Sample Space in Probability- Sample Space is a set of all possible outcomes of a random experiment. The subset of possible outcomes of an experiment is called events. In this article, we will discuss what is Sample Space in probability , its meaning, examples and definition , how to find sample space in probability , and sample space for rolling a die and two dice , along with some solved examples and practice problems on sample space in Probability.
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Sample Space is a concept in probability theory that deals with the likelihood of different outcomes occurring in a given experiment. It involves defining a sample space that encompasses all possible outcomes and assigning probabilities to these outcomes.
For example, when rolling a six-sided die, the sample space is . In a coin toss, the sample space is . Sample space is crucial for calculating probabilities and understanding random events.
Sample Space is a fundamental concept in Probability Theory .
In mathematics, the sample space is a set that contains all possible outcomes of a random experiment or event.
Sample Space is a key concept in probability theory and is used to determine the likelihood of different results occurring in a random experiment or event, by representing all possible outcomes or events that can occur.
The sample space in probability refers to the set of all possible outcomes or results that can arise from a random experiment . It serves as the foundation for calculating probabilities and understanding the variability of outcomes.
Some examples of sample space are:
Sample spaces vary depending on the experiment and help analyse possible outcomes.
To find the sample space in Probability, follow the below steps:
Sample Space for Rolling 3 coins can be calculated keeping in mind the following:
On rolling a die, we can have 6 outcomes. So the sample space for rolling a die will be, S = .
Sample Space for Rolling Two Dice is as follows:
A sample space diagram is a visual representation that illustrates all the possible outcomes of a random experiment. It is a valuable tool in probability theory for visualising and understanding the different potential results of an event.
Following illustration represents all the possible outcomes i.e., sample space of three coin tossing.
Following illustration represents all the possible outcomes i.e., sample space of rolling of two die.
Also, Check:
Here are some Solved Examples on Sample Space in Probability for you to learn and practise:
Example 1: How many possible outcomes are there when rolling a fair six-sided die?
Solution:
There are 6 possible outcomes when rolling a fair six-sided die.
Example 2: In a deck of 52 playing cards, how many different ways can you draw two cards without replacement?
Solution:
There are 2,652 different ways to draw two cards from a deck of 52 playing cards without replacement.
Example 3: If you flip a coin three times, how many elements are in the sample space for this experiment?
Solution:
There are 2 3 = 8 elements in the sample space when flipping a coin three times.
Example 4: A jar contains 20 red marbles and 30 blue marbles. If you draw two marbles without replacement, how many different pairs can you get?
Solution:
There are 20 C 1 (choosing 1 red marble) × 30 C 1 (choosing 1 blue marble) = 20 × 30 = 600 different pairs you can get when drawing two marbles without replacement.
Example 5: If you have a 4-digit PIN code, and each digit can be 0-9, how many possible PIN combinations are there?
Solution:
There are 10,000 possible PIN combinations for a 4-digit PIN code when each digit can be 0-9.
Here are a few Practice Problems on Sample Space in Probability for you to solve:
Problem 1: If you flip a coin two times, how many elements are in the sample space for this experiment?
Problem 2: How many possible outcomes are there when rolling two fair six-sided die simultaneously ?
Problem 3: In a deck of 52 playing cards, how many different ways can you draw four cards without replacement?
Problem 4: In a deck of 52 playing cards, how many different ways can you draw two cards with replacement?
Problem 5: If you have a 3-digit PIN code, and each digit can be 0-9, how many possible PIN combinations are there?
A sample space is the set of all possible outcomes or results of an experiment or random event.
The size of a sample space is determined by counting the number of distinct and equally likely outcomes in a given experiment.
For a fair coin toss, the sample space consists of two outcomes: heads and tails.
Yes, in some cases, a sample space can have an infinite number of possible outcomes such as when dealing with real numbers in a continuous random variable.
Sample space is fundamental in probability theory as it helps define the likelihood of different events occurring. By understanding the sample space, you can calculate probabilities and make informed decisions in various situations.
Sample Space refers to the method of listing or defining all possible outcomes for a given experiment which is important for calculating probabilities. The formula varies depending on the specific problem or experiment.
If you toss a coin twice, the sample space of this experiment is .
