You are essentially using the Law of Total Expectation; see the accepted answer here for a review: https://math.stackexchange.com/questions/521609/finding-expected-value-with-recursion . Let N be ...

Remark that x \cdot (x+2) + 1 = x^2 + 2x + 1 = (x+1)^2 , so: \sqrt{x \cdot (x+2) + 1} = \sqrt{(x+1)^2} = |x+1| You may also note that: For x \geq -1 , we have |x+1| = x+1 For x \leq -1 ...

Suppose that our equation \sqrt{x^2+b^2}+\sqrt{x^2+c^2}=a.\tag{1} holds. Assume a\ne 0 and b\ne c. Flip both sides over. We get \frac{1}{\sqrt{x^2+b^2}+\sqrt{x^2+c^2}}=\frac{1}{a}. ...

You will have no problems if you always use \sqrt{x^2}=|x|. In particular, \sqrt{-x^3}=|x|\sqrt{-x}. If x is negative, which it is in our problem, we can replace |x| by -x. In your second ...

S={\iint_{E}{\sqrt{1+4x^2}}dxdy} S={\int_{x=0}^1\int_{y=0}^{x}\sqrt{1+4x^2}dydx} S={\int_{x=0}^{1}\sqrt{1+4x^2}dx}{\int_{y=0}^xdy} S={\int_{x=0}^{1}{x\sqrt{1+4x^2}}dx} By substitution ...