We have \displaystyle\int_0^T e^{-t/T} dt Put z=\dfrac{-t}{T} and so dz=\dfrac{-1}{T} dt So,dt = -T dz In limits, when t=0, then z=0 and when t=T, then z=-1 So, \displaystyle\int_0^T e^{-t/T} dt ...

As an addendum to the previous answer, you actually do not need to compute any derivative since the Maclaurin series of the exponential function is fairly well-known: e^{iz} = 1 + iz -\frac{z^2}{2} + O(z^3) ...

Use Green's Theorem : If \gamma:\quad t\mapsto \bigl(x(t),y(t)\bigr)\qquad(0\leq t\leq T) is a simply closed curve bounding counterclockwise a region B\subset{\mathbb R}^2 then {\rm area}(B)={1\over2}\int_0^T\bigl(x(t)\dot y(t)-y(t)\dot x(t)\bigr)\>dt\ . ...

Let x=e^t. Then dx = e^t dt Hence, the integral becomes \int \frac{dx}{x^3 (x+1)} \frac1{x^3(x+1)} = \frac1{x^3} - \frac1{x^2} + \frac1{x} - \frac1{x+1} Now integrate to get the answer \int \frac{dx}{x^3 (x+1)} = \int \frac{dx}{x^3} - \int \frac{dx}{x^2} + \int \frac{dx}{x} - \int \frac{dx}{x+1} = -\frac1{2x^2} + \frac1{x} + \log(x) - \log(x+1) ...

You can easily draw the shape by substituting convenient values for \theta. To find the area, use the formula \displaystyle A=\frac{1}{2}\int_a^{b}r(\theta)^2d\theta. The integration proceeds as ...

The key point in the evaluation of I or J over C (which is nearly just the real axis from minus to plus infinity), is that you are ignoring the contribution of the "return path" C_+^{\text{top}} ...