Leo designs a piece of jewelry in the shape of a regular pentagon

Question

asked Jun 28, 2024 58.2k views

1 Answer

Dmitrii Cooler · Answer 1 · 2024-07-04T23:18:40+0000

So, each interior angle in Leo's designed piece of jewelry, in the shape of a regular pentagon, measures
$$ 108^\circ $.$

In a regular pentagon, all interior angles are equal. The formula to calculate the measure of each interior angle in a regular polygon is given by:

$\text{Interior Angle} = ((n-2) * 180^\circ)/(n)$

where
$n$ is the number of sides. For a regular pentagon
$($ n = 5 $)$ , the calculation would be:

$\text{Interior Angle} = ((5-2) * 180^\circ)/(5) = (3 * 180^\circ)/(5) = 108^\circ$

So, each interior angle in Leo's designed piece of jewelry, in the shape of a regular pentagon, measures
$$ 108^\circ $.$

The probable question maybe:

What is the measure of each interior angle in Leo's designed piece of jewelry, considering it is in the shape of a regular pentagon?