Understanding CDFs and Random Variables

They are easier to compute than PDFs.

They provide a graphical representation of data.

They simplify calculations by avoiding the need to distinguish between discrete and continuous variables.

They eliminate the need for probability theory.

The variance of the variable.

The average value of the variable.

The probability of the variable being less than or equal to a certain value.

The probability of the variable being greater than a certain value.

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It remains constant.

It decreases linearly.

It oscillates.

It increases linearly.

They are always decreasing.

They provide all probabilistic information about a random variable.

They are only applicable to continuous variables.

They are always equal to the PDF.

By summing the CDF values.

By multiplying the CDF by a constant.

By integrating the CDF.

By differentiating the CDF.

By differentiating the PMF.

By multiplying the PMF by a constant.

By summing the probabilities of all values less than or equal to x.

By integrating the PMF.