Додаток № 1
Стандартні значення знаменників геометричного ряду в різних ступенях
z |
φ1 |
1,06 |
1,12 |
1,26 |
1,41 |
1,58 |
1,78 |
4 |
φ2 |
1,12 |
1,26 |
1,58 |
2,0 |
2,5 |
3,16 |
φ3 |
1,19 |
1,41 |
2,0 |
2,82 |
4,0 |
5,64 |
|
6 |
φ4 |
1,26 |
1,58 |
2,5 |
4,0 |
6,32 |
10,08 |
φ5 |
1,34 |
1,78 |
3,16 |
5,64 |
10,08 |
17,92 |
|
8 |
φ6 |
1,41 |
2,0 |
4,0 |
8,0 |
16,0 |
32,0 |
φ7 |
1,49 |
2,24 |
5,04 |
11,28 |
25,28 |
56,8 |
|
9 |
φ8 |
1,58 |
2,5 |
6,32 |
16,0 |
40,0 |
101,6 |
12 |
φ9 |
1,67 |
2,81 |
8,0 |
22,56 |
64,0 |
181 |
φ10 |
1,78 |
3,16 |
10,08 |
32,0 |
101 |
|
|
φ11 |
1,89 |
3,55 |
12,64 |
45,12 |
160 |
||
16 |
φ12 |
2,0 |
4,0 |
16,0 |
64,0 |
252 |
|
φ13 |
2,12 |
4,48 |
20,16 |
90,0 |
|
||
φ14 |
2,24 |
5,04 |
25,28 |
127 |
|||
φ15 |
2,36 |
5,64 |
32,0 |
178 |
|||
18 |
φ16 |
2,6 |
6,32 |
40,0 |
|
||
φ17 |
2,65 |
7,12 |
50,65 |
i |
∑z |
||||||||||||||||||||
80 |
81 |
82 |
83 |
84 |
85 |
86 |
87 |
88 |
89 |
90 |
91 |
92 |
93 |
94 |
95 |
96 |
97 |
98 |
99 |
100 |
|
1.00 |
40 |
|
41 |
|
42 |
|
43 |
|
44 |
|
45 |
|
46 |
|
47 |
|
48 |
49 |
49 |
50 |
50 |
1.05 |
39 |
|
40 |
40 |
41 |
41 |
42 |
42 |
43 |
43 |
44 |
44 |
45 |
45 |
46 |
46 |
47 |
47 |
|
42 |
|
1.12 |
38 |
38 |
|
39 |
|
40 |
|
41 |
|
42 |
|
43 |
43 |
44 |
44 |
45 |
45 |
46 |
46 |
47 |
47 |
1.19 |
|
37 |
|
38 |
|
39 |
39 |
40 |
40 |
41 |
41 |
|
42 |
|
43 |
|
44 |
44 |
45 |
45 |
46 |
1.26 |
|
36 |
36 |
37 |
37 |
|
38 |
|
39 |
|
40 |
40 |
41 |
41 |
|
42 |
|
43 |
|
44 |
44 |
1.33 |
34 |
35 |
35 |
|
36 |
|
37 |
37 |
38 |
38 |
|
39 |
|
40 |
40 |
41 |
41 |
|
42 |
|
43 |
1.41 |
33 |
|
34 |
|
35 |
35 |
|
36 |
|
37 |
37 |
38 |
38 |
|
39 |
|
40 |
40 |
|
41 |
|
1.50 |
32 |
|
33 |
33 |
|
34 |
|
35 |
35 |
|
36 |
|
37 |
37 |
38 |
38 |
|
39 |
39 |
40 |
40 |
1.58 |
31 |
|
32 |
32 |
|
33 |
33 |
|
34 |
|
35 |
35 |
|
36 |
|
37 |
37 |
|
38 |
38 |
39 |
1.68 |
30 |
30 |
|
31 |
|
32 |
32 |
|
33 |
33 |
|
34 |
|
35 |
35 |
|
36 |
36 |
|
37 |
37 |
1.78 |
29 |
29 |
|
30 |
30 |
|
31 |
|
|
32 |
|
33 |
33 |
|
34 |
34 |
|
35 |
35 |
|
36 |
1.88 |
28 |
28 |
|
29 |
29 |
|
30 |
30 |
|
31 |
31 |
|
32 |
32 |
|
33 |
33 |
|
34 |
34 |
35 |
2.00 |
|
27 |
|
|
28 |
|
29 |
29 |
|
30 |
30 |
|
31 |
31 |
|
32 |
32 |
|
33 |
33 |
|
2.11 |
|
26 |
|
|
27 |
|
|
28 |
28 |
|
29 |
29 |
|
30 |
30 |
|
31 |
31 |
|
32 |
32 |
2.24 |
|
25 |
|
|
26 |
26 |
|
27 |
27 |
|
28 |
28 |
|
29 |
29 |
|
|
30 |
30 |
|
31 |
2.37 |
|
24 |
|
|
25 |
25 |
|
26 |
26 |
|
|
27 |
27 |
|
28 |
28 |
|
29 |
29 |
|
|
2.51 |
23 |
23 |
|
|
24 |
24 |
|
25 |
25 |
|
|
26 |
26 |
|
27 |
27 |
|
|
28 |
28 |
|
2.66 |
22 |
22 |
|
|
23 |
23 |
|
24 |
24 |
|
|
25 |
25 |
|
|
26 |
26 |
|
27 |
27 |
|
2.82 |
21 |
21 |
|
|
22 |
|
|
23 |
23 |
|
|
24 |
24 |
|
|
25 |
25 |
|
|
26 |
26 |
2.99 |
20 |
|
|
21 |
21 |
|
|
22 |
22 |
|
|
23 |
23 |
|
|
24 |
24 |
|
|
25 |
25 |
3.16 |
19 |
|
|
20 |
20 |
|
|
21 |
21 |
|
|
22 |
22 |
|
|
23 |
23 |
|
|
24 |
24 |
3.35 |
|
|
19 |
19 |
|
|
20 |
20 |
20 |
|
|
21 |
21 |
|
|
22 |
22 |
|
|
23 |
23 |
3.55 |
|
18 |
18 |
18 |
|
|
19 |
19 |
|
|
20 |
20 |
20 |
|
|
21 |
21 |
|
|
22 |
22 |
3.76 |
17 |
17 |
|
|
|
18 |
18 |
|
|
|
19 |
19 |
|
|
|
20 |
20 |
|
|
21 |
21 |
3.98 |
16 |
16 |
|
|
17 |
17 |
17 |
|
|
18 |
18 |
18 |
|
|
19 |
19 |
19 |
|
|
20 |
20 |
4.22 |
|
|
|
16 |
16 |
|
|
|
17 |
17 |
17 |
|
|
18 |
18 |
18 |
|
|
19 |
19 |
19 |
4.47 |
|
15 |
15 |
15 |
|
|
|
16 |
16 |
|
|
|
17 |
17 |
17 |
|
|
18 |
18 |
18 |
18 |
4.73 |
14 |
14 |
|
|
|
15 |
15 |
15 |
|
|
|
16 |
16 |
16 |
|
|
17 |
17 |
17 |
17 |
|