Wiki User
∙ 10y agoIt is the set of all possible outcomes.
Wiki User
∙ 10y agoIt is the space consisting of all possible outcomes of the experiment.
It means the set of all possible outcomes for the event.
Discrete probability. It helps if the all the outcomes in the sample space are equally probable but that is not a necessity.
The first marble is the independent event because its probability is only based on the sample space of the bag. The second marble is the dependent event because its probability is based on the sample space of the bag which has now been changed by the first marble.
the space used to show a sample promblem.
Not sure about the "best" definition. It is the set of all possible outcomes for the event.
It is the space consisting of all possible outcomes of the experiment.
Set of all possible outcomes.
Since there is only one definition given, it has to be better than the ones which are not even featured!
It means the set of all possible outcomes for the event.
Discrete probability. It helps if the all the outcomes in the sample space are equally probable but that is not a necessity.
Sample space
The first marble is the independent event because its probability is only based on the sample space of the bag. The second marble is the dependent event because its probability is based on the sample space of the bag which has now been changed by the first marble.
The sample space consists of the letters of the word "PROBABILITY" = {P,R,O,B,A,I,L,T,Y}
the space used to show a sample promblem.
Associates a particulare probability of occurrence with each outcome in the sample space.
First decide whether the event space is discrete or continuous.For a discrete event space, for each outcome in the space assign a probability: a number in the interval [0, 1] such that the sum of probabilities for all outcomes is 1. The mapping from the event space to the probabilities is the probability distribution function.The procedure for a continuous event space is analogous: the sum is replaced by the integral.