Hyper Geometric Distribution MCQs Test Online PDF Book Download

Hyper geometric distribution multiple choice questions (MCQs), hyper geometric distribution test prep for online learning with MBA degree certificate eCourses. Learn probability distributions multiple choice questions (MCQs), hyper geometric distribution quiz questions and answers. Career test on rectangular distribution, binomial distribution, standard normal probability distribution, discrete probability distributions test for online types of data courses distance learning.

Learn probability distributions practice test MCQs: if sample size is 6 and population is 50 from which it is drawn without replacement and elements for success are 22 then variance of hyper geometric probability distribution is, for free online courses with options 1.388, 2.388, 3.388, 4.388 for masters in business administration. Free skills assessment test is for e-learning online hyper geometric distribution quiz questions for competitive assessment in business majors to prepare entrance exam for EMBA program admission.

MCQ on Hyper Geometric DistributionQuiz Book Download

MCQ: Formula of calculating mean for hyper geometric probability distribution is

  1. n (m ⁄ n)
  2. m (n ⁄ n)
  3. n (n ⁄ m)
  4. n (m ⁄ n)

D

MCQ: If sample size is 6 and population is 50 from which it is drawn without replacement and elements for success are 22 then variance of hyper geometric probability distribution is

  1. 1.388
  2. 2.388
  3. 3.388
  4. 4.388

A

MCQ: If total number of elements with some specific characteristics is 18 from a population of 40 and sample is drawn without replacement with size of 4 then mean of hyper geometric probability distribution is

  1. 4.8
  2. 1.8
  3. 2.8
  4. 3.8

B

MCQ: If random samples are drawn without replacement and population from which samples are drawn is infinite then method which is not applicable is

  1. weighted error probability distribution
  2. hyper geometric probability distribution
  3. Bernoulli probability distribution
  4. asymmetrical random distribution

B