The integral can exist if \alpha is not of bounded variation. Since f(x) = \cos x is monotone on [0,1], \,\, if \alpha is Riemann-Stieltjes integrable with respect to f we have by ...

Hint f(x + \pi) = \int_0^{x + \pi} \cos^4(t) \, dt Split the above interval into the sum of two integral. Use the property that \cos^4(t) is a periodic function with period \pi.

Here is a completely elementary (i.e., nothing beyond basic integration) proof. Taking advantage of the symmetries of \cos, I_{n} =\int\limits_{0}^{2\pi} \cos^{2n}(x)\,{\rm d}x =4\int\limits_{0}^{\pi/2} \cos^{2n}(x)\,{\rm d}x =4\int\limits_{0}^{\pi/2} (\cos^2(x))^{n}\,{\rm d}x =4\int\limits_{0}^{\pi/2} (1-\sin^2(x))^{n}\,{\rm d}x ...

If I=\int_a^{g(x)} f(t) \, dt where a is a constant, the fundamental theorem of calculus gives \frac{dI}{dx}=f(g(x))\, g'(x) In you case where g(x)=\cos(x) and f(t)=t^2, this leads to \frac{dI}{dx}=-\sin(x)\, \cos(x)^2

Let f(x)=\int_1^x\cos t^2\,\mathrm dt. Then F(x)=f(2x) and therefore, by the chain rule,F'(x)=2f'(2x)=2\cos\bigl((2x)^2\bigr)=2\cos(4x^2). If the upper limit is 2 and not 2x, then F is ...

It's easier to do integration by parts here: \int C(x)\mathrm dx=x\,C(x)-\int x\cos(x^2)\mathrm dx Can you take it from here?