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Pythagorean
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Can you always just swap the limits of integration and flip the sign of a one-dimensional integral or is there a time when you can't do this?
HallsofIvy said:Yes, [itex]\int_a^b f(x) dx= -\int_b^a f(x) dx[/itex]. Let u= -x. I thought everyone knew this!
Swapping the limits of integration refers to the process of reversing the order in which the limits of an integral are written. This is done in order to make the integral easier to solve or to evaluate it from a different perspective.
There are several reasons why someone might want to swap the limits of integration. One reason is to make the integral easier to solve, as it might be simpler to work with the new limits. Another reason is to change the perspective from which the integral is being evaluated, which can sometimes provide a different insight or understanding of the integral.
The process of swapping the limits of integration is quite simple. All you need to do is reverse the order in which the limits are written. For example, if the integral is written as ∫ a to b, you would swap the limits to ∫ b to a.
Yes, there are some restrictions on when you can swap the limits of integration. One important restriction is that the integral must be convergent, meaning that it must have a finite value. Additionally, the integral must be able to be evaluated from both sets of limits, and the limits must be continuous at the point of swapping.
Yes, swapping the limits of integration can change the value of the integral. This is because the integral is being evaluated from a different perspective and may take into account different aspects or quantities. However, if the integral is convergent and the limits are continuous at the point of swapping, the value will remain the same.