Let $\mathrm{b}_1 \mathrm{~b}_2 \mathrm{~b}_3 \mathrm{~b}_4$ be a 4 -element permutation with $\mathrm{b}_{\mathrm{i}} \in\{1,2,3, \ldots \ldots \ldots, 100\}$ for $1 \leq \mathrm{i} \leq 4$ and $\mathrm{b}_{\mathrm{i}} \neq \mathrm{b}_{\mathrm{i}}$ for $\mathrm{i} \neq \mathrm{j}$, such that either $b_1, b_2, b_3$ are consecutive integers or $b_2, b_3, b_4$ are consecutive integers. Then the number of such permutations $\mathrm{b}_1 \mathrm{~b}_2 \mathrm{~b}_3 \mathrm{~b}_4$ is equal to $\_\_\_\_$