In this lesson, students use coordinates to make conjectures and prove simple geometric theorems algebraically. They begin with some informal reasoning in a “Which One Doesn’t Belong” prompt. In the next activity, students use slopes to classify a quadrilateral. Then, they use inductive reasoning to observe a pattern and make a conjecture which will be generalized in a subsequent unit. Students have an opportunity to attend to precision in mathematical language (MP6) as they write and refine their conjectures. At the end of the lesson, students critique each other’s reasoning (MP3) about properties of the quadrilaterals from the warm-up.
One of the activities in this lesson works best when each student has access to devices that can run the Desmos applet, because students will benefit from seeing the relationship in a dynamic way.
- Prove simple geometric theorems algebraically using coordinates.
- Let’s use coordinates to prove theorems and to compute perimeter and area.
Devices and index cards are required for the digital version of the Circular Logic task.
- I can use coordinates of figures to prove geometric theorems.
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