![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACwAAAAmCAYAAAC/H3lnAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAUwSURBVFjD7Zh7aNNXFMebV/NqWtMsZlnNLK10GGsUQ2HD6sbWQixWRG0dFSfaWjoflW3abv3LdIpDJow9cOtkFeeKFhFFQUV8MKggdSuIIv4xurmhsI1NEXTzj2afI7/B3W+/JL+0A9vRwOH+7uOc873nnHvuuclLJpN5E4kmFNj/F2C/3/9MQUHBLLvdPpu2PJVKWf7FnJdngRyQy4CcZkGgK+JyueKiL2fAZWVlU9xu97der/cktMfj8bxbWFi4n7EhBO6Mx+Oev9fGYrGZ+fn531ut1lt6YnyQte5MytFVgfyTyO+j7aL9COBX0LPWNGB2Ox3mwYaGhn8oQ1gXQFII+1hROJ9N/chYlUrIqAoGg3P6+/utGcBOdTqdv2CIy6r30NOOV1OBQKDZFGB+dhR69OPhcDhusVhSKLioKK0G8NBoYhFg28UAbKxeHRfwAP7N4XD8WlNT4zIdwxKfAC8AqB+hz2H1I7j5Jt8LFMALAXyHdZW48nkUvcB3jHFvNsCsvwjgEeTP0c9h+a9tNlsKOTHTgFnsKioqeh9Ah6CrPp9vGLBr1DXRaHQ6471Yaweh0MWmttPfD5hr9HuI4WA6+WxuCBqJRCIzDTZzCm+OIGNBTmlN3EMs2yREiKla3PQ7wgYA6s/Ex8YWi7sJnwvp4hhvXRILA7jSwMLnhB/rV40pDwPgE4ljwL+WbS0uvSsWJA59RvNYb6+ACoVCrxhs5gd4H+GhKVkByynFopvTWGVAYoudz5c+obIb8AmDcKrULHxJLEy/SLIH7VPKIZ4r2YAw6tUd7mrRoWajbIA34/Z7MHTwvRLwS2nX0z+Kq24BsFWxUg+ghoWHdcvor4Dehv+GxCEAn9Vk7pENwH+bsZCSQlez7g5xvwu+xaxroz+MIb5qb293mr04vAhaiIB1UBtWbaNtRVgC93p01iiWcZnHUm1CfK+RTKGuk/TE3F7OQIr4f1p3cAPIaGJedLQQ/3OfaC0h2UY8RcbpYyNN4774AWQhYdRIG5qs1vjZ5GoeZ2Q1BMwvH+qAuscZvZTJwnatvh1PZJ18Ik0CzhWwPJO4sepJ+G9wVQq9SX9DtlsIPh/rlnADRs0CYG1EnkSih9vuLb43kbOrcwIM4xYE3Afw69Aiuee5qXZytT5g7pgAUy4GNxVXLfM7mLsihUtJSckmM2CR242en9DRDdXJZmk/oOa4n0gk7LkAroOx0WD8C628XKtYaBqAV6NsHjxJKXIA3JwNrBQ82tttqZF+yVhjjmF2flwrLxelsdg25keyAcZD0wQshdU3/+mh0/6baITWY71edn6VOF6VwcWd8orIBhirrhBPUUaeQF6TPLGkmqNU/RLaxSskOirACCsHxFZI3mx9CD4jdTIlYfFYAMshkzcbIE/IA0CKe3TNRn4tMX0T6/9BmNWMOSQQ+vg1gBUGKbAdowWMnDqJdQB/rp8D6MtifYCfNg2YUJiV7vEI4J8l/ijKAwaAOzTA6zIBFg+Rcf4khr8z0F2lAT5rGjCxdQ3GVw2eT61iYeYPGv3Xxvw7Mk8MtihZJMxh/RAASTWUCIUWeYHA06nLEJ+JQbD08lwA78btA6SefXy/J30EH2TsPO1GFayW+OWJ1Amow1jnOusO0N/GeHNpaWktlrwtVoN3q86a9aw7i55PWZskl+8THWxmWc6HrqKiwoHAEnZbLgSwYJp/iKQsDUDF8q+lNubR+gEtjcXZzMN0NxjjYXTMkPaJ1xJYtRnL9XDQXpwQxQ9WmzpZrU0k+gsYp+pTP7G2VAAAAABJRU5ErkJggg==)
= 1,108;
![](data:image/png;base64,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)
=
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC8AAAAtCAYAAAA+7zKnAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAU7SURBVGje7Zl7aNtVFMfzfjVJkzSltlnXtaOZS9nWLnTr7LopyyDIqGu1jrnZIZ2ZVKi0e9VtiI0PxA0FCzoYA2EOJMx/CnNOoVORKkUQdLMqw/3hHoIrk/0hRWTxc+BGfoTE/rKJ+w1SONzf79xzz+97Hvfk3FvT2NiY6V6lexZ4GXwZfBk85HK56kwm0yqoGWqEWmw2W3swGPRo5ZLJJGxbG/OLoRjPq5AJ3FXw1dXVrV6v9yBgZgH1p8fjmfD7/alYLBbMA+9AdpvD4bgBzSA3XFtbW2eItKmqqjpkNpuzbrf7s2IyeHoY0FcxbKGhcj6RSHicTudlMaCmpmZL/rxEA8P+ampqut+QG5a02CngMeLHTCZj1fC7AZ5l7DBstRHAAJ9R3n9aAe8A+C3Ghw1fKiORyGYBz6b8KRqNrgH4TfZDfzF5ZOwYthiKSkXKi2RUSMsj7XzsnRbGCs1eqkFuCQVgwR3XeQCfo/JkKaNZgA/OY+wePvwckephX0wApEv4oVDosERP1vP8hjJmLe/HGTchd5JxJd+oDofDR9HTzZhGx9t9fX3W2waPBx6ndGZRNDqfLB78p1xWVFS8TzV6h/Uxyu/3Gv4P9fX17T6f7ww6twuP+V28T+IkBzoCuUix/jrFw6u3zq9kcVgDvB1vXK+srHy5lHxkXYg1X6FvGd4dQMdkbo599DFRGCGi0/DXqB/HdQC9mJNhfgA6DY3qThsUnEXpp4Sxh+dxPjSHdw6VAhzjmwGfJv/bVA73o/NLTRpOAWqrjMw9pL6bhC5o8t6LnvuI0jTGJ3SBx1uvWq3WK4C+irJPANFVCnA8/SwfO8va7aRAJx5dISDQ+7WkD/PLSY9v4XlxyouAlLQKBwKB93jfx3Mcw7YxX4lsI7I/875Bd85ns1kzZLmd8kXupgA9Au21WCwHqFK9Ko2WyoYFUEqeVSm2wHtCwEoklFy92vBbIZFdW26JDQ2evx3QsEFp2XzgE1CvQWlROefL4Mvgy+ANAp4/M+SH7BqeD/IUkHVBTvXsgbx3Fbw0THL1QWP2IWDO2+32KZqsNM3WxgJN2HrmjtLIXaIBO0Zj1WeItOGw8ACgsnIIicfjzcXkaFm/o/ObSKVSLkPlPKDeleMfkcgUAT4JfW7IDSuXSXh+TiJAJNryWt+TAL8wNDRkN2y14RBxRLwP0DMa3mFy/Qrp5Dd0qezs7AyxaW9wsMhyrFvOphwA+O/ag7auD5lMFta4ClwZFqpi1lwVu+M6zwf2q5uzX4jAZU43S4oAtGFgK/LjpNUj2ps3aJST0S7G/YrXGA6Hj8B7UkZ0tin+M9Be+IOMe/6THym8PyuVh9yP/8vB28U+aSU6U5TOfbnbCCL1G0Y5VBGYBlg3vFMYmFbO6YX/BbpXw78mx0O1r76hRG/RDV4+ItcWeZeqg4C5CX+dHkPZExlA7FbAlhKta6xdAVUD8gTvr6HzLeSOCw9qRf/FSCSykblLvLcIH/Cn3G73uG7weCoutRsvLpIPs/gEiv9A2Xq9UQLUB6zZrUm71dAoOh4FtFytvCmHfHhDeHZnQ0PDDuR/TSaTTngd6hahB0PPIfu6bvAsepAUuQXNoXBW7nGIRlMpmxPwH7HuQK6FAFBEGeHGm+cBvAHdCzXGjQD4tOwZnusUD+y+GZzZpRu83AvKBae6b1lQCmjxnFwQyWUV6w+iR/495AqFQmme++UfFtBjKp83kfvPA+4p5l9iPij9FKBfUbIvQJv/t65SNXXahs6m8a67UHUS4wrw3eV+3sj0N79ky8mo0H5QAAAAAElFTkSuQmCC)
=
![](data:image/png;base64,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)
= 1,165;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 1,316;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 1,554;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 1,595;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 1,709.
Средний коэффициент роста на основе конечного и начального уровней ряда определяется по формуле:
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
, где
![](data:image/png;base64,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)
- средний коэффициент роста.
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=1,069.
Темпы прироста определяют как отношение абсолютных приростов к уровням динамического ряда, выраженное в процентах:
Цепные по формуле:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABkAAAAYCAYAAAAPtVbGAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAH0SURBVEjH7ZU7SyNhFIYnyeQ6uZKEGGMUB40atDELUbSySqWFhQoWCoKFuN0SkGXZsIqgIEQD4g+wSaGwlhZCxEYEWwsLL3/ARmzE8TldEGMyol2Kl5w5+eY85/YlSqFQUL5bShPShHxKuq5HNE3biEajXfLs9XpXsLu/FJLJZHwEvo3H460AMb13YteEuFyuSavVWrLZbDuqqhaxNxVFWUXrdrt9G7+oxPOWw+FYlnfIepTAp2KHQqER7LMP2+XxeK45tIfm/H7/FJ95ghoADILN45vFt+B2u084eyHv4FsSCFX0Aqlg79aEJJPJbl44r/4yFotJZS8EPK72c+5PIBDYEJvWtPH8L5FITJPIVDAYPAKovQshiyBZ6NVfSlYWi+XF5/OtVfs5205rI28zxj8D/NDUdtGWCyqRVo03sgSAB1FHwxC2JsLwn9BzOp1u/5Z7wjzGpAqn03llGIbloyBUqofD4QnTEIaZl3lw0fbrZcrS9AP5bRrCRh0AMRjmzzo3XmNBFtGQKUixWFRp063cEVZ0uF4lbF9F7ospSDab7WTgcgkf6gFyuZxKSy9JpqchCAPM0aa/6D+tegR0T4BNWraUSqUcNYb+g0pugDkbgsiO87s0gHpQC0qgfmB95XLZ+l4AEugjqV/MpqP5p/UlegUQnCJqSIYFJQAAAABJRU5ErkJggg==)
=
![](data:image/png;base64,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)
, где
![](data:image/png;base64,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)
- цепной темп прироста.
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACoAAAASCAYAAAAt6kybAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAK3SURBVEjH7ZZLaFNBFIab9zshDeEaJApRgmZR0IhdBBUxYHSjFrKxOyHU4KOCIoJdGBSNFIUIuhFc+QwKogjiTqHRjSBdCboRJKKIFArVVsn1O3ADl/GG1MRN1cDh3pnz559/zvlnkoFKpTKwFGJJiPy7haZSqWXBYPBoJBKZ7IRJJpOZUCh0LRAI3CTuEDcSicR6K2w0Gj0A9q7P57sO7oFw67pu61loPB5fB+l5SJ/b7XYdwlcdRA57PJ6FcDh8BXxCAuwlt9utI7ZgxjJ/D+wsmE3kYjw3g5v1+/1P6vW647eF8rFrmjYK0Y5MJpN2OBwtFmmoOMjtLPza5XJ9VnMIeEfuUz6f98o4FovtdjqdOs99SkH2wi/zpX5brwmRlVByQ5KjjbfVHPjLkmPD22RM1e7LmA6sNeMoRFLmvV7vVL9ClxsVnbKwx6jYAq9NWgg9Rq5FV47ImOq+gecHwjQzjor7qfQMXflSLBZ9XYVms9kwpCPseHUHoQ2L9pZtNlsLf562OjQiFMyEjHlvIuZbLpcbNONqtZqLTTTJf8W3g12F4pFx8RDVebpYobRzTMSQO6PmEH9QcrT0pIzheA//vIVQ9uL+QH6Oake7ChUvQn6ISmxcbOvx3x6j9TWL1k9IDs4xo/XTwiN8SuvDbGAOsU1EO/+ER3+pKBVYKV2gao/VHOJvySFp36d8/6pxmLIK/xrjQD7s6zDh3ZBx6p9Z5RH0CO/pVCbUnqtWq17mFlj8ZfsyR+AGwXEvVxWLnJLN0p3tvV74Q5Dk8W7Z2PFHbLGL2EIVVpiqquHVaeIFuZ0SvDeo8tt0Or1KEXUcC8zLE9xWnicYf0f82Z5/majgCDstE+P8AJSI/bwfxktjbGLYjC0UCm4WLVHdCyx6kfeyXDtWvGIFEWZgz6lc//89/fNCfwKho90ISEpuSgAAAABJRU5ErkJggg==)
= 11,08%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACoAAAASCAYAAAAt6kybAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAK7SURBVEjH7ZZNaBNRFIWbyf8/MYQ0lCgEdRGhUKPWVUWIkHahWAgIXYeYginUgiCoBBWjRSEKghtXVTTSjVDiwo2CqTuLK12ICy0iCgVR6A9m/C6MMDwnpDZuKi1cZt7cw3nn3nveS3sqlUrPZohNIfL/FppKpXoDgcDpcDg83Q6TTCbTwWDwrt/vv088JO4lEomMFTYSiYyDnfV6vTM8H8M9peu6tmGhsVhsANKrkM1rmqZDuNBG5KDb7V4NhUK3wSckwN50uVw6YkfMWL4/Avsd7iFyUbBD4L4h+mmtVnP8tVD+tHg8PgbRcDqd3m2321ts0lRx9XpdY+M3Tqfzq5pDwHtyXzKZjNco/KjD4dCj0WhB6fAJ+HWexW5HHxciK6Hk+iVHRx6oOfC3JEfBR2Tt8/lmZc0E9phxNKKPAloej2e+W6F9RkdfWNhjTGyBJ6cthE6Sa9GpSVnT3bfw/ERYrxmXz+e9CF1iKkvy3lEoIwpBOkrFO9sIbVqMt2Sz2Vr486LFoSmJUDAXZM37ImJW2SdqxjUaDQdFfCS/Ir7tKBTvTIiH6M6z9QplnEURQ+6SmkP8uOQY6TlZw/EB/jVVKIfISTGL5Jfp9raOQsWLkJ+iEwfWO3r8d9wYfc1i9GclB2fJGP2C8MCXVCYZpIAfiP1ULped/8Kjf3SUDuyQKdC1J2oO8TPG4dlnCL9jrPcr/HKrCMdcV4dJKjZO/XOrPILm8J6ezWaDv79Vq1UP35a5DV5xmduM+3av4LiXrykWOS/FcjCHN3rh90OSxbsl4wr6jC2OEYfownZTV+N49TXxktyIBO9NOvQO3C5F1BQWWOF5BtxhebJeQ3x1w79MdHCUSkvEBD8ABeIk72W8VKSIQTM2l8u52LRAd6+z6Q3xJR32W/FysgfAXDawV+A6uPXf05ZQU/wCDyTcbMpPzYYAAAAASUVORK5CYII=)
=
![](data:image/png;base64,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)
= -6,84%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACoAAAASCAYAAAAt6kybAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAK7SURBVEjH7ZZNaBNRFIWbyf8/MYQ0lCgEdRGhUKPWVUWIkHahWAgIXYeYginUgiCoBBWjRSEKghtXVTTSjVDiwo2CqTuLK12ICy0iCgVR6A9m/C6MMDwnpDZuKi1cZt7cw3nn3nveS3sqlUrPZohNIfL/FppKpXoDgcDpcDg83Q6TTCbTwWDwrt/vv088JO4lEomMFTYSiYyDnfV6vTM8H8M9peu6tmGhsVhsANKrkM1rmqZDuNBG5KDb7V4NhUK3wSckwN50uVw6YkfMWL4/Avsd7iFyUbBD4L4h+mmtVnP8tVD+tHg8PgbRcDqd3m2321ts0lRx9XpdY+M3Tqfzq5pDwHtyXzKZjNco/KjD4dCj0WhB6fAJ+HWexW5HHxciK6Hk+iVHRx6oOfC3JEfBR2Tt8/lmZc0E9phxNKKPAloej2e+W6F9RkdfWNhjTGyBJ6cthE6Sa9GpSVnT3bfw/ERYrxmXz+e9CF1iKkvy3lEoIwpBOkrFO9sIbVqMt2Sz2Vr486LFoSmJUDAXZM37ImJW2SdqxjUaDQdFfCS/Ir7tKBTvTIiH6M6z9QplnEURQ+6SmkP8uOQY6TlZw/EB/jVVKIfISTGL5Jfp9raOQsWLkJ+iEwfWO3r8d9wYfc1i9GclB2fJGP2C8MCXVCYZpIAfiP1ULped/8Kjf3SUDuyQKdC1J2oO8TPG4dlnCL9jrPcr/HKrCMdcV4dJKjZO/XOrPILm8J6ezWaDv79Vq1UP35a5DV5xmduM+3av4LiXrykWOS/FcjCHN3rh90OSxbsl4wr6jC2OEYfownZTV+N49TXxktyIBO9NOvQO3C5F1BQWWOF5BtxhebJeQ3x1w79MdHCUSkvEBD8ABeIk72W8VKSIQTM2l8u52LRAd6+z6Q3xJR32W/FysgfAXDawV+A6uPXf05ZQU/wCDyTcbMpPzYYAAAAASUVORK5CYII=)
=
![](data:image/png;base64,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)
= 7,03%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 5,14%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACoAAAASCAYAAAAt6kybAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAK7SURBVEjH7ZZNaBNRFIWbyf8/MYQ0lCgEdRGhUKPWVUWIkHahWAgIXYeYginUgiCoBBWjRSEKghtXVTTSjVDiwo2CqTuLK12ICy0iCgVR6A9m/C6MMDwnpDZuKi1cZt7cw3nn3nveS3sqlUrPZohNIfL/FppKpXoDgcDpcDg83Q6TTCbTwWDwrt/vv088JO4lEomMFTYSiYyDnfV6vTM8H8M9peu6tmGhsVhsANKrkM1rmqZDuNBG5KDb7V4NhUK3wSckwN50uVw6YkfMWL4/Avsd7iFyUbBD4L4h+mmtVnP8tVD+tHg8PgbRcDqd3m2321ts0lRx9XpdY+M3Tqfzq5pDwHtyXzKZjNco/KjD4dCj0WhB6fAJ+HWexW5HHxciK6Hk+iVHRx6oOfC3JEfBR2Tt8/lmZc0E9phxNKKPAloej2e+W6F9RkdfWNhjTGyBJ6cthE6Sa9GpSVnT3bfw/ERYrxmXz+e9CF1iKkvy3lEoIwpBOkrFO9sIbVqMt2Sz2Vr486LFoSmJUDAXZM37ImJW2SdqxjUaDQdFfCS/Ir7tKBTvTIiH6M6z9QplnEURQ+6SmkP8uOQY6TlZw/EB/jVVKIfISTGL5Jfp9raOQsWLkJ+iEwfWO3r8d9wYfc1i9GclB2fJGP2C8MCXVCYZpIAfiP1ULped/8Kjf3SUDuyQKdC1J2oO8TPG4dlnCL9jrPcr/HKrCMdcV4dJKjZO/XOrPILm8J6ezWaDv79Vq1UP35a5DV5xmduM+3av4LiXrykWOS/FcjCHN3rh90OSxbsl4wr6jC2OEYfownZTV+N49TXxktyIBO9NOvQO3C5F1BQWWOF5BtxhebJeQ3x1w79MdHCUSkvEBD8ABeIk72W8VKSIQTM2l8u52LRAd6+z6Q3xJR32W/FysgfAXDawV+A6uPXf05ZQU/wCDyTcbMpPzYYAAAAASUVORK5CYII=)
= 13,04%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 18,03%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 2,65%;
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACkAAAAYCAYAAABnRtT+AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAL4SURBVFjD7ZbLa1NREIfzfqd51CSGNCa2KhIp1EakpYpQo8SqVKEx8VUrBRXFau3WTWoMoi6qRV1IER+oZKELVyqBUkGwVSqoC/8AwaULUQQxfgM3cCnYZJMSJIthzp2ZM/M780o02WxWU+9U9wAbIBsg/0uQzc3NaZvNNipn+FaHwzFcdyBdLtdFp9N5T87wu01NTbmagrRYLEM6ne6GXq+fNBgME5wvaTSaHPyK0Wi8jlzopsjJWJcC7AnABuSMbNrj8WypGchkMmmmXF8JmifYEQCn7Hb7Ha1WW+L8ibIeAswgupN8/wRMRu5h85FzXyQS2YfuSzwed9YMJIG6KV1RrQTwVUD+QXdugXzG5/OtVu5loPOATPCIR4FAoL9mIMnOMoKFF5R/ltKWCNxblhUKBR0ZW0Mb6NS2qVRKD8hXgG9fssHp6enx0pc/oF+xWCxQyVFra6uLR3Uv6QoKBoObJYtms/l93e5JSn9G+pHBmKqQQT/tsIfB6qfU3erM8j2AfIBhspbl2G4XeTgcbpNvzitJxkFokBbaD+9jiA1VgQTcQ5lswB5fDGQ0Gk0T+DSZ76Qnn2M/Jn0LfxYKhbYB4oDb7X4qtl6v9wKgc9jGkU3DVwD2KD0+aTKZRtkueeQvpL8rgiyVSlrK/JmdWMLJhsVAql9NsByPe8CdTvic6sEfkG2CzwMsqtjeZptcVmeZDTEidlWVm0FpYWB+s8C/JRIJRzV9Q3ndZE+ysw5+mCEqqrbEDPJTVqv1nWwRRTYO0MdlGzK+nopMVN2TONwhQ4PTYpUAQ9zJwePyTdlTlO51WY+ft+h3IpNMtijZvQbIWyqQU+jWVgRJv+yVksnL6cfvlHweZ3kc7F5kC/Rx7yX3hmj8jdztAKyPUs7KcHC3C9BztIWJfruPrfSvF/0bzr2Kj2N+v3+8qummxG0EaodWQcuhiHwTOPIvB4BIk/Ucdln5Tcd2WAncQfnOoh8rZ0haAtkIdALapdokGWw8jT+9DZDQX9guGbiNcaIRAAAAAElFTkSuQmCC)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 7,14%.
Базисные по формуле:
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
, где
![](data:image/png;base64,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)
- базисный темп прироста.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACkAAAAYCAYAAABnRtT+AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAMTSURBVFjD7ZfdS9NhFMf36t7di1tL13LMWjRIy0UpK4MaYUjRi2JFpVCUJMPohaC75ZCgiN6NIrwoupCgxKuQQRkUaakQXtRf0GUXUQTR+hz4/WBIznUx+oEJh+c853nO7/k+55zveaYuk8notC6aB7i4QcZiMbPmQAKqoqqq6pDb7c76/f67zDdqCmQ0GnWGQqELgEwjqerq6ojm0h0MBo/V1NSMhsPh3YFA4AwgV2sOpMPhGPN4PM9aW1tNXq93j8vlelNWkFartdtgMNw2Go03TSbTNfRLOp0uy3jZbDbfwC5yR+xOp7NJATmF3iI6IHfKvGwgiYTFbrd/JhIDHNoF4A4OHNLr9Xn0WSFGZWXlEdZOMv8OoAPiB1nukeY+qUUi+gr9YNlAcmgzB+YKFwF8BZC/WDs9xz4OmJUKcVzU5XERgG4pa58kOn7AhOekf4LU5gGwVbUNDw8biGaMMjD882aeTCZ91OU35Ec8Hl+iyReH1G2WKFoslhnNPouk/pTUI+R5sEAzpxqC0iN3Ic0Fdjfzdgi3L5FI2Av66nax0VfrVBt6Pba9BKblr0AC7rFCmhPFQEYikU4OTnPAOtj/HDkrdYvfKC9RStgO65/KXp/P1w+YLLZGbC/xWY6elL2M9dgest5bEsh8Pq8nzR/piXluub4YSGniqg6hslzuET6NjJMFF/6AbRPjtPpssvc+4M5zqUH0c2JD34Y+UxJIiLIMwvykgX9JpVLOEt9wD4e+AESc8TCdIVfQJcax99pstvfSRRTbRVreIO3sCXqXYmtgzycyYVwQJB/cIaTBIVciwBA+WcaEEpEOHobX6jrfecd6G7YpxpAS3euktx+QQ+xPKzxIsmdWMjkvSCleSZncnHr8Ssqn+diAkKJIF2jDbwy/bnrnBnzXAjZAlCaEHPg2AWKSsqhQak7q18f6W6lN5u3YRyQT/N1CrhZNNymu46A1yApkKVIrcw6unQ8kB3US9Sz7MvKms/eoAr4BQvUpv4xWqSUhJEN65HLqNyDYfuXV6vnTD+b//+MsKpC/AXwQERIRYStTAAAAAElFTkSuQmCC)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 11,08%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 3,48%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 10,60%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 16,46%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 31,65%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 55,38%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 59,49%;
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
=
![](data:image/png;base64,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)
= 70,89%.