\(An = x^{n-1} + x^n + x^{n+1} + x^{n+2} + x^{n+3}\)
e.g. \(A2 = x + x^2 + x^3 + x^4 + x^5\)
Notice you can only take x common out of all these terms i.e. the smallest term \(x^{n - 1}\)

If \(\frac{An}{{x(1+x(1+x(1+x(1+x))))}} = x^5\), it means the part: (1+x(1+x(1+x(1+x)))) will get canceled from the num and den. Ignore it.
From An, you will be able to take out \(x^6\) common so that \(\frac{x^6}{x}\) gives you \(x^5\)
So smallest term must be \(x^6\) i.e. \(x^{n-1}\). Therefore, n = 7.

Answer: B