probability

Statistics

(noun)

The relative likelihood of an event happening.

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Biology

(noun)

a number, between 0 and 1, expressing the precise likelihood of an event happening

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Algebra

(noun)

A number, between zero and one, expressing the precise likelihood of an event happening.

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Chemistry

(noun)

A number, between 0 and 1, expressing the precise likelihood of an event happening. In this context, the probability of finding a particle at a given position is of interest and is related to the square of the wave function.

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Examples of probability in the following topics:

  • Marginal and joint probabilities

    • For instance, a probability based solely on the student variable is a marginal probability:
    • A probability of outcomes for two or more variables or processes is called a joint probability:
    • If a probability is based on a single variable, it is a marginal probability.
    • Verify Table 2.14 represents a probability distribution: events are disjoint, all probabilities are non-negative, and the probabilities sum to 1.24.
    • We can compute marginal probabilities using joint probabilities in simple cases.

  • Misconceptions

    • State why the probability value is not the probability the null hypothesis is false
    • Misconception: The probability value is the probability that the null hypothesis is false.
    • Proper interpretation: The probability value is the probability of a result as extreme or more extreme given that the null hypothesis is true.
    • It is the probability of the data given the null hypothesis.
    • It is not the probability that the null hypothesis is false.

  • Probability

    • Probability density function describes the relative likelihood, or probability, that a given variable will take on a value.
    • In probability theory, a probability density function (pdf), or density of a continuous random variable, is a function that describes the relative likelihood for this random variable to take on a given value.
    • The probability for the random variable to fall within a particular region is given by the integral of this variable's probability density over the region.
    • For a continuous random variable $X$, the probability of $X$ to be in a range $[a,b]$ is given as:
    • Apply the ideas of integration to probability functions used in statistics

  • Chi-Square Probability Table

  • Probability Distributions for Discrete Random Variables

    • The probability distribution of a discrete random variable $x$ lists the values and their probabilities, where value $x_1$ has probability $p_1$, value $x_2$ has probability $x_2$, and so on.
    • Every probability $p_i$ is a number between 0 and 1, and the sum of all the probabilities is equal to 1.
    • $\sum f(x) = 1$, i.e., adding the probabilities of all disjoint cases, we obtain the probability of the sample space, 1.
    • Sometimes, the discrete probability distribution is referred to as the probability mass function (pmf).
    • The probability mass function has the same purpose as the probability histogram, and displays specific probabilities for each discrete random variable.

  • Continuous Probability Distributions

    • A continuous probability distribution is a probability distribution that has a probability density function.
    • Each of these individual outcomes has probability zero, yet the probability that the outcome will fall into the interval (3 cm, 4 cm) is nonzero.
    • Unlike a probability, a probability density function can take on values greater than one.
    • The standard normal distribution has probability density function:
    • Boxplot and probability density function of a normal distribution $$$N(0, 2)$.

  • Student Learning Outcomes

  • Probability distributions

    • A probability distribution is a table of all disjoint outcomes and their associated probabilities.
    • A probability distribution is a list of the possible outcomes with corresponding probabilities that satisfies three rules:
    • Probability distributions can also be summarized in a bar plot.
    • 2.20: The probabilities of (a) do not sum to 1.
    • The second probability in (b) is negative.

  • Two Types of Random Variables

    • Their probability distribution is given by a probability mass function which directly maps each value of the random variable to a probability.
    • For example, the value of $x_1$ takes on the probability $p_1$, the value of $x_2$ takes on the probability $p_2$, and so on.
    • The probabilities $p_i$ must satisfy two requirements: every probability $p_i$ is a number between 0 and 1, and the sum of all the probabilities is 1.
    • The resulting probability distribution of the random variable can be described by a probability density, where the probability is found by taking the area under the curve.
    • This shows the probability mass function of a discrete probability distribution.

  • Common Discrete Probability Distribution Functions

    • Some of the more common discrete probability functions are binomial, geometric, hypergeometric, and Poisson.
    • A probability distribution function is a pattern.
    • You try to fit a probability problem into a pattern or distribution in order to perform the necessary calculations.
    • These distributions are tools to make solving probability problems easier.