![](data:image/png;base64,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)
(2.3.8)
![](data:image/png;base64,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)
на отрезке
![](data:image/png;base64,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)
из начальных условий.
![](data:image/png;base64,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)
таким образом
![](data:image/png;base64,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)
(2.3.9)
Подставляя в уравнение, получим дифференциальное уравнение относительно функции
![](data:image/png;base64,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)
[4]:
![](data:image/png;base64,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)
(2.3.10)
Обозначим:
![](data:image/png;base64,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)
и окончательно
![](data:image/png;base64,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)
(2.3.11)
Общее решение этого дифференциального уравнения относительно функции
![](data:image/png;base64,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)
имеет вид [3]:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAARgAAAA1CAYAAACay/TQAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAeeSURBVHja7V2/b9tGFL7uyV4HOi9xukcnj/VkyHSRdGtQWtDkwINhcMkgFEZAezNa5A+op2SzgXbNEHvtEC9dW8D+C5y/wanuqCNPLEnxjqR4On7Dh0SyflDfvfvuvXfvHcnp6SkBAABoAiABAAAIDAAAEBgAAAAIDAAAEBi3yCbkGxVZfyt6H/hwmw8X+cPEX5IhTCYHjz1Krqb/fxCg3tXB2dkj/vejIX0jn2ejkxfqe8/ODh55PXJN2N4H8OEmHy7zBwFYAvYY+VA0oMGQvfaC8Hnoe1v83/RKczJiL7ihyFVn1Vdv8NEd/iAANbur6ef5YNLh0ZvDw8ONvPeOPG//8Pin7xgbhfK5yWT8hBFyy1cmj7Hf/NB/Pn18x4bDt5SQe/6Z4GN1+OgqfxCHGhC7nYR+UVcMMdiMhaPA+4ENg9dZ7w3D8Zo3GPxKCfs8DsM1+Rwj7BN/HAbec8r23sUr19RAgtB/phoP+LCbjy7zB4GoAXzQhuPxK0boZ9UguKHssPVzSncvZHxcBtLFlfE0d2eFkazvnPPPkasY+FgNPrrMHwSiBtdVxrTp1/LB5KvFQXiwFgQn35b9Dr5KjSeTJ/xz5SomvsMPX0aubrQa2ezGu8JHkzsuneAPoqGxsghXcxrHEvKgKr4Y+IwVgMfJUUaf3eoMYLwLMNj9Q+wUsNF74c6KnQF6n3abbeLCJT7ETg0PVXretY7HAP4gMEYIhsNXIo6dGkef9K/kIOcZRH2GPl1lLMsx5HHhCh+qADQhMK7zB4GpiD1G36lxbVN1BYmh2+G5LOLCNT7Eb2lAYLrCH8SiIDbOq5IUca3n7c8VNqUMIusz6oYtfKhcuMbHMgTGZf4gKCmILUK1QjJVJXmakYTLMYiHpmEDH1kJSRv5MJ1ETQvMqvAHgVkSQp+95IOvGmuTLu2qcWEjH+I6CfmaVVfSpsCsCn8QmCVB7fFQ+zy6KDB5XNjGxyzncJfXm9OWwKwKf60LjElGWu7LOzXZOtx8ZzMfVYvIlpGDcdmealgd9It0TN9n84Squq3oUuOeTXxUvZa2BMYVe6r0ZuGJGIqEEJmG9+J1suRVBqLqKindeFsa96oapU188IIy0/dzHkRBGheYyeTxsni11Z5MEuXm3ovSNGU++PP7/3VPkqRaMapY3D487vPEWmbW3iA+l99zfLjdz2s+05kINjTuVeHCRj4WHW2wYJLeqvZTxVbL8mqrPUVtBvpFh5V+gKkRzl10A7HmbNfggZdEy+eS7db5nQQ+mJR6l3wgfF/PgJQE4tcqXNjSuFeFC1v5iD2QJYY4przabk8moZvxD+gTelPV+xBeEOnf1JmLkVuSWQOkEh+LTo9cy+5S3UkVi1aqTsZEaNtuZKzKha18tC0wOrzabE/RtdFL3Tmfm7PIix2lC1ckDOpnFOVA6hKqecEiX/K8onTeR3hQM+OTvSFtGKENjYy2cFEnH/G5Ki0KTBu81sWfOnfVxbns/J4TmLmKzdSAyFxJ/JqNjb8JYXdZZM0m+b3wIqYqmvzY/78+TkalvA3TsuYozi1fTCUTgPyaq8a8prClkdEGLurmIzm4KdtWXeS1Lv7mcphTj+rI3/T5wq0zvzNDpCiZk7xYPUNCisLg6dM/iwZNeibr6+QfLh5yoNPxW57AjBh5X1jWrORWTFcr6fJtB8H3QzZ828YK11Tjma5A28BFE3y0LTDL5rUu/mbHa97JeSYjAzlPy87vTIGJPoz+Kw4N5mJC6Uf5mP9dnI71I/ulaNCEKNH+jR+Ez9SBLiswFci9K5s0li4fPyHM1i5lU+gKtKtcLBKYppsFV5HX5K4D8xskO+vsfM7pKDG/swVGyYvwOpf4cGCepJq5eWkvJ8stVEVDFa2mQiRtgZleU6/X+8vzwy2XxMU0d+UiFyUEptFmwVXkNWtuy54p3fmdKzB8og4Gg9/jszunjzf9I1+6eUUfmD5AJ47lMsKavCSvSYiUJLem5GS0IfDTyVQ3deTRUI2Ju3wjL1e5aDtEWkVe03VD0YZOOjwqN78zBSbtIiknnN+reZi83R8hPtS75JWPSaIo+4i/urepkwRUJDLS24liyuQAZZ4M3hwFP3veaF/eJyaPINfhMhdNCUyZitZV5VUKTLxbTAcfB3Rwwe9kwD0xnfmdKzDqSs8f71J6kRaTvEK7dJdoEalNFNplnl+SIkDeUyauTuyouLjORRMCU3SWrgu8KrtED3El8Ox+SlwTdOZ3psBoXUiqVUC3GKfJVgEAaKIOpugs3U7wqVlsV9GdSgQicaki96nUSuDQzbIAi13+hgrturRA6s7vWgRGigT/8rnE7IJS5+j15p3YAGCDwKTP0nUZOvO7NoFJ8ih68SW/2DpqXwBgEZo6zyXv5mhAzQIDANYLTM0bCXln6QIQGKArhj3bStY5rqBME1/RWboABAboANSq7tD3tsokYnWb+AAIDNBRzNVCaeQHdZr4AAgMAGhBp4kPgMAAgBZ0mvgACAwAlIZuEx8AgQGA8gKj2cQHQGAAoDR0m/gACAwAlILpifkABAYAiieAYRMfAIEBgIUwbeIDIDAAAEBgAACAwAAAAEBgAACwBf8BnfCsM1KA/cYAAAAASUVORK5CYII=)
(2.3.12)
где
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABAAAAATCAYAAACZZ43PAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAADaSURBVDjLY2hsbGSgBDMMbgOAgBEZk2QASEOUMcNCIP0PgmVfu2RVG9VHGvsaRzf44DUApAisyTh6AUysoyONx0OWYTfQoDceefWGOA2Aav6PbAtcrj5W0ljOfVZaRwcPVgPq8zwMZRkY3jAYRy3E6jKQAcbR9TjDIMdNthjdiUTHAtiPMgx7GGQ89iA7kWgDwM5jYLiLy/m0NwCEIfFufDe2vFwKXWF5eRqvm7FbLbr3sMXCa5ghsBRYXh4rZcwgexJb4GI4CZFgYCkQhI3vxNbXSw7B3EgXAwC8nbFjCa87ZgAAAABJRU5ErkJggg==)
- произвольная постоянная, определенная из начальных условии.
Вернемся к исходному уравнению:
![](data:image/png;base64,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)
(2.3.13)
где
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHgAAAA7CAYAAACwqE4QAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAVESURBVHja7Zu/b9tGFMeve7zHgU5T0z06ZYwng6aKNFuN0ISmBBoEg0sGDUZBezOQ5A+op2SLgcwtUGft0PwFLRD9BcnfEJfvyEedaJ5EUjySOr3hAYZtyvR97n3fj3vHLi4uGJm9RotAgMkIMBkB7qr5vj8iwJbauS+eCuGH4zDcJ8AWWui5B24QPrqzKIz9AFZ6MZPnVCPAbcqzYO+4c/pK/d7l5eSey9kNY2JexLMR5OI59l0ad2+eCXYt/POnuo1EgFsygHXUF1dFAJ8I9p6Jk/c6hTicTg8c4fw2uby8R4DbWIAcKS0KGGI4KMB0Ov1RpxCxR/Ov5MEtearbY58iAN9UAFnAutjqCxH6gfuzcIKXlGR1MckK3EfOeHwsGP9HB/hObE3ia3Ae3D8S/SvORx/akl8CvEaKZZkUJUHZ353NJnsS8Gz2QPd5pw5/xcXJ20k42Q+C8/t1vxsBLuOp4XhfMPYFvE/NmiWkTBa9FDsjT9V5J8RdeD7Ktr9sUkenYUKTqFkF2FQNGTjOMUAA0AM2uEEgOsBN/7+oJCa8uFNdJelho9GbyNvm8HWefG5qJ4K/xXgrPdCQ56yz2Wz8QKpKpBKuEK8hWeOM/wfvJhVH+KFVgH3XfQFyiF4F0lW2fizSScK/0ybgOGSIv6SqRIkexPJgPH4CSZsEHH2vrsy8W4Bnsz1oHIDnQqJTBrAu21WfzyZVOsB5G6Uui0OGeKmqiOx2KeGjzs5X5ySaCf8dJjl1SnToiV8ApurVKwB/N2VYP0OGHv/PcQ2OngzSLUGvyOApi84padRFxo3TlkSn7zMcfZSqE23qdINr1Mc6wE2cxrSZZO10o0PKKWO32RaiCcBtlkk7CThpSsyzcmoq7m8CuAvnvVsHeNNFLwPnbHo4qFqOyKTIQN1qPeAmZFNRiduqCmGqbrUeMNTBpgGnNfMGmaqpurVRwG3MFa2akDARB6s+b6purbvS0P4g7ZU2PI0gAffcT0U8C+vJqjKLnlzleVN1a+m/v2at9P94f/g79kqbjC9FAUOCxLl7HYTeQ8+rtgGxZageQGyTFclXtIDxEBsAu1540MQLp2ejawDj72EPtypg2TKMNrHaG94Wi9WHX6vvnVcVFPCo5nb3YkZq9ciqlKdkE+BZb2XAUezcFsDqoYWsBPpHV7AGWPJB2XY4PRsUBpxMLMzLLmDRU5WqgDHT3jR8xLUs+wq94G2AK8NXEu9PvcceJqPJ4cxtXnNoZYzrs/6/nA//LAt4MS6qMc2CFgGM0nQYBE/anDdu0pKEd47rlmzMbypIXXm58gPhA9QD8i5INEoTNhlsh7uY2Vo4RXasN67J+efcazh34U724ANxqsJ1/Rdl62KTEg27t9fr/d1U4te2xeXQ8nrg2fZSKNUkpvllSlLTwc5wnOC4THw0LdG+y0M17m5Dw7/Oxk+cTC3kGdcMHDJvLZa9Qx7TLcZAMYmBByHThLhX9M6OCYmGnfrYD56DquA04jYkSHUATjNlPvxjyIcfYEgPVCyOx4PPv55Nf8pjk8mYl7tW2XniMpeyTNTBeAdIHe+xXaLTTB9vVITeQ5zGhDVadNTyO46lAZgEXKaTRVawvCLABHgpw153Z2dTW5URkhkGXOTOTi2ALR+E6yxgoy+i3NOxfRBu5wCnIzSR53Z5OoIAb1Ie4bWTHSh9dlKiyQgwmS2Abe8v7zRgHKSjTNpCwDiKCl9v6yAcAV7jvXgMRvWwhYDV4bcuXwchwOTBBHhVDI4nCCkGW5lF44EGea/FdTAZASYjwGQEeAfsf1BvnxMfXkjgAAAAAElFTkSuQmCC)
, где
![](data:image/png;base64,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)
- искомая функция.
Умножим обе части уравнения на
![](data:image/png;base64,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)
и проинтегрируем по
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAAPCAYAAAA/I0V3AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAACbSURBVDjLY2hsbGQgFTMMnCYgYARhfGIoGhqijX2Akv8YGGTfeOTVG6KIyXrsTuvo4MHpvBw32WIG46iFEDp6AVF+qs/zMJRlYHgj65ZTTHRAdHSk8XjIMOwxjm7wIVpTnptxiomJ7AqQEwlqAoUQyOMgZ4GdKOuxMq28nBdkCCxgUDSBPQ0KJajHwU6UZdgNEkP3G8MQS0bEYACqqBXputXHeAAAAABJRU5ErkJggg==)
от
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAATCAYAAABLN4eXAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAACgSURBVDjLY2hsbGQgFTMMrCYgYARhojXluMkWAzX8A2HjyHpfgpoaoo19GBiM78TW10vW18dKGjMw3DGObvDBqamjI43HQ4ZhD7IisCEyHnvSOjp4sGqqz/MwlGWQvemRV2+ITwxFE9Rpd0FOg2uCOPEuuhNpoAnsPIY3ODWR5SdsoQeOM3yhhxLE5eW85eWxUgTjCWuKwKJhEKRymmgCAGvUY7uDg/juAAAAAElFTkSuQmCC)
до
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABAAAAANCAYAAACgu+4kAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAADWSURBVDjLY2hsbGSgBGMKMDAwgjA6H1kMpwE5brLFQIX/GBhkX3vk1RtWZ7kYyTIwvIGIMfwzjm7wwWlAfZ6HoaxxVC+YXR8raSJrsgKo+xSDjMeetI4Ono6ONB4PWdmVIIOxGpDnZpyCLNkQbewDtPU/sq0gS4zd8lJwGOAWFltfL4liANR2uAFAl7m55YUR5YIoY4aFDAzGd2PLy6WIMgAWBqDQro809gUFmomJyQwG46iFsFiIMpbtxRkGSP4Gh7isW04xSCzamGEBUbFAtYQ09AwAAEbUH/vh3w5CAAAAAElFTkSuQmCC)
:
![](data:image/png;base64,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)
(2.3.14)
из сравнения (3.12) и (3.14) получаем:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAO0AAAA9CAYAAABBc+6gAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAktSURBVHja7V29b9tGFD97TjI3H6elcTtbR49NloChm7idlIIiNDnQIBgckgBCkcZUNqN1sjtdkkxu0a4Zmowd0ixdWyT+B5z8C3bLd+RRFH0UjyIpUro3/ADbkGTx8f3e9z2Sx48fEwQCsThAISAQSFoEAoGkRSDyKDUhK0haBGKBCOs4ziaSFoFYEIwcdpsxZ7fneReRtAjEAsCzres3Bg/bMg/sY3UWzw3vC7EigKRFIEqCw8hzarn34n/b2+ufsyh5TQj7oOKBBTHH7yMnHNR6/a1BDpkzuu0bh2uW660jaRGIigAEvNliz7JIC2TtMvKCMOd5uicfXDeZudvf2zuHpEUgylBqSSisSlrIiam5c7/f76+lefLA89Jj9LQIREkeNQhp6ac4qeKkTeSpq/Ec1WHMs3fMWxuWu91Yo4Q3GrFM8Fxr3ez17jBC38pIa3vu2kSeGuaqEOoOh/3zN1nrGaWbh3WFvkhaxLKHwWc8JW/5OKPbyddyQrbYz73h8FLa57kWvUdZ90l/2L/kuqPPSgjRV5C0CITwqF7vIiPkPXhKPwd9IP6+Y9L7kJOm5qKhV5V95mAwuArEJYS9L9LnjUL0lGIWkhahJVzL6gCxgLxt0n4tSJZG2jl7/xXh8eMFsbI8LyqARODJkAsxm5zir5GFsmWhy+gTkb8CaQnrvqhDLsNh7xL3/r43txj7yXGtrymh/8J345EBczwkrVpeoaQoYbh1xEzzESXkuE5rvSxyAm/Dw9fNzX3/PR/gZ1m+qfjdpKTns8aWtS1CXhlpE+8vHWPCsj/A4z8c3GhT5uy7vd5XUNjipHWtdWa6d5G0GeA3MKEo05SAN9V9K+l69lpZVnER5ZRFFFU5CTKJkBVyPZOZj1Qrs2cmkhI5KXwvz2ZbrDe6NXEtZ0l7UiV4uG6yu0BO+E7+d3jAp6ZioTsMZZTV111aReTWjm4egmLZdiCsaUoAAjZa1gH/2VeE5CicLnLKIkoeOQFpO/3+BSA5s72tfr9zIQ9pszww/H/S7r6MG5a6wmPo73aGw8v8OxH6CeafwbvSdvfpcNi57JP3zbTKtfakhfK+dYW8EdZOkHZq2AcW21csELAIc5adsFXLadRjtzjpmfNcVG/jXrFYIQqqvGPDIj63LtJG38fY/E1UjqPrlxg/JK1EsYSAXNO8o0JAHvLVPJ6Gciop1K+pEDW3GsQyXhQoFuRQEPqpjKPx8KXdHemSw9Yhp3ieXDVpixQRq2jRIGmVihf0lxuDwTWLWT9khSPjJr0+HrYOOQW5HvkvORNcNsTA/0yRB+SgFbRoGknavBapSgvGhd26+cwyWgdNI6GucgoJ/yGZf1Yg31U/amCztlaqatE0jrS8P8Wc3TzvcRjbLauSlkRQDaV/WrZ3rUmC1llORbxfTsNw5BP3NG8vOP4ZVbRoGkXaeEM5v4D995WskEGjnXrCQjZhNQjKaT6jhVGrqkCFtqoWTaNIC72pWVsjVeQMUHbfcNzvLMvZhlCJ51EVDW2jnPIXvFQNSl1jpFW1aPIYU5VrLxZeMWe/mDLTfdkSrlkBpzQmhN8AwqKcwjaRYhtGNsWmC8L7cZplLArdiKKC5bOpS95TQzmFpL1ivcnyWrIptgLeaiEPffBUIjFldmbeevaEnb4rmqgHJfb2u0WfPkqs14wUBuWkTtpZprOmeepF9NaiDRfXFzBkySq2Ukwd/x1+5hZxihJJ9sRKm+plKXWNZA1lQY7BOoa9yBNewbS9rSyy6SAnrog+GbNIO8t0ljRfDwf3m1z9TeOcaMOBDELdYtA39lMjNsHBSZbzQfHTuID5Ssk2fQoCiF5z9erfhLAjmWADRSXH0EgHxR1vr/Nfn6jGRce8EhZRcspkddqpk7qEDac5xJYDEdpxpQu2Hxz1euyu7nKKSJsih2SxSnU6KzX/t6ztwcPOF3nba3VFaNFYqG+wduwNW9QXQn04DTHR25bnTzEBi1MLwmpB+8L4/PPfp90E4RlaLfIP/DNx45IVxDRlHCtwChpQYArkMl5+DWGZuI5osuYb9r3uclIhbd7prGlpm2UYP1LC3jY9lQgPzB+JexQa8Y/xe8wNmeQUVUr+FIxycYJS+kr8HoUfWcrIQx32l+16a/Ebl/wCacpYIK+s9KBzUhHF9SR36kaEnuJpdZCTKmmbPMVWDWGD/D1uVMPFc5EOAffSUqJU6w8tBr4D1rPXhcKI0CXpjbMqpkHeNyZ+FWHfPA46ywxbdH1hW0dsqAfi6S4nVdI2dYqt4ihtQh7JXjlPvVJaP3Kr5yuIYRgHELKJ3zfsHVuELkmlPUv68aKtaY9ZSCuwND3sE9cveqciNI4OZod5ru5yUiFtU6fYKq+mx1p4YTEzCo3jEZfU8KYKObzhY6HTj0JpplUzA6tp/QobC8aJtnwlZZNaGXmKN9EAfLv7ErYxwD5d2FoQtBvG16q7nFRI29QptirBjW24cSPQA+OVQY1DeLIBRBvifneGgy+tlnGQlJtcyLFiAPy+SemhzMpD1TP5/nifLMvaN+UGpe3Qzfa2vPobVfhkRQPd5ZRF2iZOsc0nUuO6cxLt2gq3OALvxuOU8mOQxf4x6z6RVQFViwnx1Zd1Im2HrmqoM61ApLucVPu0iBzRTjE3P56JjZrBfsjXHw7PK5W8G9hLy0MQVeXVXU6qY4yIOZBWnEDhxYR4USRr4Jm/fvaTLxXmaxM7dLPAwxiFcE53OSFpG0TaPIp7Js+raHtBEUVM7tAtEzrLiefvSNrmkHYphJCyQxdRjpx02JCIpC1X0TKH8tN26GpGyNLlFH8YlS7L35G0BZFnKF9nVCGnaGeT75UX5cQNkrYpCqk4lK89cUuW08TjRTTovSJpy1RGxaF87UmLckLSNgWqQ/m6A+WEpG1QyKc2lI+hMcoJSdsA5BnK1xkoJyRtY5BnKF9nVC2nWCsJe+BI2nTkHcrXFVXLKTrAb5qP+AI8rNojaVMse66hfG1v/pzkxMNtcQStoU+iQ9LWjDxD+TpjHnICT2u0rAO+8cRmW9hCQtIiGg5+uMD2tuChVrM8hAyBpEXMGdFeX80e2o2kRSwk+CMj290RygJJi1iEsDjaJ4UeFkmLQCBpUQgIBJIWgUBUhv8BSiBDoWPVQU0AAAAASUVORK5CYII=)
при этом
![](data:image/png;base64,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)
, где
![](data:image/png;base64,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)
(2.3.15)
![](data:image/png;base64,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)
- постоянная величина (вычислена Simon Sandor).
Рассмотрим исходное уравнение:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJgAAAAzCAYAAABrGcEMAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAUbSURBVHja7Vu/TttAHL7u8AAgLlvZ4cKKOqBgVdANCWNlQwwR8kIlq8pgsmXhAcoEG6wdOhReoDxBK8ETwDNAfbbPORLf3/hsQ3/Dp1bBufi+3+ff3zMajUYIAHAFIAEAAgOAwAAAEBgABPa2yUToAwX7P3ACAqsUAUEXiBxcngZkByFy34/jJRAYCEPLK+l6pMDDMSYHZ8AdCEyJKOovE4TuE3E9UxA/3lV9J+yRQy+M14A/EJgU4/HRwnaHnLMwd9zDJ4nIXkhwuiMTpIfxtY4QQWD/OWLf2+Q9ERWct4JuaY5Ven3orWFEfvuxv0a9Hu4dnwCPIDAjHBB0KRIYAAQ2d8ikHkwWIkcl7QoQGJCgFzJpCMTe9dF4vCAPrWSX5moI4SdI9kFgBuERn6kEE8f9pST/eiiqTg1vBwLTKeVJEDdx8wEhcT+Kll3/Dq0gdcRCG6xVJ/cqfuvioBGBZU8s+dVUx7qO36chLxHNV5ZXDQdb654fb4qEWKXAdPbXtA2cCix9ehreWEqwIw86yad4kAfRnmmVWaXAdPl1yUFjAkuT3ppHIqLqTCc/sgmLLJd6BRJc1NHGMOVXhwOX1a1o7TmSXnRZZxIbRUeLaaNzxbudruTS4XIL+lOpwErurw5+VRxkA/jkAano/nRtYx2W1hG+q8prqJ6qvDq7FxGUddHX75oO11UJzIZfHQ5sc0SZfVS2MV6YflalQadnfsqwVSawigVvuw/RU1w1v7TQIL3w0ISD9P4wvub/XraOrX1EtlE8Efgvf0NskTDY2Bclu2WxWBb7qxIY7T812XcqBCYpAubll1Wx9Htbg+G6igP+qFH69872OeVOtk5tApv+AiOQutj8QN0MAUWc57rYxWfYuyl7sl0KjCdYhKYEZsNveqAxq2ZnGrnTHNC9pSE75/7Y3/BZjiZbpxaB8Zste+JEBLz6sWQz2b+zVRdvYJogphuIomWV4U0FlhP5LISgIrQRponA5uFX1ArhOcjPsT2w/WVroyeeH1lLxcY+RgKTuW+6gEpgbEOiDZQY/kXH8HWFSKkoc8wjMFt+ZXkW42AjCPezY0UTDqe9kCpfs7GPkcBk7ltEUBnZOgZ3meS3NUTa8iva/ysOvpBv0/eQNoy5FoZsHechssx9s4SQbVj1BNBjw90uvtLpTVUiMEHVZRsiXQrMll/+e2UPBuPgUxf94HnP1p6ER9U6zgXGhbd0/sY36AbDvVU2kihrBLLr6c0Xx1uiaFF2Tl13A0XSSjeRrNm2RquuwGz5ZQLaGw5Wy/hiHLBpQlEp4u7PLu5eBaH3mc5QVevY2Edmm1Lv0+mgP/xTPhmbTF7Fmh5lFNfkXiHru6Ab+pmsuZde1+l+Vw90Jy9fJFXqIy9YF6MiV30wW365Cv2xbK+Mg1zAj6x6DGP/Y8pdXsWr1jG1j8o2sxfnvRK9znXzhm3ToFfVyXfF75sZdrP2gqlxmzoeTH+3DSc6dAXmgt+2cSAUGAtppqV+FvurS5ZNQJP4Np0alVVnrvhtGwdSDwaoQGDw1hEIzCQE68xV2WcujkyDwN4pdOeqxYseieeaflkXAALTDnuiuSrfjmkqFwWBvWGo5qoAENhcMJmrAkBgxjCZq7KEH3gDgWkJxXSuykY+EE5BYOrE3nCuys8O2zBCA4G9Q1GyPA36YSAwJ7lacZ4r8Waqt3VAYADwYCCw9oDlYNnhO8jBQGAOwI5og/cCgQFAYAAQGAAAAgM0iX8A12/nP+z4rgAAAABJRU5ErkJggg==)
разделим обе части его на
![](data:image/png;base64,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)
и перейдем к пределу при
![](data:image/png;base64,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)
Следовательно,
![](data:image/png;base64,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)
, где
![](data:image/png;base64,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)
(2.3.16)
из условия
![](data:image/png;base64,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)
и условия
![](data:image/png;base64,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)
можно получить
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFkAAAAoCAYAAACVdVbLAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAP2SURBVGje7Zi7UttAFIbX1ISey7pMjw91KkZZBihd2BpVIS48jAtgRgUXQefCPEBSQZokrxBIn/ACmQzhBcCvYJI9K629SKvLYmMbssUZtEKSd7/9z2UPOTk5Idae1p7npAkpjeIZCznFfN9bAHCP8p5zAY4831+wkHOUyG0mAZjANy8I5vPeDwJvXjw7BaDjC5uRbqZeT8K2HbpHCNyoQLk6gyKAH4AGNxiHGKQp90oJyL5fXQRCbsA93ghVEF5PAnC73ZhlS+SSgHsm7+03VysU3I7pt1ygndXmfuWp4NaBnPO/vdDoLf5WUINNlZ3iWuQPf/CvAvkavOP1SUJWJ4qLecymH7uwQaB+PmrACJL/vVeFIOZNyQWHfcdawXJCyUGLLVNCuuNSbzzeqi6Gm7xSZh8a7fasHFcIvVInXjhkiHVVrkzCTO43I8A6EQqBlt9+lHPPhCxjspqAlPhT0o2LmnB9Qn+r0EQMpuwCJ4cTZaxVzQOlxkPNvdKwG5Q+d9JVFazJA0faxKdCfhCfxa7R7mqz+SZ0Be4ilfqnRqM6p46Nk1oEVA0PlLV2Ul0+lgTFfQ/Wo1h4h7FQceOeumFp+SWetDRW0idk2jXZtCRkz9vqx2fHOeT37vBaxplwwfFx8R/VAdUpuwhkaS1Gd3CjOYDduMKyILtAzgZJS2Oxb/UT8hK7VMOBOWRUb8q1LqyE43RApqHiMZDlnKizvauvl0dTKclvmSbSEUEunjBNQ0URyL7feCWqkVqwaQLZNFwUgawLMWOF3AcaKQ4nxJUNUtlpCTTLW/CdlgNbKyv0s1y8+p2sxGcaLgbvwE3V9xe1mw3sIO6RiayJaggXnryOoFTSxsXKKeHWe6iUfq25xL4396uv03oSOlBShfgN9ALxbcq+VhuNOYQunx11CRet4VaClqoPiwX6UysExQ2uM3eVGzB2EP6Abkxv8+IyLr5cJr9UpYikJcZwnQUCFaRuZP+9SG2DgwDpqaFHbGRKuTXUYSn6rYGlz3+83bNYkW6sIKifmr5XB3o6qhp56rtwIuENqSjTPkTRtuiLgCzda9heiOyqFW3am3btxtXqLMWP0ialyjhMnPIKeISI4RNqcGVCFuUJL4PCrJ8eyMP46HZ0PYysI+n/akkFMBqofdu0gl1sBD/K4v+jo3aPrq11oiN5b1K96GcBeduB92o2zijY72U/1WXsHVYN2DvAgwbGYAecw8dWEi8aMmbjNUq/yINGbk81io0IGQ8BorHO38UOnYWceqyGH7WgtowHk6xegozJiZYjqjpS/rQknakMF9YsZAvZmoVsIVvI1ixkC9mahWwhW8jWLGQL2UK2ZiE/P/sHdSIBzdydr4MAAAAASUVORK5CYII=)
(2.3.17)
Так как
![](data:image/png;base64,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)
, то
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAD8AAAAXCAYAAAC8oJeEAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAJSSURBVFjD7ZixTsMwEIaPHR6Aqs7ITt2ZCYUMZQSpjbohhqrqUqQMHdxuXXgBprLBK0CfoE9QpPYJ4BkQOTsOaWontttKRRTJIrLi8313/9mXwmg0gv86/i34TuCjqF2hNGQm74aUsnYUVf4sfPx3JJ8Za59SoG9txk5N1tq+v1fwXZ/0AehSOs8zaQnCA2CoFJfEZJOzNfjx+P44qMIUaOuZQ/SCc0Jbjy62WpQ8Bj12vk1wkRj4xkGb7Hon8DQcNgQAPMtn2zEMaUMGcRuD2wO6QBWK0oKFyjfjes7PcaPe1dP9eHyMzzUgM9fscdVAbaYqmSLZmiQlDUY1mKKvRvDCIfKRBeJSSowgsO/3bk2czwPk53TBk4ooq90yv1VzhfBZ0GxEid/ta2S2zMOLeaw78iU3TudI8C5tJ9JcqqSZvm8YBJUvOvuF0smC6qJXBL8SyNh58T+cqK88NfxaEDBoUXSiC8LG8GWSt4UX9uBLpRpT+Lwt3X5K+GSNEbyN5E3gVYeQCzxme9C5rMUgn+B586DJLrZa8ypQsaFa8mUlgaPn07t6nbzorrOy22IFOnNWmAZap9oiiT7gpmmtxYs7g5szVTemc16ux0ByuyR4xXrFYKxnRn1bqA5Io3seYeO9+LeG6T2PjnkezGV3hAfUb7ckGgd1l7ba5KRrkgOOZ4TAO87ly0fX5Ij59QPSusPTlNN67SWNi1OjskftrfWHjbySXI25QOzyw8YYXsrStT/Pgph2Y/iey5fg3v6YYVOnIYXJJsE+/Ix1gD/AW48fa00rcCMDT1AAAAAASUVORK5CYII=)
, следовательно, функция
![](data:image/png;base64,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)
- возрастающая, притом монотонно при
![](data:image/png;base64,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)
.
Умножим исходное уравнение на
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAAPCAYAAAA/I0V3AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAACbSURBVDjLY2hsbGQgFTMMnCYgYARhfGIoGhqijX2Akv8YGGTfeOTVG6KIyXrsTuvo4MHpvBw32WIG46iFEDp6AVF+qs/zMJRlYHgj65ZTTHRAdHSk8XjIMOwxjm7wIVpTnptxiomJ7AqQEwlqAoUQyOMgZ4GdKOuxMq28nBdkCCxgUDSBPQ0KJajHwU6UZdgNEkP3G8MQS0bEYACqqBXputXHeAAAAABJRU5ErkJggg==)
и дважды продифференцируем:
![](data:image/png;base64,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)
Следовательно,
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFwAAAAXCAYAAACGcCj3AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAALASURBVGje7Zg9btswFIDZPTlAAlNbusd010yFrABJO7WoLXgLPASBlhTQEASMNy05QDIlm30G5wQ5QQvEJ2jO0Fak/FKKISlWoqTAtgGCAG3rvfe9H74nNJlM0GY1tzYQ1gU4jYL9YEAPWpE9CA6CiO6vHPD08w6WDBvjw+k4SbbaMDpJxluHGE/bgF7bg898fI4QWXzudxK2jyjdAWN94l82BVvl8Lr10MmsDTgzJuigB0Q+zbJ9eA/fXYXkCPtn503AjuPxNpffCR5UYFlQkPDqyH2god9skQE9bhT4hzD6xnbRqCHB165SWRdFvGzR0Q5B6IkbrwHOSxsZXruymwVTms1PLJtBvuxQp8bCGRfm9W8jOthjOxjLzruoO4fyUtWpfY/cFj2LR5wOuGN95ODiDpBkW9Uf+YxHBsI/xUgVDWOG+H70Ffb8/7qPsoE2MusDjh9dZJyKiepMkRKs/uBn+NHLGQ7moLRsBHi3qDarPG4rsw7gqqiUuyvd0pSThajPsqwsxOfrlUwvumwP71RKinBVnrQFbiNTBYJdiBx4HO+aQJQBHhJ0Bxefcin0qwQ8A4ieVRFbVE7KAjfJNID4UwSiDPAKF2Ye+NKmQuAmRcqWkyLg/2v8WysppWo4rMgnJ70enor9sw7uxenHrk05MV2aJpm1A8d4JutepqSonKeS/apGwmCSjd/BbBzH2wwGU0pI++/wW+hzTy++vCckpEbgijasSGYV4OzZQ4LuudHpM+tsC3MZnMqK49GusQ9/mZCW3su8j+bsDCKaQfA89EP09L/JKmv4i5QSBx8bmca+1+vd6GTmBp+sC/olO9D14PNq0lSUR/s+cznMVH330ORobwPH9Wjv7OUVtG0uJrImX169NT3sx9Y01V1FA0tl4kcnbQJv6534WqVz7nLTDFcrC3xd1wbCBvhqr79C9to+oF2OuwAAAABJRU5ErkJggg==)
при
![](data:image/png;base64,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)
(2.3.18)
Таким образом, искомая кривая
![](data:image/png;base64,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)
приближается к прямой
![](data:image/png;base64,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)
при
![](data:image/png;base64,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)
, где
![](data:image/png;base64,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)
.
Итак, можно сделать следующий вывод: если интервал
![](data:image/png;base64,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)
заполняется некоторыми одинаковыми отрезками, условно равными по величине 1 и не имеющими общих точек (то есть не перекрываются), то при достаточно больших
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAAPCAYAAAA/I0V3AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAACbSURBVDjLY2hsbGQgFTMMnCYgYARhfGIoGhqijX2Akv8YGGTfeOTVG6KIyXrsTuvo4MHpvBw32WIG46iFEDp6AVF+qs/zMJRlYHgj65ZTTHRAdHSk8XjIMOwxjm7wIVpTnptxiomJ7AqQEwlqAoUQyOMgZ4GdKOuxMq28nBdkCCxgUDSBPQ0KJajHwU6UZdgNEkP3G8MQS0bEYACqqBXputXHeAAAAABJRU5ErkJggg==)
эти отрезки заполняют интервал
![](data:image/png;base64,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)
на 74,8%.
Рассмотрим вопрос о вычислении дисперсии.
Пусть в исходном уравнении
![](data:image/png;base64,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)
, тогда
![](data:image/png;base64,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)
(2.3.19)
(заметим, что
![](data:image/png;base64,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)
), тогда
![](data:image/png;base64,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)
.
Следовательно, изображение функции
![](data:image/png;base64,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)
можно записать в виде:
![](data:image/png;base64,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)
, (2.3.20)
где
![](data:image/png;base64,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)
. (2.3.21)
Заметим, что функция
![](data:image/png;base64,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)
- целая относительно
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAAPCAYAAAA/I0V3AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAC1SURBVDjLY2hsbGQgFTMMnCYgYARhojU1RBv7ADX8YzCOWggTy3GTLZZ1yynGqgmswTh6AbqiKGPZXo+8ekOcNtXXx0oaMciegimqz/MwlGUwOhVbXy+J33kyHnvSOjp4ILYwLER2KlZNIEUwp4EMkJGROWoc3eCDUxPMaS5Z1UbVWS5Gcsbus9zljGeFVocaGRtH1+PUZMzAcAccerIeu/PyXGxlGRheMzAY38HrpyGQjIjBAJm5GMknudIMAAAAAElFTkSuQmCC)
, и, следовательно,
![](data:image/png;base64,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)
- целая функция относительно
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABAAAAARCAYAAADUryzEAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAADUSURBVDjLY2hsbGSgBDPQxAAgYARhZDaMT9CA+jwPQ1kGhtdADf+NI+t9o4wZFgLZ/xgYjO/G1tdLEuWC+vpYSSMG2VNycgw3jKMbfDo60ng8ZBj2yLrlFBNlQEO0sQ+DrNGpyLx6VRCfZANAzgbZjOot2ZseefWGhMMA7Hyj3TD/ggIPHA7G0QuID0RZj5Vp5eW8cM0MxnewBSBWA3LcZIshoQ7FOGzGagA4sGRlV2LzK0EDQM6tznIxgjmfZAOijRkWwJ0t67E7raODZ+DywtAyAAARx4DEKMSVAwAAAABJRU5ErkJggg==)
, тогда функция
![](data:image/png;base64,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)
(2.3.22)
тоже целая относительно
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABAAAAARCAYAAADUryzEAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAADUSURBVDjLY2hsbGSgBDPQxAAgYARhZDaMT9CA+jwPQ1kGhtdADf+NI+t9o4wZFgLZ/xgYjO/G1tdLEuWC+vpYSSMG2VNycgw3jKMbfDo60ng8ZBj2yLrlFBNlQEO0sQ+DrNGpyLx6VRCfZANAzgbZjOot2ZseefWGhMMA7Hyj3TD/ggIPHA7G0QuID0RZj5Vp5eW8cM0MxnewBSBWA3LcZIshoQ7FOGzGagA4sGRlV2LzK0EDQM6tznIxgjmfZAOijRkWwJ0t67E7raODZ+DywtAyAAARx4DEKMSVAwAAAABJRU5ErkJggg==)
. Таким образом, для функции
![](data:image/png;base64,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)
достаточно применить к функции
![](data:image/png;base64,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)
обратное преобразование Лапласа:
![](data:image/png;base64,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)
(2.3.23)
В результате получим:
![](data:image/png;base64,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)
(2.3.24)
Рассмотрим вопрос о вычислении дисперсии, введя обозначение:
![](data:image/png;base64,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)
(2.3.25)
и применим к функции
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACgAAAAXCAYAAAB50g0VAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAHZSURBVEjH5ZbBasJAEIand/sAguOxd7OePZXtCvbYggZPFQ8iuVjwICV6y8UX6Km96TPoE/gELfgIPkNpJtuEuO7GTSBFUFgkSybzzcw/swuLxQIueV00XOmAvicaouu3rN7tipbw/Ma/ARIcYns1DIKKzftBMKy0EVcqZClw5Iwz/mYLl2VXCuDcZR3k40kR2zHHCXPnnVIBewyXOj1ZS4P1llaA4e/GZu/Igd+vOuBs+r5fLQSo2GdHAvidzgSlH2pim6UtaefsdIAUnBqguicBcRf7zdRCGoYELGqwPact0p8uiGgf4AcAD7HzZA/FRvUT69DYTSqMLqN5AI8CZ71P+e9+mHxnAhYtrw2g/DYcTJWwArQpr05PNoAqQG5AHcxsdO+kM0pCZgB70o+aiawmoeVxNmg2cUVlNgIiro1NkirBK2UoEXKYldHs6Y4x1/c4fyYA3UgxjZn4WxSQPAbFejid3hJwWkpnxwwZ1OvwJTsuXKGQo5JHz2yvOtYNZXUvsf9rCpkl2BgrYBrUUenqD+95zlBXiBfdSCnlqItHQJ4zVyf2Ui4LcdpN3XV6f2OPFIzp6KNSMe4Nch1zmjshFC1DotFwmYJSy3V2fmoG93Vf+a8C8BejHjCeZMJ/5QAAAABJRU5ErkJggg==)
то же вычисление, как для
![](data:image/png;base64,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)
: на интервале
![](data:image/png;base64,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)
выбираем интервал
![](data:image/png;base64,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)
, где
![](data:image/png;base64,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)
. Тогда выполняется равенство
![](data:image/png;base64,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)
, где
![](data:image/png;base64,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)
и
![](data:image/png;base64,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)
независимы, так как
![](data:image/png;base64,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)
,
то
![](data:image/png;base64,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)
.
Пусть
![](data:image/png;base64,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)
(2.3.26)
тогда
![](data:image/png;base64,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)
(2.3.27)