(3)
теңдеуінің түбірі болуға тиіс.
Сөйтіп, (1) теңдеудің шешімінің бар болуы біріншіден, оның –қа қатысты шешілу мүмкіндігімен екіншіден, (2) теңдеудің шешімдерінің бар болуымен байланысты екен.
Теорема 3. Егер центрі ( ) нүктесінде ( , F( )=0 теңдеудің түбірі) болатын ![](data:image/png;base64,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) 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) тұйық параллелепипедінде мына шарттар
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