Our aim is to determine the lower central series (LCS) and derived series (DS) for the braid groups of the sphere and of the finitely-punctured sphere. We show that for all n (resp. all n\geq 5), the LCS (resp. DS) of the n-string braid group B_n(S^2) is constant from the commutator subgroup onwards, and that \Gamma_2(B_4(S^2)) is a semi-direct product of the quaternion group by a free group of rank 2. For n=4, we determine the DS of B_4(S^2), as well as its quotients. For n \geq 1, the class of m-string braid groups B_m(S^2) \ {x_1,...,x_n} of the n-punctured sphere includes the Artin braid groups B_m, those of the annulus, and certain Artin and affine Artin groups. We extend results of Gorin and Lin, and show that the LCS (resp. DS) of B_m is determined for all m (resp. for all m\neq 4). For m=4, we obtain some elements of the DS. When n\geq 2, we prove that the LCS (resp. DS) of B_m(S^2) \ {x_1,...,x_n} is constant from the commutator subgroup onwards for all m\geq 3 (resp. m\geq 5). We then show that B_2(S^2\{x_1,x_2}) is residually nilpotent, that its LCS coincides with that of Z_2*Z, and that the \Gamma_i/\Gamma_{i+1} are 2-elementary finitely-generated groups. For m\geq 3 and n=2, we obtain a presentation of the derived subgroup and its Abelianisation. For n=3, we see that the quotients \Gamma_i/\Gamma_{i+1} are 2-elementary finitely-generated groups.