MathgeomGLS

1
3.58130236497986	-2.40195184708779	36.4040156229448	18.2957150356083	3.58130236497986	-2.40195184708779	36.4040156229448	18.2957150356083	0.25	Tahoma		9	2	7	7	70	70	1	1	1	1	1	64000	1	15793151	12632256	255	32768	8421504	32896	32896	8421376	15780518	128	0	0	0	1
2
		1	1	16711680	0.100000001490116	-3.14159265358979	3.14159265358979	-0.3	0.1	-1	-1	0	0	-1
3
25
4
Proof	1	0	0	1	0	2	0	0	0	-1	5	11	-1
5
6.5	9.5	4	9.5	4	7	12.5	7	6.5	9.5	6.5	1	12.5	1	12.5	7	15	13	9	15.5	6.5	9.5	
6
Congruent  sss	1	0	0	1	-1	2	0	0	0	-1	5	6	-1
7
18	15	15	10	18	11	18	15	21	10	18	11	
8
Congruent  sss	1	0	0	1	0	2	0	0	0	-1	5	2	-1
9
16.4	12.7	16.7	12.5	
10
Congruent  sss	1	0	0	1	0	2	0	0	0	-1	5	2	-1
11
19.6	12.7	19.3	12.5	
12
Congruent  sss	1	0	0	1	-1	2	-1	0	0	-1	5	2	-1
13
16.8	10.8	16.9	10.4	
14
Congruent  sss	1	0	0	1	-1	2	-1	0	0	-1	5	2	-1
15
16.8	10.4	16.7	10.8	
16
Congruent  sss	1	0	0	1	-1	2	-1	0	0	-1	5	2	-1
17
19.2	10.4	19.3	10.8	
18
Congruent  sss	1	0	0	1	-1	2	-1	0	0	-1	5	2	-1
19
19.2	10.8	19.1	10.4	
20
Congruent  sas	1	0	0	1	-1	2	0	0	0	-1	5	6	-1
21
24.5	10	24.5	14.5	22	10.5	24.5	10	27	14	24.5	14.5	
22
Congruent  sas	1	0	0	1	-1	2	-1	0	0	-1	5	2	-1
23
23.1	10	23.35	10.45	
24
Congruent  sas	1	0	3	1	-1	2	-1	0	0	-1	5	2	-1
25
25.6	14	25.8	14.45	
26
Congruent  sas	1	-1	3	2	16711680	2	-1	0	0	-1	5	1	-1
27
24.2	10.35	
28
Congruent  sas	1	-1	3	2	16711680	2	-1	0	0	-1	5	1	-1
29
24.75	14.2	
30
Congruent  aas	1	0	3	1	16711680	2	-1	0	0	-1	5	5	-1
31
28	10	33	15	34	10	29	15	28	10	
32
Congruent  aas	0	-1	3	2	255	2	-1	0	0	-1	5	2	-1
33
30.6	13	31.4	13	
34
Congruent  aas	0	-1	2	2	16711680	2	-1	0	0	-1	5	2	-1
35
28.4	10.7	33.6	10.7	
36
Congruent  aas	1	0	2	1	65280	2	-1	0	0	-1	5	2	-1
37
29.7	12	30	11.7	
38
Congruent  aas	1	0	2	1	65280	2	-1	0	0	-1	5	2	-1
39
32	11.7	32.3	12	
40
Congruent  rhs	1	0	3	2	16711680	2	-1	0	0	-1	5	5	-1
41
15	1	20	6	21	1	16	6	15	1	
42
Congruent  rhs	1	0	3	1	16711680	2	-1	0	0	-1	5	2	-1
43
15.3	3.8	15.8	3.7	
44
Congruent  rhs	1	0	3	1	16711680	2	-1	0	0	-1	5	2	-1
45
20.7	3.8	20.2	3.7	
46
Congruent  rhs	1	0	3	1	16711680	2	-1	0	0	-1	5	2	-1
47
16.7	3	17	2.7	
48
Congruent  rhs	1	0	3	1	16711680	2	-1	0	0	-1	5	2	-1
49
19	2.7	19.3	3	
50
Congruent  rhs	1	0	3	1	16711680	2	-1	0	0	-1	5	2	-1
51
16.8	3.1	17.1	2.8	
52
Congruent  rhs	2	0	3	1	16711680	2	-1	0	0	-1	5	2	-1
53
19.2	3.1	18.9	2.8	
54
9
55
Pythagoras' Theorem	6	18.1	20	Tahoma		12	0	-1
56
1
57
Pythagoras' Theorem	255
58
Statement	5	17.6	20	Tahoma		12	0	-1
59
4
60
In any right-angled triangle the square	0
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on the hypotenuse is equal to the sum	0
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of the squares on the other two sides.	0
63
           c� =  a� + b�	16711680
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Letters	6.2	8.9	22	Tahoma		12	16711680	-1
65
5
66
                      c	16711680
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b	16711680
68
	16711680
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   90�	16711680
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                      a	16711680
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Congruent triangles	15.5	18.1	20	Tahoma		12	0	-1
72
5
73
Congruent Triangles	255
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1) If a triangle has three sides	0
75
    equal to the three sides of      	0
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    another triangle then the	0
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    triangles are congruent.	0
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Congruent triangles	21.4	17.6	20	Tahoma		12	0	-1
79
5
80
2) If a triangle has two sides and	0
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    the included angle equal to the	0
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    two sides and the included angle	0
83
    of another triangle then the	0
84
    triangles are congruent.	0
85
Congruent triangles	27.8	17.6	20	Tahoma		12	0	-1
86
5
87
3) If a triangle has two angles and	0
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    one side respectively equal to	0
89
    two angles and the corresponding	0
90
    side of another triangle then the	0
91
    triangles are congruent.	0
92
Congruent triangles	15.5	9	20	Tahoma		12	0	-1
93
6
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4) If the hypotenuse and one side	0
95
    of a right-angled triangle are	0
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    equal to the hypotenuse and	0
97
    one side of another right-angle	0
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    triangle then the two triangles	0
99
    are congruent.	0
100
Congruent triangles	17.2	4.2	20	Tahoma		12	16711680	-1
101
1
102
90�   90�	16711680
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Simila Triangles	22.25	9	20	Tahoma		12	0	-1
104
13
105
Simila Triangles	255
106
Simila tiangles are the same shape but not necessarily the same size.	0
107
Congruent triangles are simila triangles but simila triangles are not	0
108
necessarily congruent triangles.	0
109
Two triangles are simila if...	0
110
1) The three sides of one triangle are proportional to the three sides of 	0
111
    the other triangle.	0
112
2) The two sides of one triangle are proportional to the two sides of the	0
113
    other triangle and the included angles are equal.	0
114
3) The two angles of one triangle are equal to two angles of the other	0
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    triangle.	0
116
4) The hypotenuse and one side of a right-angled triangle are proportional	0
117
    to the hypotenuse and one side of the other right-angled triangle.	0
118