We study the one-level density of Artin $$L$$ L -functions twisted by a cuspidal automorphic representation under the strong Artin conjecture and certain conjectures on counting number fields. Our result is unconditional for $$S_3$$ S 3 -fields. For a non-self dual $$\pi $$ π , it agrees with the unitary type $$\text {U}$$ U . For a self-dual $$\pi $$ π whose symmetric square $$L$$ L -function $$L(s,\pi ,\text {Sym}^2)$$ L ( s , π , Sym 2 ) has a pole at $$s=1$$ s = 1 , it agrees with the symplectic type $$\text {Sp}$$ Sp . For a self-dual $$\pi $$ π whose exterior square $$L$$ L -function $$L(s,\pi ,\wedge ^2)$$ L ( s , π , ∧ 2 ) has a pole at $$s=1$$ s = 1 , the possible symmetry types are $$\text {O}$$ O , $$\text {SO(even)}$$ SO(even) , or $$\text {SO(odd)}$$ SO(odd) . When $$\pi =1$$ π = 1 , for $$S_3$$ S 3 cubic fields and $$S_4$$ S 4 quartic fields, we rediscover Yang’s one-level density result in his thesis (Yang 2009). In the last section, we compute the one-level density of several families of Artin $$L$$ L -functions arising from parametric polynomials.