Which type of variable would measurements of height be? a. Discrete b. Continuous On any random...

For the following experiments list: a) the possible events in the sample space; and b) the...

For the following experiments list: a) the possible events in the sample space; and b) the probability of each event. EXAMPLE: one flip of a normal coin. Sample space: {heads, tails} Probabilities: P(heads) = .5, P(tails) = .5 A random draw from a bag containing 8 red balls and 5 green balls. The simultaneous flip of two normal coins. The flip of a coin and the roll of a normal 6-sided die.

QUESTION 1 A game is played that costs $1. To play, you roll one six-sided die....

QUESTION 1 A game is played that costs $1. To play, you roll one six-sided die. If you roll a six, you win $5. What is the expected value of this game? a. $0 b. $5 c. $0.50 d. $4.50 QUESTION 2 A class room contains 32 students, 11 of whom are female. If one student is randomly chosen from the room, what is the probability the student is female? Round to the nearest thousandth. 1 points    QUESTION 3...

Deriving fair coin flips from biased coins: From coins with uneven heads/tails probabilities construct an experiment...

Deriving fair coin flips from biased coins: From coins with uneven heads/tails probabilities construct an experiment for which there are two disjoint events, with equal probabilities, that we call "heads" and "tails". a. given c1 and c2, where c1 lands heads up with probability 2/3 and c2 lands heads up with probability 1/4, construct a "fair coin flip" experiment. b. given one coin with unknown probability p of landing heads up, where 0 < p < 1, construct a "fair...

(2) Indicate which of the following are discrete measurements and which are continuous measurements: Discrete Continuous...

(2) Indicate which of the following are discrete measurements and which are continuous measurements: Discrete Continuous ___ ___ a) life of a Dell monitor ___ ___ b) waist size of NFL football players ___ ___ c) mileage of Japanese cars ___ ___ d) length of New York City NYC rats ___ ___ e) weight of human brains ___ ___ f) number of left-handed people on basketball teams ___ ___ g) time to complete the task of assembling a computer ___...

An unfair coin is made so that heads is seven times as likely to come up...

An unfair coin is made so that heads is seven times as likely to come up as tails when the coin is flipped. An experiment consists of flipping this coin just once What weight (or probability) does the outcome 'heads' have? What weight (or probability) does the outcome 'tails' have? Enter your answers as whole numbers or fractions in lowest terms. An experiment has sample space S={a,b,c,d,e}. Outcomes b,c,d,e are equally likely while the likelihood of outcome a is Wa=7/19...

Construct a sample space (list or make a tree diagram of all of the outcomes) for...

Construct a sample space (list or make a tree diagram of all of the outcomes) for the experiment of rolling a 12 sided die and flipping a coin at the same time. Assuming each outcome is equally likely, what is the probability of: DO NOT REDUCE b) rolling a number less than 4 and getting heads? c) rolling an odd number and getting tails? d) rolling a 7 and getting ( heads or tails)

Suppose you are flipping an unfair coin 10 times. Let p be the probability of getting...

Suppose you are flipping an unfair coin 10 times. Let p be the probability of getting tails for said coin. Define X to be the number of heads obtained. (a.) Describe the sample space S. (b.) Give the values x for X. (c.) Find the likelihood of rolling exactly four heads. (d.) Find fX(x) .

3. A fair coin is flipped 4 times. (a) What is the probability that the third...

3. A fair coin is flipped 4 times. (a) What is the probability that the third flip is tails? (b) What is the probability that we never get the same outcome (heads or tails) twice in a row? (c) What is the probability of tails appearing on at most one of the four flips? (d) What is the probability of tails appearing on either the first or the last flip (or both)? (e) What is the probability of tails appearing...

Determine whether the following value is a continuous random​ variable, discrete random​ variable, or not a...

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 "yes" or "no" response to a survey question"yes" or "no" response to a survey question c. The time required to upload a file to the Internet time required to upload a file to the Internet d. The number of free dash throw attempts before the first shot is missed a...

Two friends, Helen and Harriet, have a coin. Helen spent all day flipping the coin thousands...

Two friends, Helen and Harriet, have a coin. Helen spent all day flipping the coin thousands of times, and observed that it turned up heads 60% of the time. So Helen assigns a probability of 0.6 to the event that a head turns up. Harriet, who is unaware of Helen's flipping experiment, reasons that the coin has two sides, each side being equally likely to show up. So Harriet assigns a probability of 0.5 to the event that a head...