Math and Arithmetic

# When all of the outcomes in a sample space are produced by two events those events are said to be?

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These events are said to be complementary.

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## Related Questions

The sample space consists of the following four outcomes: TT, TH, HT, HH

A sample space is the set of all possible outcomes from an experiment..

A set of outcomes are called results. All possible outcomes are referred to as the sample space.

A possible outcome is an element of the outcome space. All possible outcomes make up the outcome space.

There are 16 simple events in the sample space of four puppies.

It is the set of all possible outcomes of the experiment.

11 outcomes if the dice are indistinguishable, 36 otherwise.

Not sure about the relevance of sizzle! The size of the sample space is 46656.

The set of all possible outcomes of an experment is called the sample space. Suppose an experiment consists of a coin 2 times. Let H represents heads and T represent tails. The sample space for this experiment is {HH,TT,HT,TH}. There are 4 elements in the sample space.

The sample space consists of all the possible outcomes. A flip of a coin has 2 outcomes, H,T. The total number of outcomes for 6 flips are 26 or 64.

It is the space consisting of all possible outcomes of the experiment.

impossible or 1/6 * * * * * No! The sample space refers to the set of possible outcomes, not the probability of any one outcome.

11 * * * * * No, on two counts. The sample space is the possible outcomes of the experiment, not the NUMBER of possible outcomes. And, as far as this experiment is concerned, there is no way to distinguish between the two occurrences of b and i. So there are, in fact, only 9 possible outcomes. Two of these outcomes have a higher probability but that is a different matter. The sample space is {p, r , o , b, a, i, l, t, y} a set of cardinality 9.

You find the sample space by enumerating all of the possible outcomes. The sample space for three coins is [TTT, TTH, THT, THH, HTT, HTH, HHT, HHH].

It is a diagram of all possible outcomes of a probability experiment.

The set of all possible outcomes of a random experiment is nothing but sample space usually denoted by S. we can also call it as event. For example our experiment is rolling a dice, then our sample space is S= {1,2,3,4,5,6}

It means the set of all possible outcomes for the event.

When a fair die is rolled, there are 6 possible outcomes {1,2,3,4,5,6}. The sample space consists of 6 points, so its size is 6.

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