Answer the following:
a) Describe the difference between a discrete and a continuous random variable. Give an example of each.
b) Describe probability density function
c) Differentiate between retrospective and observational studies
d) What is the significance of the Central Limit Theorem in statistics?
Answer the following: a) Describe the difference between a discrete and a continuous random variable. Give an example of each.
Give an example of a discrete or continuous random variable X (by giving the p.m.f. or p.d.f.) whose cumulative distribution function F(x) satisfies F(n)=1-1/n! Thank you very much! Exercise 3.40. Give an example of a discrete or continuous random variable X p.d.f.) whose the cumulative distribution function F(x) (by giving the p.m.f satisfies F(n)1 - i for each positive integer n or
Determine whether the random variable is discrete or continuous. In each case, state the possible values of the random variable. (a) The number of points scored during a basketball game. (b) The amount of rain in City B during April. (a) Is the number of points scored during a basketball game discrete or continuous? A. The random variable is discrete. The possible values are x≥0. B. The random variable is continuous. The possible values are x =0, 1, 2..... C. The random variable is discrete. The...
Determine whether the following value is a continuous random variable, discrete random variable, or not a random variable. Homework: HMK 5.1 - Probability Distributions Save Score: 0.67 of 1 pt 4 of 15 (4 complete) HW Score: 24.44%, 3.67 of 15 pts 5.1.6 8 Question Help O Determine whether the following value is a continuous random variable, discrete random variable, or not random variable. a. The number of people in a restaurant that has a capacity of 150 b. The...
give the answer in detail 9. Let X be a continuous random variable with probability density function given by 0 otherwise Find the probability density function of Y X2 +3
. Assignment of probability p, to each value of the Continuous Random Variable x. B. Assignment of frequency f, to each value of the Discrete Random Variable x. C. Assignment of probability p, to each value of the Discrete Random Variable x. D. Assignment of frequency f, to each value of the Continuous Random Variable x. Given the discrete probability distribution in the table below, answer questions 12-15 23 4 Po)10.12a a-0.11 0.28 12. Calculate a A. 0.46 B. 0.33...
1. Probability is defined differently for discrete and continuous random 4 variables. Describe this difference with the results of your coin-lipping project.
Determine whether the following value is a continuous random variable, discrete random variable, or not a random variable. a. The number of textbook authors now eating a mealnumber of textbook authors now eating a meal b. The usual mode of transportation of people in City Upper Ausual mode of transportation of people in City A c. The number of statistics students now doing their homeworknumber of statistics students now doing their homework d. The number of runs scored during a...
Determine whether the random variable is discrete or continuous. In each case, state the possible values of the random variable. (a) The number of customers arriving at a bank between noon and 1 : 00 P.M.. (b) The distance a baseball travels in the air after being hit. (a) Is the number of customers arriving at a bank between noon and 1 : 00 P.M. discrete or continuous? A. The random variable is discrete. The possible values are x greater...
3.Determine whether the following value is a continuous random variable, discrete random variable, or not a random variable. a. The weight of a hamburger b. The hair color of adults in the United States It is a continuous random variable. It is a discrete random variable. It is not a random variable. c. The square footage of a pools It is a continuous random variable. It is a discrete random variable. It is not a random variable. d. The time...
Determine whether the following value is a continuous random variable, discrete random variable, or not a random variable. A. The number of textbook authors now eating a meal b. The hair color of adults in the United States c. The number of statistics students now doing their homework d. The time it takes for a light bulb to burn out e. The number of home runs in a baseball game f. The number of runs scored during a baseball game