Maths-Shapes Investagation
Essay by 24 • June 23, 2011 • 5,719 Words (23 Pages) • 947 Views
GCSE Maths Coursework - Shapes Investigation
Summary
I am doing an investigation to look at shapes made up of other shapes (starting with triangles, then going on squares and hexagons. I will try to find the relationship between the perimeter (in cm), dots enclosed and the amount of shapes (i.e. triangles etc.) used to make a shape.
From this, I will try to find a formula linking P (perimeter), D (dots enclosed) and T (number of triangles used to make a shape). Later on in this investigation T will be substituted for Q (squares) and H (hexagons) used to make a shape. Other letters used in my formulas and equations are X (T, Q or H), and Y (the number of sides a shape has). I have decided not to use S for squares, as it is possible it could be mistaken for 5, when put into a formula. After this, I will try to find a formula that links the number of shapes, P and D that will work with any tessellating shape вЂ" my вЂ?universal’ formula. I anticipate that for this to work I will have to include that number of sides of the shapes I use in my formula.
Method
I will first draw out all possible shapes using, for example, 16 triangles, avoiding drawing those shapes with the same properties of T, P and D, as this is pointless (i.e. those arranged in the same way but say, on their side. I will attach these drawings to the front of each section. From this, I will make a list of all possible combinations of P, D and T (or later Q and H). Then I will continue making tables of different numbers of that shape, make a graph containing all the tables and then try to devise a working formula.
As I progress, I will note down any obvious or less obvious things that I see, and any working formulas found will go on my �Formulas’ page. To save time, perimeter, dots enclosed, triangles etc. are written as their formulaic counterparts. My tables of recordings will include T, Q or H. This is because, whilst it will remain constant in any given table, I am quite sure that this value will need to be incorporated into any formulas.
Triangles
To find the P and D of shapes composed of different numbers of equilateral triangles, I drew them out on isometric dot paper. These tables are displayed numerically, starting with the lowest value of T. Although T is constant in the table, I have put it into each row, as it will be incorporated into the formula that I hope to find. I am predicting that there will be straightforward correlation between P, D and T. I also expect that as the value of P increases, the value of D will decrease. I say this because a circle is the shape with the largest area for its perimeter, and all the area is bunched together. When my triangles are bunched together, many of their vertexes shared dots with many other triangles, therefore there are much more dots enclosed than if the triangles were laid in a line
10 Triangles (T=10):
P=
D=
T=
8cm
2
10
10cm
1
10
12cm
0
10
15 Triangles (T=15):
P=
D=
T=
11
3
15
13
2
15
15
1
15
17
0
15
16 Triangles (T=16):
P=
D=
T=
10cm
4
16
12cm
3
16
14cm
2
16
16cm
1
16
18cm
0
16
20 triangles (T=20):
P=
D=
T=
12
5
20
14
4
20
16
3
20
18
2
20
20
1
20
22
0
20
...
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