The integral of \(\frac{\ln x}{\cos x}\) cannot be expressed in closed form using elementary functions. While every differentiable function has an indefinite integral, most cannot be represented simply. A power series expansion can be utilized for the antiderivative around \(x = 1\), but this requires advanced knowledge of calculus. Tools like Mathematica can compute terms of the series, although the integral's complexity may hinder straightforward solutions.
PREREQUISITESStudents studying calculus, particularly high school students preparing for advanced mathematics, and educators seeking to explain complex integrals and series expansions.
Do you understand that "almost all" integrals of elementary functions cannot be written in terms of elementary functions?FL0R1 said:I putted this in Mathematica program and it didnt gave results, when i put it the program stopped, anyway.This is a indefinite integral and sure that can be found by power series but do anybody know any algebra "trick" that can go to a way.
Thanks
its an undefinite integral..dextercioby said:First, asking ## \int \frac{\ln x}{\cos x} {}dx = ? ## is not a properly formulated mathematical problem. You need to specify for which values of x the function under the integral sign makes sense in the reals, or in the complex plane. Only then you can ask yourself, for what values of x, does it make sense to consider a series expansion...
Im in high school and we didnt still learned power series, i just wanted a solution for my grade.Sure that i know power series but if i solve it with PS how can classmates understand.HallsofIvy said:Do you understand that "almost all" integrals of elementary functions cannot be written in terms of elementary functions?