The main purpose of this study is to find out what conceptions senior high school students in Taiwan may have in relation to parabola, ellipse and hyperbola after formal instruction. A further purpose is to identify the kinds of mental models that students may perceive about these three mathematical objects. This study adopted a qualitative analysis approach and was executed in three stages, each with its specific purpose. This study began by interviewing with graduate students in science education with different background to help formulate its research question. This formed the explorative stage of the present study. During the second adjustment stage, in order to help focus the research direction, a general test on conic sections was compiled. After administering the test to a group of senior high school students, a number of them were recommended by their math teacher to be interviewed by the present researcher. However, it was later found out that their performance in the clinical interview did not quite related to those presented in the written test. After discussing with an expert, it is decided to pick up an extra senior high school the average abilities of its students was no difference from the previous one. 12 students with different genders and different academic abilities from the two senior high schools were selected by the present researchers as participants in the third stage, the formal stage. The students were given diagrams with portions of curves from different conic sections and were then probed for various mathematical judgment. After data coding and analysis, it was found that some of the participants did reveal certain mental models when they thought of different conic sections. For the parabola, the mental models found include the rocket model and a parabola-like model. The mental models for ellipse include the playground model and an ellipse-like model. As for the hyperbola, the mental models include the two-parabola model and a hyperbola-like model. Besides these mental models, there is an extra one known as the graphic model with which the participants were affected by the shape of the curves. It was also found that there were six concepts that the participants used to distinguish between various curves. They were the concept of opening, infinity, “radian,” symmetry, asymptote, and mathematical definitions of the mathematical objects. In particular, the way the concept “radian” was used was different from the formal definition. Here, it was used to describe the degree of bending of a curve and was used as a daily term. In general, it was found that many participants could not master a deeper realization of the definitions of conic sections. The results revealed that many participants still held different mental models regarding the mathematical objects about which they were being instructed. This study suggested that mathematics teachers should focus on the definition of parabola, ellipse, and hyperbola and try to enhance students’ understanding regarding their differences. Moreover, they may consider introducing the concept of eccentricity to help clarify the differences between parabola, ellipse, and hyperbola.