This is discrete mathematics
If you do it right, I must give praise.
You must use probability space is a triple relative acknowledge.
S: is a sample sapce
E=p(s) is the set of all events
P: E-->R is a function.
The important thing that I need to say three times:
If you don't know how to do it, please don't do it.
don't copy others,
especially for question (a), give sample space, probability measure
The important thing that I need to say three times: If you don't know how to do it, please don't do it; Don't copy others; Especially for question (a), give sample space, probability measure
The important thing that I need to say three times: If you don't know how to do it, please don't do it; Don't copy others; Especially for question (a), give sample space, probability measure
This is discrete mathematics If you do it right, I must give praise. You must use probability spa...
a fair coin is tossed three times. A. give the sample space B. find the probability exactly two heads are tossed C. Find the probability all three tosses are heads given that the last toss is heads
CSCI-270 probability and statistics for computer Consider the sample space of outcomes of two throws of a fair die. Let Z = be the minimum of the two numbers that come up. List all the values of Z. Compute its probability distribution. Consider the sample space of outcomes of two tosses of a fair coin. On that space define the following random variables: X = the number of heads; Y = the number of tails on the first toss. For...
Please help me write these in R script / Code 1, Suppose you're on a game show, and you're given the choice of three doors. Behind one door is a car; behind the others, goats. You pick a door, say #1, and the host, who knows what's behind the doors, opens another door, say #3, which has a goat. He then says to you, "Do you want to pick door #2?" What is the probability of winning the car if...
The next four questions (5 to 8) refer to the following: An unfair coin is tossed three times. For each toss, the probability that the coin comes up heads is 0.6 and the probability that the coin comes up tails is 0.4. If we let X be the number of coin tosses that come up heads, observe that the possible values of Xare 0, 1, 2, and 3. Find the probability distribution of X. Hint: the problem can be solved...
Law of Large Numbers We saw in the Theoretical and Experimental Probability Lab that as we do more and more repetitions or trials of an experiment, the closer the experimental probability gets to the theoretical probability. This is called the Law of Large Numbers. Why is the Law of Large Numbers important? Why do we do experiments and find experimental probability when we could just use theoretical probability? Inferential statistics makes inferences about populations using data drawn from the population....
A high-school teacher takes an afternoon to teach their class some basic ideas about probability. They do this by getting the students to toss coins (head or tails) and set up a tournament where the 32 students split into pairs and have a contest: the students in each pair toss a coin ten times and the winner is the student who tosses the most heads. Then the 16 students who were winners in the first round are again split into...
1 Spinning a coin, unlike tossing it, may not give heads and tails in equal proportions. I spin a penny 150 times and got 60 heads. We want to know if we have significant evidence that the coin is not fair. • When we go to the Rossman Chance applet, what value should be entered under "Probability of heads" (or "Probability of success 7")? Round to 3 places. • In the Rossman Chance applet, what value should be entered under...
C Spinning a coin, unlike tossing it, may not give heads and tails equal probabilities. I spun a penny 150 times and got 67 heads. We wish to find how significant is this evidence against equal probabilities, a. What is the sample proportion of heads? Round to 3 decimal places. b. Heads do not make up half of the sample. Is this sample evidence that the probabilities of heads and tails are different? Take p to be the probability of...
You have five coins in your pocket. You know a priori that one coin gives heads with probability 0.4, and the other four coins give heads with probability 0.7 You pull out one of the five coins at random from your pocket (each coin has probability 릊 of being pulled out), and you want to find out which of the two types of coin it is. To that end, you flip the coin 6 times and record the results X1...
Probability Puzzle 3: Flipping Coins If you flip a coin 3 times, the probability of getting any sequence is identical (1/8). There are 8 possible sequences: HHH, HHT, HTH, HTT, THH, THT, TTH, TTT Let's make this situation a little more interesting. Suppose two players are playing each other. Each player choses a sequence, and then they start flipping a coin until they get one of the two sequences. We have a long sequence that looks something like this: HHTTHTTHTHTTHHTHT.......