Suppose you just received a shipment of 14 televisions 3 of the televisions are defective it to televisions are randomly selected compute the probability that both televisions work what is the probability at least one of the televisions does not work
Given is the binomial problem with n = 2 and probability of defective = 3/13
The probability mass function of binomial distribution is given as
1) Probability that both televisions work
Probability that both televisions work is given as probability that there is no defective piece.
2) Probability at least one of the televisions does not work
Probability that at least one of the televisions does not work is given as
Suppose you just received a shipment of 14 televisions 3 of the televisions are defective it...
Suppose you just received a shipment of 6 televisions to of the televisions are defective if to to hella visions are randomly selected compute the probability that both televisions work what is a probability at least one of the televisions does not work
Suppose you just received a shipment of thirteen televisions. Three of the televisions are defective. If two televisions are randomly selected, compute the probability that both televisions work. What is the probability at least one of the two televisions does not work?
suppose you just received a shipment of eight televisions. three of the televisions are defective. if two televisions are randomly selected, compute the probability that both televisions work. what is the probability at least one of the two televisions does not work? The probability that both televisions work is (Round to three decimal places as needed.) The probability that at least one of the two televisions does not work is nothing. (Round to three decimal places as needed.)
you just received a shipment of six televisions. Two of the televisions are defective If two televisions are randomly selected, compute the probability that both televisions work. What is the probablity at least one of the two televisions does not work? The probability that both televisions work is (Round to three decimal places as needed) The probability that at least one of the two televisions does not work is (Round to throe decimal places as needed Guide uccess Library Options...
Suppose you first received a shipment of six televisions. Four of the televisione are detective Itwa televisions are randomly selected compute the probably that both televisions work. What is the probability at least one of the two television does not work? The probability that both televisions work is Round to three decimal places as needed The probability that at least one of the two televisions does not work is (Round to three decimal places as needed) Enter your answer in...
A shipment of 15 televisions sets contains 3 defective sets. A hotel purchases 9 of these televisions sets. What is the probability that the hotel receives at least one of the defective sets?
ll oluiaiplicauon Rule 287 () Among those who were issued no tickets last year, what is the probability the individual texts while driving? (c) Based on the results of this survey, does it appear to be the se that individuals who text while driving are less likely to be issued 0 speeding tickets than those who do not text whi driving? V 21. Acceptance Sampling Suppose that you just received a shipment of six televisions and two are defective. If...
Suppose you have just received a shipment of 17 modems. Although you don't know this 2 of the modems are defective. To determine whether you will accept the shipment you randomly select 5 modes and test them. Wall modems work, you accept the shipment Otherwise the shipment is rejected What is the probly of accepting the shipmeni? Tha probability of accepting the shipment is (Round to four decimal places as needed
QUESTION 4 A shipment of 15 televisions sets contains 4 defective sets. A hotel purchases 8 of these televisions sets. What is the probability that the hotel receives at least one of the defective sets? a. 0.0103 b. 0.7949 C. 0.2051 d. 0.0256 e. 0.9744
A shipment of 50 parts contains 12 defective parts. Suppose 3 parts are selected at random, without replacement, from the shipment. What is the probability that at least one part is defective? 0.5696 0.5610 0.1435 0.0427