ABSTRACT
In this chapter second order linear conformable dynamic equations are investigated. There are several kinds of second order linear homogeneous equations, which we solve in the constant coefficient case. Wronskian determinants are introduced, and from them a conformable version of Abel's theorem is proved. Certain conformable dynamic equations of second order with nonconstant coefficients are also considered. We present a variation of constants formula for solving nonhomogeneous second order linear conformable dynamic equations.
