Hey, need some help with a calculus homework assignment due this afternoon. The lecturer gave the formula for the Leibniz rule (specifically, d/dx[ integral from u(x) to v(x) of the function f(x,t) dt] = f(v)*dv/dx - f(u)*du/dx + integral from u to v of the partial_f/partial_t dt ), but didn't go into any examples of the process, and I unfortunately missed the tutorial that week, and it appears that no helper in the study hall I went too have so far been taught math of this level yet, and I'm hoping not to bother the actual teacher if I can help it.
I'm hoping to get some examples/further working in the rule in practice, so I can apply it in new equations, specifically towards the three I have for my homework assignment. So far the internet has proven quite disheartening in this regard, as while a quick search nets the equation, none seem to offer actual examples of this particular case that I need.
These are the three homework problems I need to solve with the Leibniz rule, and while I don't need the exact answers for these three, going through similar problems would be much appreciated;
a) d/dx [integral from x to x^2 | 1/ln(x + u) du]
b) d/dx [integral from 1/x to 2/x | (sin xt)/t dt]
c) d/dx [integral from 1 to 1/x | (e^(xt))/t dt]
I'm hoping to get some examples/further working in the rule in practice, so I can apply it in new equations, specifically towards the three I have for my homework assignment. So far the internet has proven quite disheartening in this regard, as while a quick search nets the equation, none seem to offer actual examples of this particular case that I need.
These are the three homework problems I need to solve with the Leibniz rule, and while I don't need the exact answers for these three, going through similar problems would be much appreciated;
a) d/dx [integral from x to x^2 | 1/ln(x + u) du]
b) d/dx [integral from 1/x to 2/x | (sin xt)/t dt]
c) d/dx [integral from 1 to 1/x | (e^(xt))/t dt]
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