Strona główna
Losuj
Zaloguj się
Ustawienia
Darowizny
O Wikiźródłach
Informacje prawne
Szukaj
Strona
:
A. Baranowski - O wzorach.pdf/10
Język
Obserwuj
Edytuj
Ta strona została
przepisana
.
φ
(
5882
,
6
)
=
φ
(
5882
,
5
)
−
φ
(
452
,
5
)
=
1222
−
94
=
1128
{\displaystyle \varphi (5882,6)=\varphi (5882,5)-\varphi (452,5)=1222-94=1128}
φ
(
5882
,
5
)
=
φ
(
5882
,
4
)
−
φ
(
534
,
4
)
=
1345
−
123
=
1222
{\displaystyle \varphi (5882,5)=\varphi (5882,4)-\varphi (534,4)=1345-123=1222}
φ
(
5882
,
4
)
=
φ
(
5882
,
3
)
−
φ
(
840
,
3
)
=
1569
−
224
=
1345
{\displaystyle \varphi (5882,4)=\varphi (5882,3)-\varphi (840,3)=1569-224=1345}
φ
(
5882
,
3
)
=
φ
(
5882
,
2
)
−
φ
(
1176
,
2
)
=
1961
−
392
=
1569
{\displaystyle \varphi (5882,3)=\varphi (5882,2)-\varphi (1176,2)=1961-392=1569}
φ
(
5882
,
2
)
=
φ
(
5882
,
1
)
−
φ
(
1960
,
1
)
=
2941
−
980
=
1961
{\displaystyle \varphi (5882,2)=\varphi (5882,1)-\varphi (1960,1)=2941-980=1961}
φ
(
1176
,
2
)
=
φ
(
1176
,
1
)
−
φ
(
391
,
1
)
=
588
−
196
{\displaystyle \varphi (1176,2)=\varphi (1176,1)-\varphi (391,1)=588-196}
=
{\displaystyle =}
392
{\displaystyle 392}
φ
(
840
,
3
)
=
φ
(
840
,
2
)
−
φ
(
168
,
2
)
=
280
−
56
=
224
{\displaystyle \varphi (840,3)=\varphi (840,2)-\varphi (168,2)=280-56=224}
φ
(
840
,
2
)
=
φ
(
840
,
1
)
−
φ
(
280
,
1
)
=
420
−
140
=
280
{\displaystyle \varphi (840,2)=\varphi (840,1)-\varphi (280,1)=420-140=280}
φ
(
168
,
2
)
=
φ
(
168
,
1
)
−
φ
(
56
,
1
)
=
84
−
28
{\displaystyle \varphi (168,2)=\varphi (168,1)-\varphi (56,1)=84-28}
=
{\displaystyle =}
56
{\displaystyle 56}
φ
(
534
,
4
)
=
φ
(
534
,
3
)
−
φ
(
76
,
3
)
=
143
−
20
=
123
{\displaystyle \varphi (534,4)=\varphi (534,3)-\varphi (76,3)=143-20=123}
φ
(
534
,
3
)
=
φ
(
534
,
2
)
−
φ
(
106
,
2
)
=
178
−
35
=
143
{\displaystyle \varphi (534,3)=\varphi (534,2)-\varphi (106,2)=178-35=143}
φ
(
534
,
2
)
=
φ
(
534
,
1
)
−
φ
(
178
,
1
)
=
267
−
89
=
178
{\displaystyle \varphi (534,2)=\varphi (534,1)-\varphi (178,1)=267-89=178}
φ
(
106
,
2
)
=
φ
(
106
,
1
)
−
φ
(
35
,
1
)
=
53
−
18
{\displaystyle \varphi (106,2)=\varphi (106,1)-\varphi (35,1)=53-18}
=
{\displaystyle =}
35
{\displaystyle 35}
φ
(
76
,
3
)
=
φ
(
76
,
2
)
−
φ
(
15
,
2
)
=
25
−
5
=
20
{\displaystyle \varphi (76,3)=\varphi (76,2)-\varphi (15,2)=25-5=20}
φ
(
76
,
2
)
=
φ
(
76
,
1
)
−
φ
(
25
,
1
)
=
38
−
13
=
25
{\displaystyle \varphi (76,2)=\varphi (76,1)-\varphi (25,1)=38-13=25}
φ
(
15
,
2
)
=
φ
(
15
,
1
)
−
φ
(
5
,
1
)
=
8
−
3
{\displaystyle \varphi (15,2)=\varphi (15,1)-\varphi (5,1)=8-3}
=
{\displaystyle =}
5
{\displaystyle 5}
φ
(
452
,
5
)
=
φ
(
452
,
4
)
−
φ
(
41
,
4
)
=
104
−
10
=
94
{\displaystyle \varphi (452,5)=\varphi (452,4)-\varphi (41,4)=104-10=94}
φ
(
452
,
4
)
=
φ
(
452
,
3
)
−
φ
(
64
,
3
)
=
121
−
17
=
104
{\displaystyle \varphi (452,4)=\varphi (452,3)-\varphi (64,3)=121-17=104}
φ
(
452
,
3
)
=
φ
(
452
,
2
)
−
φ
(
90
,
2
)
=
151
−
30
=
121
{\displaystyle \varphi (452,3)=\varphi (452,2)-\varphi (90,2)=151-30=121}
φ
(
452
,
2
)
=
φ
(
452
,
1
)
−
φ
(
150
,
1
)
=
226
−
75
=
151
{\displaystyle \varphi (452,2)=\varphi (452,1)-\varphi (150,1)=226-75=151}
φ
(
90
,
2
)
=
φ
(
90
,
1
)
−
φ
(
90
,
1
)
=
45
−
15
{\displaystyle \varphi (90,2)=\varphi (90,1)-\varphi (90,1)=45-15}
=
{\displaystyle =}
30
{\displaystyle 30}
φ
(
64
,
3
)
=
φ
(
64
,
2
)
−
φ
(
12
,
2
)
=
21
−
4
=
17
{\displaystyle \varphi (64,3)=\varphi (64,2)-\varphi (12,2)=21-4=17}
φ
(
64
,
2
)
=
φ
(
64
,
1
)
−
φ
(
12
,
1
)
=
32
−
11
=
21
{\displaystyle \varphi (64,2)=\varphi (64,1)-\varphi (12,1)=32-11=21}
φ
(
12
,
2
)
=
φ
(
12
,
1
)
−
φ
(
4
,
1
)
=
6
−
2
{\displaystyle \varphi (12,2)=\varphi (12,1)-\varphi (4,1)=6-2}
=
{\displaystyle =}
4
{\displaystyle 4}
φ
(
41
,
4
)
=
φ
(
41
,
3
)
−
φ
(
5
,
3
)
=
11
−
1
=
10
{\displaystyle \varphi (41,4)=\varphi (41,3)-\varphi (5,3)=11-1=10}
φ
(
41
,
3
)
=
φ
(
41
,
2
)
−
φ
(
8
,
2
)
=
14
−
3
=
11
{\displaystyle \varphi (41,3)=\varphi (41,2)-\varphi (8,2)=14-3=11}
φ
(
41
,
2
)
=
φ
(
41
,
1
)
−
φ
(
13
,
1
)
=
21
−
7
=
14
{\displaystyle \varphi (41,2)=\varphi (41,1)-\varphi (13,1)=21-7=14}
φ
(
5263
,
7
)
=
φ
(
5263
,
6
)
−
φ
(
309
,
6
)
=
1009
−
59
=
950
{\displaystyle \varphi (5263,7)=\varphi (5263,6)-\varphi (309,6)=1009-59=950}
φ
(
5263
,
6
)
=
φ
(
5263
,
5
)
−
φ
(
404
,
5
)
=
1094
−
85
=
1009
{\displaystyle \varphi (5263,6)=\varphi (5263,5)-\varphi (404,5)=1094-85=1009}
φ
(
5263
,
5
)
=
φ
(
5263
,
4
)
−
φ
(
478
,
4
)
=
1203
−
109
=
1094
{\displaystyle \varphi (5263,5)=\varphi (5263,4)-\varphi (478,4)=1203-109=1094}
φ
(
5263
,
4
)
=
φ
(
5263
,
3
)
−
φ
(
751
,
3
)
=
1404
−
201
=
1203
{\displaystyle \varphi (5263,4)=\varphi (5263,3)-\varphi (751,3)=1404-201=1203}
φ
(
5263
,
3
)
=
φ
(
5263
,
2
)
−
φ
(
1052
,
2
)
=
1755
−
351
=
1404
{\displaystyle \varphi (5263,3)=\varphi (5263,2)-\varphi (1052,2)=1755-351=1404}
φ
(
5263
,
2
)
=
φ
(
5263
,
1
)
−
φ
(
1754
,
1
)
=
2632
−
877
=
1755
{\displaystyle \varphi (5263,2)=\varphi (5263,1)-\varphi (1754,1)=2632-877=1755}
φ
(
1052
,
2
)
=
φ
(
1052
,
1
)
−
φ
(
350
,
1
)
=
526
−
175
{\displaystyle \varphi (1052,2)=\varphi (1052,1)-\varphi (350,1)=526-175}
=
{\displaystyle =}
351
{\displaystyle 351}