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Suppose $f: [-2,3] \longrightarrow \mathbb{R}$ is defined by $ f(x) = \left\{ \begin{array}{l l} 2|x| + 1, & \text{if $x$ is rational}, \\ 0, & \text{if $x$ is irrational}. \end{array} \right.$

Prove that $f$ is not Riemann integrable.


We know that the lower integral is $0$ and the upper integral is $18$, then because they are not equal $f$ is not Riemann integrable.

Is this correct? Thanks!

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    Hello Math Friends. I went the the professors office hours and she explained the correct way about solving this problem. You have to rigorously prove that the upper and lower bounds are always x away from each other. So something like, mK= 0 and MK=1 so the upper bound is greater or equal to 5 and the lower bound is always 0. Just thought I'd update.2012-04-23

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Set of points of discontinuity is not measure zero