Continuous Random Variables (DP IB Analysis & Approaches (AA))

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  • True or False?

    If f is the probability density function of the continuous random variable X, then f open parentheses x close parentheses equals straight P open parentheses X equals x close parentheses.

    False.

    If f is the probability density function of the continuous random variable X, then f open parentheses x close parentheses not equal to straight P open parentheses X equals x close parentheses.

    The probability density function does not give probabilities of individual values.

  • If X is a continuous random variable with a probability density function f, how would you find straight P open parentheses a less or equal than X less or equal than b close parentheses?

    If X is a continuous random variable with a probability density function f, then straight P open parentheses a less or equal than X less or equal than b close parentheses equals integral subscript a superscript b f stretchy left parenthesis x stretchy right parenthesis straight d x.

  • True or False?

    If X is a continuous random variable, then straight P open parentheses X equals k close parentheses equals 0 for any value k.

    True.

    If X is a continuous random variable, then straight P open parentheses X equals k close parentheses equals 0 for any value k.

  • True or False?

    If X is a continuous random variable, then straight P open parentheses a less or equal than X less or equal than b close parentheses equals straight P open parentheses a less than X less than b close parentheses.

    True.

    If X is a continuous random variable, then straight P open parentheses a less or equal than X less or equal than b close parentheses equals straight P open parentheses a less than X less than b close parentheses.

    This is because straight P open parentheses X equals a close parentheses equals 0 and straight P open parentheses X equals b close parentheses equals 0.

  • What are the two conditions a function f needs to meet if it is to be a probability density function?

    If f is to be a probability density function then it needs to meet the following two conditions:

    • f is never negative, i.e. f open parentheses x close parentheses greater or equal than 0,

    • the area under the graph of f is equal to 1, i.e. integral subscript negative infinity end subscript superscript infinity f open parentheses x close parentheses d x equals 1.

  • True or False?

    If straight P open parentheses X less than m close parentheses equals 0.5, then m is the mode of the continuous random variable X.

    False.

    If straight P open parentheses X less than m close parentheses equals 0.5, then m is the median of the continuous random variable X.

  • How would you find the median of a continuous random variable X using its probability density density function f?

    To find the median of a continuous random variable, you would integrate the probability density function between its lowest value and the unknown m. Set this definite integral equal to 0.5 and solve for m, which is the median.

    I.e. solve the equationspace integral subscript negative infinity end subscript superscript m f stretchy left parenthesis x stretchy right parenthesis space straight d x equals 0.5 for m.

  • How can you find the mode of a continuous random variable X?

    You can find the mode of a continuous random variable X by finding the value of x which gives the maximum value of the probability density function f.

  • True or False?

    To find the mode of a continuous random variable, you need to integrate its probability density function.

    False.

    To find the mode of a continuous random variable, you do not integrate its probability density function.

    You can differentiate the probability density function to help find the maximum point.

  • If the probability density function is symmetrical about the line x equals a, what is the median of the continuous random variable?

    If the probability density function is symmetrical about the line x equals a, then the median of the continuous random variable is x equals a.

  • True or False?

    If the probability density function is symmetrical about the line x equals a, then the mean of the continuous random variable is a.

    True.

    If the probability density function is symmetrical about the line x equals a, then the mean of the continuous random variable is a.

    If a probability density function is symmetrical then the mean is the same as the median.

  • How do you find the mean of a continuous random variable X?

    To find the mean of a continuous random variable X, you multiply the probability density function by x and integrate over its domain.

    The formula straight E open parentheses X close parentheses equals integral subscript negative infinity end subscript superscript infinity x f open parentheses x close parentheses d x is given in the exam formula booklet.

  • How do you find the variance of a continuous random variable X?

    To find the variance of a continuous random variable X, you multiply the probability density function by x squared, integrate over its domain and then subtract the mean squared.

    The formula Var open parentheses X close parentheses equals integral subscript negative infinity end subscript superscript infinity x squared f open parentheses x close parentheses d x minus mu squared is given in the exam formula booklet.

  • How do you calculate straight E open parentheses X squared close parentheses for the continuous random variable X?

    To calculate straight E open parentheses X squared close parentheses for the continuous random variable X, you use the formula straight E open parentheses X squared close parentheses equals integral subscript negative infinity end subscript superscript infinity x squared f open parentheses x close parentheses straight d x.

    Multiply the probability density function by x squared and integrate it over its domain.

    This is not given explicitly in the exam formula booklet.