In an experiment, a random process is observed with a sample size of 10000. The number...

Let A and B be two events such that P(A) = 0.8, P(B) = 0.6 and...

Let A and B be two events such that P(A) = 0.8, P(B) = 0.6 and P(A  B) = 0.4. Which statement is correct? a. None of these statements are correct. b. Events A and B are independent. c. Events A and B are mutually exclusive (disjoint). d. Events A and B are both mutually exclusive and independent. e. Events A and B are the entire sample space.

Determine if the random variable from the experiment follows a Binomial Distribution. A random sample of...

Determine if the random variable from the experiment follows a Binomial Distribution. A random sample of 5 SLCC professors is obtained, and the individuals selected are asked to state the number of years they have been teaching at SLCC. 1. There there are two mutually exclusive outcomes (success/failure).                            [ Select ]                       ["FALSE", "TRUE"]       2. Since a sample size of 5 is less than...

Consider an experiment with a standard 52-deck from which one card is randomly selected and not...

Consider an experiment with a standard 52-deck from which one card is randomly selected and not replaced. Then a second card is randomly selected. Define the following events: Event A = The first card is a heart Event B = The second card is a heart a. Are these two events mutually exclusive? Why or Why not? b. Are these two events independent? Why or why not?

Consider an experiment with a standard 52-deck from which one card is randomly selected and not...

Consider an experiment with a standard 52-deck from which one card is randomly selected and not replaced. Then a second card is randomly selected. Define the following events: Event A = The first card is a heart Event B = The second card is a heart a. Are these two events mutually exclusive? Why or Why not? b. Are these two events independent? Why or why not?

A card is randomly selected from a standard, 52-card deck. The denomination on the card is...

A card is randomly selected from a standard, 52-card deck. The denomination on the card is recorded so that the resulting sample space is {A, 2, 3, 4, 5, 6, 7, 8, 9, 10, K, Q, J}. (In other words, we ignore the suits.) (a) (5 points) Given that the card selected displays some number from 3 to 10 (inclusive), what is the probability that the value on the card is not a multiple of 4? (b) (5 points) Suppose...

Two fair die are tossed, and the uppermost face of each die is observed. The following...

Two fair die are tossed, and the uppermost face of each die is observed. The following events are defined from this random experiment: AA represent the event the uppermost faces sum to five BB represent the event that the product of the uppermost faces is four. For example, die1*die2 = 4 CC represent the event that the absolute difference between the uppermost faces is 1. For example, |die1−die2|=1|die1−die2|=1 Part (a) Find the probability that the uppermost faces do not sum...

Roll two dice, one white and one red. Consider these events: A: The sum is 7...

Roll two dice, one white and one red. Consider these events: A: The sum is 7 B: The white die is odd C: The red die has a larger number showing than the white D: The dice match (doubles) Which pair(s) of events are disjoint (events AA and BB are disjoint if A∩B=∅A∩B=∅)? Which pair(s) are independent? Which pair(s) are neither disjoint nor independent?

Discuss the concepts of mutually exclusive events and independent events. List several examples of each type...

Discuss the concepts of mutually exclusive events and independent events. List several examples of each type of event from everyday life. If A and B are mutually exclusive events, does it follow that A and B cannot be independent events? Give an example to demonstrate your answer. Hint: Discuss an election where only one person can win the election. Let A be the event that party A's candidate wins, and let B be the event that party B's candidate wins....

Consider two events A and B as an outcomes of a random process. Suppose that P(A)=50%...

Consider two events A and B as an outcomes of a random process. Suppose that P(A)=50% and P(B)=40%. i. A and B cannot be mutually exclusive. ii. A and B cannot be independent. 1. i is true, ii is false. 2. I is false, ii is true. 3. Both I and ii are true. 4. Both I and ii are false. 5. There’s no enough information to answer this question. Select right answer and explain/prove your choice.

.1) A company employs 40 skilled and 30 unskilled workers. Twenty five of the skilled workers...

.1) A company employs 40 skilled and 30 unskilled workers. Twenty five of the skilled workers and seventeen of the unskilled workers are college graduates. If an employee of the company is selected at random, the probability that the person picked will not be a college graduate is: a) 2/5 b) 25/70 c) 12/28 d) 17/70 .2) If A is the event "tomorrow it will rain" and B is the event "I will win in the lottery", then:             a)...