I need to find S'(x) where:
$S(x) = \int_1^{x^2}\frac{\sin{t}}{t} dt$
My first thought was to solve the definite integral first getting a function that only depends on $x$ and then derivate that.
However, trying to find the primitive of $\frac{\sin t}{t}$ seems impossible. Wolfram Alpha gives me $\int\frac{\sin{t}}{t} dt=\mathrm{Si}(t)+C$ where $\mathrm{Si}(x)$ is the sine integral. So I don't get an expression that I can derivate but a definition.
On the other side this problem should be easier than that. Let me explain:
If $F(x) = \int{x^2} dx$ then F'(x) = x^2 +C
I should be able to apply that to $S(t)$ but how?