解   [tex=7.143x1.5]37tQcW9cKFzfSzkO3THIQIzhC8fwBHAOXWVz8QDUMDs=[/tex]是 [tex=12.286x1.571]h/29jdoeHbHrEBH6p9Xi6trQfqOUSA44/r3EWygGFzV4EqX6H+pMD8blpudmax5izt9L1U7iw7iwObjpE/QTfA==[/tex]被 [tex=2.357x1.143]RXPUuGtyMsNdtHsopW2V8w==[/tex] 除的商.[tex=4.0x1.357]xqBqcPMZLX73jsHkaEApvg==[/tex]的全部复数根为[tex=19.071x2.429]dhSnjuamM7e4461FfzCjk2BNwIM0JHAFw8sl+dlUeciLjpnXzHVVdhsk1dTYNYhf02uqt0fJjqiUajXezosCF2MvBNZZ+6OuD/CoJDI3Hkhwc3jwNQW22uEm1a8LMjhdcSlwMq3e9i/bD8wOW4YoEg==[/tex]其中 [tex=2.714x1.0]dFuH9eXfAoxy/PEGB73UIC+a439NehQljwhrgSvdfqo=[/tex]所有这些 [tex=1.071x1.214]b7eY4U49AQ0FhLZEJ22e/A==[/tex]中, 除了[tex=2.357x1.143]RXPUuGtyMsNdtHsopW2V8w==[/tex]的根[tex=10.429x1.5]cGb5R1/DixYiSbpMTRhcwBr5pR3yhCukHx3+ldWx2gppzW38kyqJkF+uhgRMf9pj[/tex] 之外, 其余的[tex=4.929x1.5]cGb5R1/DixYiSbpMTRhcwPO8NgBYY2a3pK5H6dANrr8=[/tex]或 [tex=9.0x1.357]CB4xViLCxseuJF9CmIxSPuASiiEr0f20dIKnXq7Bm4xoWdHe9KRi1UmSjXU/sVYW[/tex]就是 [tex=1.857x1.357]bZ4KhrFbnCaidqbMGQZfww==[/tex]的全部根. [tex=1.857x1.357]QwcZRP/k6GQjt3RgosTUtg==[/tex]在复数范围内的分解式为[tex=13.357x3.286]8ZJL4Ua5GNciK2ykYsqKJnXNayjpKytM1CxRO64J+kfpzOZuRYERoVtwK8B7Cg6OJ7dA4i4NCg1+d1d/7dNPsQoj+j7wwIa9BVfCwaRvld7WIaWHO6zs1OUxAPsQ06EX[/tex]每个 [tex=8.429x1.5]U/qbRyO6yLDveU0emixt+S5HoC/Q4kRmtuGvvZy5FCkYMOMZNFiO9j/pokxu2jf6[/tex]与其共轭虚根[tex=11.857x1.286]2Alm3dNkkaxRkV0Mozdh19j1dyOKa9nvjNDX8BC3wivPI37qNMfPvrpCTrSDUVRdkXtsKWXAqFdQ81bRHgNAcmk9GPjottXgpqI41tKLbfw=[/tex] 决定的一次因式的乘积[tex=23.643x2.429]y9FPTRfVfaPQ1Fo++5PWTPmj+VygIDbarq4ZbZ2GPXsmPcO6OGj+OC5tYcoU8PCcSanghpzH2zs+dv8zkJ1+CYVTPyrczjOy9boCWurrCbHLSNe6m1QOw6Ad+DIEtjYBcECCWzHF1iClrM8g6UM/+UocH+PP0/YxjvLGuWcR/RE=[/tex]是实数域上不可约因式, [tex=1.857x1.357]bZ4KhrFbnCaidqbMGQZfww==[/tex] 在实数域上分解为这 [tex=0.643x0.786]/he/ol8BkDuTTL9yMPtH4Q==[/tex] 个二次不可约因式 [tex=2.214x1.357]adUZQ3+U1NKUHJzemqgaUg==[/tex]之积[tex=18.571x3.429]sl16/u6o3F6CUa0VmBipQN4frLustZMw6xewqgoIKUan3VVxeeOS75gTTkr0wyBu7LWppdLvAV16H64DGpMjcXhHZTXwcFFkQIqS9afm+9QDe2bLeliR82phUuR2hwuN[/tex]