Ryan Saladores

Ryan Saladores

Answered question

2022-07-23

Answer & Explanation

karton

karton

Expert2023-06-02Added 613 answers

To solve the integral 4ln1xxdx, we can simplify the expression using logarithmic properties.
Let's start by rewriting 4ln1x:
4ln1x=eln4ln1x=eln1x·ln4
Next, we can rewrite the integral as:
4ln1xxdx=eln1x·ln4xdx
Now, we can simplify further by bringing the exponent inside the integral:
eln1x·ln4xdx=eln4·ln1xxdx
Using the property elna=a, we have:
eln4·ln1xxdx=4·ln1xxdx
We can now separate the terms and rewrite the integral as:
4·ln1xxdx=4ln1xxdx
To proceed with the integration, we can use the substitution method. Let's substitute u=ln1x:
dudx=1xdx=duu
Substituting into the integral:
4ln1xxdx=4uudu=4du=4u+C
Finally, substituting back u=ln1x:
4u+C=4ln1x+C
Therefore, the solution to the integral 4ln1xxdx is 4ln1x+C.

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