(Super)conformal mechanics in one dimension is induced by parabolic or hyperbolic/trigonometric transformations, either homogeneous (for a scaling dimension λ) or inhomogeneous (at λ = 0, with ρ an inhomogeneity parameter). Four types of (super)conformal actions are thus obtained. With the exclusion of the homogeneous parabolic case, dimensional constants are present. Both the inhomogeneity and the insertion of λ generalize the construction of Papadopoulos [Class. Quant. Grav. 30, 075018 (2013); e-print arXiv:1210.1719]. Inhomogeneous D-module reps are presented for the d = 1 superconformal algebras osp(1|2), sl(2|1), B(1, 1), and A(1, 1). For centerless superVirasoro algebras, D-module reps are presented (in the homogeneous case for ${\cal N}=1,2,3,4$N=1,2,3,4; in the inhomogeneous case for ${\cal N}=1,2,3$N=1,2,3). The four types of d = 1 superconformal actions are derived for ${\cal N}=1,2,4$N=1,2,4 systems. When ${\cal N}=4$N=4, the homogeneously induced actions are D(2, 1; α)-invariant (α is critically linked to λ); the inhomogeneously induced actions are A(1, 1)-invariant.
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