For which simple closed curves $\gamma$ is $\displaystyle\int_{\gamma} z^{2}+z+1\, dz=0$
Could someone help me through this problem?
For which simple closed curves $\gamma$ is $\displaystyle\int_{\gamma} z^{2}+z+1\, dz=0$
Could someone help me through this problem?
Yet anouther way to see this is to note that the polynomial is entire. Since it is entire, we have that, by the deformation invariance theorem, the integral is zero (since the loop can be deformed continuously to a point in the domain of analyticicity).
If $f(z)$ is holomorphic, then for any closed curve $\gamma$, we have $\int_\gamma f(z)= 0$ As other also commented: See cauchy theorem
Every polynomial has a primitive and so you can use the fundamental theorem of calculus to conclude that the integral of a polynomial around a closed curve is zero.