Description: f(n) is Ω(g(n)) if there exist constants c>0 and n0≥0 such that f(n)≥c.g(n) for all n≥n0 where f(n) denotes the worst-case running time ie.f(n)=32n2+17n+1→f(n) is both Ω(n2) and Ω(n) lower bound