image/svg+xml
Периметр треугольника
Alexey Pavlov
© 2020 Alexey Pavlov
математика
формула
Периметр треугольника ∆ABC равен сумме длин его сторон
Adobe Illustrator 25.0 (Windows)
2020-11-19T20:18:46+03:00
2020-11-19T20:18:46+03:00
2020-11-19T20:18:46+03:00
5
256
232
JPEG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default
uuid:65E6390686CF11DBA6E2D887CEACB407
xmp.did:b8ee68c7-84fd-e64e-b9c5-0fa8446294b6
xmp.iid:b8ee68c7-84fd-e64e-b9c5-0fa8446294b6
uuid:7d065704-f78b-4574-9e80-9f27a9c3ddc2
xmp.did:5db74fb5-bdf5-f640-9628-937190e1f49f
uuid:65E6390686CF11DBA6E2D887CEACB407
default
saved
xmp.iid:2cc94c93-a55b-4e4b-887e-523e730c8322
2020-11-18T09:35:57+03:00
Adobe Illustrator 25.0 (Windows)
/
saved
xmp.iid:b8ee68c7-84fd-e64e-b9c5-0fa8446294b6
2020-11-19T20:18:46+03:00
Adobe Illustrator 25.0 (Windows)
/
Adobe Illustrator
1
False
False
5536.000000
4320.000000
Pixels
MyriadPro-Regular
Myriad Pro
Regular
Open Type
Version 2.106;PS 2.000;hotconv 1.0.70;makeotf.lib2.5.58329
False
MyriadPro-Regular.otf
TimesNewRomanPS-BoldMT
Times New Roman
Bold
Open Type
Version 7.00
False
timesbd.ttf
Cyan
Magenta
Yellow
Black
Группа образцов по умолчанию
0
Белый
RGB
PROCESS
255
255
255
Черный
RGB
PROCESS
0
0
0
RGB красный
RGB
PROCESS
255
0
0
RGB желтый
RGB
PROCESS
255
255
0
RGB зеленый
RGB
PROCESS
0
255
0
RGB голубой
RGB
PROCESS
0
255
255
RGB синий
RGB
PROCESS
0
0
255
RGB пурпурный
RGB
PROCESS
255
0
255
R=193 G=39 B=45
RGB
PROCESS
193
39
45
R=237 G=28 B=36
RGB
PROCESS
237
28
36
R=241 G=90 B=36
RGB
PROCESS
241
90
36
R=247 G=147 B=30
RGB
PROCESS
247
147
30
R=251 G=176 B=59
RGB
PROCESS
251
176
59
R=252 G=238 B=33
RGB
PROCESS
252
238
33
R=217 G=224 B=33
RGB
PROCESS
217
224
33
R=140 G=198 B=63
RGB
PROCESS
140
198
63
R=57 G=181 B=74
RGB
PROCESS
57
181
74
R=0 G=146 B=69
RGB
PROCESS
0
146
69
R=0 G=104 B=55
RGB
PROCESS
0
104
55
R=34 G=181 B=115
RGB
PROCESS
34
181
115
R=0 G=169 B=157
RGB
PROCESS
0
169
157
R=41 G=171 B=226
RGB
PROCESS
41
171
226
R=0 G=113 B=188
RGB
PROCESS
0
113
188
R=46 G=49 B=146
RGB
PROCESS
46
49
146
R=27 G=20 B=100
RGB
PROCESS
27
20
100
R=102 G=45 B=145
RGB
PROCESS
102
45
145
R=147 G=39 B=143
RGB
PROCESS
147
39
143
R=158 G=0 B=93
RGB
PROCESS
158
0
93
R=212 G=20 B=90
RGB
PROCESS
212
20
90
R=237 G=30 B=121
RGB
PROCESS
237
30
121
R=199 G=178 B=153
RGB
PROCESS
199
178
153
R=153 G=134 B=117
RGB
PROCESS
153
134
117
R=115 G=99 B=87
RGB
PROCESS
115
99
87
R=83 G=71 B=65
RGB
PROCESS
83
71
65
R=198 G=156 B=109
RGB
PROCESS
198
156
109
R=166 G=124 B=82
RGB
PROCESS
166
124
82
R=140 G=98 B=57
RGB
PROCESS
140
98
57
R=117 G=76 B=36
RGB
PROCESS
117
76
36
R=96 G=56 B=19
RGB
PROCESS
96
56
19
R=66 G=33 B=11
RGB
PROCESS
66
33
11
Оттенки серого
1
R=0 G=0 B=0
RGB
PROCESS
0
0
0
R=26 G=26 B=26
RGB
PROCESS
26
26
26
R=51 G=51 B=51
RGB
PROCESS
51
51
51
R=77 G=77 B=77
RGB
PROCESS
77
77
77
R=102 G=102 B=102
RGB
PROCESS
102
102
102
R=128 G=128 B=128
RGB
PROCESS
128
128
128
R=153 G=153 B=153
RGB
PROCESS
153
153
153
R=179 G=179 B=179
RGB
PROCESS
179
179
179
R=204 G=204 B=204
RGB
PROCESS
204
204
204
R=230 G=230 B=230
RGB
PROCESS
230
230
230
R=242 G=242 B=242
RGB
PROCESS
242
242
242
Цветовая группа для Web
1
R=63 G=169 B=245
RGB
PROCESS
63
169
245
R=122 G=201 B=67
RGB
PROCESS
122
201
67
R=255 G=147 B=30
RGB
PROCESS
255
147
30
R=255 G=29 B=37
RGB
PROCESS
255
29
37
R=255 G=123 B=172
RGB
PROCESS
255
123
172
R=189 G=204 B=212
RGB
PROCESS
189
204
212
Adobe PDF library 15.00
математика; формула
3
2BF72B647A68D50F4D2AA0FC2B6BDB6B
Москва
Россия
Москва
99
математика
формула
математика
формула
True
https://urokmatematiki.ru
Москва
Москва
Россия
https://urokmatematiki.ru
admin@urokmatematiki.ru
A
B
C
https://urokmatematiki.ru
a
b
c