If you flip a coin three times, what is the probability (represented in percent) of getting three heads?
Question 15 options:
0.13% |
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2.5% |
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12.5% |
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18.9% |
If you flip a coin three times, what is the probability (represented in percent) of getting...
Coin Flips: If you flip a fair coin 5 times, what is the probability of each of the following? (please round all answers to 4 decimal places) a) getting all tails? b) getting all heads?
If we flip a fair coin 15 times, what is the probability of not flipping 15 heads in a row?
1) what is the probability of getting that you flip a coin 4 times and get the same result every time? 2) what is the probability of and seven-digit ID number ending in the number 8? 3) what is the probability of your birthday being on a Monday next year? 4) what is the probability you roll two dice and get a sum of 11 or 12? if you could work them out so i could know how to do...
If you flip a fair coin six times, what is the probability of having more heads than tails?
thank you !! 1. If you were to flip a coin 16 times. A) What is the probability of getting 12 or fewer heads? B) What is the probability of getting 6 or fewer heads? 2. In a sample of N=36, what is the 90% confidence intervals of the mean, if the mean is 10 and the unbiased estimate of the standard deviation is 2? 3. What is the 99% confidence interval of the mean in a sample of N=20...
You flip the same coin 90 mores times (100 total flips). If half of the 90 additional flips are heads (45 heads) and half are tails (45 tails), what is the empirical probability of getting a heads for this coin? (So there are the original 10 heads plus an additional 45 heads for a total of 55 heads in 100 flips) (You can give the answer as either a decimal or percent. Give the answer to two decimal places.)
Suppose that I flip a fair coin 21 times. What is the probability that it will land on heads exactly 13 times?
Suppose that I flip a fair coin 36 times. What is the probability that it will land on heads exactly 23 times?
2. A coin is altered so that the p coin is flipped three times as altered so that the probability of getting a head on every flip is 0.6. Suppose this (*) is flipping the coin a binomial experiment? Explain by checking if the four properties of binomial experiments are satisfied. (b) What is the probability that there are at least two heads? (c) What is the probability that an odd number of heads turn out in 3 flips? (d)...
We flip a fair coin 10 times. What is the probability that there are at least 4 heads out of the 10 flips?