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φ
(
23
,
5
)
=
φ
(
23
,
4
)
−
φ
(
2
,
4
)
=
6
−
1
=
5
{\displaystyle \varphi (23,5)=\varphi (23,4)-\varphi (2,4)=\,\,\,6-1=5}
φ
(
23
,
4
)
=
φ
(
23
,
3
)
−
φ
(
3
,
3
)
=
7
−
1
=
6
{\displaystyle \varphi (23,4)=\varphi (23,3)-\varphi (3,3)=\,\,\,7-1=6}
φ
(
23
,
3
)
=
φ
(
23
,
2
)
−
φ
(
4
,
2
)
=
8
−
1
=
7
{\displaystyle \varphi (23,3)=\varphi (23,2)-\varphi (4,2)=\,\,\,8-1=7}
φ
(
23
,
2
)
=
φ
(
23
,
1
)
−
φ
(
7
,
1
)
=
12
−
4
=
8
{\displaystyle \varphi (23,2)=\varphi (23,1)-\varphi (7,1)=12-4=8}
{\displaystyle }
{\displaystyle }
φ
(
4347
,
8
)
=
φ
(
4347
,
7
)
−
φ
(
228
,
7
)
=
785
−
43
=
742
{\displaystyle \varphi (4347,8)=\varphi (4347,7)-\varphi (\,\,\,228,7)=\,\,\,785-\,\,\,43=\,\,\,742}
φ
(
4347
,
7
)
=
φ
(
4347
,
6
)
−
φ
(
255
,
6
)
=
834
−
49
=
785
{\displaystyle \varphi (4347,7)=\varphi (4347,6)-\varphi (\,\,\,255,6)=\,\,\,834-\,\,\,49=\,\,\,785}
φ
(
4347
,
6
)
=
φ
(
4347
,
5
)
−
φ
(
334
,
5
)
=
903
−
69
=
834
{\displaystyle \varphi (4347,6)=\varphi (4347,5)-\varphi (\,\,\,334,5)=\,\,\,903-\,\,\,69=\,\,\,834}
φ
(
4347
,
5
)
=
φ
(
4347
,
4
)
−
φ
(
395
,
4
)
=
993
−
90
=
903
{\displaystyle \varphi (4347,5)=\varphi (4347,4)-\varphi (\,\,\,395,4)=\,\,\,993-\,\,\,90=\,\,\,903}
φ
(
4347
,
4
)
=
φ
(
4347
,
3
)
−
φ
(
621
,
3
)
=
1159
−
166
=
993
{\displaystyle \varphi (4347,4)=\varphi (4347,3)-\varphi (\,\,\,621,3)=1159-166=\,\,\,993}
φ
(
4347
,
3
)
=
φ
(
4347
,
2
)
−
φ
(
869
,
2
)
=
1149
−
290
=
1159
{\displaystyle \varphi (4347,3)=\varphi (4347,2)-\varphi (\,\,\,869,2)=1149-290=1159}
φ
(
4347
,
2
)
=
φ
(
4347
,
1
)
−
φ
(
1449
,
1
)
=
2174
−
725
=
1449
{\displaystyle \varphi (4347,2)=\varphi (4347,1)-\varphi (1449,1)=2174-725=1449}
φ
(
869
,
2
)
=
φ
(
869
,
1
)
−
φ
(
289
,
1
)
=
435
−
145
{\displaystyle \varphi (869,2)=\varphi (869,1)-\varphi (289,1)=435-\,\,\,145}
=
{\displaystyle =}
290
{\displaystyle 290}
φ
(
621
,
3
)
=
φ
(
621
,
2
)
−
φ
(
124
,
2
)
=
207
−
41
{\displaystyle \varphi (621,3)=\varphi (621,2)-\varphi (124,2)=207-\,\,\,41}
=
{\displaystyle =}
164
{\displaystyle 164}
φ
(
621
,
2
)
=
φ
(
621
,
1
)
−
φ
(
207
,
1
)
=
311
−
104
{\displaystyle \varphi (621,2)=\varphi (621,1)-\varphi (207,1)=311-104}
=
{\displaystyle =}
207
{\displaystyle 207}
φ
(
124
,
2
)
=
φ
(
124
,
1
)
−
φ
(
41
,
1
)
=
62
−
21
{\displaystyle \varphi (124,2)=\varphi (124,1)-\varphi (41,1)=\,\,\,62-\,\,\,21}
=
{\displaystyle =}
41
{\displaystyle 41}
φ
(
395
,
4
)
=
φ
(
395
,
3
)
−
φ
(
56
,
3
)
=
105
−
15
=
90
{\displaystyle \varphi (395,4)=\varphi (395,3)-\varphi (56,3)=105-15=\,\,\,90}
φ
(
395
,
3
)
=
φ
(
395
,
2
)
−
φ
(
79
,
2
)
=
132
−
27
=
105
{\displaystyle \varphi (395,3)=\varphi (395,2)-\varphi (79,2)=132-27=105}
φ
(
395
,
2
)
=
φ
(
395
,
1
)
−
φ
(
131
,
1
)
=
198
−
66
=
132
{\displaystyle \varphi (395,2)=\varphi (395,1)-\varphi (131,1)=198-66=132}
φ
(
79
,
2
)
=
φ
(
79
,
1
)
−
φ
(
26
,
1
)
=
40
−
13
{\displaystyle \varphi (79,2)=\varphi (79,1)-\varphi (26,1)=40-13}
=
{\displaystyle =}
27
{\displaystyle 27}
φ
(
56
,
3
)
=
φ
(
56
,
2
)
−
φ
(
11
,
2
)
=
19
−
4
=
15
{\displaystyle \varphi (56,3)=\varphi (56,2)-\varphi (11,2)=19-4=15}
φ
(
56
,
2
)
=
φ
(
56
,
1
)
−
φ
(
18
,
1
)
=
28
−
9
=
19
{\displaystyle \varphi (56,2)=\varphi (56,1)-\varphi (18,1)=28-9=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
(
334
,
5
)
=
φ
(
334
,
4
)
−
φ
(
30
,
4
)
=
76
−
7
=
69
{\displaystyle \varphi (334,5)=\varphi (334,4)-\varphi (\,\,\,30,4)=\,\,\,76-\,\,\,7=\,\,\,69}
φ
(
334
,
4
)
=
φ
(
334
,
3
)
−
φ
(
47
,
3
)
=
89
−
13
=
76
{\displaystyle \varphi (334,4)=\varphi (334,3)-\varphi (\,\,\,47,3)=\,\,\,89-13=\,\,\,76}
φ
(
334
,
3
)
=
φ
(
334
,
2
)
−
φ
(
66
,
2
)
=
111
−
22
=
89
{\displaystyle \varphi (334,3)=\varphi (334,2)-\varphi (\,\,\,66,2)=111-22=\,\,\,89}
φ
(
334
,
2
)
=
φ
(
334
,
1
)
−
φ
(
111
,
1
)
=
167
−
56
=
111
{\displaystyle \varphi (334,2)=\varphi (334,1)-\varphi (111,1)=167-56=111}
φ
(
66
,
2
)
=
φ
(
66
,
1
)
−
φ
(
22
,
1
)
=
33
−
11
{\displaystyle \varphi (66,2)=\varphi (66,1)-\varphi (22,1)=33-\,\,\,11}
=
{\displaystyle =}
22
{\displaystyle 22}
φ
(
47
,
3
)
=
φ
(
47
,
2
)
−
φ
(
9
,
2
)
=
16
−
3
{\displaystyle \varphi (47,3)=\varphi (47,2)-\varphi (\,\,\,9,2)=\,\,\,\,\,\,\,\,\,\,\,16-\,\,\,\,\,\,\,\,\,\,\,3}
=
{\displaystyle =}
13
{\displaystyle 13}
φ
(
47
,
2
)
=
φ
(
47
,
1
)
−
φ
(
15
,
1
)
=
24
−
8
{\displaystyle \varphi (47,2)=\varphi (47,1)-\varphi (15,1)=\,\,\,\,\,\,\,\,\,\,\,24-\,\,\,\,\,\,\,\,\,\,\,8}
=
{\displaystyle =}
16
{\displaystyle 16}
φ
(
9
,
2
)
=
φ
(
9
,
1
)
−
φ
(
3
,
1
)
=
5
−
2
{\displaystyle \varphi (\,\,\,9,2)=\varphi (\,\,\,9,1)-\varphi (3,1)=5-2}
=
{\displaystyle =}
3
{\displaystyle \,\,\,3}
φ
(
30
,
4
)
=
φ
(
30
,
3
)
−
φ
(
4
,
3
)
=
8
−
1
=
7
{\displaystyle \varphi (30,4)=\varphi (30,3)-\varphi (\,\,\,4,3)=\,\,\,8-1=\,\,\,7}
φ
(
30
,
3
)
=
φ
(
30
,
2
)
−
φ
(
6
,
2
)
=
10
−
2
=
8
{\displaystyle \varphi (30,3)=\varphi (30,2)-\varphi (\,\,\,6,2)=10-2=\,\,\,8}
φ
(
30
,
2
)
=
φ
(
30
,
1
)
−
φ
(
10
,
1
)
=
15
−
5
=
10
{\displaystyle \varphi (30,2)=\varphi (30,1)-\varphi (10,1)=15-5=10}
{\displaystyle }
{\displaystyle }