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Thought for the day: Don't tell students anything when you first display a prompt. Ask them what they notice and wonder, and let their ideas flow before you begin to focus their thinking on specific ideas!

Concepts: area (possibly polygons and perimeter) 

Creating

As they notice and wonder, students may create and explore their own polygons. Many of their creations may flow out of things that they have wondered about. For example, they may

Create more polygons whose area is 4 square units. (Try for variety!)
Create a variety of polygons having some chosen fractional area (such as 2.5 square units).
Try to make their polygons look like recognizable objects (real or imaginary).
Create polygons using smaller pieces of squares (such as quarter-squares).
Create polygons that have the same area but as many different perimeters as possible.

Reflecting and Extending
I notice that polygons with the same area can look very different.
I notice that polygons with the same area can have different perimeters.
I wonder how may triangles (or other shapes like pentagons or hexagons) I can create that have areas of 4 square units.
I wonder what is the smallest (or largest) perimeter I can make for a polygon whose area is 4 square units.

Notes

A related Creative Math Prompt is part of an extended activity called "Area Challenge" on the Deep Math Projects page of this site. You can use this activity to learn more about the concepts in this prompt.

This prompt is focused on area, but it can also lead to great discussions about perimeter—or even about the meaning of the word polygon, especially for younger students. For example, when my students were trying to create more polygons of area 4, I once had a student who asked if this was a polygon: