\int_{0}^{2} (1-x)^2 dx = F(x) |_{0}^{2} while we should have \frac{\partial{F(x)}}{\partial x} = (1-x)^2. It is easy to show that (especially if you set u=x-1 and then using chain rule): F(x) = - \frac{1}{3} (1-x)^3 \Rightarrow \frac{\partial{F(x)}}{\partial x} = (1-x)^2 ...

One definition of (-1)^x is e^{i \pi x}; this is the plot shown in the OP. If you keep this definition over the whole domain [0,1], then \int_0^1 (-1)^x dx = \int_0^1 \cos(\pi x) dx + i \int_0^1 \sin(\pi x) dx = \frac{2i}{\pi}. ...

In general, F(x)=\int_{-\infty}^x f(t)\,dt, where f is the density function. If you prefer, you can write \int_{-\infty}^x f(x)\,dx. (The second notation can be confusing, since x appears ...

The most you can say/prove is that the integral and the series are equal (easy to prove), and that the integral has no elementary anti-derivative (hard to prove, but there's one if you know some ...

Your argument is wrong. You get nothing by differentiating the equation \int f^{2}=1 because there are no functions in this equation. Here is a correc t argument: \int_0^{1} xf(x)f'(x)\, dx=\frac 1 2 x(f(x)^{2}|_0^{1} -\frac 1 2\int_0 ^{1} f(x)^{2}\, dx=-\frac 1 2 ...

Let p(x)=ax^2+bx+c. Then we have: \int_0^1p(x)dx = \left[\frac{a}{3}x^3+\frac{b}{2}x^2+cx\right]_0^1 = \frac{a}{3}+\frac{b}{2}+c Thus, your solution should be all p(x) with \frac{a}{3}+\frac{b}{2}+c=1 ...