| David
Allen |
Here is my question, its been puzzling me for days and has two parts to it. A regular pentagon ABCDE is inscribed in a circle with centre O and radius 5cm. (Then I have a nice wee diagram of just that). Calculate the perimeter of the pentagon, correct to 2 decimal places. (In triangle OAB you may assume that the line from O to the midpoint of AB is at right angles to AB) ALSO: What is the percentage of the area of the circle lies outside the pentagon? Now I know I should know the formuli to get these answers but I am completely stumped. Please can you help? |
||
| Anuj
Shah |
Take triangle OAB, you know OA is 5cm and angle OAB is 54° (Half the interior angle of a regular pentagon). The length AM (where M is the midpoint of AB) is then 5.cos(54°). So the perimeter is 50.cos(54°) The area of triangle OAM is (1/2)(5)(5.cos(54 °))=25.cos(54°)/2. The area of the pentagon is then 125.cos(54°). So the area of the circle outside the pentagon is p.52-125.cos(54°)=25(p-5.cos(54° )). You can then find the percentage. |