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φ
(
751
,
3
)
=
φ
(
751
,
2
)
−
φ
(
150
,
2
)
=
251
−
50
=
201
{\displaystyle \varphi (751,3)=\varphi (751,2)-\varphi (150,2)=251-\,\,\,50=201}
φ
(
751
,
2
)
=
φ
(
751
,
1
)
−
φ
(
250
,
1
)
=
376
−
125
=
251
{\displaystyle \varphi (751,2)=\varphi (751,1)-\varphi (250,1)=376-125=251}
φ
(
150
,
2
)
=
φ
(
150
,
1
)
−
φ
(
50
,
1
)
=
75
−
25
{\displaystyle \varphi (150,2)=\varphi (150,1)-\varphi (50,1)=75-25}
=
{\displaystyle =}
50
{\displaystyle 50}
φ
(
478
,
4
)
=
φ
(
478
,
3
)
−
φ
(
68
,
3
)
=
127
−
18
=
109
{\displaystyle \varphi (478,4)=\varphi (478,3)-\varphi (68,3)=127-18=109}
φ
(
478
,
3
)
=
φ
(
478
,
2
)
−
φ
(
95
,
2
)
=
159
−
32
=
127
{\displaystyle \varphi (478,3)=\varphi (478,2)-\varphi (95,2)=159-32=127}
φ
(
478
,
2
)
=
φ
(
478
,
1
)
−
φ
(
159
,
1
)
=
239
−
80
=
159
{\displaystyle \varphi (478,2)=\varphi (478,1)-\varphi (159,1)=239-80=159}
φ
(
95
,
2
)
=
φ
(
95
,
1
)
−
φ
(
31
,
1
)
=
48
−
16
{\displaystyle \varphi (95,2)=\varphi (95,1)-\varphi (31,1)=48-16}
=
{\displaystyle =}
32
{\displaystyle 32}
φ
(
68
,
3
)
=
φ
(
68
,
2
)
−
φ
(
13
,
2
)
=
23
−
5
=
18
{\displaystyle \varphi (68,3)=\varphi (68,2)-\varphi (13,2)=23-5=18}
φ
(
68
,
2
)
=
φ
(
68
,
1
)
−
φ
(
22
,
1
)
=
34
−
11
=
23
{\displaystyle \varphi (68,2)=\varphi (68,1)-\varphi (22,1)=34-11=23}
φ
(
13
,
2
)
=
φ
(
13
,
1
)
−
φ
(
4
,
1
)
=
7
−
2
{\displaystyle \varphi (13,2)=\varphi (13,1)-\varphi (4,1)=7-2}
=
{\displaystyle =}
5
{\displaystyle 5}
φ
(
404
,
5
)
=
φ
(
404
,
4
)
−
φ
(
36
,
4
)
=
93
−
8
=
85
{\displaystyle \varphi (404,5)=\varphi (404,4)-\varphi (36,4)=93-8=85}
φ
(
404
,
4
)
=
φ
(
404
,
3
)
−
φ
(
57
,
3
)
=
108
−
15
=
93
{\displaystyle \varphi (404,4)=\varphi (404,3)-\varphi (57,3)=108-15=93}
φ
(
404
,
3
)
=
φ
(
404
,
2
)
−
φ
(
80
,
2
)
=
135
−
27
=
108
{\displaystyle \varphi (404,3)=\varphi (404,2)-\varphi (80,2)=135-27=108}
φ
(
404
,
2
)
=
φ
(
404
,
1
)
−
φ
(
134
,
1
)
=
202
−
67
=
135
{\displaystyle \varphi (404,2)=\varphi (404,1)-\varphi (134,1)=202-67=135}
φ
(
80
,
2
)
=
φ
(
80
,
1
)
−
φ
(
26
,
1
)
=
40
−
13
{\displaystyle \varphi (80,2)=\varphi (80,1)-\varphi (26,1)=40-13}
=
{\displaystyle =}
27
{\displaystyle 27}
φ
(
57
,
3
)
=
φ
(
57
,
2
)
−
φ
(
11
,
2
)
=
19
−
4
=
15
{\displaystyle \varphi (57,3)=\varphi (57,2)-\varphi (11,2)=19-4=15}
φ
(
57
,
2
)
=
φ
(
57
,
1
)
−
φ
(
19
,
1
)
=
29
−
10
=
19
{\displaystyle \varphi (57,2)=\varphi (57,1)-\varphi (19,1)=29-10=19}
φ
(
11
,
2
)
=
φ
(
11
,
1
)
−
φ
(
3
,
1
)
=
6
−
2
{\displaystyle \varphi (11,2)=\varphi (11,1)-\varphi (3,1)=6-2}
=
{\displaystyle =}
4
{\displaystyle 4}
φ
(
36
,
4
)
=
φ
(
36
,
3
)
−
φ
(
5
,
3
)
=
9
−
1
=
8
{\displaystyle \varphi (36,4)=\varphi (36,3)-\varphi (5,3)=9-1=8}
φ
(
36
,
3
)
=
φ
(
36
,
2
)
−
φ
(
7
,
2
)
=
12
−
3
=
9
{\displaystyle \varphi (36,3)=\varphi (36,2)-\varphi (7,2)=12-3=9}
φ
(
36
,
2
)
=
φ
(
36
,
1
)
−
φ
(
12
,
1
)
=
18
−
6
=
12
{\displaystyle \varphi (36,2)=\varphi (36,1)-\varphi (12,1)=18-6=12}
φ
(
7
,
2
)
=
φ
(
7
,
1
)
−
φ
(
2
,
1
)
=
4
−
1
{\displaystyle \varphi (7,2)=\varphi (7,1)-\varphi (2,1)=4-1}
=
{\displaystyle =}
3
{\displaystyle 3}
φ
(
5
,
3
)
=
φ
(
5
,
2
)
−
φ
(
1
,
2
)
=
2
−
1
=
1
{\displaystyle \varphi (5,3)=\varphi (5,2)-\varphi (1,2)=2-1=1}
φ
(
5
,
2
)
=
φ
(
5
,
1
)
−
φ
(
1
,
1
)
=
3
−
1
=
2
{\displaystyle \varphi (5,2)=\varphi (5,1)-\varphi (1,1)=3-1=2}
φ
(
309
,
6
)
=
φ
(
309
,
5
)
−
φ
(
23
,
5
)
=
64
−
5
=
59
{\displaystyle \varphi (309,6)=\varphi (309,5)-\varphi (23,5)=64-5=59}
φ
(
309
,
5
)
=
φ
(
309
,
4
)
−
φ
(
28
,
4
)
=
70
−
6
=
64
{\displaystyle \varphi (309,5)=\varphi (309,4)-\varphi (28,4)=70-6=64}
φ
(
309
,
4
)
=
φ
(
309
,
3
)
−
φ
(
44
,
3
)
=
82
−
12
=
70
{\displaystyle \varphi (309,4)=\varphi (309,3)-\varphi (44,3)=82-12=70}
φ
(
309
,
3
)
=
φ
(
309
,
2
)
−
φ
(
61
,
2
)
=
103
−
21
=
82
{\displaystyle \varphi (309,3)=\varphi (309,2)-\varphi (61,2)=103-21=82}
φ
(
309
,
2
)
=
φ
(
309
,
1
)
−
φ
(
103
,
1
)
=
155
−
52
=
103
{\displaystyle \varphi (309,2)=\varphi (309,1)-\varphi (103,1)=155-52=103}
φ
(
61
,
2
)
=
φ
(
61
,
1
)
−
φ
(
20
,
1
)
=
31
−
10
{\displaystyle \varphi (61,2)=\varphi (61,1)-\varphi (20,1)=31-10}
=
{\displaystyle =}
21
{\displaystyle 21}
φ
(
44
,
3
)
=
φ
(
44
,
2
)
−
φ
(
8
,
2
)
=
15
−
3
=
12
{\displaystyle \varphi (44,3)=\varphi (44,2)-\varphi (8,2)=15-3=12}
φ
(
44
,
2
)
=
φ
(
44
,
1
)
−
φ
(
14
,
1
)
=
22
−
7
=
15
{\displaystyle \varphi (44,2)=\varphi (44,1)-\varphi (14,1)=22-7=15}
φ
(
8
,
2
)
=
φ
(
8
,
1
)
−
φ
(
2
,
1
)
=
4
−
1
{\displaystyle \varphi (8,2)=\varphi (8,1)-\varphi (2,1)=4-1}
=
{\displaystyle =}
3
{\displaystyle 3}
φ
(
25
,
4
)
=
φ
(
28
,
3
)
−
φ
(
4
,
3
)
=
7
−
1
=
6
{\displaystyle \varphi (25,4)=\varphi (28,3)-\varphi (4,3)=7-1=6}
φ
(
28
,
3
)
=
φ
(
28
,
2
)
−
φ
(
5
,
2
)
=
9
−
2
=
7
{\displaystyle \varphi (28,3)=\varphi (28,2)-\varphi (5,2)=9-2=7}
φ
(
28
,
2
)
=
φ
(
28
,
1
)
−
φ
(
9
,
1
)
=
14
−
5
=
9
{\displaystyle \varphi (28,2)=\varphi (28,1)-\varphi (9,1)=14-5=9}
φ
(
5
,
2
)
=
φ
(
5
,
1
)
−
φ
(
1
,
1
)
=
3
−
1
{\displaystyle \varphi (5,2)=\varphi (5,1)-\varphi (1,1)=3-1}
=
{\displaystyle =}
2
{\displaystyle 2}