A collection of results relating to algebraic rules of convergence. If real (or complex) sequences a_n and b_n converge to limits A and B, then a_n + b_n converges to A + B, a_nb_n converges to AB and a_n/b_n converges to A/B provided B ≠ 0 ≠ b_n. Similar results apply to the sums of series and limits of functions.