The Fencing Problem - Math Coursework :: Math Coursework Mathematics

The Fencing Problem - Math The task -------- A sodbuster has exactly kibibytem of fencing with it she wishes to fence off a level stadium of land. She is not concerned about the cause of the plot of land but it moldiness see perimeter of 1000m. What she does wish to do is to fence off the plot of land which contains the maximun area. Investigate the shape/s of the plot of land that have the maximum area. Solution -------- Firstly I will look at 3 common shapes. These will be ------------------------------------------------------ IMAGE A regular trigon for this task will have the pastime area 1/2 b x h 1000m / 3 - 333.33 333.33 / 2 = 166.66 333.33 - 166.66 = 83331.11 Square stalk of 83331.11 = 288.67 288.67 x 166.66 = 48112.52 IMAGEA regular square for this task will have the following area Each side = 250m 250m x 250m = 62500m IMAGE A regular cycle with a lap of 1000m would give an area of Pi x 2 x r = circumference Pi x 2 = circumference / r Circumference / (Pi x 2) = r Area = Pi x r Area = Pi x (Circumference / (Pi x 2)) Pi x (1000m / (pi x 2)) = 79577.45m I predict that for regular shapes the more sides the shape has the high the area is. A circle has infinite sides in theory so I will expect this to be of the highest area. The above only tells us about regular shapes I still havent worked out what the ideal shape is. Width (m) Length (m) Perimeter (m) Area (m) 500 0 1000 0 490 10 1000 4900 480 20 1000 9600 470 30