Both arguments are variants of one and the same argument, just differently phrased. We know unconditionally that J(\sigma) \geqslant 1 for \sigma > 1 and arbitrary t\in \mathbb{R}\setminus \{0\} ...

I would go with B, one hundred ninety five dollars.\nHope that this would help you..

You are integrating an odd continuous function over [-\pi,\pi]. Hence, the integral must be 0. Added Your mistake was probably here \int_{-\pi}^{\pi}\sin(mx)\cos(nx)\,dx=\left[-{\cos((n+m)x)\over 2(n+m)}-{\cos((m-n)x)\over 2(n-m)}\right]_{-\pi}^\pi=\\=-{\cos((n+m)\pi)\over 2(n+m)}-{\cos((m-n)\pi)\over 2(n-m)}+{\cos(-(n+m)\pi)\over 2(n+m)}+{\cos(-(m-n)\pi)\over 2(n-m)}=0 ...

To find Deck transformations, you only have to know that \cos(x_1)=\cos(x_0) and \sin(x_1)=\sin(x_0) is equivalent to x_1=x_0+ 2k \pi for some k \in \mathbb{Z}. So your transformations are G=\{ \phi_k : t \mapsto t+k \ | \ k \in \mathbb{Z} \} ...

Here is one approach: \mathcal{L}(\cos(t)) = \dfrac{s}{s^2+1} \mathcal{L}\{\cos(t)u(t-\pi)\} = e^{-\pi s}\mathcal{L}(\cos(t-\pi)) = e^{-\pi s}\mathcal{L}(-\cos(t)) = -e^{-\pi s} \dfrac{s}{s^2+1} ...

We have that |\cos x-\cos y|\le |x-y| for all x,y, by the mean value theorem. This can also be established without calculus; see here for the analogous proof for |\sin x-\sin y|\le |x-y|. We ...