Note: (2x+5)^2 \neq 2x^2 + 5^2. Remember: (2x+5)^2 = (2x+5)(2x+5).

Consider the function p:\quad y\mapsto x:=3y-y^3\qquad(-\infty<y<\infty)\ ; its graph is a cubic parabola. The function p is odd, has a local minimum at (-1,-2), a local maximum at (1,2), ...

Often it helps to use cumulative distribution functions. First, F(x) = \Pr((a-d)^2 \le x) = \Pr(|a-d| \le \sqrt{x}) = 1 - (1-\sqrt{x})^2 = 2\sqrt{x} - x. Next, G(y) = \Pr(4 b c \le y) = \Pr(b c \le \frac{y}{4}) = \int_0^{y/4} dt + \int_{y/4}^1\frac{y\,dt}{4t} = \frac{y}{4}\left(1 - \log\left(\frac{y}{4}\right)\right). ...

You are correct: The space of continuous functions on [-1,1] is not a Hilbert space under the inner product (f,g)=\int_{-1}^{1}f(x)g(x)dx. However, for any inner product space X, and fixed f \in X ...

If x\le 0 then F(x) = \int_{-1}^x -t dt = {1 \over 2} (1-x^2). If x\ge 0 then F(x) = F(0) + \int_0^x t dt = {1 \over 2} (1+x^2). Combining gives F(x) = {1 \over 2} (1+x|x|). It is easy to ...

The problem is in your last integral: \int_1^x (2-t)dt = 2t - \frac{t^2}{2} \bigg|_1^x = \left( 2x-\frac{x^2}{2} \right) -\left( 2-\frac{1}{2} \right) = -\frac{x^2}{2} + 2x -\frac{3}{2}. Then, ...