kelsiu
New member
- Joined
- Jun 15, 2014
- Messages
- 9
It is common that we replace \(\displaystyle \int u(x)v'(x)dx\) by \(\displaystyle \int udv\) where both u and v are continuous functions of x. My question is, must we ensure that u can be written as a function of v before applying this? The above substitution method is involved in the proof of integration by parts but I cannot find textbooks that addressed this point.
I find it easier to understand for definite integrals because I can think it as summation. But for indefinite integrals it is just anti-derivative and I am not sure how this kind of replacement is valid.
I find it easier to understand for definite integrals because I can think it as summation. But for indefinite integrals it is just anti-derivative and I am not sure how this kind of replacement is valid.
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