To integrate the function 1/x with bounds 4 and 1, we use the following definite integral formula:
∫(from 1 to 4) 1/x dx = [ln|x|] (from 1 to 4)
Now, we substitute the bounds into the formula:
[ln|4|] - [ln|1|]
Simplify further:
ln(4) - ln(1) = ln(4)
Therefore, the integral of 1/x from 1 to 4 is ln(4).
integrate with bound 4 and 1 equation 1/x dx
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