I taught abstract algebra to a class dominated by education majors for a few years.  Much of the "applications" from the course were either algebraic facts which are familiar to calculus students, or modular arithmetic.  For example, we spent a couple weeks on Peano arithmetic.  The theory of polynomials illuminates the theory of partial fractions.  Many "individual concepts" appear along the way.  For example the concept of a ring is quite natural after you've been discussing numbers and polynomials in the same style.  While more difficult, the notion of equivalence classes appear when you define rational numbers or rational functions precisely.  I found that education students were sufficiently motivated by the clarity and authority that comes from proving such standard facts.  And modular arithmetic is just fun for everyone.  I have some notes on my OU webpage with a large "collection of questions" for this course.