expectation of random probability measure

Given $mu(omega, B)$ is a random probability measure on $mathbb{R}_{geq 0}$. This means for each $B$, it is a random variable, and for each $omega$ it is a probability measure.

How could I show that
$$mathbb{E}bigg[int_mathbb{R} f dmubigg] =int_mathbb{R} f dmathbb{E}[mu]$$
where $f$ is a bounded continuous function?

If $f$ is also differentiable, using Fubini theorem, we can rewrite
$$int_mathbb{R} f dmu = int_0^infty f dmu=int_0^infty f'(x)mu(x,infty) dx.$$
Is there any measurability issue for $mu(x,infty)$ when switching the expectation with the integral in the term below
$$mathbb{E}bigg[int_0^infty f'(x)mu(x,infty) dxbigg]?$$