Q&A for How to Find How Many Diagonals Are in a Polygon

The basic formula to find the number of diagonals in a polygon is n(n-3)/2.

You can draw six, one for each of the vertices, except for the vertex you're drawing from, and the two adjacent vertices.

It is the same relationship for any polygon, as expressed in the formula n(n-3)/2.

If you had (n-1) sides you would simply plug (n-1) into the equation as the variable: n(n - 3)/2 = (n-1)((n-1) - 3)/2. Simplifying terms yields ((n-1)(n-4))/2. You can either leave it at that, or expand using FOIL: (n^2 - 5n + 4)/2.

It depends on the shape of the base. A square or rectangular base has two diagonals, a pentagonal base has three diagonals, etc. The slanted surfaces are always triangles and have no diagonals.

If a regular polygon has n sides, each angle equals [(n-2)(180°)] / n. For example, a regular pentagon has five sides, so each interior angle is [(5 - 2)(180°)] / 5 = [(3)(180°)] / 5 = 540° / 5 = 108°. (If the polygon is not regular, there is no formula available to calculate the interior angles.)

Substitute 11 for (n) in either of the formulas shown above.

Substitute (n-1) for (n) in the first formula shown above: (n-1)[(n-1) - 3] / 2 = [(n-1)(n-4)] / 2 = (n² - 5n + 4) / 2. The number of diagonals is (n² - 5n + 4) / 2.

Using the above formula, (16)(13) / 2 = 104.

The n-3 comes from picking any of the n vertices and subtracting the 3 vertices we can't draw a diagonal to, itself and the neighbouring vertices on each side. The /2 is because n(n-3) counts a diagonal from A to B, and again from B to A, even though it's really the same diagonal regardless of direction. Dividing by 2 counts corrects this overcount and counts every diagonal once.

In each polygon, n(n-3)/2 is the number of maximum diagonals. If you are asking for maximum number of diagonals in a highest polygon, there are an infinite number of sides. Thus, no fixed maximum number of diagonals.