By the classification theorem of cubic surfaces (p.6 in this paper), a cubic surface belongs to the following classes
Has at worst ADE singularities.
Has an elliptic singularity, i.e., the surface is cone over a smooth cubic curve.
Non-normal or non-integral, and singular along a curve.
So if $X$ has two singularities, $X$ belongs to case 1 and all singularities are rational. We can compute the cohomology by the minimal resolution $\tilde{X}\to X$. The surface $\tilde{X}$ is called a weak del Pezzo surface, which is still blowup of 6 points on $\mathbb P^2$, but in less general positions, so $H^{2}(\tilde{X})=\mathbb Z^7$.
Now let's do some topology: Let $E$ be the exceptional divisor. Then the long exact sequence of the pair $(\tilde{X},E)$ reads $$H^1(E)\to H^2(X)\to H^2(\tilde{X})\xrightarrow{r} H^2(E),$$
where we used $H^*(\tilde{X},E)\cong H^*(X)$ because $\tilde{X}/E\cong X$ as CW complex.
$E$ is union of two chains of rational curves over the two singularities, so $H^2(E)$ has rank $\mu_1+\mu_2$, where $\mu_i$ is the Milnor number of the singularity. Also, $H^1(E)=0$ and $r$ is surjective, so
$$H^2(X)=\mathbb Z^{7-\mu_1-\mu_2}.$$
Cohomologies at other degrees are easy to compute.