(f(0))^2+8=\int\limits_0^0f(t)dt=0\Rightarrow(f(0))^2=-8 which is a contradiction since f is real valued.

suppose f is differentiable. differentiating (f(x))^2+C=\int\limits_0^xf(t)dt \tag 1 gives us 2ff' = f \to f' = \frac12, f = \frac12x + k puuting it back in (1) we get \left(\frac12x + k\right)^2 + C= \frac14 x^2 + kx ...

If h is continuous on \mathbb{R}, then the function \phi(x) = \int_0^x h(t) dt is differentiable on \mathbb{R}, with derivative \phi'(x) = h(x). To see this, choose x \in \mathbb{R}, and ...

A random variable X \colon \Omega \to \mathcal{X} is a measurable function, where (\Omega, \mathcal{F}, P) is a probability space and (\mathcal{X}, \mathcal{A}) is a measurable space. So X^{-1}A = \{\omega \in \Omega \colon X(\omega) \in A\} ...

HINT: This is a problem about the fundamental theorem of calculus. It says that if F(x)=\int_a^xf(t)~dt\;, then F'(x)=f(x). You’ve been given F(x); use the fundamental theorem to find the f(x) ...

The conditional distribution is definitely not the same as the marginal distribution. A better notation, for reasons I could go into, is f_{Y\,\mid\,X} (y). This is the conditional density of Y ...