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Chances are (pun intended) you've encountered probability by now, but what exactly is probability, and how do you calculate it? Probability is the likelihood of a specific event happening, like winning the lottery or rolling a 6 on a die. Finding probability is easy using the probability formula (the number of favorable outcomes divided by the total number of outcomes). In this article, we'll walk you through exactly how to use the probability formula step by step, plus show you some examples of the probability formula in action.

Method 1
Method 1 of 3:

Finding the Probability of a Single Random Event

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  1. Probability can only be calculated when the event whose probability you’re calculating either happens or doesn’t happen. The event and its opposite both cannot occur at the same time. Rolling a 5 on a die, a certain horse winning a race, are examples of mutually exclusive events. Either a 5 is rolled or it isn’t; either the horse wins or it doesn’t.[1]

    Example: It would be impossible to calculate the probability of an event phrased as: “Both a 5 and a 6 will come up on a single roll of a die.”

  2. Let’s say you're trying to find the likelihood of rolling a 3 on a 6-sided die. “Rolling a 3” is the event, and since we know that a 6-sided die can land any one of 6 numbers, the number of outcomes is 6. So, we know that in this case, there are 6 possible events and 1 outcome whose probability we’re interested in calculating.[2] Here are 2 more examples to help you get oriented:
    • Example 1: What is the likelihood of choosing a day that falls on the weekend when randomly picking a day of the week? "Choosing a day that falls on the weekend" is our event, and the number of outcomes is the total number of days in a week: 7.
    • Example 2: A jar contains 4 blue marbles, 5 red marbles and 11 white marbles. If a marble is drawn from the jar at random, what is the probability that this marble is red? "Choosing a red marble" is our event, and the number of outcomes is the total number of marbles in the jar, 20.
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  3. Divide the number of events by the number of possible outcomes. This will give us the probability of a single event occurring. In the case of rolling a 3 on a die, the number of events is 1 (there’s only a single 3 on each die), and the number of outcomes is 6. You can also express this relationship as 1 ÷ 6, 1/6, 0.166, or 16.6%.[3] Here's how you find the probability of our remaining examples:[4]
    • Example 1: What is the likelihood of choosing a day that falls on the weekend when randomly picking a day of the week? The number of events is 2 (since 2 days out of the week are weekends), and the number of outcomes is 7. The probability is 2 ÷ 7 = 2/7. You could also express this as 0.285 or 28.5%.
    • Example 2: A jar contains 4 blue marbles, 5 red marbles and 11 white marbles. If a marble is drawn from the jar at random, what is the probability that this marble is red? The number of events is 5 (since there are 5 red marbles), and the number of outcomes is 20. The probability is 5 ÷ 20 = 1/4. You could also express this as 0.25 or 25%.
  4. Add up all possible event likelihoods to make sure they equal 1. The likelihood of all possible events needs to add up to 1 or to 100%. If the likelihood of all possible events doesn't add up to 100%, you've most likely made a mistake because you've left out a possible event. Recheck your math to make sure you’re not omitting any possible outcomes.[5]
    • For example, the likelihood of rolling a 3 on a 6-sided die is 1/6. But the probability of rolling all five other numbers on a die is also 1/6. 1/6 + 1/6 + 1/6 + 1/6 + 1/6 + 1/6 = 6/6 , which = 100%.

    Note: If you had, for example, forgotten about the number 4 on the dice, adding up the probabilities would only reach 5/6 or 83%, indicating a problem.

  5. This just means that there is no chance of an event happening, and occurs anytime you deal with an event that simply cannot happen. While calculating a 0 probability is not likely, it’s not impossible either.[6]
    • For example, if you were to calculate the probability of the Easter holiday falling on a Monday in the year 2020, the probability would be 0 because Easter is always on a Sunday.
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Method 2
Method 2 of 3:

Calculating the Probability of Multiple Random Events

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  1. Once you’ve figured out what these probabilities are, you’ll calculate them separately. Say you wanted to know the probability of rolling a 5 twice consecutively on a 6-sided die. You know that the probability of rolling one five is 1/6, and the probability of rolling another five with the same die is also 1/6. The first outcome doesn’t interfere with the second.[7]

    Note: The probability of the 5s being rolled are called independent events, because what you roll the first time does not affect what happens the second time.

  2. If the occurrence of 1 event alters the probability of a second event occurring, you are measuring the probability of dependent events. For example, if you choose 2 cards out of a deck of 52 cards, when you choose the first card, that affects what cards are available when you choose the second card. To calculate the probability for the second of two dependent events, you’ll need to subtract 1 from the possible number of outcomes when calculating the probability of the second event.[8]
    • Example 1: Consider the event: Two cards are drawn randomly from a deck of cards. What is the likelihood that both cards are clubs? The likelihood that the first card is a club is 13/52, or 1/4. (There are 13 clubs in every deck of cards.)
      • Now, the likelihood that the second card is a club is 12/51, since 1 club will have already been removed. This is because what you do the first time affects the second. If you draw a 3 of clubs and don't put it back, there will be one less club and one less card in the deck (51 instead of 52).
    • Example 2: A jar contains 4 blue marbles, 5 red marbles, and 11 white marbles. If 3 marbles are drawn from the jar at random, what is the probability that the first marble is red, the second marble is blue, and the third is white?
      • The probability that the first marble is red is 5/20, or 1/4. The probability of the second marble being blue is 4/19, since we have 1 less marble, but not 1 less blue marble. And the probability that the third marble is white is 11/18, because we’ve already chosen 2 marbles.
  3. Multiply the probabilities of each separate event by one another. Regardless of whether you’re dealing with independent or dependent events, and whether you’re working with 2, 3, or even 10 total outcomes, you can calculate the total probability by multiplying the events’ separate probabilities by one another. This will give you the probability of multiple events occurring one after another. So, for the scenario; What is the probability of rolling two consecutive fives on a six-sided die? the probability of both independent events is 1/6. This gives us 1/6 x 1/6 = 1/36. You could also express this as 0.027 or 2.7%.[9]
    • Example 1: Two cards are drawn randomly from a deck of cards. What is the likelihood that both cards are clubs? The probability of the first event happening is 13/52. The probability of the second event happening is 12/51. The probability is 13/52 x 12/51 = 12/204 = 1/17. You could also express this as 0.058 or 5.8%.
    • Example 2: A jar contains 4 blue marbles, 5 red marbles and 11 white marbles. If three marbles are drawn from the jar at random, what is the probability that the first marble is red, the second marble is blue, and the third is white? The probability of the first event is 5/20. The probability of the second event is 4/19. And the probability of the third event is 11/18. The probability is 5/20 x 4/19 x 11/18 = 44/1368 = 0.032. You could also express this as 3.2%.
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Method 3
Method 3 of 3:

Converting Odds to Probabilities

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  1. For example, let’s return to our example dealing with colored marbles. Say you want to figure out the probability of drawing a white marble (of which there are 11) out of the total pot of marbles (which contains 20). The odds of the event happening is the ratio of the probability that it will occur over the probability that it will not occur. Since there are 11 white and 9 non-white marbles, you’ll write the odds as the ratio 11:9.
    • The number 11 represents the likelihood of choosing a white marble and the number 9 represents the likelihood of choosing a marble of a different color.
    • So, odds are that you will draw a white marble.
  2. Converting odds is pretty simple. First ,break the odds into 2 separate events: the odds of drawing a white marble (11) and the odds of drawing a marble of a different color (9). Add the numbers together to calculate the number of total outcomes. Write this as a probability, with the newly calculated total number of outcomes as the denominator.
    • The event that you’ll draw a white marble is 11; the event another color will be drawn is 9. The total number of outcomes is 11 + 9, or 20.
  3. You have calculated that there are a total of 20 possibilities and that, essentially, 11 of those outcomes are drawing a white marble. So, the probability of drawing a white marble can now be approached like any other single-event probability calculation. Divide 11 (number of positive outcomes) by 20 (number of total events) to get the probability.
    • So, in our example, the probability of drawing a white marble is 11/20. Divide this out: 11 ÷ 20 = 0.55 or 55%.
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Expert Q&A

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  • Question
    How do you find the probability of a single event?
    Mario Banuelos, PhD
    Mario Banuelos, PhD
    Associate Professor of Mathematics
    Mario Banuelos is an Associate Professor of Mathematics at California State University, Fresno. With over eight years of teaching experience, Mario specializes in mathematical biology, optimization, statistical models for genome evolution, and data science. Mario holds a BA in Mathematics from California State University, Fresno, and a Ph.D. in Applied Mathematics from the University of California, Merced. Mario has taught at both the high school and collegiate levels.
    Mario Banuelos, PhD
    Associate Professor of Mathematics
    Expert Answer
    In general, you take the total number of potential outcomes as the denominator, and the number of times it may occur as the numerator. If you're trying to calculate the probability of rolling a 1 on a 6-sided die, the side with the 1 occurs once and there's a total of 6 sides, so the probability of rolling a 1 would be 1/6.
  • Question
    How do you find probabilities with percentages?
    wikiHow Staff Editor
    wikiHow Staff Editor
    Staff Answer
    This answer was written by one of our trained team of researchers who validated it for accuracy and comprehensiveness.
    wikiHow Staff Editor
    wikiHow Staff Editor
    Staff Answer
    To calculate a probability as a percentage, solve the problem as you normally would, then convert the answer into a percent. For example, if the number of desired outcomes divided by the number of possible events is .25, multiply the answer by 100 to get 25%. If you have the odds of a particular outcome in percent form, divide the percentage by 100 and then multiply it by the number of events to get the probability.
  • Question
    What are the rules of probability?
    wikiHow Staff Editor
    wikiHow Staff Editor
    Staff Answer
    This answer was written by one of our trained team of researchers who validated it for accuracy and comprehensiveness.
    wikiHow Staff Editor
    wikiHow Staff Editor
    Staff Answer
    The 3 basic rules, or laws, of probability are as follows. 1) The law of subtraction: The probability that event A will occur is equal to 1 minus the probability that event A will not occur. 2) The law of multiplication: The probability that events A and B both occur is equal to the probability that event A occurs times the probability that event B occurs, given that event A has occurred. 3) The law of addition: The probability that event A or event B occurs is equal to the probability that event A occurs plus the probability that event B occurs minus the probability that both events A and B occur.
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Tips

  • Mathematicians typically use the term “relative probability” to refer to the chances of an event happening. They insert the word "relative" since no outcome is 100% guaranteed. For example, if you flip a coin 100 times, you probably won't get exactly 50 heads and 50 tails. Relative probability takes this caveat into account.[10]
  • You may need to know that that in sports betting and bookmaking, odds are expressed as “odds against,” which means that the odds of an event happening are written first, and the odds of an event not happening come second. Although it can be confusing, it's important to know this if you’re planning to bet on a sporting event.
  • The most common ways of writing down probabilities include putting them as fractions, as decimals, as percentages, or on a 1–10 scale.
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About This Article

Mario Banuelos, PhD
Co-authored by:
Associate Professor of Mathematics
This article was co-authored by Mario Banuelos, PhD. Mario Banuelos is an Associate Professor of Mathematics at California State University, Fresno. With over eight years of teaching experience, Mario specializes in mathematical biology, optimization, statistical models for genome evolution, and data science. Mario holds a BA in Mathematics from California State University, Fresno, and a Ph.D. in Applied Mathematics from the University of California, Merced. Mario has taught at both the high school and collegiate levels. This article has been viewed 3,493,125 times.
134 votes - 75%
Co-authors: 71
Updated: May 23, 2024
Views: 3,493,125
Article SummaryX

Probability is the likelihood that a specific event will occur. To calculate probability, first define the number of possible outcomes that can occur. For example, if someone asks, “What is the probability of choosing a day that falls on the weekend when randomly picking a day of the week,” the number of possible outcomes when choosing a random day of the week is 7, since there are 7 days of the week. Now define the number of events. In this example, the number of events is 2 since 2 days out of the week fall on the weekend. Finally, divide the number of events by the number of outcomes to get the probability. In our example, we would divide 2, the number of events, by 7, the number of outcomes, and get 2/7, or 0.28. You could also express the answer as a percentage, or 28.5%. Therefore, there’s a 28.5% probability that you would choose a day that falls on the weekend when randomly picking a day of the week. To learn how to calculate the probability of multiple events happening in a row, keep reading!

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