Function bounded on [a,b] with finite discontinuities is Riemann integrable

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Homework Help Overview

The discussion revolves around proving that a function bounded on the interval [a,b] with a finite number of discontinuities is Riemann integrable on that interval.

Discussion Character

  • Exploratory, Mathematical reasoning

Approaches and Questions Raised

  • Participants explore the implications of the definition of Riemann integrability, particularly focusing on how to ensure that the upper and lower sums can be made arbitrarily close.

Discussion Status

Some participants have offered guidance on how to select partition points to achieve the desired closeness of upper and lower sums, indicating a productive direction in the discussion.

Contextual Notes

There is an emphasis on the need to manage the size of certain terms in the inequalities involved, as well as the requirement to consider the finite nature of discontinuities in the function.

natasha d
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Homework Statement



to prove that a function bounded on [a,b] with finite discontinuities is Riemann integrable on [a,b]

Homework Equations



if f is R-integrable on [a,b], then \forall \epsilon > 0 \exists a partition P of [a,b] such that U(P,f)-L(P,f)<\epsilon


The Attempt at a Solution


the term on the LHS must be made <ε
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Last edited:
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You're almost there! You can choose your c_j'' and c_j' to be as close as you want, can't you?
 
make it small enough to neglect the second term on the RHS?
 
Thats the idea. You can choose c_j''-c_j' to be less than some multiple of epsilon and then proceed.
 
got it thanks
00006qsq.jpg
 

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