\input zb-basic \input zb-matheduc \iteman{ZMATH 2015c.00801} \itemau{Nagle, Courtney; Moore-Russo, Deborah} \itemti{The concept of slope: comparing teachers' concept images and instructional content.} \itemso{Investig. Math. Learn. 6, No. 2, 1-18 (2013).} \itemab Summary: In the field of mathematics education, understanding teachers' content knowledge and studying the relationship between content knowledge and instructional are both crucial. Teachers need a robust understanding of key mathematical topics and connections to make informed choices about which instruction tasks will be assigned and how the content will be represented. {\it L. Ma} [Knowing and teaching elementary mathematics. Teachers' understanding of fundamental mathematics in China and the United States. Mahwah, NJ: Lawrence Erlbaum (1999; ME 1999d.02385)] described this profound understanding of fundamental mathematics as how accomplished teachers conceptualize key ideas in mathematics with a deep and flexible understanding so that they are able to represent those ideas in multiple ways and to recognize how those ideas fit into the preK--16 curriculum. Slope is a fundamental topic in the secondary mathematics curricula. Unit rate and proportional relationship introduced in sixth grade prepare students for interpreting equations such as $y = 2x-3$ as functions with particular, linear behavior in eight grade. The focus on relationships with constant rate of change leads to distinctions between linear and non-linear functions and the idea of average rate of change in high school. Ultimately, these ideas prepare students for instantaneous rates of change and the concept of a derivative in calculus. The diversity of conceptualizations and representations of slope across the secondary mathematics curriculum presents a challenge for secondary teachers. These teachers must work flexibly and fluently with various representations in the many contexts in order for their students to build a coherent, connected conceptualization of slope. Since secondary mathematics teachers need a deep understanding of slope to mediate students' conceptual development of this key topic, the study reported here investigates both how teachers think about and present slope. \itemrv{~} \itemcc{I29 I49 C39 D39} \itemut{slope; teachers' concept images; teachers' content knowledge; rates of change; derivative; instructional knowledge; linear functions; non-linear functions} \itemli{} \end