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Explanation:
Let t = logx => e^t = x
=> dt= (1/x) . dx or dx = e^t . dt
∴, ∫(1/log x) dx = ∫e^t. dt/t = ∫ t^-1 . e^t. dt
Using integration by parts,
∫udv = uv - ∫vdu
In ∫t^-1 . e^t. dt
Take, u=t ^−1 => du=−t^−2.dt
∫dv=∫e^tdt => v=e^t
Now substituting,
∫(1/log x) dx = t^−1.e^t−∫e^t (−t^−2) dt
Similarly using integration by parts, we have to integrate ∫t^−2.e^t. dt
This is a never ending integral and the approximate value is:
∫(1/log x) dx = t ^−1 . e^t+t ^−2. e^t+ 2 . t ^−3 .e^t+ 6.t ^−4 . e^t + …..
Hope it helps!!
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