Definite integration: $int_1^2 frac{(1+ln x)^5}{x}dx$

Question

Evaluate following definite integral:
$$int_1^2 frac{(1+ln x)^5}{x}dx$$
I solved this integral with a substitution rule: $u=ln x$, $du=dx/x$
$$int_1^2 frac{(1+ln x)^5}{x}dx=int_0^{ln 2} (1+u)^5 du$$
solved and got an answer $1.97$. But I got a different result from that others i.e; $3.75$.
I am just wondering am I right or wrong?
Thanks in advance.

Harish Chandra Rajpoot · Accepted Answer

Let $1+ln x=uimplies frac{dx}{x}=du$
$$int_1^2frac{(1+ln x)^5}{x} dx=int_1^{1+ln 2}u^5 du=frac{1}{6}((1+ln 2)^6-1)approx color{blue}{3.76}$$

Definite integration: $int_1^2 frac{(1+ln x)^5}{x}dx$

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