Suppose k_n denotes either φ(n) or φ(p_n) (n = 1,2,... ) where the polynomial φ maps the natural numbers to themselves and p_k denotes the k^th rational prime. Let (r_n/q_n)_n=1^∞ denote the sequence of convergents to a real number x and define the the sequence of approximation constants (θ_n(x))_n=1^∞ by θ_n(x) = q_n²∣ x - (r_n/q_n)∣ (n = 1,2, ... ). In this paper we study the behaviour of the sequence (θ_kn(x))_n=1^∞ for almost all x with respect to Lebesgue measure. In the special case where k_n = n (n = 1,2,... ) these results are due to W. Bosma, H. Jager and F. Wiedijk.