Comparison Test for improper integral

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sanhuy
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Homework Statement


use the comparison theorem to determine whether ∫ 0→1 (e^-x/√x) dx converges.

Homework Equations


I used ∫ 0 → 1 (1/√x) dx to compare with the integral above

The Attempt at a Solution


i found that ∫ 0 → 1 (1/√x) dx = 2 ( by substituting 0 for t and take the limit of the defenite integral as t → 0^+) thus it is convergent. and (1/√x) > (e^-x/√x) so ∫ 0→1 (e^-x/√x) dx also converges.

But in my textbook they only use the comparison theorem for the limits of integration from 0 to ∞. would it still be acceptable to use the comparison theorem for this problem for limits of integration from 0 to 1.
Thanks for reading :).
 
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sanhuy said:
But in my textbook they only use the comparison theorem for the limits of integration from 0 to ∞. would it still be acceptable to use the comparison theorem for this problem for limits of integration from 0 to 1.
Thanks for reading :).
I don't see any particular reason why the comparison theorem for integrals wouldn't be valid with other limits of integration than ##0## to ##\infty##.

See for example here.