Gió Apr 5, 2015 Have a look:

Notice that for f(x)=\sqrt x \ln x you have f'(x)=\frac{\ln x}{2\sqrt x}-\frac1{\sqrt x}. Now by mean value theorem f(n+1)-f(n) = f'(\theta_n) for some \theta_n such that n<\theta_n<n+1 ...

Let x=f(y) and we assume that we can write y=f^{-1}(x). Then \int dx \, f^{-1}(x) = y f(y) - \int dy \, f(y) = x f^{-1}(x) - F[f^{-1}(x)] as you stated. x=\frac12 \left ( y^2 + y^{-2}\right ) \implies y^4 - 2 x y^2 + 1 =0 \implies y^2=x\pm \sqrt{x^2-1} ...

The key mistake you made here is your simplification of square roots. Actually, since a square root is positive always, you should get \vert F_1P\vert = \frac{|4p+25|}{5} and \vert F_2P\vert = \frac{|4p-25|}{5} ...

How did he find the solution? I don't know. But you can verify that it IS the solution by differentiating and seeing that it satisfies the equation, and then also checking that at time 0 the value ...

Your step three isn't correct. It should read There exist p, q \in \mathbb{Q}(\sqrt{2}) with \sqrt{1 + i}^2 + p \sqrt{1 + i} + q = 0 Your step uses a minimum polynomial of degree less than 2 ...