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points and are called the limits (or bounds) of integration, and the integral is said to be over the interval , called the interval of integration. A function is said to be integrable if its integral is well-defined and finite. (The type of integral being considered determines the type of integrability this means, thus Riemann integrable means that the upper and lower Riemann sums converge over the domain, Lebesgue integrable means that the Lebesgue integral exists and is finite, and so on.) If limits

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