.6) b. Find the mean of X C. Find the standard deviation of X.
i need both questions answer
there are 2 sets of questions named as 2
1st set i wrote as 1st question and
2nd set i wrote as 2nd question and in each question sets
there are 2 question and each question contains 2 sub-questions iam
attaching down.please do both the sets
2. Calculate multiplier k. Find distribution function f(x), mode Mo(x), median Me(x), mathematical expectation (the mean) M(x), variance (dispersion) D(x) and standard deviation 0(x) for continuous distributions with the...
(e) A continuous random variable X has the probability density function given by: f(x) = ( 2x/√ k for 0 ≤ x ≤ 2 0 otherwise. i. Show that the constant k equals 16. ii. Find the expected value of X. iii. Find the variance of X. iv. Derive the cumulative distribution function, F(x). v. Calculate P(X < 1 | X < 1.5)
Given a standardized normal distribution (with a mean of 0 and a standard deviation of 1), determine the following probabilities. a. P(Zgreater than1.02) b. P(Zless thannegative 0.23) c. P(minus1.96less thanZless thannegative 0.23) d. What is the value of Z if only 9.68% of all possible Z-values are larger?
Examination in probability theory and statistics Variant 9 1. Discrete distribution for X is given by the following table: Probability p ValueX Find distribution function fa) and median Me(0). Calculate mathematical expectation (the mean) M(x), 0.3 -10 0.4 10 0.2 20 0.1 40 variance (dispersion) Da, standard error ơ(X), asymmetry coefficient As(X) and excess Ex(X). 2. Calculate multiplier k. Find mode Mots, median Me(o), mathematical expectation (the mean) Mc) variance (dispersion) D(x) and standard error σ(x) for continuous distributions having...
1. A certain continuous distribution has cumulative distribution function (CDF) given by F(x) 0, r<0 where θ is an unknown parameter, θ > 0. Let X, be the sample mean and X(n)max(Xi, X2,,Xn). (i) Show that θ¡n-(1 + )Xn ls an unbiased estimator of θ. Find its mean square error and check whether θ¡r, is consistent for θ. (i) Show that nX(n) is a consistent estimator of o (ii) Assume n > 1 and find MSE's of 02n, and compare...