# How To Find The Area Of A Pentagon Calculator

February 5, 2022 By Vaseline How To Find The Area Of A Pentagon Calculator. The area of heptagon formula is defined as measure of the total area that the surface of the object occupies of heptagon (7/4)* (side a^2/tan (80/7)) or a= (7/4) (a^2) (cot (pi/7)) square units is calculated using area = (7/4)* ( side ^2/ tan ( pi /7)). The area of pentagon calculator instantly calculates the properties of pentagon using the given values. How to Find the Area of Regular Polygons (with Examples) from www.wikihow.com

Please follow the below steps to find the area of a pentagon: To calculate area of heptagon, you need side (s). Sides are equal, angles are equal = 72 degrees.

### = (5 ⁄ 2) × 10 × 5 Cm 2.

To calculate area of pentagon given radius, you need radius (r) & angle a (∠a). Click on the reset button to find the area for different sides of a pentagon. A pentagon is a polygon, a closed plane figure with five sides.

### Enter The Length Of The Side Of A Pentagon In The Given Input Box.

Area of a pentagon = a = (5 ⁄ 2) × s × a. In euclidean geometry, a regular polygon is a polygon that is equiangular (all angles are equal in measure) and equilateral (all sides have the same length). Suppose the perimeter of a pentagon is 25 cm and we want to find its area.

### Pentagon Calculator Is An Online Tool That Is Used To Calculate The Various Properties Of A Pentagon.

Please follow the below steps to find the area of a pentagon: Calculate area of a pentagon. Given, s = 10 cm.

### This Shape Is Often Used In Architecture.

R = a / 10 * √ 25 + 10 * √5. To calculate area of heptagon, you need side (s). It can calculate the area, perimeter, diagonal, and side of a pentagon.

### Students Can Learn The Concept Of A Pentagon By Using This Calculator.

This calculator makes the complex geometrical calculation very easy by. Area = (5 x side x apothem) / 2 = (perimeter x apothem) / 2.both involve the perimeter (is the sum of all sides) and apothem (is the smallest distance between the center and any of its sides). Enter the length of sides of pentagon in the first required input field.