![](data:image/png;base64,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)
Вероятность надежной работы по замыканию в плече:
![](data:image/png;base64,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)
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![](data:image/png;base64,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)
Вероятность отказа по замыканию в плече:
![](data:image/png;base64,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)
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![](data:image/png;base64,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)
Вероятность надежной работы по обрыву в плече:
![](data:image/png;base64,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)
| (31)
| где ![](data:image/png;base64,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)
![](data:image/png;base64,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)
Вероятность отказа по обрыву в плече:
![](data:image/png;base64,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)
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![](data:image/png;base64,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)
Вероятность надежной работы по замыканию в выпрямительном блоке:
,
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![](data:image/png;base64,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)
Вероятность отказа по замыканию в выпрямительном блоке:
![](data:image/png;base64,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)
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![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQsAAAAUCAIAAAAVwI//AAAHjUlEQVR4nO1be0xObxwPubchQ7l1c9lyWSmMLCMKFaZWWm4l3pUtlxEmGktk7pXEUJTWhb01a5ll1EyY5LLEWhdLlFQWuY7f5/c+29nZ857nvKf3PXXYzueP9u17vs9zvudzzvd2Tpn/+fPHTIUKFQyYK+2AChV/NdQIUaFCDMIRUltbu2/fvoKCgo6OjpkzZ8bHx8+YMaNL/cjLy9uxY8fr16+NW56Tk7N169Zfv37FxsaGhYWJWGZmZmq1WlhqNBpPT0/F9ffv38e1//79e9myZW5ubkTZs2dPvs84yv/VFK6kEMWykUtv9CqRC//27ZuTk1NlZSWnESR82rRpNTU1X758sbKyWrx48aFDhywtLcUZE4iQsrKyhQsXhoaGvnjxol+/fteuXfP29i4tLXVwcBDfyzjA3bi4OGtr66qqKuN2qKioOHPmDNz++vWrr68vmHJ1dRW0hFlKSsrevXtB6Nq1a8Eg4l9BfWFhYUhISGRk5IABAyIiIpCJFi1aRFylokIWrqQQxbKRS2/cWQxeeExMDD9yWIQD5eXlo0aNamlpwZINGzbg8RYnjY6QHz9++Pn57dmzZ9u2bUSzfv36T58+RUdHIyjF9zIOAwcOPHjwIAQ8KMbtkJCQEBUVNXz4cMjwMzk5+cKFC4KWiYmJ6enpSCSQcQ+SkpIIcUrp09LSEBVr1qyB7OPjA+e5COkKrqQQxbKRS2/cWcQvvKSkBCmGr2ERjtgjBjgFCoitra1B0ugISU1NHTx4MBceBP7+/ohgg3spheLiYuQDIqMb5GR9oHucNGkSkRcsWHDs2DFl9UiNI0aMIPLIkSO7+r2iFKJYNnLpTVklCAwC4BO92f79+zkli3A+0ICNHj3a4P50hOTn56PcU0rcxc+fPxvci0JRURG6NcFDvXr1+vnzZ2c3ZOHNmzeIaiIPHTq0vr6eZWlnZ/f27Vt7e3vIKLWQldUj9Zw9e9bZ2bl///5Hjx5dvXo15yo6ig8fPmAhcmdAQIA4AxKplkIUy0YuvSmrBLF7925Um969e/OVLMIJQEhDQwPCb+fOnQb3pyPk6dOnp0+fppRwdNiwYQb3ouDh4SHYTMsOlNG+ffsSGdUWv7Isd+3ahZYG0x5G4UePHqFJVVYPZUZGBqZGyJs2bcK8R/S4CzY2NriWx48fo41GbQkMDBRhQCLVUohi2cilN2WVPm7fvo0GTH+aYhFOgFP06NED7Rw/JbFARwjyln7pgR/Icwb3kh0SUyMSMCjAT8iodUQQBBhpbW29ePGiubn55MmTBw0apKz+8uXLFhYWHz9+RMVft24doiU4OBj6KVOmEAN0z8iRubm54hEiEVKIYtnIpTdlFYX29vYjR47k5eXpH2IRTvD9+3eM9RjTMausWrVKnDQ6QhCRCBIUJr4Sc8/mzZvFN+oKSEyNY8aMAR2EzebmZsp5CpE6QKiqqrpx44ay+uvXr2s0miFDhkBGc4uplEQIH5hPMK4YJEEKpBDFspFLb8oqCtu3b0enxNUcCqwbAaAlw5SCGoIM1ekImT9/vlarRcXnNMnJyYjmoKAgwfXv37+HQWNjo62tLUob/1C3zSGzZs0qKyvDkwT54cOHEj/dIPcIvjjqTj144BoJhAH1GYQArTm6avZ1/A+JVEshimUjl96UVRTO68DXgED9lMq6EWi0UGFE9iegLeLi4tzd3S0tLX18fDo6OjIzMw8fPozxXbDevXv37sSJEwhl8nqOQrfNIUjDW7ZsmT59Op42zLWsV73AkiVLrl692qdPHySVpKSkBw8eKKv38vI6cOAAbhW6LKRD9M1E7+vrm5qaitry7Nmz+Ph4g+/ZJVIthSiWjVx6U1ZRoC6ZHx4swlesWHHu3DkQ29TUVFxcjIfcIGl0hIwfP/7WrVuo+CEhISgLnp6eJSUlUPJtxo4dO27cOAwnx48fR36aOHEi/HBzc7t06VJ4eDgmJDhh8MQcEGYrV658+fKlme4ttaOjY3Z2tmDIsYBMg3EWvTs4io2N5b4NQY88xLesqalB4cYTOWfOnIKCAu71g1J6tMKYwq9cuQLPkWhCQ0OJvq2tDXUDHTl+IkJcXFxk4UoKUSI2suiNW9XZC2cRjgnC3t4ecwjaOUQj+RLFAc/wvXv3qK0EqgwmG4RXS0sLWjT991pmug80Tk5OEG7evImRqLS0FGdKS0t7/vw5ZqOGhgaW34Kwtra+e/dup5boQ6MDX4MCWFFRQZkRivWhlB63UN9zMx3DgvamcyWFKEGXZNQbsUrKhfNLCotwFrEE+uFhJvKXi2i0XF1d8cQvX74cVQn3kjs0YcKEjRs3mukiFQI8q66uTk9PxzSfkpIyb9488SvpHpw8eXLu3LlKe/EPQCVKHGKTSnR0dEBAAKb22bNnYxbk9GiO0UAnJCRYWFjU19dnZWVhTHz16pWNjU15eTn6yC73WgLgcEZGhtJe/ANQiRKHWIRg0NFqtZRy6dKld+7cQU8FGXUD6Wfq1Kl1dXWnTp2C5smTJxgrFXk1TIEf0ipEoBIljk7/f0h+fj4ne3h4NDc3849iopLBKRUq/hqo/0GlQoUY/gMd7Yq8ymeqcAAAAABJRU5ErkJggg==)
Вероятность надежной работы по обрыву в выпрямительном блоке:
,
| (35)
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![](data:image/png;base64,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)
Вероятность отказа по обрыву плеча:
![](data:image/png;base64,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)
| (36)
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![](data:image/png;base64,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)
В выпрямителе:
![](data:image/png;base64,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)
| (37)
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![](data:image/png;base64,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)
,
| (38)
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.
Результаты расчетов:
Таблица №10
Элемент
| Вероятность отказа по замыканию
| Вероятность надежной работы по замыканию
| Вероятность отказа по обрыву
| Вероятность надежной работы по обрыву
| Диод
| 0,0042748800
| 0,99572512
| 0,001068720
| 0,998931280
| Цепочка
| 0,0000000050
| 0,999999995
| 0,006395212
| 0,993604788
| Плечо
| 0,0000000249
| 0,999999975
| 0,000002591
| 0,999997409
| Выпрямительный блок
| 0,0000001493
| 0,999999851
| 0,0000155431
| 0,999984457
| Выпрямитель
| QВ = ![](data:image/png;base64,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)
| PВ = ![](data:image/png;base64,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)
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