Step 1: First Integration by Parts: Let $I = \int e^x \cos x \, dx$. Using the ILATE rule, let $u = \cos x$ and $dv = e^x \, dx$.
Then $du = -\sin x \, dx$ and $v = e^x$.
Using $\int u \, dv = uv - \int v \, du$:
$$I = e^x \cos x - \int e^x (-\sin x) \, dx$$
$$I = e^x \cos x + \int e^x \sin x \, dx$$
Step 2: Second Integration by Parts: Now, integrate $\int e^x \sin x \, dx$. Let $u = \sin x$ and $dv = e^x \, dx$.
Then $du = \cos x \, dx$ and $v = e^x$.
$$\int e^x \sin x \, dx = e^x \sin x - \int e^x \cos x \, dx$$
$$\int e^x \sin x \, dx = e^x \sin x - I$$
Step 3: Solve for $I$: Substitute this back into the equation for $I$:
$$I = e^x \cos x + (e^x \sin x - I)$$
$$2I = e^x (\cos x + \sin x)$$
$$I = \frac{1}{2} e^x (\cos x + \sin x) + c$$