Is there any repesentation of $\gamma$ (Euler-Mascheroni constant) of the form:
$$\int_2^\infty f(t) dt = \gamma ?$$
I have not yet found any (there are plenty of integral representations of this constant in Wolfram's Functions site but none starting by 2). I was just curious about it, since bot $\gamma$ and $2$ are important constants in Analytic Number Theory.
You could just change variables in, say, the familiar $$ \gamma = \int_1^\infty \left(\frac{1}{\lfloor x\rfloor} - \frac1x\right)\;dx$$ giving $$ \gamma = \int_2^\infty \left(\frac{1}{\lfloor t-1\rfloor} - \frac1{t-1}\right)\;dt$$