Differentiability and Rational and Irrational Functions

Related BrainMass Solutions

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  103513 Real Analysis : Riemann Integrable Functions Show that the function h, defined on I by h(x)=x for x rational and h(x)=0 for x irrational, is not Riemann integrable on I. Please see the attached file for the complete solution.

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  This will only happen when x = x^2, which only is true for x = 0 and x = 1. The expert examines proof involving existence of limit for piecewise functions. Rational and irrational numbers are provided.

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