For this particular equation, it is simple. Differentiate both sides of the equation with respect to x: f^\prime(x) = 2 (a-4) x + \lambda \int_0^1 9 t f(t) \mathrm{d} t Since the integral ...

Use integration by parts, letting u=(x^2-1)^n, and dv=dx. Then du=2nx(x^2-1)^{n-1}\,dx and we can take v=x. Thus I_n=x(x^2-1)^n -2n\int x^2(x^2-1)^{n-1}\,dx. Note that x^2(x^2-1)^{n-1}=\left((x^2-1)+1\right)(x^2-1)^{n-1}=(x^2-1)^{n}+(x^2-1)^{n-1}. ...

Hint: \begin{align}\frac{d}{dx}\left(\alpha\int_a^xf(u)du+\beta\int_x^bf(u)du\right)=(\alpha -\beta)f(x)\end{align}

From f(x) = \int_{1}^{x}f'(y)\,dy it follows that: |f(x)| \leq \int_{1}^{x}|f'(y)|\,dy \leq \sqrt{\int_{1}^{x}f'(y)^2\,dy\cdot\int_{1}^{x}1\,dy}\leq \sqrt{x-1}\,\|f'\|_2\ll\sqrt{x} hence: I_N=\int_{1}^{N}\frac{f(x)^2}{x^2}\,dx=\left.-\frac{f(x)^2}{x}\right|_{1}^{N}+2\int_{1}^{N}\frac{f(x)\,f'(x)}{x}\,dx ...

For the case where x_0=1/2, assume that |f'(x)|\le 2 for all x. Then we can conclude by the Mean Value Theorem that f(x)\le 2x \qquad\text{for}\qquad 0 \le x \le 1/2. Similarly, or by ...

The proof is correct, though invoking the fundamental theorem for this result is a bit of an over-kill. If you like, think of how to approach it quite directly. If f(x)> 0 for some x, then by ...