Let Pk denote the set of all algebraic polynomials of degree at most k with real coefficients. Let Pn,k be the set of all algebraic polynomials of degree at most n+k having exactly n+1 zeros at 0. Let ∥f∥A:=x∈Asup∣f(x)∣ for real-valued functions f defined on a set A⊂R. Let Vab(f):=∫ab∣f′(x)∣dx denote the total variation of a continuously differentiable function f on an interval [a,b]. We prove that there are absolute constants c1>0 and c2>0 such that c1kn≤P∈Pn,kminV01(P)∥P′∥[0,1]≤P∈Pn,kmin∣P(1)∣∥P′∥[0,1]≤c2(kn+1) for all integers n≥1 and k≥1. We also prove that there are absolute constants c1>0 and c2>0 such that c1(kn)1/2≤P∈Pn,kminV01(P)∥P′(x)1−x2∥[0,1]≤P∈Pn,kmin∣P(1)∣∥P′(x)1−x2∥[0,1]≤c2(kn+1)1/2 for all integers n≥1 and k≥1.