The Fencing Problem - Mathematics :: Math Coursework Mathematics

The Fencing Problem Introduction ============ I live with been given snow0 meters of fencing and my aim is to find emerge the maximum area in human face. ====================================================================== Prediction ---------- I would predict that the more sides the consideration has, then maybe the bigger the area it will have, although I have nothing to base this on, it will be what I am some to investigate. Shapes I am going to start with the rectangle, I think this is a good starting block because I am able to spay the widths and lengths to see which has the bigger area. If I discover that the rectangles with equal sides i.e. square gain me the best result, then I will try to direct my investigation into furthering that particular theory. Rectangles ---------- IMAGE Area = 40 000 m2 ================ IMAGE Area = 60 000 m2 IMAGE Area = 62 500 m2 It appears that the square shape has a bigger area, I wou ld possibly say that this is because the square has two bigger calculates, which are multiplied together to give a greater number than when a big number is multiplied with a smaller number. However, I cannot take this for granted and I think using one more shape will be useful in order to back up my theory. IMAGE Area = 52 500m This proves my theory regarding squares and I shall now put my results into a graph to attest what I have found. Length (m) Width (m) Area (m) 400 100 40 000 300 200 60 000 250 250 62 500 one hundred fifty 350 52 500 I will now further my investigation by looking at shapes of a different nature IMAGE perpetual Pentagon ---------------- The regular pentagon has 5 sides, and as we get 1000m of fencing, this means each side will be 200m (10005=200).