The only thing I'd know of would be looking at your risk factors, are you over 35? Is the father over 60?
There are three main methods for assigning probabilities Following the classical definition of probability Using relative frequencies Using subjective probability
the distance from the nucleus at which the electron is most likely to be found
An empirical rule indicates a probability distribution function for a variable which is based on repeated trials.
A set of outcomes are said to be equally like if the probability for the occurrence of any of the is the same as that for any other. The phase, "at random" is used to indicate that the probability for each individual outcome is the same.
Astronomers indicate the probability of us all really going to be sucked into a black hole to be quite low.
Probability is the likelihood that some particular event will occur. It is expressed as a number between 0 and 1, where 0 means the event will not occur, and 1 means the event will occur. Values in between 0 and 1 indicate the relative likelihood, i.e. "probability", that the event will occur. For instance, the probability of tossing heads on a fair coin toss is 0.5, the probability of rolling a 3 on a standard die is 1 in 6, or about 0.1667, and the probability of drawing an ace of spades from a standard deck of 52 cards is 1 in 52 or about 0.01923.
In all probability - nothing. Most realistically it's pigmentation from a small injury sometime.
"Certain" is not a preposition; it is an adjective that is used to indicate a high degree of probability or assurance about something.
If she has not yet played the next stroke, there can be no experimental probability. You may be able to use her record to compare her performance with other players and then use their performance to predict hers. It is extremely unlikely but her own past performance may indicate a kind of evolution in her strokes which may help to predict.
In statistics, the t-test is a measure of the probability of a particular event happening. It is based upon a normal (bell-shaped curve) distribution of probabilities. A negative number result for a t-test indicates that the probability calculated is to the left if you are graphing it on the bell curve. Importantly, it does not indicate a "less than zero" chance of an event happening.
Apparent tendencies from the past don't indicate future tendencies in such a case. If during the last year some number appeared more frequently, that was a coincidence, and it won't affect the probability of the number appearing again in the next lotto drawing. The numbers are random, each number should have the same probability.
Uncertainty about a situation can often indicate risk, which is the possibility of loss, damage, or any other undesirable event. Most people desire low risk, which would translate to a high probability of success, profit, or some form of gain.