The given function is: $f\left(z\right)=\frac{e^{iz}}{9z^2+4}$.

If $z_0$  is an isolated singular point of f(z) . Then the integration of the function within any closed curve C  is given by:

 ${\oint }_{c}f\left(z\right)dz=b_1·2\pi i$

Here, $b_1$  is the residue.

As we know, the residue of the function is given by:

 $R\left(z=z_0\right)=\frac{g\left(z_0\right)}{h\text{'}\left(z_0\right)}$, for $f\left(z\right)=\frac{g\left(z\right)}{h\left(z\right)}$ 

According to the question, we have:

 $$\begin{gathered} g\left(z\right)=e^{iz} \\ h\left(z\right)=9z^2+4\Rightarrow h\text{'}\left(z\right)=18z \end{gathered}$$

Now, the residue at $z_0=\frac{2i}{3}$ will be:

 $\begin{array}{rcl}R\left(\frac{2i}{3}\right)& =& \frac{g\left(\frac{2i}{3}\right)}{h\text{'}\left(\frac{2i}{3}\right)}\\ & =& \frac{e^{i·\frac{2i}{3}}}{18\left(\frac{2i}{3}\right)}\\ & =& \frac{e^{-\frac{2}{3}}}{12i}=-i\left(\frac{e^{-\frac{2}{3}}}{12}\right)\\ & =& -0.042785i\end{array}$

Hence, the residue of the function at $z_0=\frac{2i}{3}$  is $-0.042785i$.