image/svg+xml
Правильный многоугольник. Признаки и свойства
Alexey Pavlov
© 2020 Alexey Pavlov
Многоугольник будет правильным, если выполняется следующее условие: все стороны и углы одинаковы
математика
формула
Adobe Illustrator 24.1 (Windows)
2020-10-20T21:36:30+03:00
2020-10-20T21:36:30+03:00
2020-10-20T21:36:30+03:00
5
256
132
JPEG
/9j/4AAQSkZJRgABAgEASABIAAD/7QAsUGhvdG9zaG9wIDMuMAA4QklNA+0AAAAAABAASAAAAAEA
AQBIAAAAAQAB/+4ADkFkb2JlAGTAAAAAAf/bAIQABgQEBAUEBgUFBgkGBQYJCwgGBggLDAoKCwoK
DBAMDAwMDAwQDA4PEA8ODBMTFBQTExwbGxscHx8fHx8fHx8fHwEHBwcNDA0YEBAYGhURFRofHx8f
Hx8fHx8fHx8fHx8fHx8fHx8fHx8fHx8fHx8fHx8fHx8fHx8fHx8fHx8fHx8f/8AAEQgAhAEAAwER
AAIRAQMRAf/EAaIAAAAHAQEBAQEAAAAAAAAAAAQFAwIGAQAHCAkKCwEAAgIDAQEBAQEAAAAAAAAA
AQACAwQFBgcICQoLEAACAQMDAgQCBgcDBAIGAnMBAgMRBAAFIRIxQVEGE2EicYEUMpGhBxWxQiPB
UtHhMxZi8CRygvElQzRTkqKyY3PCNUQnk6OzNhdUZHTD0uIIJoMJChgZhJRFRqS0VtNVKBry4/PE
1OT0ZXWFlaW1xdXl9WZ2hpamtsbW5vY3R1dnd4eXp7fH1+f3OEhYaHiImKi4yNjo+Ck5SVlpeYmZ
qbnJ2en5KjpKWmp6ipqqusra6voRAAICAQIDBQUEBQYECAMDbQEAAhEDBCESMUEFURNhIgZxgZEy
obHwFMHR4SNCFVJicvEzJDRDghaSUyWiY7LCB3PSNeJEgxdUkwgJChgZJjZFGidkdFU38qOzwygp
0+PzhJSktMTU5PRldYWVpbXF1eX1RlZmdoaWprbG1ub2R1dnd4eXp7fH1+f3OEhYaHiImKi4yNjo
+DlJWWl5iZmpucnZ6fkqOkpaanqKmqq6ytrq+v/aAAwDAQACEQMRAD8A9U4q7FXYqoXt9Y2Nu1zf
XEVrbJ9ueZ1jQV8WYgDBKQAs7NmLDPJLhgDKXcBZbs72yvrZLqyuI7q1lFY54XWSNh0qrKSDjGQI
sbrlxTxyMZgxkOhFFA6p5o0HSyVvbyNJB/ulavJ/wC1I+nMLU9pYMH1yAPdzPyDqdZ2vptNtkmAe
7mfkEjk/MWORGk07Sbu6hQEtOyiKIAdy/wAYA9zmtPb3H/dYpz86ofpdXH2jOU1p8GXLflX62H3H
57ajc3x03y/oR1XUN6R27tOg7VLxrSg7kbe4wYu1dRkNDGB8eL7nueyPZ3tHNHxdZHHosH9OXFM+
6Iqv84g/0Susfz3u1v8A9G6zon6M1IGjW1zIYOuwo0i037VxydraiEqOMS+Nfe1dsdgdqaaPi6bH
DW6f+djlUvjD1f7Ey86Zgn5iQQqranpd5Yq1CspTnHQ9Dy+Go+QyX8viH97jnD4bfoeKPtKMZrPh
y4veNv0fcq3n5jaHFGJLOG51RRG8s31NELRRx7szpK8T7DeignM7F2rgyfQeL3c/kaL03Y+bTdoG
sWbEJXQjIkSPwq/iaHmyOyvLa9s4Ly1f1La5jSaCQVAZJFDK2/iDmwjIEWG3LiljmYSFSiSD7wrY
Wt2KuxV2KuxV2KuxV2KuxV2KuxV2KrZJI40MkjBEXdmYgAD3JxViusee4oRbppltLe/W1vOM0YVW
QWa/vJVjnMCyqjsAf3i1/ZrlMsvc2xxd7IdIu4rzSrK7hleeK5gjmjmkUI7rIgYMygKFJBqRQZbE
2La5Cii8KHYq7FXYq7FXYq7FXYqw38z/ADDJo+jW3oKsks91EsoESXE0cAqXmhhfZ3UgAVBpXNd2
jrYYYiyLJ8v0uVodZpcWUjPkjAmEuAGfAJy6RMjQiD3kgdL3eZxz+cNO8uapd3Nzf6Fpc+qNN6sl
oVfhMkXKa49GFVjgHVigWrVHWtNVDBq8/pHFGEjyAPESf6oH46F2Wt08u0dTiEjhGn/KjjAyyEhM
SntjnxwJkI8IBmZQrfhlGlt7+bvkTT7z9E/l7oFx5y1/fjcCJ3iUjYtUrzah6lEVaftZ3XZ3/A8G
GAyZuDBH+dlNy/0vf5ekvGaDsXQaY/TxyH+cf9MfTH3xB9yWan5E/wCcjfP8iy67JZ6NYVDR6fPM
ViUdqQ2/rVI7c/i982WTQdh4v7yebUHuj6Y/70/7IvW6bt7PpxWmx48X9KuKfzO3wEQFbRvJn5i6
HB5k09fOken2vlyCKe8ezs4oRI7wNMqAoImZuHGruTuehzU6vtHRxkRpsAxQxx6+oylz9XFxen3V
I/zg7THjlqBhnqjLPl1MyBuQIREuH0iNb3f9EV9LtY/Ln81NdGkadf8AmsXY1W1+tWovbG2lSFvT
9SWIzcpLpSlQPUWMLuBUE8czcHafZmTFCGp0vFMx3lGVb9aA4acI+PpsubNpMvhwxzrh3vhuo8wY
y9xN8zVBS0vyn/zkj+X3I6Utpr+lLUyWEMpkiKnrSGb0XBPf09/nmTDs7sXLtiyZdOT0mOKH6f8A
dBxtV25l1I/wnFjyH+dH0T+Y9J+MSleo+edD81eYhYa3o/8AhnWTaNbPpl7FOsa3XIss8QijJd3B
48ZkQAD7ec/297Ey0+GWqxnHPBGNmeM1y61592/vcfS63s7RYJzAyYJiYyGWMRjOUYj+7Mv5v+6J
+l6H5R0fzd5cbTPMUkFtqmmjS47RmtGVp/TZYSCzLEjME9Ki8ncAdOO+clA6rSgZJR44938UR3H3
fZu4Ha3tBmhppyEcmWOXUSzcMo0cWORyER/vJ2alH6YRr1AykOEjqei69pms2v1ixl5gbSRnZ0J7
Mvb9WbzR67FqI8WM39497iaDtHDq4ceI33jqPeEwzLc52KuxV2KuxV2KuxV2KpNc+abITtaafFJq
d6ho8NsAVQ/8WSmka/fmtydpw4uDGDkn3R6e+XIOpzdsYxIwxA5sg6R5D+tL6R81Mx+brpTJNc22
kwgFisS/WJQP8p5OMY+hcjw6zJuZRxDyHEfmdvsYRx6/NzlDCO6I45fM1H7Cw291m41KSa08r3t9
rdxDUXWrPcG20u3I6lpYlT1SOvGOvzzFnp+K6yZJVzPFwxH+lAehw+x/hgT12ozQvlASrJL3RiBw
++XySmbyj5skS0lOqvc3AMcjQXjzLbO0rO0IorF4W+EcH34mgNdzmvhgyGQBlLhNV6pbcV8O93vX
wJDtcnZ3Zk4HFwZIQF1KGSXiCvqPFfr57iW1fTVAJXqEF/qPmWw0a4iey1OZb4Sabrjo1qfU+rlf
Qn9KcXHN42bkByqv7PXNgNPK+ATnGX9I8XysG7/QHX5vZzJgwmenz5MmM16x6zGifqjL6CRKt9th
XV6D5e0nz15ekl+tsmt2noW0CcLmUS/6OrBpfSnBjVn5UIRvi4gneuZcjqcW4AyDyNGvjsfsdLq8
+ohvGAyDilsPSQOnOxKvgyXTfMWm30ptwzW16v27K5UxTD/Yn7Q91rl2n7Qx5Tw/TP8Amy2l8v1N
el7Uw5pcG8cn8yQ4ZfLr8LTPM12LsVdirsVdirsVY35y852Xl60480a/lH7qN2Cog/35IxICqPc7
5qu0+0xgHDH1ZZch+k+Tqu0NfOEhhwQOXU5PohEWfea6fjvLxLWvzq0TQ7j6xY27+ZvNl0wWCeRW
FukjGirDGAHkIO2wUfy++R7L+zObX5TkPqkN55ZfRD3d5+XwG7stL7GDs8DVdqT4tVPcYxRl/wAT
Ef0t65AJton5PeevP80Oufmxqs6WfIS2nli3b0lQHp6vH4YzTYhRzp1YHbO/n2vpuzo+HoRx5P4s
0tz/AJo7vs8pc2WSZynccMP5o/SeZPv+FcntHl/yx5e8u2C2Gh6fBp1otKxwIF5ECnJ2+07f5TEn
OV1Ory558eSRnLzSmeY6pFq3kbyrq95LeahYLPPcRiK4+ORElVQQvqIjKjla/CzAlexymenhI2Q7
LTdr6nBAQxzoRNjYbe4kWL6gbHqiLLyvo1lqf6StkmW7+rpacmubiRPRiACJ6TyNHtSteNa1PUms
o4og2OfLmWrL2hlyY/DkRw8Rl9MQbPM2Bf29w5AJrljhMU806NpfmTWbLSLu1jnjtFe5u5yKSxpI
pjWOOUUeMy78uLA0Ga/PnnPNHDE+gVOfcaNxiRyPqF0e50mu/wAIzx0/8EfXk9w+mPxO/uDyjWPy
x/Mr8sWk1f8ALLU59T0JCZbry1c/vWA25GNKBZP9iFf/AFs9Ej2jpO1BwasDDqOmWPI/1x+v4GLu
8WU4juOPH/NPP/NPMfaO8FCaB+dHlzW511GJD5b8yIaXFPis5mP2lkH2oy3+UCvi3fPN/aP2d1HZ
2o4q8PIfpkP7vIP0HvB+PQtWs9ipaqJ1vZE7zR+rHtGXuI+k+8bS7r5dv8pebbHzDYiSJlW7jA9e
FWDD/XQ/tIfHJdm9pR1Mf5uSP1R/HRwezu0fHuGSJx54bThIUQfcd6T7Nk7N2KuxV2KqU11bwA+r
IqkI8vEkcuEdObAdaLyFfngJSAxfQfzCs9QhuZ72KOxhhtrW9TjOJ5PRvQ7QrKiqvpzFEDcBy2Yb
5iz1kIRM5nhiP0/p8mvW5cemxmeQ1EfjbvRSWmq+YKS3/PT9IbePT0PGeZfGdxuin+RfpzCGLLq9
8l48X83+KX9Y9P6o+Loxhz63fLeLB0gPql/XPQf0R8Un8w/mX5W8r3KeXNFtJNa8w0Ih8v6SgkkU
0+1cMvwQr05F96b0IzqezuwpSxcQ4cOAfxS9Mfh1kfcC7vBgx4YiERwxHQD8fM82N3/kT82/PRD+
atYt/LWkMQyaBpyi6koCCFuJWKxO30Ovtl849nYtuGepP9I+HD/Sx9R/zpfB2WDtLJg/uRHHL+d9
U/gTtH/NiD5prY/lPo1vfW2nPq2salDbRl547m+kS3jiYFUjjgtvQhQsRUUWopUb0OYGt7YlmI0+
PHixw2MuGA5A7Rs2fUeY6xsci1w4heacpSmdgSd76n4fei7T8pfIialLCllOi2ixywML29LB5S3M
uzTEyA8F+GTkNumQy9q6jNkzQmQY5IQB9MOQ4qr0+ki9iKLEeiEJDmJS/wB6lFz+TOnavY3Gn/p7
V7Se3fjJbSXP121DU+CVILwT8eSmoKMCDtXbMnT9uDNDw9Thw5THaXp4ZHulxQrmP0tkcmTTZBlw
TlDi3FH5xPfR6FZY2v5z+Q4wrNH588vRdUStvqkSAbmNZGdZQB0TmWPQUzLhp9Bm2hKWnl3T9cP9
OPUPiJMc+r8Y3OMeL+dD0374/T8uH4so0LzX5F/MC1khtpOV9aE/WdOuFNvqFo6kA8ozSROLGnJa
rXapzVdrdhyiAM8bifpkNwfOMh+O91es0OLURqYuuvIj3dQjvruqeX2Cak7X2jkhV1GlZoa7ATgf
aX/LH05ovGy6Q1lPHh/n/wAUf63eP6XzdV4+bRGsxOTB/P8A4o/1+8f0vmyGOSOWNZI2DxuAyOpq
CDuCCM28ZCQsbgu9jISAINgrsLJ2KuxVKvM/mC10HSJtQuKEoKQx93elQP4n2zC1+sjp8ZmefIDv
Lha7VjBCwLnIiMR/OkeQfOly2mT+WP8AHXm+WfW9c1e5lh8v6DzKRTPGeHJxHR/TjI34kbADckYO
xex8eovPnJGMbzl17gB3ykdoj9AfS9VlPZ2b8noMcI5pRHHk/iJqyZSPKIG+90No0y78i/Ithba7
qGp+Y7OR/PNsqSTI8Sx2thDcFvRitkBoGZFJqF2Hw9eVer7R9oYZYDSaWBw6aAHp2Bkf6VE/fvzP
lyWv7OzQA1GXJHKcpNSBJvhq+YB25fse5ZonXOxV2KuxVK9W1e6tL6ysrW1W5nvBKy85fSVRCFJ3
4SdeeYOq1U8c4QhHilPi619NeR73W6zWzxZIY4QE5ZOLnLh+mvI97dnr1tNpU+oTobZbRpUu42IY
o8JIcAjZum2HFroyxHJIcPBfEO4x5pwdpQngllkODg4hIdxjz9/ko+V7SZbSXUbpeN9qj/WZlPVE
IpFH/sEplfZuKQgck/ryniPkP4R8A1dkYJCByz/vMx4j5D+GPwCc5sXbPnL86PLmkfpyfzd5RsnO
oWNwLTzAWtxJpV1IxAaKWh5etyZVYolOVPiVxXN9ovaTAdPLSa2Msun6EUTCXQCz8u7kdneaDsXV
jJDJhyRxZpDiiDIiRj/O2B9Nb1zIGwKAs73RNO0DS/zG8hXdxZwi8S11vQpX9Vbd2BZ0JNGKELQE
1JDA1B2HL+0fs/PsvPY5j6T0IP4ojvdxodZHtuE8efHCWphikcWSqlxAbCx0s3W0TW4fRuh6xa6x
pkN/bn4ZB8aVqUcfaU/I46LVx1GIZI9fsPc+fdn66GqwjJHrzHceoR+ZTmuxV2Ksf80Xi20imQSe
jJY3qO6xqYkqYQHkkJDLToFAPLf+XKM+QQBlLYAFE8sccDOZqMdy820/S7O38v6FrvnDU4oJre1s
oNBsIYvUlZLeWKYURHZppJOHBSoooNTmtxeoDJl2r6R5d9c7I6dHI7N0WfXTMo4zUZEizQAqUeKV
iPDYJPDK/nsA91+YHmbz9eTWtjqEfknyTBKYL/Xp5o47y4cfat7WRjwSTpyKk8PEn4T2WHDi0WMZ
tWB4kt4Yj3dJZO4d0OZ67W5Gox48Z8PCfFmPqmPpHlDv/rnb+aOUnqHkjyn5Q8uaMkHliCFbSYBp
LyNhLJcsCf3ks9SZDUnqdugoMwNX2hk1UuOcuLu7gO6I5Ae5wSCNinV9dx2drJcSAlUGyj7TMTRV
X3YmgzAzZRjgZHp+K+LPFjM5CIUtLtJLe3Lz0N3cMZrph05sKcR7IoCj2GV6XEYRuX1y3l7/ANnI
M9RkEpVH6Y7D8efNZbf8dm+/4xW/65Mjj/vp+6P++ZT/ALqPvl+hZqgNpPHqqD4Yh6d6B3gJry+c
TfF8uWR1P7uQyjptL+r3/wCbz91pwesHGeu8f637eXvpMgQQCDUHoczXFYj52/LLy/5peO+Jk0vz
Fa72Gv2J9K7hYCgqy09RO3Fu1aUrXNloe1MmnBh9eKX1Ql9J/Uf6Q3WzzHT8fgcmGaZ+aHmvytrX
+FPzIshdM6M9lr1lHWO7gT7btABuVXeRUFVG/EjfD2loYDGdRguen/iHOWInpIdYnpIe4789lpdJ
i1g4ImMM/wDNl9M/6pPI/wBGXPoegmWl6rp+nCK9026jvPKd+1I5YnDraTMelR0jYncH7J8M5CEx
pJAg3ppn/SE/70/YXk9RpsvZObgyAx08jyP+Tkf95L5Bl+bx3TsVdirxv81tY+u6Vr+pM/8AuM0e
H6nbDs9zcMImYf6gJav+SPHOVyiWt1J4RcMR4Yj+dMmvv+4d7rfZjAO0u3YTmf8ABtJLi8uKHqv4
GP2DvYP+UXkjzP5vFp53EscNvoMkNr5Y0+55C3mS2k53EjMqsyc5ankA3xVHRRnp3b+lhodFh0GO
jliRkyHvlR9Pu3/3J6l63D2zDLrc+fIJeHmjOG31Riao77HYAHcdXsLeSfMN5Z+ak1SWzlufMf1d
VMZkCRRRoI2j+JCf3a1KN+0d/hzj/AkRO69VOUO1sGOeA4xMRwcXOrJJu+fXqOg72d5mPNOxV2Ku
xVINe0+6vNe0gwyT26Rx3fqXUAHwFlj4glldRyp3zU67TzyZ8XCZRAE/UOn094I3dH2jpZ5dTh4T
KIAyXKPT6a5gjdJ7GGa6+p+WpYWQW80txqzsGHrRxSkxsS32vXejH5Gma/DCU+HTEVwyMp/0gDtz
58Z3dXp8csnBo5RI4ZSlk5+oCXpO/PxDufcaZvnTPYOxV5z/AID83LpUWhLc2DaTb6ouomVjL691
F9c+tNFMAnFCKn4gWrQDbMD8vPh4bHDxX797er/lnSnKc/Dk8WWLg6cMTwcFx3s+7arPN5L+dXl3
X/J99fa56UcflvzRM1vqNrBKZlinVhPbzGsNuEJZW2Aag5jkS2dV2Z2UO0dLqMJr8xQnj5b8N2Lo
fVsN9+RMjW1Wm7ehg1GlkDLgxXGRPdLblxT2jz5gd0I9emflnrBtItGnL103zFaoQR9lb2L93KB8
5FP3jwzzvRyOl1Iif7vN9k+o+f3jueA7V038ldt5cI/xfUTMo9wkdx8wR8x3PVM6l3LsVdiry38x
tYvNQ802ehaVMkM1rC8txK6NMp5vGaeiKLIY+CN8RpU9Ouc12tqhPIMY3ETv7+dHvrY1+pydB2bp
9cZSzXPBgmOKIPDxTrijGUv5tbkDrW4pI5/L9tqWoP5W0KR5tZuIY5/M3mFpUnuU0+RiPq0EoAit
mn3VVUfCm/E9c6vsYHTYxrZYhk5jHc47zHWv5se4UL2t2XafaE8/7ni8LHH+CMSAPf3nzNsv1O3f
QLnywLHQpYtJ0f6xGtvZRvccFeAxqOECSNuzdSNz1zVa7V6jLlGXJEylxEne7sFw8GPGIyiJcwOl
dV3lSXzVZanJGukejo+pSXt6kLqUkhIa3SFC1eEYKmQ8ClTSoNAcq08ssbqG0iTV8vxzTmjjlXr3
ApPWutSv9QUix5W+nueSeqtGuKbb9/TU/efEZA5cuXJ9Hpxn+cPq/wCO/f7mQx48cPq9U/L+H9v3
e9Mfrmq/9W7/AJLJ/TMzxsv8z/ZBxvCx/wA/7Cgre71P9LXpFhVjHByX1U2AMlN6d8xseXL40/R0
j/EP6TfPHj8OPq6y6e5GNd6owKtp1QdiDMlCPuzJOXKf8n/sg0DHj/n/AGFAaZeanaOdLay5GFed
tWVa+gTRVr39P7PypmJps2XGfC4OW49Q+n9nL5ORnx45jxOLnz26/t5/NMPrmq/9W7/ksn9My/Gy
/wAz/ZBx/Cx/z/sKQ+dPLcnmvRW067sGgnjdZ9Pv4pkE1rdR7xTxMKEMje+42zP7O7V1Gly8ccdj
lKJkKlE84n3sJ4MUh9f2FgFna/W1v7VWGj+ddOKWuvJbAC2vmkSscr2J+GRZ0BYNHuDXfbMDt3SD
GBkjj4MOe+EcQlffGhzMfn1d3ptZHUYjptTWow1REgQYj+jPnH47Mw/LrzolxZ/ofVJR+kLOQW8c
yq5jlXiCvx/EFKk8PiO+3U5r+x9ZxQ8OR9URtf8AN6fj3PP5dDHRZfywlKVQE48VcXATIC65kcNE
0OmzPM3aGHeZvzAi0qOe3m0+9tJJTJbaffzRILaW4UNQKyuzivEspZAGA2zWdo67wcUpUbrY+bPt
XSzw6DLqMcoTljhxGIJ4o3QBIqtiRdE11eTfnXa3cfkvyf5GsdtV80agsklTvU8U+OnYG4UH/Vzp
v+B92XDGBnyj0aeByy/rken9NecQ6r2fxHR9n8A2yZgAf871S+QEYnyL3ry7oVhoGhWGi6enCz0+
FIIR3IQU5N/lMdyfHMTV6mefLLLP6pm3YxjQpMMx0uxV2KuxV2KqV1cw2ttLcztwhhQvI3gqipyG
XJGETKXIC2vNljjgZyNRiLKVeWLaY202qXS8bzVHE7qeqRUpDH/sU/EnMDs3HLhOWf15TfuH8I+A
db2RilwHNMfvMx4vdH+GPwH2kp1myds7FXYqkXnnyraea/KWqeX7mgS/gZI5CK8JR8UUnf7Eiq2Z
3ZuulpdRDNH+E/MdR8QxnHiFPEvyhu7y/wDye1TTJEI1vyffSMsJYKyKPjNSem/q/SuVf8EDseMM
s54/pnWaBHn9X28Rr3OJ29px2hp8cpSMZ46BkI8RHBtYiN5egx26kPWfJP5jWPmCyv5bsQWUmlJF
JeypcpNbCOZGYOZaR8Kem3JWHw06nrmo0esGWHEdqAv8dHoM/Zc4Y8M4icvGGwljljnYqxwGz1Fb
m2YgggEGoO4IzOdYhtTvorDT7m9l+xbxtIR48RUD6TtlOpzjFjlM8oi3H1eoGHFLIeUQS8t1RrTy
/rEmqas3B4fLV9qd7KNn+sfW7eUca/th+Kr9GYPZXZMs+SGD/K5RZPdKUgb/AM39DtOw4S0vYxlL
65aiMp+ZlCdj9DIfy+0K6XRZdRlvLmPzBfXM13ftPU8GmcyR27wElVSON1AVSKbkEVzYayUc07xi
OKeOoS4fplKIoyI/i4vqEvq4SN1lPg9MvXjO4vmAe49K5VyvoyhNWe3YRapGLZiaJcqeVu5PT4z9
gnwb6CcxhqjA1lHD5/wn49PcftYnTiW+M8Xl/EPh1+H2K2p3klvbqIAGu7hhFaqdwXb9o/5KirH2
GWanMYR9P1y2j7/1DmWGDGJS9X0jc/jz5KtjZx2drHboSwQfE56sxNWY+7ManLMGIY4CI6fb3n4s
MuQzkZFXy1rQFt/x2b7/AIxW/wCuTMTH/fT90f8AfOTP+6j75foR+ZbjIHVraZ447q2Fby0JkhX+
cUo8f+zXb50OYuqxkgSj9cNx594+I+2nI08wCYy+mWx/Qfgrx39pJZLe+oq2zIH9RyFAB/mr0y2O
eBhx36atrlikJ8FepB/Xr6+205PRtz/x/Tqdx/xVEaFv9ZqD55jeNky/3YqP84/70dfeaHvb/Chj
+s2f5o/Sf1fYwX8xLe18vahpvmP69dLHD/ovmCjcxJY3k8MBmk/ZT0WIKlF6cs2Oh0gz8WiiBLLm
HFxn6wIAkgH/AGz6ANhvxVskZyB4h2hDlEcuI8vlzv4dWM6pdSaVPc3cHoiM+ZL6AwtBLMPTjVLg
sywyRs6IYVIjHXuaVB53NCOOQyjbgmR8DX2Dm2e0mKInp9Qb4seDGDuBcZnhNk7bXxfDzek+VtSi
u9KsZNKuLVJ/qKSzeX1lQxxPISxo6LJLGFcsnQrtQAUzc45WBXdycSYo7/NgPmHyLqyazo9vqAsr
qa61dpzq3KVr6aBmb93JzXjEsaygcEYqaDpTfQ9pY6MMUqJyT59avr5b9HO7d9pdL+X/AClZB+Zg
MYgOHw4kGFy52b/nVxCzzSLy3oBm/wCci7TRmEf1XyZYXdzHEhLR/wCmXEs8IUMBRkTUI/pTrnpu
kh+V7DlXPPmr/NG/3g/Np7U1f5nUeJv9Eef87hjGXz4bfQucs4TsVdirsVdirsVSDzB/uSv7TQV3
ikpdaj7W8TfCh/4ySUHyBzVa/wDfZI6ccj6p/wBUdP8AOP6XSdp/4RlhpRyPrn/UB2H+dL7AU/AA
FB0zau7dirzT8n9D01b/AM3a2Yy+qP5h1i0FwzMxS3F4X9JFJ4qpf4jQbnOk7f1MzDDiv0eDilXn
wVZ+GzTiA3PmWb6x5r8saKCdY1ez0+gqRdTxxHx2DsCc0un0OfN/dwlP3AlsMgOZYwfzn8n3AI0K
HUvMcgNCuk2FxOv/ACNZY4f+HzZ/6HtRH+9MMP8AXnEfZZl9jDxR03eT+VbGXUfzb88eWLy2uvLt
t5ws01OG1uRE04nimSUMyxs6EMzTEry+zsd82ntFpY5uysJExPw5HGZRuu8cwOQiA5/ZOtOmz+II
3w+qvLeJ9x3G/fuy/wAq/lq+raN5i0681eSGSeSO0dIIY1RTarME5o/qc4y9xy47MGUEODSnlPY+
ETxThZHDLh7+V/pP2I9mfaqEIRhjw0NNlyD15DOR4jEk8VR9WxF1VGuHnfYLaFobaKFpGmaNFRpX
ChnKinIhQq1PXYUzpAKDTklxSJqrPLuSfzWBPDp+nndb69hSVfGKMmV/+TeaztT1CGP+fOIPuHqP
3Oj7Z9cceL/VMkQfcPUfueb/AJs2cuq/mj5Q8vKOVrrEZTUIz0e1tLhL6VT7N9VAzquxB4eXLqf9
Swmv60yIx+8vWTyD+T/D6yzxPwjCV/eGQ+bAF86yPLe3VjYppkUk8trPNCEka4eOOZo42VZaHihD
A7H2zkdXLgzE2RHhHER03IEvOthv0XTx4sVc5Wav3Db8dU98m+ZW1q0axvoGTUbW1tZb0v6TRyLd
xlkYBGYqWCnkjqpHhxIOZ2ny+JACQ34RfxcTNj4JEx5Wa+C6wsLg3DajppUWsRaKys5ixjZNhI8b
b+nzZfhoCKdt8wMGCXF4mL6RYjE3VdSP5tnl0r3uZlzR4fDyfUd5Ec76A99dfP3MU1XU2/Sfmi7m
1K803UbD6s+mWRuZOBf6uCYxbK7QyCRxv8J618cjLU34hJMJj6Y35DauRs/emOCuCgJQPM159/MU
PuZ5oOtHVYbn1LWS0ubKc2t1FIY2HqqiOTG8TyKy0kHeo6EAgjNvjnxX5OtnCq81S2/47N9/xit/
1yZRj/vp+6P++bp/3UffL9CPzLcZLpdW9WRoNNj+tzKaPJXjBGf8uShqf8lanMOWq4jw4hxn/Yj3
n9AsuTHT0LyHhH2n3D9JS+10tbXVUTUCLlbktLa7FYY7ipeRViJZQWB5KeuzZh4tMMeUDJ6uLeP8
0S5kAfaDz5uVkz8eO4enh2PeY9N/sPwT24uIreCSeZuEUSl3Y9goqc2uTIIRMpcg66EDIgDmUivf
Lia55d1ay1JeMmu28kMytuYo5EKRoPeMNXb9qpw9k5Z4MsdQf7ziEvcByj8ufmS26qQPoj9Mdvee
p/HSnlP5XeXdU82+RrKWe7a2urLVL4ajKpHrGQ2X1Z+PNJEqZT8VR9kmm9Mv9oOzRHVZsY+gzMh7
pxEh/unI7VyR1GnxxIEuLTiFHl6ZSjvVHp0eleQfL1jaafZapDNcPI9mLcwSsrRoxlMs7qOIbnLM
WZyT+AGavs6fiYYz6mP29ftdN2frTqNNCZABkN/fyLev/vfPXl2E9EW4kFelQhP/ABpmBrvVrsEe
7iP2fsdF2l6u0tNHu4z9n7Hmn5DXo1z81fzJ1+ocNPBFA5JJELyS+mB2pwgXPR+05V2VpB/O8SX+
yv8A3z12uxeFqZw/miAPvERf2vd85ZodirsVdiqA1vWINKsvrEiNK7uIreBPtSStXig+dP8AbO2T
x4zI04us1ccEOIgncAAcyTsAEqXzbc2c6J5g08aTDIjyR3BuEmjpGOT8yqqEoMmcQ4SYm68t/wBr
ifyjLHMRzQ4OK6IlxDYWRyBBrflv3sS0H83fJHK6u47mfV9Y1GTmbLSrW4vpEiT4YYuUCNGCF3oW
6nJ9mezOt4ZZs0BhOQ3+8lGFR/hHqN8vLm09lA1LNkFZMpuuoiNox+A+0pt/jrzzqDEaJ5FvFiOy
3OsXNvp6g+JiU3M1P9j92bT+TNLj/vdRG+7HGU/t9I+123HI8g1+jPzn1JaXet6R5fU7gadaS30t
PD1Lt44/+SWPjdm4/px5cv8AXkID5RBP+yWpnqA2fynhvSG8w+Zdc1qv97bveGztm/542Qth+Jx/
lww/ucWLH58PFL5z4l8K+ZJTXR/yy/L7Rn9TTvL9jFPWv1hoVlmr4+rLzk/4bMXUds6vMKnlmR3X
Q+Q2ZDHEdGTAAAACgGwAzWM3gv5m340X/nJHyRqm6JcWa2crkfCVklnib/gRNU/RnU4pf6x5f6Ga
B93Fwx/S5Ggw+LnMP52Of+xBn/vXp3k/4PMPmeEdBdJJ7Vk5k/qzzfsnbUaiP9MH528h2HtqtVH+
mD8+Jlmb96dJdU+LzPoa9lW7l+lY1T/mZmt1O+qwj+ufsA/S6jWb6zAP+GH/AGIH++YpqkK3P596
ECORsNAvbpemxkuI4K7+zUzrNN6ez80v5+THH5CcndTlcYjuMj9kGaaj5c8v6lOtzqGmWt3conpp
PPDHJIqbnirsCwHxHoc0OTDCf1AFMMso8iQlFvawwT3GkQQJDqd2yi9v40VJZrRBRZpJFALvxPpA
k1Db9M1YMv8AF/4+p/ofzvf/AA/1t3PIH99/D3f0+73fxe7Zk0cccUaRRqEjQBUUbAACgAzbRiIg
Acg62UiTZ5pddeWPLl1ePfXGmWsl+9OV6YUFx8IAU+sB6gKhRQ8tsryafHP6gP0/Pm2QzTjyKFsN
H/w+so020iksppGmnSGOOK4Mjbs7FQizE9y3xe5zGEMmHl64f7L/AI99/vbzKGXn6Jf7H9n3e5bB
rlkdVvGgD3E0kcKpbRqfV5KZOQZW48KV350yiGth4suG5EiOwG/8XPu+NN09LPw43QAJ36dPn8EZ
9Qvb7fUn9OA9LGBjxP8Axlk2Z/kKD55keBPL/emo/wA0fpPX3bD3tHjQx/3Ys/zj+gdPv9yYxRRx
RrHEixxoKKigBQPAAZmRiIigKDiykSbPNQ1GyF5atEG4Sgh4JR1SRDVG+g5VqMPiQrkeh7iORbMO
XglfTr5jqlkN0+sTQ27oY47QiTUY96eujUSL3UMvP5cfHMKGU6iQiRQhvP8ArDlH5+r5d7lyxjAD
IGzL6fd3/o+aeZtHXvOvyXURwedIVFI4fNmqrGB2UtG1P+Gzc9tbyxS6yw47+EeH9DORNAdw+8k/
pZV5QHDS5oOn1e8uouPhSdzT8c5PsrbEY/zZzH+yLpOxNsJj/NyZB/syxX81dVbRLq01hTxkhsr5
YSenqeiVT/hpBmv7VlwavDPyn937WeLSHN25oo9JykD7q9X2F5X/AM4/6jceVfNHmixl0+8vpL61
029SCzjSRxGYDPzPJ41AVbtdq13ApXO+7Q1cP5L0UeeQQnsOkeKrP+l+NGnuO0uz5ajX6jIJRhjG
Xh4pmgZdwoH9QHMvofy7r9j5g0eDV7BZBZ3Jf0DKvBmWORo+fGpoG41Wu9OoGaDFkE48Q5On12in
pspxTrjjV15gGvhe/mmWWOI7FXYqkXnCwvbmzs7izj9ebTbyK99AfakWIMCq+/xV/VU7ZdgkASD1
FOs7UwzlCMoDiljnGVd9cwPOjt5pddTXPmTUdNiTTrq0s7G4F3cy3sJhqUFFRQ32gakN9/bLI1jB
N7nYU4+WUtVlxiMZRhCXHIyHDyBAiL589+lMrggggiWGCNYoUFEjQBVA8ABsMxpSMjZNl3YC/Ars
VdirsVSnWfNfl/RZo4dSuxDNKpkEYSSRljU0aVxGr8IwervRffKp5ow5lztL2bn1AJxxsDbmBv3C
yLPkN3zt+e95Fr/5h6Re6NKZ4rPQBqccoBAEbXLgOAwBB477gbUzppS/5t3NIfx5Y151wF2Xs7iO
HtjHjyiiOKJHmYyH7Hsv5Y6musS6vrSfYv2t5FpsB8DNSh8OWee9iy482effIfZbwXZ+mOLtDWxP
8Obg/wBKZBnWdC71JdU+HzPobdmW7i+lo1f/AJl5rdTtqsJ/rj7Af0Oo1m2swH/hg/2IP+9Ypqky
23596ESeJv8AQL21XpuY7iOem/stc6zTers/NH+Zkxy+YnF3U41GJ7zIfZB6FNNFBC80rBIo1Lux
6AAVJzRzmIgyPIIjEyIA5lIvq92qfp8o31yvNrfv9UP+6afzBfj/ANfNX4cwPzFevu/ofzff/F/W
dhxxvwf4e/8Apd/6Pcn0Usc0SSxMHjkUMjDoQRUHNpGQkARyLrpRINHmFO7vbW0i9W4kEak0Wu5Y
noFUbsfYZDLmjjFyNM8eKUzURaCrqt/9nlp1of2iAblx7A1WMfOrfLMa8uX/AGuH+yP6I/afc31j
x/05f7H9v3e9B2+h2I1W7WDnbyxxwslxGx9Xkxk5FmblzrQV51rmPj0WPxZcNxIEdwd/4vn8bb56
ufhxuiCTt06fL4UjPr99Y/DqKerAOl9ApoB/xbHuyfMVHyzI8eeL+8Fx/nD/AHw6e8WPc0eFDJ/d
mj/NP6D1+/3pjFLFNGssTrJG4qrqQQR7EZmRkJCwbDiyiQaOxUNRvRZ2jTcechISGIdXkc0RR8zl
eozeHC+Z6DvJ5Bsw4uOVdOvkOqWQW0mjzQzyOZI7shNRk7CdzVZd+ilm4fLj4ZgwxnTyEibE9p/1
jyl7v4f9L3OXKYzAgCjH6f6vd+n5p5m0de86/JdhJB50mU1jm82aq0ZHdQ0a1/4XNz21tLFHrHDj
v4x4v0s5A0D3j7iR+hlXlE89Lln6/WLu6l5eNZ3Ffwzk+yt8Rl/OnM/7Iul7E3wmX87JkP8Asywf
/nImwuJ/JUNzAhcW9youCu5WFxVmp/rIuUds4gRCZ/hP3h7D2Zjgj2pgy5SIyjxiF9ZzjwgX0sXX
nQ5liE2pRW35t6JeeV7xIbHzrozWNldziscMkCIhUopH72P6rGFH8zU6Z1Wj0OXPoMuXEYGEeC7v
iiBxVw7UQeOXECR9N7uZqtTjxSGDVxn4uLJOXprhnxUdydxy2IB2L0fyh5J8yaPcaUbm/UWlhBHb
SWcFxcNAyR2oQsIWVI+T3DO5YitAtDuRmjw4JxIs7DzPd+tHafa2nzxycMPVORlxGMeLed/VuaEK
Fctz5FneZjzbsVdirsVdirsVdirsVdirsVee6/ovnCPVvNcmmacl9+n7OGCwvGmjjS3WKBo3idXP
OpdmdeIKkn4iMwcmPJxToXxDbyep0Wq0hxacZJmHgzJlHhJ4rkCCK25AA3vttby7Q77SH8xeeNV1
VFg0rRNGTyvT4XkWb00hWGEj4XblBJWhoD3K75ue08Gq0ukxQzGsE8fFGIl1P86NfV53VVX8TkaO
eHU5o/lhxao6jjlIxr0gk3xdIb8qskG/4Q9O/IWxurb8vreS5jKPcyyPGT1MQPFP+InOd7HxCOOU
h/FL7qH3gvPdtQ057R1GTARKOTJZI5cQjGMh5+uMvjb0XNu695v+Zvm3UdK1W2FlBG/6JS31CRpE
kbn9ZkltxGXQhYUpG3KR9qkD56ztD6oSr6JA/Ow4+p0kcnhzN3Cd7EDpR5g8XP6RRPRj35pavFZf
mn5V1+2njkt9ABGrsjK3owXc8dnLzofhKi8VqHtvnUdhy8XLl03+q4TX9eBE4/pd3kxD+T/EPOOe
I+EoSv7g9Wvf9Ov008b28HGe9PY71ii/2RHJvYe+c5m/e5Bj/hjvL/ex/SfL3uPi/dwM/wCI7R/S
f0D9iZO6RoXdgqKKszGgAHck5mmQAs8nFAJNBjljf3IuX07TQv1SYvLZXcwYIqbGRI1oPU4s3w7g
U77ZpsGeXEceL6DZjI3VdQB/FR5dK9zs8uKPDx5PqG0gOflfd59b96cWmlQQS/WJGa5vCKG5loWF
eoQfZRfZQM2OLSxieI+qfef0d3wcLJqDIcI9Me4fjf4ozMloQFt/x2b7/jFb/rkzEx/30/dH/fOT
P+6j75foR+ZbjJfLpPpyNPp0n1SdjV0pyhkP+XHtuf5locw5aWjxYzwS/wBifeP0ii5MdRY4ZjiH
2j3H9B2S611NbrVUbUALdbYtFa7loZLipSRlkIUVUfCoO+7Zh4tTx5Qcnp4do/zTLkaPlyA583Ky
YODGeD1cW57xHpt9p+Ce3FvFcQSQTLyilUo6+IIpm1yYxOJieRddCZiQRzCR3vmJND8uare6k3KT
QreSadjsZY40LxuPeQCn+tUYeycU8+WOnP8AecQj7weUvlz8wW3VAD1x+mW/uPUfjpTBvyLNzo35
ZahNfjjeQXdzcXYbr67RRyOD782pmV292hGWo1GUfTCRA90IiI/3LPtutLpscv5unE/iTOX6Xo/l
qzaz0Cwt3r6iwoZK9ebjk3/DE5quzsRx6eETz4R8+ZdL2VgOLS44HmIi/edz9rvMmlDVtCvbCgLT
Rn0wenNfiSv+yAw9oabxsEodSNvfzH2su0tMc+nlAbSI2/rDeP2h8oeftD1ry5pum+YdIZjYWGoL
d2wIJNnfxEGSM+CyKiP78afs77H/AIHPaYjl8HKf3WpBxS8p9Pny98vJ6HR9qjt3sgZp/wCP6Taf
fOMeZ942lLu3rnQ9WeVPMdh5l8uadr1g1bXUIVmQdSrHZ42/ykcFT7jLddpJ6bNLFP6oGv2/Ebuq
jKxaa5isnYq7FXYq7FXYq7FXYq7FXYqxz8xPOFt5Q8m6pr85UvaQn6rG3+7Lh/hhT6XIr7VObHsn
QS1ephhH8R38h1PyYZJcIt8z/lz5S1fU/LkN/qXNrK4vGltoG63l/OQHkb+ZURQv+tt3bNR/wQu1
jqdVIY/7uBGLGB1r6iPjYB/quz7b7UPYfZIxYP8AjQ1lb9YRlyA7jw/EE33PrDSNPTTtLtbFNxbx
rGSO5A+I/Sd8jpcAw4owH8Ip0ui0wwYY4x/CAP1q9ytw0DrbyLFOR+7kdDIoPuoZKj/ZDLy5Yef+
bNDW81jU7/XbyTR9IubBdNAhZJPrIilmm+KsUhUMsigKCrlqqtdicXPj4rs1szkOKHDH6uY8j0Pw
O7ENP8u6dPq2paXqSln1TRtTt761QqxW5lvoEAj+CP4y7B1LVI23oBTE7J7Tlpskcw3yYunfMSAr
/O+4ub2Rk/N9kGJPqjnjCd9DDHPiNWfezn8vdeu5NGm02SyuH16wup7W/E5IDGGQxx3DzEUZJI1W
hUGtDQbZs9ZGOGdYzHLPIBORj9MZSFyiT/DwnYR+oRA2apQ4/VL0QG0b50O4db53yvqylNJadxNq
kgunBqluBxt0Psn7ZH8z19qZjR0pkbyniPd/CPh195+FMTqOEVjHD5/xH49PcPtVdUs3ubYGAhLq
BhLauegkXoD7MCVb2OWanCZx9P1x3j7/ANvI+RYYMgjLf6Tsfd+N1WwvEvLSO4QFeYIZD1R1NGQ+
6sCDk8GYZICQ/sPUfBhlxmEjE/jzV8ta0Bbf8dm+/wCMVv8ArkzEx/30/dH/AHzkz/uo++X6EfmW
4yB1a5mSJLa2NLy7b04W68BSryH/AFF3+dB3zF1WQgCMfrnsPLvPwH205GngCTKX0x3P6B8VeKwt
I7JbL0w9sqCP03HIED+avXLY4ICHBXpqmuWaRnx36kH9RvrHfTn9a3HWxnY0A/4qlNWX/Vao+WY3
gZMX92bj/NP+9PT3Gx7m/wAWGT6xR/nD9I/SN/ewT8w7i18w6jpvlw2V0Y5qXXmGilFjsLOeKcxS
7cZPVYUUI3Tlmx0OrGC9bEiOXEOHgP1ETBBkB/tf1iW4/hvdl4BI8M7wnykOXEP18iPj0XaBIt/L
q2ixEOt/5ivJrkjcfVYTG7Go/nbioznc8hlIwj+PISf6kaP27BxPbL97PS6b+fhxmX9SNk/M0Hpm
b9i7FXnuvaPptprd3pmqQiXy15oX050b7MdxXYg/snkag9q1/Zzmpf4HrLO2LN/sZ/o3+/yeYwam
fZPaYyRNYs5+An5+RvfoRLyYH+WOo335V+fLj8tPMMpbQtWlNx5X1Jz8BeQ8fSNdl9T7JHaTxD1z
1ntKH8p6MayH9/iHDlA7uk/x02/hemnGMZ+naEt4+XfH4faN+Zp79nFpdirsVdirsVdirsVdirsV
dir5584T3H5z/mRD5T0qU/4I8sSevrOox7xzXG6kI3Q/tRx/7NtxTO1wg9laA5TtqtQKj3wh1l7+
vv4e4pwcPicUxcIdP50ug9387y22JD0ry3YWWp6+k1lCsXl7y8gtdLiUfAZAN3Hj41/1c8l0gGr1
XiD+5w7R8z3/AI8nlsWefavaMtVM8WPEaif50up/H9FnmdK9Q7FWmVWUqwDKdiDuDiry3zt5Rm0T
VbbXtBgV42X6rPayzPGql2r8MzF/TV/hTf4RQDYZzXaukGOccg2jI7+/kL8jy/tcnRdq4NFIxz3H
BnmDKYFiM64YylH+b0JHI9/QmvNdi0nU38zaPDLa67bQx2/mfy3JCtvdPp8RJNxBF/dXLW+7Ky/a
So5DpnWdjk6mA0Usox1Zx3AbTPT+rLvF7707LtPs+WH9/wAPi4j/ABxkSD7+4+Rp6lpNzJq+m22p
6brCXVjdoJbe4jiQqyn6foI7HMLPotRimYTlwyjsRwh1gzYiLEPtKL+p6r/1cf8Akin9cq8HL/P/
ANiE+Lj/AJn2lLmtdSsNQWl9xt9Qejv6S0W4oAu1dvUVafMe+YZxZcWT6/TkPcPq/b9/vckZMeSH
07w8/wCH9n3e5Mfqeq/9XH/kin9czPBy/wA//YhxvFx/zPtKCt7TU/0tegX9GEcHJvSTcEyU2r2z
Gx4svjT9fSP8I/pN88mPw4+nrLr7kY1pqigs2o0A3JMKUA+/Mk4so/yn+xDQMmP+Z9pQGm2ep3bn
U2veJlUx2tYlr6FahqdvU+18qZiafDlyHxTPntH0j6f28/dTkZ8mOA8Ph5c9+v7OXzTD6nqv/Vx/
5Ip/XMvwcv8AP/2Icfxcf8z7SkPnPzHL5V0VtQur5p7iR1t9O0+KBTNdXUm0UESipLO3tsN8z+zu
ytRqsnBHJQG8pGIqMRzkfcwnnxRH0faWAWV0bRdQukUaz501Arda/JbkG2sWjQrHE98fhjEKVULH
uTXbfMDt3VjKBjjPjw4L4TwiNd8rHIy+fR3em0cNNiOp1JGnw1ZMiSZD+jDnL47My/KrQ5LSwvNR
vIhHqF7N8aBSqonBCAlf5q1P9ma/sbScEPEP1SG19I8x+Pc8/qNXHWZhqhGUbgIR4vq4AZSF1yJ4
txZ6bs6zdodirCvzRNnc6bYaLKsrXmp3DLYiOcWqCSKF3LSzEHiijei/ExoBmv7SxRyw4DzPL31z
3dhoezhqY5DIQ4ccb9eMZaJNAjHLaR9+1XuHls8CfmD5dsvI2uhbjWI729g0rzEJvUaB7aOSSNg3
Cs8b+iY3NVqOLbsNsj2Z9pcui1Ih9RG0u6Uft6/o57t/aGDCdRlw/RPHgw5a4OES4+GMiBxHgMZS
vhuXPhBZH+Uv5tXyag35fef2Nn5w09vq8F1ORxvVH2P3nQyFeh/3YN/tHOy7V7Ix5Mf5zR+rAfqj
1xnqCO77v6tF08xKEhGfXcHpId4/Gx22Oz2TOVSgLPX9CvZvQstStbmarL6UM0cjco6cxxViaryF
fDIRyROwIcnLos2McU4SiPOJHPl80fk3GdirsVdirsVdirw380vzR1XzJrX/ACrT8uXFzqt6TDq+
rxtWK2i6Soki1oQtfUcfZ+yvx/Z7DsvsvFpMQ1mtHp/yePrM9Nu7+07c4wjLISI8o/VLu/b3eaD1
jQ9L8n6Rb+RPKtxOuoWtpJe6zqC3RsoWJH7yWbhXmx40CNUKtF3JzgPaXtnLr9Qd/Udj/NjH+b8v
v6ku37Nh4kBGAgcUswxSHheNL6eKUTZiIgxPqnd71Ed078meetIs9C0mwlsbxWNvarNdQQfWI5Lu
4sY750SOAyXDMY5Sx/dUFDvQZXopY8WOMIggUPPcji9/2N0/ZYabihgMI44ynUTKiIjJKFmUqj9Q
/nXuGXaHrU2pT6tDLbC2fTL5rMUk9T1FEMU6SfZTjyScVXenjmfjycV7cjTg6zSDEMZEuLxIcXKq
9UokczdGPPr3JrljhOxVSurW3u7aS2uEEkEylJEPQg5DLijkiYyFxLXmwxyQMJi4yFFh17oWlXPp
eXvM8AuIg3+4PViSkq03VBMtGjmSm1D8WafH+7kMGbcf5Of+9J/nD7XE7G7Y1PZmUYDI8MtoSO8Z
j+ZMcuIefPpuxCDyt59/K7UZ7/y4knmjyfdSerqOiKAL6Fj9qe2UUSR/5goHPwB+LO30+phq4DDq
pVkjtDKe7pHL3junzHXq7zVHDlPiYojHL+KH8J84fzf6p2/mnlF6R5Q87+WfN2nfXtCvUuUWguID
8M8DmvwTRH4kaoPXY9qjNfrdBl00+HIK7j0I7weRDhJve2kV3ayW8teMgpyHVSNww91O4zXZsQyQ
MT1bMWQwkJDoo6VdyzwNHcUF5bN6VyBsCwFQ4H8rqQwyvS5TKNS+uOx/X7jzZ6jGIm4/TLcfjy5L
Lb/js33/ABit/wBcmRx/30/dH/fMp/3UffL9CzVCbuaPSoz8Mo9S9YfswA04/OQ/D8uWR1J8SQxD
rvL+r/x7l7rTg9AOQ9No/wBb9nP30mQAAAAoBsAMzQHFYj52/M3QPK7x2FJNV8xXIpYeX7Eerdys
RUEotfTTvybtWlaUzZaHsvJnBmSIYY/VOX0j9Z7ojdaJ2HP8fZ58mG6Z+V/mrzRrQ81/mRffVnjR
1stBspKR2lu+7xtODsWXaRk3YbcqbYe0tdA4zp8Fw0/OR5SyEdZnpEdIj3nflstLq8WjHGAJ5v50
vph/VB5n+lLl0HUgtNEN7r9ok0cdj5KhvtQsYBCkUFuUto5GVVmjAuOT+gsrM7cTQ/tKM5AQGeVE
DwBy/pdfly97qdXOfaEicp48dQlZJJmdpdduDcbd/k9U8qz2dxpzXNi8ktjPIJLWWWVpWeJo0Kt+
8/eLUfsv8Xc9c3OMituTfMUU5ybB2KobUNL03Urf6tqNpDe2/IP6NxGkqcl6Hi4YVGRlASFEW3YN
RkxS4scpQl3xJB+xJtc8k6RfWyfUoItPv7ZzPZ3UCLGUlPUngB9rueua/X9mxzR9PoyDlIfp8nV9
r6XJq4H95KOWgBLiPIESEZd8eIA10IBG7yT81/KKeb7FYNUgFl520xf9EuhRFvIgahA4oA/dOxO2
1dnsT2q1XZ+apenL1B+jKPPz7j+shj7Pdv4pT/IdqDgv6Z9x/nxPcf4h9J58xTEdN/NT8ybDyNea
Vrccmq6MwWzbX4iRd2QLASRXfU/FGGVHenX7RoQO11eHR9raaWXRfu9T/Fh7/wCdwfC6rn/NBeyw
9nHsztHHHUkHDdxn/Cdjwk/51cXd5jd6NoHmvRta8z3mr+R7OGVbDSINP00LHzTnNeIjGWOFg6LE
CPtFTxDN9nfOV1Gi1GCfFLFPH6ajxRMb3865OdxY5aYYs2aM+LNKc+GYJAECdjuCZeVi6HNmsOqe
d7rS9PkntVs7iW/tkZ7dHLPbCZvrBnt5o3+rK0KbfvWNT9oHYwE8hAsVuPl126fN1ktPo4ZJiMuK
Ixy5kbS4Rw8MokcZ4j/NHLkWYZlOidiqB125vbXQ9RubCMzX0FtNJaQgci8qRlo1A71YAZDISIkj
nTk6OEJ5oRmagZRBPcL3+x4hJ5t/L3Q9R8r6rNetLdW9tPfa5dfvZJbm9aERxxSABi0omlbiKfB0
2GY2i0hz5IDGLNSMpE0PTGzcpUPSLJ32D22sGoGHURmOGJnCGOIFmMTP+GI3qVAbfUfNi3nT80vz
Z816Lb2lvEui6RqTejFc20ckN1qBagaOCNpJZAik8GKmhOxO/DOs0Wt0HZ2njnzfv9XK+HGK4YkG
rJBkCNrErNggxHV0f+h2Wo1k8WM+Hp8YBnORugRf82FSrnEgcJBs7Mz/ACw8pp5T0s6P5ciS580X
6g6tqoo0dsnX0lkoQeP7TDYnpXanD9re0er7RzkRPHmPM/wYx3R/X18y8P297QQz5PyPZQ/dw5z8
+RnI9SenSI2iLJepaV5F8vWlvELqzg1C9RjI97cxJLIZG+0ylwxX6Mv0PZmPBCvqkdzI8yXJ7F00
uz8RhinISn9ZsjiPn+hNbfRtItvT+rWNvD6LB4fTiRODLF6ClaAUIh/din7Pw9MzxCI5D8cnZz1W
Wd8UpG+dk778X+69Xv35oiK3t4WleKJI3nf1JmVQpd+ITkxH2jxRRU9gMIADVKcpAAm62HkOe3xJ
VMLF2KuxVD3+n2eoWr2t3GJYJPtKfEdCCNwR45TnwQywMJi4lo1Omx54GGQXEpIt3qvl8enf+pqG
kL/d36jlPCvhOg+2B/Ov0jNaMuXSbZLyYv538Uf6w6+8fF1AzZ9FtlvLg6T5yj/XHUf0h8Qk/mH8
tfK3mi4TzFot3JovmGh9HzBpLiOVjT7M6r8Ey/zB96bVzqOzu3JRx8I4c2A/wy9Ufh1ifcQ7rBqM
eaInE8UT1B/HyPLuY3qHnr82/ItE806Pb+ZtIUhV17T2+qSUJoDcRMGiRv8AgE98yJy7Oyb8U9Mf
MeJD/TR9Q+MT73Zafs3Jn/uTHJL+b9M/gDtL4Sv+im1l+a+kXN7aag+kaxpsdwnp3EtxYyPbyRAF
lkjuLb14X4NWlG3Bp1oMwNb2RLDWox5MWSGwlwzH03tKjR9J590ST0a4cRvDOMozHIEdeo+P30i7
X82PI51KaZbq6KXaxRQD6hfKS8ZbkG5QD0x8Y+J6L77HIZOys+HJmnMRAxwgT64cvVy9XqPkLN+8
MR64QiOZlL/epPc/nLp+kWNxqB8v6xdXFw5Z7iW2+pWxI2SJJrxoeXFRQcFJJqab5k6bsQYYeJqc
2HFKe8vVxSHdHhhfIfbbZHHk1OQYsEJT4dhQ+cj3WepWWNz+dHnxOb+l5D8vS/tRg3GqSxsOiNIE
WKo6PwVh1Fcy4ajQYd8cZ55d8/RD3iAPEf8AOMWOfSeCanKJl/Nh6q98vp/0vF8GUaF5V8i/l/ay
TW0fG+uyfrOo3DG41C7ckE85DWRyzCvFaLXegzVdrduSkAc8qiPpiNgPKMR+O91es12LTxvIavpz
J93Uo76lqmvsH1JGsdIBqunVpNNToZyPsr/kD6c0Xg5dUbyjgw/zP4pf1u4f0fm6v8vm1pvMDjwf
zP4pf1+4f0fmpaL+XmhafNczTxi8ea6u7mONzILeNbtmqi2xd4KiNzHz4VK7dNs2WPBGP42+T0PH
URGOwAA28k90vSdN0qxisdOt0trSEBY4kG2wA3J3JoOp3y2MQBQYykSbKLwodirsVdiqA1jQ9M1e
1NvfwiRd+D9HQnurdRmLq9Fi1EeHIL+8e5wtd2fh1UODLG/vHuLyfVPy/wDOnk/zE3mPyjGurwXC
tFqWmuQpmjYftoSAx913r265p8Okz6OVxPHEf6b3V18qek7A10IaM6HtCZlgx74svDKU4f0CIiRI
/m1e221Rea675cn1rVvrWneVI/LGtq3L63puoJYEPWu6SMIlP+qFOdLoP+CTqcf7qfBlh/NyfrlX
224/j+zM5cI1soz88WSP+6gGSaJa/wDOWOlxJ9Ulj1a0H2Fv5rGYkf8AGUS+o3/B50ePtjsrUi8u
lniJ645xkPviP9iubs/TgXg1UMkfOGSP3Rl96L1X82/+chdBmSDWfKWlK5UOzxyH01RmKq8ki3Ui
RrVTu5GGeLsO/wC/y4/60OL/AHMUabszU5heOMcm9bSESeuwlRPwBYzf/wDOS/502umi7n8uaTbx
mFJmlZifgdbVgyJ9b5Go1GAgbn4qHo1MTCOzBGPiHOZfxVwAXtyu9ufd8HXS4ulMf1P80/zw8xPc
Wz6zHaRoI6QaXc2EAkaZmjijguY5WeVneMqPTd6Gv8rUzZ9sdl6YXh0xyEdcsgB769Q+5yMWnxGJ
lmzeHQJ2iTyvYnauXPcCx50D8qeZ9B0DUmnm8oJr+vkiVbq/uhfyyK8kSxzRxgqjCQzoUYIW6gGo
zS6/2212oHhxMcePlwwsC9/TYvlRsXXk5mKPYgNHNkMuIx2hxA0e+h0BlR3Fb7mPFI9G86t5o873
WteZYriWRoLb9E2WnNayHjcXQsxBBJJcJb/alFSHPH4+dG2zktR2bk1JBnLhj1rnXQC+XW7Ye0Gt
/NaWGi0kpYtId8pIrJkPcdyBHv8AcByel6f+fn5f6VZ3FlpmialHcWdjBqlxZlLcSm2uJreNZGdZ
5AX9K8SXc/ZqCVYUG202lx4I8OMUHT6PRYtNDgxR4R+OfemGkf8AOR3k7VW0xrbStWFtqdxbWqXb
xWqxxS3k00MXqj6yZKf6M7EqrUX3NMyHKSjU/wDnJ3Rm0y2v9F0i6lguJ7MJJOImdrea6uYJ2jgg
lkkZgLCQR7gEkE+DKsotfzy8py6ZaalJHItpcyXCSzxTWs0NqkN/DYq9zKJgqh/rcUtU5LwavIji
WVZxomrW2saLYavaq6W2o20N3AkoCyBJ4xIocAsAwDb0OKo3FXYq7FXYqk115Xs2na60+STTL1vt
TWpCq5/4siNUf7s12Xs2Blx4ycc++PX3jkXU5uyMZkZ4icOTvh1/rR+kvPfNWs+b7LXr6Se5F1aa
BHYTzrBM1rzgmmkM/K2qY52lRPTox+HbiKnK+LPD6iJ8Pd6fsdjpY6iGMCfDkn6twOHu4b3NdeXk
oRShLy7uvKlle+X5CrG50e4g9axuJFLCZZbSNmaCi+meaAbNuvSuPlz8H0wmL5jh4o/Y7aXtQAI4
9biyZu6cIkzh3VMfV7pXuOfJJPNL+cvNvl1NEs7S80u7ea356hGlwfq5sJvVieN41WSQj9njQ13J
BFMwcGqyQmCYyMa7pEmrq9r2B686Bb9ZruzY4jMZJy4t4iOKRmSau47cHmZEDnw8STw/kv50TzDb
Xtpqmp6hM81zezapdxTWrwytNC8ccSNfrs6LIpbj0JqCSvDajVGQsYpymP5wEfv5PPS9oMxjOGnx
ZowlL6D6AR5mR3rzH6amdp+Un5hXVvbPf+aVs9Ss1g+r6jElxcXJktQwiaV5bgswP1m69RfUowl4
jiqqMvh+Yn9XDjHkeI9etAd1c+XW3Gx/msn1iOIeR4pdetADpXPl1vZCb/nHnXZYYy/nq+m1BUiM
moXC3M0rTw3X1hJF5Xn7scQifBRwVDK61YNkx02MS46HH39fm5UdJiE+PhHH/Orf580Zrv5KeeNQ
a9Nn+ZWrad9evLi6kCG6cRwykNDbwj64oiWE891HxA0I+FaXOQhbf8hvO0drLbt+Z+s8BbQ29ksR
uYVt3iWJGkUR3Y5BkjccWO3KtSwqVVDUP+cePNOp3d3c6j+Yd/PJcXkV5bt6U9bUQGRo47cPeSIn
FpiQ3EkUHGg5clU/P5SebVs3itvO91aXAEq27wJdLEouprqW4aSI3rerKTeDhKzclMaH4vi5KvT8
VdirsVdirsVQWo6JpOpLS+tI59qBmUcgPZh8Q+g5jajR4c395ES/HfzcPVaDBqB+8hGX3/PmkMn5
caOjmTT7m70+Tt6Epp/wwLf8Nmql7PYQbxynjPkfwftdLL2WwA3ilkxH+jL8H7WFecvIv5kXM17Y
2eo3upaXcWhS1AulhT1GDCRLlWlRm5bUoGU9DTIS7N1MfSMkpDz6+W5/W9x7O4cejhikc9ZIZuLI
cmM5ZThceGOMkmMK9Vy+uzYOwCMtPIXnrUGl0nXNWuf8PXFrLaTQK0Sr6XoW6qlI35/G0k6Hfon+
UMnHs7UEgHLIV1H6rry+Hm4HafZ+HLgHh5pDUcfEZjxLlc8pIMZSOOhHwqqIPO7sgSeP8svL7cP0
hJcaiU4kC4kJUFSCtKAHYgHrkodgYbucpzPnL9TzGP2X0/FxZJZMh/pS/VR+1kGmaLpGlQrDp1nF
aRKAoWJAvwjoKjfNrh02PF9EQPx3u70+jxYf7uIjfzPvPMo3L3JdirsVdirsVdirsVdirsVdirsV
SG78saL+nH12XThqGoz/AFeFDIkLi39EuRNGZaMn958ZUkmgoK9azjF3VlsEzVXs3aeVNPMUP121
tuEaOP0dBDGLNHkcs7qhTkzlaKzE0P8AKKnEYx1QZnonoAAAAoB0GWMHYq7FXYq7FXYq7FXYq7FX
Yq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXYq7FXY
q//Z
default
uuid:65E6390686CF11DBA6E2D887CEACB407
xmp.did:30360b9e-688a-9245-b4f8-c3bde493e90f
xmp.iid:30360b9e-688a-9245-b4f8-c3bde493e90f
uuid:5153a564-b91b-4ab7-9c23-8f7b9e04b6c9
xmp.did:14389727-987f-7543-b31c-d50db4a552e3
uuid:65E6390686CF11DBA6E2D887CEACB407
default
saved
xmp.iid:c729cb08-662a-4b4d-8945-99db6152c789
2020-10-11T21:06:35+03:00
Adobe Illustrator 24.1 (Windows)
/
saved
xmp.iid:30360b9e-688a-9245-b4f8-c3bde493e90f
2020-10-20T21:36:30+03:00
Adobe Illustrator 24.1 (Windows)
/
Adobe Illustrator
1
False
False
1705.000000
833.000000
Pixels
MyriadPro-It
Myriad Pro
Italic
Open Type
Version 2.007;PS 002.000;Core 1.0.38;makeotf.lib1.7.9032
False
MyriadPro-It.otf
MyriadPro-Regular
Myriad Pro
Regular
Open Type
Version 2.007;PS 002.000;Core 1.0.38;makeotf.lib1.7.9032
False
MyriadPro-Regular.otf
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
R
r
a1
a2
a3
a4
an-1
an
a1
α1
α2
α3
α4
α5
αn-1
αn
https://urokmatematiki.ru
O
β4
β1
β2
β3
β5
β6
D1
D2
D3
https://urokmatematiki.ru