M=0
n=0
m*n=0
Multiply the possible outcomes of the events in the disjoint events
They are the product of the number of possible outcomes for each of the component events.
I assume you mean how many possible outcomes when looking at all 13 results. It would be 2^13 = 8192
It is a set of events that, taken together, include all possible outcomes.
Because there are many events whose outcomes cannot be determined. However, using probability it may be possible to make a good estimate as to the outcome.Because there are many events whose outcomes cannot be determined. However, using probability it may be possible to make a good estimate as to the outcome.Because there are many events whose outcomes cannot be determined. However, using probability it may be possible to make a good estimate as to the outcome.Because there are many events whose outcomes cannot be determined. However, using probability it may be possible to make a good estimate as to the outcome.
False
Multiply the possible outcomes of the events in the disjoint events
They are the product of the number of possible outcomes for each of the component events.
I assume you mean how many possible outcomes when looking at all 13 results. It would be 2^13 = 8192
Counting Principle is used to find the number of possible outcomes. It states that if an event has m possible outcomes and another independent event has n possible outcomes, then there are mn possible outcomes for the two events together.
It is a set of events that, taken together, include all possible outcomes.
Because there are many events whose outcomes cannot be determined. However, using probability it may be possible to make a good estimate as to the outcome.Because there are many events whose outcomes cannot be determined. However, using probability it may be possible to make a good estimate as to the outcome.Because there are many events whose outcomes cannot be determined. However, using probability it may be possible to make a good estimate as to the outcome.Because there are many events whose outcomes cannot be determined. However, using probability it may be possible to make a good estimate as to the outcome.
A set of events is said to be exhaustive if, between them, they cover all possible outcomes.
product
product
Random events are events that do not have a determined outcome. The set of possible outcomes for a random event is always greater than one item.
Well you start with the first event, how many possibilities, draw a line down for each one, and state what event occurred. I.e. a heads or tails of a coin. Then from each of these outcomes, draw the possible outcomes from each of the first events reflecting the second events, i.e. HH, HT, TH, TT. Third outcome (third flip of a coin) would look like this. HHH, HHT, HTH, HTT, THH, THT, TTH, TTT