Indeed, the proof in the book show that if $G$ is a bounded complex of quasi-coherent sheafs with coherent cohomologies, then there is a subcomplex $G_1\subseteq G$ with same cohomologies of $G$, where $G_1$ is bounded complex of coherent sheafs. Then it is not difficult to show two bounded categories have same hom set.
In fact, here $C^b(Coh(X))$ is cofinal subcategoy of $C^b(Qcoh X)$. In general, the following is true:
Let $S$ is a multiplicatively closed subset of an additive category $\mathcal A$, suppose $\mathcal B$ is full subcategory of $\mathcal A$, if $S\cap \mathcal B$ is also a multiplicatively closed subset of $\mathcal B$. If for any $s: X\rightarrow Y$ in $S$, where $X\in \mathcal A$ and $Y\in \mathcal B$, there exists $t:Z\rightarrow X$ with $Z\in \mathcal B$ such that $st\in S$, then $(S\cap \mathcal B)^{-1}\mathcal B\rightarrow S^{-1}\mathcal A$ is fully faithful.