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Line 44: * The [[definite integral]] of a step function is a [[piecewise linear function]]. * The [[Lebesgue integral]] of a step function <math>\textstyle f = \sum_{i=0}^n \alpha_i \chi_{A_i}</math> is <math>\textstyle \int f\,dx = \sum_{i=0}^n \alpha_i \ell(A_i),</math> where <math>\ell(A)</math> is the length of the interval <math>A</math>, and it is assumed here that all intervals <math>A_i</math> have finite length. In fact, this equality (viewed as a definition) can be the first step in constructing the Lebesgue integral.<ref>{{Cite book \| author=Weir, Alan J \| title=Lebesgue integration and measure \| date= 10 May 1973\| publisher=Cambridge University Press, 1973 \| isbn=0-521-09751-7 \|chapter= 3}}</ref> * A [[discrete random variable]] is sometimes defined as a [[random variable]] whose [[cumulative distribution function]] is piecewise constant.<ref name=":0">{{Cite book\|title=Introduction to Probability\|last=Bertsekas\|author-link=~~Dimitri_Bertsekas~~Dimitri Bertsekas\|first=Dimitri P.\|date=2002\|publisher=Athena Scientific\|others=[[John Tsitsiklis\|Tsitsiklis, John N.]], Τσιτσικλής, Γιάννης Ν.\|isbn=188652940X\|___location=Belmont, Mass.\|oclc=51441829}}</ref> In this case, it is locally a step function (globally, it may have an infinite number of steps). Usually however, any random variable with only countably many possible values is called a discrete random variable, in this case their cumulative distribution function is not necessarily locally a step function, as infinitely many intervals can accumulate in a finite region. ==See also==

Step function: Difference between revisions