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The probability that a random selected female aged 60 years old will survive the year is 99.186 what is the probability that 4 randomly s?
To find the probability that all four randomly selected females aged 60 will survive the year, we can use the survival probability of 99.186% (or 0.99186). The probability that all four survive is calculated by raising this probability to the power of 4: [ P(\text{all survive}) = (0.99186)^4 \approx 0.9661. ] Thus, the probability that all four will survive the year is approximately 96.61%.
How are ratio and probability the same?
A ratio is a comparison of the relative size of two different things. Probability is the change that something will (or will not) occur. Probability can be expressed as a ratio of Yes to No (or, "will occur" to "won't occur"). That is, Probability is the relative size of Yes to No. So, if something is said to have a 60% Probability of occurring, what that is indicating is that, out of 100 tries, 60 will be the outcome indicated. While probability is usually expressed as a percentage, it is entirely possible to express it as a ratio. In the aforementioned example, a 60% Probability of occurrence could also be said to be a 60:40 (or, reduced, 3:2) ratio in favor of happening.
Having children the first year of marriage will cause the probability of divorce to double or triple?
No.
What is the probability of pulling a two of hearts out of a deck of cards?
1 out of 60
What is the probability of Kevin randomly picking out a paperclip of 60 papercliips?
i dont no
What is the probability of a single marriage lasting 60 years?
one in 50
What Gem stone represents 60 years of marriage?
Diamond represents 60 yrs. of marriage.
How long has the legal age of marriage been in affect?
60 years
The probability that a random selected female aged 60 years old will survive the year is 99.186 what is the probability that 4 randomly s?
To find the probability that all four randomly selected females aged 60 will survive the year, we can use the survival probability of 99.186% (or 0.99186). The probability that all four survive is calculated by raising this probability to the power of 4: [ P(\text{all survive}) = (0.99186)^4 \approx 0.9661. ] Thus, the probability that all four will survive the year is approximately 96.61%.
How are ratio and probability the same?
A ratio is a comparison of the relative size of two different things. Probability is the change that something will (or will not) occur. Probability can be expressed as a ratio of Yes to No (or, "will occur" to "won't occur"). That is, Probability is the relative size of Yes to No. So, if something is said to have a 60% Probability of occurring, what that is indicating is that, out of 100 tries, 60 will be the outcome indicated. While probability is usually expressed as a percentage, it is entirely possible to express it as a ratio. In the aforementioned example, a 60% Probability of occurrence could also be said to be a 60:40 (or, reduced, 3:2) ratio in favor of happening.
What is the probability if you get a one out of sixty?
It is 1/60, clearly!
What is the probability of spinning a 2 on a 1-6 spinner if I spin it 60 times?
The probability of getting a 2 is 1 - (1/6)60 = 1 - 2.05*10-47
If you roll a die 60 times what is the probability you will roll a one?
You add the probabilities together. For each roll, it is 1/6; therefore, you will have 60 times 1/6, which is 60/6, which is 10. Since probability is only 1 at the most, which means that it WILL happen, I would say that the probability is 1 (or 100%).
What is the probability the random variable will assume a value between 40 and 60?
It depends on what the random variable is, what its domain is, what its probability distribution function is. The probability that a randomly selected random variable has a value between 40 and 60 is probably quite close to zero.
If you roll a die 60 times what is the probability you will roll a one or a six?
I'm assuming you're looking for the probability that you roll either a one or six at least once. So the problem can be rewritten as: 1 - probability of rolling 60 times and never getting ones or sixes = 1 - (2/3)^60
If you roll a dice 60 times what is the probability you will roll a 1?
1-(5/6)^60 ≈ 99.99822529882%
What is the probability of getting this question correct A.25 B.50 C.60 D.25?
60
