We study the relations between finitistic dimensions and restricted injective dimensions. Let $R$ be a ring and $T$ a left $R$-module with $A={\mathrm{End}}_{R}T$. If ${}_{R}T$ is selforthogonal, then we show that $\mathrm{rid}\left(T_A\right)\le \mathrm{findim}\left(A_A\right)\le \mathrm{findim}{(}_{R}T)+\mathrm{rid}\left(T_A\right)$. Moreover, if $R$ is a left noetherian ring and $T$ is a finitely generated left $R$-module with finite injective dimension, then $\mathrm{rid}\left(T_A\right)\le \mathrm{findim}\left(A_A\right)\le \mathrm{fin}.\mathrm{inj}.\dim {(}_{R}R)+\mathrm{rid}\left(T_A\right)$. Also we show by an example that the restricted injective dimensions of a module may be strictly smaller than the Gorenstein injective dimension.