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1 there are two possibilities for each of the five tosses of the coin, so there are $2^5 = 32$ possible outcomes in your sample space, as you found D) contain the same number of heads and tails? What is the probability that heads never occurs twice in a row
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Your proposed answer of $13/32$ is correct. C) contain at least three heads Suppose you flip a fair coin repeatedly until you see a heads followed by a tails
What is the expected number of coin flips you have to flip
By manipulating an equation based on the result of the f. If you get heads you win \\$2 if you get tails you lose \\$1 What is the expected value if you flip the coin 1000 times I know that the expected value of flipping the coin once i.
If i flip a coin 100 times, what is the probability that i will get at least one streak of at least ten of the same side Assuming the coin is fair The probability of a coin landing heads ten times in a row is.0009765625 There are 7,000,000 people on the planet
Each person can flip a coin 17280 times a day
If every person on the planet flips coins until one person gets ten heads in a row, how long will it take to get the 10 heads in a row? I understand the formulae for combinations and permutations and that for the binomial distribution However, i'm confused about their application to coin tossing 1 suppose you repeatedly flip a fair coin until you see the sequence hht or the sequence htt
What is the probability you see the sequence htt before you see the sequence hht I am attempting to understand the solution of this problem, but i'm having difficulty translating the law of total probability onto the series of coin tosses. 35 suppose we flip a coin until we see a head What is the expected value of the number of flips we will take
I am pretty new to expected value, so i tried to evaluate it by multiplying the probability of each scenario with the number of flips it took to get there (like taking the arithmetic mean).
A coin is flipped eight times where each flip comes up either heads or tails How many possible outcomes a) are there in total B) contain exactly three heads
