Polygon Sides Quiz: Can You Classify Them All?

The term "heptagon" comes from the Greek prefix hepta - meaning seven and gonia meaning angle, so knowing how many sides to a heptagon is as simple as matching its prefix to the number 7. In the same way, understanding how many sides do nonagon have comes from its nona - prefix that denotes nine. This naming pattern applies consistently across polygons, from tetragon (4) up to dodecagon (12) and beyond.

Use the formula (n − 2) × 180° to find the total interior angle sum of any n-sided polygon - so a heptagon's sum is (7 − 2) × 180° = 900° and a nonagon's is (9 − 2) × 180° = 1260°. This key relation appears in virtually every high school and university geometry textbook, including Euclid's Elements and modern resources like Stewart's Calculus. Mastering it helps you verify your side counts through angle measures.

In a regular n-gon, each interior angle equals [(n − 2) × 180°] / n, giving about 128.57° for a regular heptagon and exactly 140° for a regular nonagon. This formula, featured in college geometry courses, lets you see at a glance why some shapes tessellate (like hexagons) and others do not. Working through a few examples cements the link between side count and angle size.

The number of diagonals in an n-sided polygon follows n(n − 3)/2, yielding 14 diagonals for a heptagon and 27 for a nonagon. Drawing these diagonals can solidify how the sides connect, reinforcing the concept of how many sides has a heptagon have in relation to vertex connections. This combinatorial approach is also covered in discrete math and combinatorics syllabi.

Memory aids like "Heppy Seven" for heptagon and "Nona the Cat with Nine Lives" for nonagon make recall both playful and efficient. Spot real-world heptagons in seven-segmented road signs or architectural features like the UK's seven-sided bollards, and nonagons in international stop-sign variants. Linking shapes to everyday objects shows that polygons aren't just abstract - they're all around us.